|\^/| Maple 12 (IBM INTEL LINUX)
._|\| |/|_. Copyright (c) Maplesoft, a division of Waterloo Maple Inc. 2008
\ MAPLE / All rights reserved. Maple is a trademark of
<____ ____> Waterloo Maple Inc.
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> #BEGIN OUTFILE1
> # Begin Function number 3
> check_sign := proc( x0 ,xf)
> local ret;
> if (xf > x0) then # if number 1
> ret := 1.0;
> else
> ret := -1.0;
> fi;# end if 1;
> ret;;
> end;
check_sign := proc(x0, xf)
local ret;
if x0 < xf then ret := 1.0 else ret := -1.0 end if; ret
end proc
> # End Function number 3
> # Begin Function number 4
> est_size_answer := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local min_size;
> min_size := glob_large_float;
> if (omniabs(array_y[1]) < min_size) then # if number 1
> min_size := omniabs(array_y[1]);
> omniout_float(ALWAYS,"min_size",32,min_size,32,"");
> fi;# end if 1;
> if (min_size < 1.0) then # if number 1
> min_size := 1.0;
> omniout_float(ALWAYS,"min_size",32,min_size,32,"");
> fi;# end if 1;
> min_size;
> end;
est_size_answer := proc()
local min_size;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
min_size := glob_large_float;
if omniabs(array_y[1]) < min_size then
min_size := omniabs(array_y[1]);
omniout_float(ALWAYS, "min_size", 32, min_size, 32, "")
end if;
if min_size < 1.0 then
min_size := 1.0;
omniout_float(ALWAYS, "min_size", 32, min_size, 32, "")
end if;
min_size
end proc
> # End Function number 4
> # Begin Function number 5
> test_suggested_h := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local max_value3,hn_div_ho,hn_div_ho_2,hn_div_ho_3,value3,no_terms;
> max_value3 := 0.0;
> no_terms := glob_max_terms;
> hn_div_ho := 0.5;
> hn_div_ho_2 := 0.25;
> hn_div_ho_3 := 0.125;
> omniout_float(ALWAYS,"hn_div_ho",32,hn_div_ho,32,"");
> omniout_float(ALWAYS,"hn_div_ho_2",32,hn_div_ho_2,32,"");
> omniout_float(ALWAYS,"hn_div_ho_3",32,hn_div_ho_3,32,"");
> value3 := omniabs(array_y[no_terms-3] + array_y[no_terms - 2] * hn_div_ho + array_y[no_terms - 1] * hn_div_ho_2 + array_y[no_terms] * hn_div_ho_3);
> if (value3 > max_value3) then # if number 1
> max_value3 := value3;
> omniout_float(ALWAYS,"value3",32,value3,32,"");
> fi;# end if 1;
> omniout_float(ALWAYS,"max_value3",32,max_value3,32,"");
> max_value3;
> end;
test_suggested_h := proc()
local max_value3, hn_div_ho, hn_div_ho_2, hn_div_ho_3, value3, no_terms;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
max_value3 := 0.;
no_terms := glob_max_terms;
hn_div_ho := 0.5;
hn_div_ho_2 := 0.25;
hn_div_ho_3 := 0.125;
omniout_float(ALWAYS, "hn_div_ho", 32, hn_div_ho, 32, "");
omniout_float(ALWAYS, "hn_div_ho_2", 32, hn_div_ho_2, 32, "");
omniout_float(ALWAYS, "hn_div_ho_3", 32, hn_div_ho_3, 32, "");
value3 := omniabs(array_y[no_terms - 3]
+ array_y[no_terms - 2]*hn_div_ho
+ array_y[no_terms - 1]*hn_div_ho_2
+ array_y[no_terms]*hn_div_ho_3);
if max_value3 < value3 then
max_value3 := value3;
omniout_float(ALWAYS, "value3", 32, value3, 32, "")
end if;
omniout_float(ALWAYS, "max_value3", 32, max_value3, 32, "");
max_value3
end proc
> # End Function number 5
> # Begin Function number 6
> reached_interval := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local ret;
> if (glob_check_sign * (array_x[1]) >= glob_check_sign * glob_next_display) then # if number 1
> ret := true;
> else
> ret := false;
> fi;# end if 1;
> return(ret);
> end;
reached_interval := proc()
local ret;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
if glob_check_sign*glob_next_display <= glob_check_sign*array_x[1] then
ret := true
else ret := false
end if;
return ret
end proc
> # End Function number 6
> # Begin Function number 7
> display_alot := proc(iter)
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local abserr, analytic_val_y, ind_var, numeric_val, relerr, term_no;
> #TOP DISPLAY ALOT
> if (reached_interval()) then # if number 1
> if (iter >= 0) then # if number 2
> ind_var := array_x[1];
> omniout_float(ALWAYS,"x[1] ",33,ind_var,20," ");
> analytic_val_y := exact_soln_y(ind_var);
> omniout_float(ALWAYS,"y[1] (analytic) ",33,analytic_val_y,20," ");
> term_no := 1;
> numeric_val := array_y[term_no];
> abserr := omniabs(numeric_val - analytic_val_y);
> omniout_float(ALWAYS,"y[1] (numeric) ",33,numeric_val,20," ");
> if (omniabs(analytic_val_y) <> 0.0) then # if number 3
> relerr := abserr*100.0/omniabs(analytic_val_y);
> if (relerr > 0.0000000000000000000000000000000001) then # if number 4
> glob_good_digits := -trunc(log10(relerr)) + 2;
> else
> glob_good_digits := Digits;
> fi;# end if 4;
> else
> relerr := -1.0 ;
> glob_good_digits := -1;
> fi;# end if 3;
> if (glob_iter = 1) then # if number 3
> array_1st_rel_error[1] := relerr;
> else
> array_last_rel_error[1] := relerr;
> fi;# end if 3;
> omniout_float(ALWAYS,"absolute error ",4,abserr,20," ");
> omniout_float(ALWAYS,"relative error ",4,relerr,20,"%");
> omniout_int(INFO,"Correct digits ",32,glob_good_digits,4," ")
> ;
> omniout_float(ALWAYS,"h ",4,glob_h,20," ");
> fi;# end if 2;
> #BOTTOM DISPLAY ALOT
> fi;# end if 1;
> end;
display_alot := proc(iter)
local abserr, analytic_val_y, ind_var, numeric_val, relerr, term_no;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
if reached_interval() then
if 0 <= iter then
ind_var := array_x[1];
omniout_float(ALWAYS, "x[1] ", 33,
ind_var, 20, " ");
analytic_val_y := exact_soln_y(ind_var);
omniout_float(ALWAYS, "y[1] (analytic) ", 33,
analytic_val_y, 20, " ");
term_no := 1;
numeric_val := array_y[term_no];
abserr := omniabs(numeric_val - analytic_val_y);
omniout_float(ALWAYS, "y[1] (numeric) ", 33,
numeric_val, 20, " ");
if omniabs(analytic_val_y) <> 0. then
relerr := abserr*100.0/omniabs(analytic_val_y);
if 0.1*10^(-33) < relerr then
glob_good_digits := -trunc(log10(relerr)) + 2
else glob_good_digits := Digits
end if
else relerr := -1.0; glob_good_digits := -1
end if;
if glob_iter = 1 then array_1st_rel_error[1] := relerr
else array_last_rel_error[1] := relerr
end if;
omniout_float(ALWAYS, "absolute error ", 4,
abserr, 20, " ");
omniout_float(ALWAYS, "relative error ", 4,
relerr, 20, "%");
omniout_int(INFO, "Correct digits ", 32,
glob_good_digits, 4, " ");
omniout_float(ALWAYS, "h ", 4,
glob_h, 20, " ")
end if
end if
end proc
> # End Function number 7
> # Begin Function number 8
> adjust_for_pole := proc(h_param)
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local hnew, sz2, tmp;
> #TOP ADJUST FOR POLE
> hnew := h_param;
> glob_normmax := glob_small_float;
> if (omniabs(array_y_higher[1,1]) > glob_small_float) then # if number 1
> tmp := omniabs(array_y_higher[1,1]);
> if (tmp < glob_normmax) then # if number 2
> glob_normmax := tmp;
> fi;# end if 2
> fi;# end if 1;
> if (glob_look_poles and (omniabs(array_pole[1]) > glob_small_float) and (array_pole[1] <> glob_large_float)) then # if number 1
> sz2 := array_pole[1]/10.0;
> if (sz2 < hnew) then # if number 2
> omniout_float(INFO,"glob_h adjusted to ",20,h_param,12,"due to singularity.");
> omniout_str(INFO,"Reached Optimal");
> return(hnew);
> fi;# end if 2
> fi;# end if 1;
> if ( not glob_reached_optimal_h) then # if number 1
> glob_reached_optimal_h := true;
> glob_curr_iter_when_opt := glob_current_iter;
> glob_optimal_clock_start_sec := elapsed_time_seconds();
> glob_optimal_start := array_x[1];
> fi;# end if 1;
> hnew := sz2;
> ;#END block
> return(hnew);
> #BOTTOM ADJUST FOR POLE
> end;
adjust_for_pole := proc(h_param)
local hnew, sz2, tmp;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
hnew := h_param;
glob_normmax := glob_small_float;
if glob_small_float < omniabs(array_y_higher[1, 1]) then
tmp := omniabs(array_y_higher[1, 1]);
if tmp < glob_normmax then glob_normmax := tmp end if
end if;
if glob_look_poles and glob_small_float < omniabs(array_pole[1]) and
array_pole[1] <> glob_large_float then
sz2 := array_pole[1]/10.0;
if sz2 < hnew then
omniout_float(INFO, "glob_h adjusted to ", 20, h_param, 12,
"due to singularity.");
omniout_str(INFO, "Reached Optimal");
return hnew
end if
end if;
if not glob_reached_optimal_h then
glob_reached_optimal_h := true;
glob_curr_iter_when_opt := glob_current_iter;
glob_optimal_clock_start_sec := elapsed_time_seconds();
glob_optimal_start := array_x[1]
end if;
hnew := sz2;
return hnew
end proc
> # End Function number 8
> # Begin Function number 9
> prog_report := proc(x_start,x_end)
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local clock_sec, opt_clock_sec, clock_sec1, expect_sec, left_sec, percent_done, total_clock_sec;
> #TOP PROGRESS REPORT
> clock_sec1 := elapsed_time_seconds();
> total_clock_sec := convfloat(clock_sec1) - convfloat(glob_orig_start_sec);
> glob_clock_sec := convfloat(clock_sec1) - convfloat(glob_clock_start_sec);
> left_sec := convfloat(glob_max_sec) + convfloat(glob_orig_start_sec) - convfloat(clock_sec1);
> expect_sec := comp_expect_sec(convfloat(x_end),convfloat(x_start),convfloat(array_x[1]) + convfloat(glob_h) ,convfloat( clock_sec1) - convfloat(glob_orig_start_sec));
> opt_clock_sec := convfloat( clock_sec1) - convfloat(glob_optimal_clock_start_sec);
> glob_optimal_expect_sec := comp_expect_sec(convfloat(x_end),convfloat(x_start),convfloat(array_x[1]) +convfloat( glob_h) ,convfloat( opt_clock_sec));
> glob_total_exp_sec := glob_optimal_expect_sec + total_clock_sec;
> percent_done := comp_percent(convfloat(x_end),convfloat(x_start),convfloat(array_x[1]) + convfloat(glob_h));
> glob_percent_done := percent_done;
> omniout_str_noeol(INFO,"Total Elapsed Time ");
> omniout_timestr(convfloat(total_clock_sec));
> omniout_str_noeol(INFO,"Elapsed Time(since restart) ");
> omniout_timestr(convfloat(glob_clock_sec));
> if (convfloat(percent_done) < convfloat(100.0)) then # if number 1
> omniout_str_noeol(INFO,"Expected Time Remaining ");
> omniout_timestr(convfloat(expect_sec));
> omniout_str_noeol(INFO,"Optimized Time Remaining ");
> omniout_timestr(convfloat(glob_optimal_expect_sec));
> omniout_str_noeol(INFO,"Expected Total Time ");
> omniout_timestr(convfloat(glob_total_exp_sec));
> fi;# end if 1;
> omniout_str_noeol(INFO,"Time to Timeout ");
> omniout_timestr(convfloat(left_sec));
> omniout_float(INFO, "Percent Done ",33,percent_done,4,"%");
> #BOTTOM PROGRESS REPORT
> end;
prog_report := proc(x_start, x_end)
local clock_sec, opt_clock_sec, clock_sec1, expect_sec, left_sec,
percent_done, total_clock_sec;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
clock_sec1 := elapsed_time_seconds();
total_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_orig_start_sec);
glob_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_clock_start_sec);
left_sec := convfloat(glob_max_sec) + convfloat(glob_orig_start_sec)
- convfloat(clock_sec1);
expect_sec := comp_expect_sec(convfloat(x_end), convfloat(x_start),
convfloat(array_x[1]) + convfloat(glob_h),
convfloat(clock_sec1) - convfloat(glob_orig_start_sec));
opt_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_optimal_clock_start_sec);
glob_optimal_expect_sec := comp_expect_sec(convfloat(x_end),
convfloat(x_start), convfloat(array_x[1]) + convfloat(glob_h),
convfloat(opt_clock_sec));
glob_total_exp_sec := glob_optimal_expect_sec + total_clock_sec;
percent_done := comp_percent(convfloat(x_end), convfloat(x_start),
convfloat(array_x[1]) + convfloat(glob_h));
glob_percent_done := percent_done;
omniout_str_noeol(INFO, "Total Elapsed Time ");
omniout_timestr(convfloat(total_clock_sec));
omniout_str_noeol(INFO, "Elapsed Time(since restart) ");
omniout_timestr(convfloat(glob_clock_sec));
if convfloat(percent_done) < convfloat(100.0) then
omniout_str_noeol(INFO, "Expected Time Remaining ");
omniout_timestr(convfloat(expect_sec));
omniout_str_noeol(INFO, "Optimized Time Remaining ");
omniout_timestr(convfloat(glob_optimal_expect_sec));
omniout_str_noeol(INFO, "Expected Total Time ");
omniout_timestr(convfloat(glob_total_exp_sec))
end if;
omniout_str_noeol(INFO, "Time to Timeout ");
omniout_timestr(convfloat(left_sec));
omniout_float(INFO, "Percent Done ", 33,
percent_done, 4, "%")
end proc
> # End Function number 9
> # Begin Function number 10
> check_for_pole := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local cnt, dr1, dr2, ds1, ds2, hdrc,hdrc_BBB, m, n, nr1, nr2, ord_no, rad_c, rcs, rm0, rm1, rm2, rm3, rm4, found_sing, h_new, ratio, term;
> #TOP CHECK FOR POLE
> #IN RADII REAL EQ = 1
> #Computes radius of convergence and r_order of pole from 3 adjacent Taylor series terms. EQUATUON NUMBER 1
> #Applies to pole of arbitrary r_order on the real axis,
> #Due to Prof. George Corliss.
> n := glob_max_terms;
> m := n - 1 - 1;
> while ((m >= 10) and ((omniabs(array_y_higher[1,m]) < glob_small_float * glob_small_float) or (omniabs(array_y_higher[1,m-1]) < glob_small_float * glob_small_float) or (omniabs(array_y_higher[1,m-2]) < glob_small_float * glob_small_float ))) do # do number 2
> m := m - 1;
> od;# end do number 2;
> if (m > 10) then # if number 1
> rm0 := array_y_higher[1,m]/array_y_higher[1,m-1];
> rm1 := array_y_higher[1,m-1]/array_y_higher[1,m-2];
> hdrc := convfloat(m)*rm0-convfloat(m-1)*rm1;
> if (omniabs(hdrc) > glob_small_float * glob_small_float) then # if number 2
> rcs := glob_h/hdrc;
> ord_no := (rm1*convfloat((m-2)*(m-2))-rm0*convfloat(m-3))/hdrc;
> array_real_pole[1,1] := rcs;
> array_real_pole[1,2] := ord_no;
> else
> array_real_pole[1,1] := glob_large_float;
> array_real_pole[1,2] := glob_large_float;
> fi;# end if 2
> else
> array_real_pole[1,1] := glob_large_float;
> array_real_pole[1,2] := glob_large_float;
> fi;# end if 1;
> #BOTTOM RADII REAL EQ = 1
> #TOP RADII COMPLEX EQ = 1
> #Computes radius of convergence for complex conjugate pair of poles.
> #from 6 adjacent Taylor series terms
> #Also computes r_order of poles.
> #Due to Manuel Prieto.
> #With a correction by Dennis J. Darland
> n := glob_max_terms - 1 - 1;
> cnt := 0;
> while ((cnt < 5) and (n >= 10)) do # do number 2
> if (omniabs(array_y_higher[1,n]) > glob_small_float) then # if number 1
> cnt := cnt + 1;
> else
> cnt := 0;
> fi;# end if 1;
> n := n - 1;
> od;# end do number 2;
> m := n + cnt;
> if (m <= 10) then # if number 1
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> elif
> (((omniabs(array_y_higher[1,m]) >= (glob_large_float)) or (omniabs(array_y_higher[1,m-1]) >=(glob_large_float)) or (omniabs(array_y_higher[1,m-2]) >= (glob_large_float)) or (omniabs(array_y_higher[1,m-3]) >= (glob_large_float)) or (omniabs(array_y_higher[1,m-4]) >= (glob_large_float)) or (omniabs(array_y_higher[1,m-5]) >= (glob_large_float))) or ((omniabs(array_y_higher[1,m]) <= (glob_small_float)) or (omniabs(array_y_higher[1,m-1]) <=(glob_small_float)) or (omniabs(array_y_higher[1,m-2]) <= (glob_small_float)) or (omniabs(array_y_higher[1,m-3]) <= (glob_small_float)) or (omniabs(array_y_higher[1,m-4]) <= (glob_small_float)) or (omniabs(array_y_higher[1,m-5]) <= (glob_small_float)))) then # if number 2
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> else
> rm0 := (array_y_higher[1,m])/(array_y_higher[1,m-1]);
> rm1 := (array_y_higher[1,m-1])/(array_y_higher[1,m-2]);
> rm2 := (array_y_higher[1,m-2])/(array_y_higher[1,m-3]);
> rm3 := (array_y_higher[1,m-3])/(array_y_higher[1,m-4]);
> rm4 := (array_y_higher[1,m-4])/(array_y_higher[1,m-5]);
> nr1 := convfloat(m-1)*rm0 - 2.0*convfloat(m-2)*rm1 + convfloat(m-3)*rm2;
> nr2 := convfloat(m-2)*rm1 - 2.0*convfloat(m-3)*rm2 + convfloat(m-4)*rm3;
> dr1 := (-1.0)/rm1 + 2.0/rm2 - 1.0/rm3;
> dr2 := (-1.0)/rm2 + 2.0/rm3 - 1.0/rm4;
> ds1 := 3.0/rm1 - 8.0/rm2 + 5.0/rm3;
> ds2 := 3.0/rm2 - 8.0/rm3 + 5.0/rm4;
> if ((omniabs(nr1 * dr2 - nr2 * dr1) <= glob_small_float) or (omniabs(dr1) <= glob_small_float)) then # if number 3
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> else
> if (omniabs(nr1*dr2 - nr2 * dr1) > glob_small_float) then # if number 4
> rcs := ((ds1*dr2 - ds2*dr1 +dr1*dr2)/(nr1*dr2 - nr2 * dr1));
> #(Manuels) rcs := (ds1*dr2 - ds2*dr1)/(nr1*dr2 - nr2 * dr1)
> ord_no := (rcs*nr1 - ds1)/(2.0*dr1) -convfloat(m)/2.0;
> if (omniabs(rcs) > glob_small_float) then # if number 5
> if (rcs > 0.0) then # if number 6
> rad_c := sqrt(rcs) * omniabs(glob_h);
> else
> rad_c := glob_large_float;
> fi;# end if 6
> else
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> fi;# end if 5
> else
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> fi;# end if 4
> fi;# end if 3;
> array_complex_pole[1,1] := rad_c;
> array_complex_pole[1,2] := ord_no;
> fi;# end if 2;
> #BOTTOM RADII COMPLEX EQ = 1
> found_sing := 0;
> #TOP WHICH RADII EQ = 1
> if (1 <> found_sing and ((array_real_pole[1,1] = glob_large_float) or (array_real_pole[1,2] = glob_large_float)) and ((array_complex_pole[1,1] <> glob_large_float) and (array_complex_pole[1,2] <> glob_large_float)) and ((array_complex_pole[1,1] > 0.0) and (array_complex_pole[1,2] > 0.0))) then # if number 2
> array_poles[1,1] := array_complex_pole[1,1];
> array_poles[1,2] := array_complex_pole[1,2];
> found_sing := 1;
> array_type_pole[1] := 2;
> if (glob_display_flag) then # if number 3
> if (reached_interval()) then # if number 4
> omniout_str(ALWAYS,"Complex estimate of poles used for equation 1");
> fi;# end if 4;
> fi;# end if 3;
> fi;# end if 2;
> if (1 <> found_sing and ((array_real_pole[1,1] <> glob_large_float) and (array_real_pole[1,2] <> glob_large_float) and (array_real_pole[1,1] > 0.0) and (array_real_pole[1,2] > -1.0 * glob_smallish_float) and ((array_complex_pole[1,1] = glob_large_float) or (array_complex_pole[1,2] = glob_large_float) or (array_complex_pole[1,1] <= 0.0 ) or (array_complex_pole[1,2] <= 0.0)))) then # if number 2
> array_poles[1,1] := array_real_pole[1,1];
> array_poles[1,2] := array_real_pole[1,2];
> found_sing := 1;
> array_type_pole[1] := 1;
> if (glob_display_flag) then # if number 3
> if (reached_interval()) then # if number 4
> omniout_str(ALWAYS,"Real estimate of pole used for equation 1");
> fi;# end if 4;
> fi;# end if 3;
> fi;# end if 2;
> if (1 <> found_sing and (((array_real_pole[1,1] = glob_large_float) or (array_real_pole[1,2] = glob_large_float)) and ((array_complex_pole[1,1] = glob_large_float) or (array_complex_pole[1,2] = glob_large_float)))) then # if number 2
> array_poles[1,1] := glob_large_float;
> array_poles[1,2] := glob_large_float;
> found_sing := 1;
> array_type_pole[1] := 3;
> if (reached_interval()) then # if number 3
> omniout_str(ALWAYS,"NO POLE for equation 1");
> fi;# end if 3;
> fi;# end if 2;
> if (1 <> found_sing and ((array_real_pole[1,1] < array_complex_pole[1,1]) and (array_real_pole[1,1] > 0.0) and (array_real_pole[1,2] > -1.0 * glob_smallish_float))) then # if number 2
> array_poles[1,1] := array_real_pole[1,1];
> array_poles[1,2] := array_real_pole[1,2];
> found_sing := 1;
> array_type_pole[1] := 1;
> if (glob_display_flag) then # if number 3
> if (reached_interval()) then # if number 4
> omniout_str(ALWAYS,"Real estimate of pole used for equation 1");
> fi;# end if 4;
> fi;# end if 3;
> fi;# end if 2;
> if (1 <> found_sing and ((array_complex_pole[1,1] <> glob_large_float) and (array_complex_pole[1,2] <> glob_large_float) and (array_complex_pole[1,1] > 0.0) and (array_complex_pole[1,2] > 0.0))) then # if number 2
> array_poles[1,1] := array_complex_pole[1,1];
> array_poles[1,2] := array_complex_pole[1,2];
> array_type_pole[1] := 2;
> found_sing := 1;
> if (glob_display_flag) then # if number 3
> if (reached_interval()) then # if number 4
> omniout_str(ALWAYS,"Complex estimate of poles used for equation 1");
> fi;# end if 4;
> fi;# end if 3;
> fi;# end if 2;
> if (1 <> found_sing ) then # if number 2
> array_poles[1,1] := glob_large_float;
> array_poles[1,2] := glob_large_float;
> array_type_pole[1] := 3;
> if (reached_interval()) then # if number 3
> omniout_str(ALWAYS,"NO POLE for equation 1");
> fi;# end if 3;
> fi;# end if 2;
> #BOTTOM WHICH RADII EQ = 1
> array_pole[1] := glob_large_float;
> array_pole[2] := glob_large_float;
> #TOP WHICH RADIUS EQ = 1
> if (array_pole[1] > array_poles[1,1]) then # if number 2
> array_pole[1] := array_poles[1,1];
> array_pole[2] := array_poles[1,2];
> fi;# end if 2;
> #BOTTOM WHICH RADIUS EQ = 1
> #START ADJUST ALL SERIES
> if (array_pole[1] * glob_ratio_of_radius < omniabs(glob_h)) then # if number 2
> h_new := array_pole[1] * glob_ratio_of_radius;
> term := 1;
> ratio := 1.0;
> while (term <= glob_max_terms) do # do number 2
> array_y[term] := array_y[term]* ratio;
> array_y_higher[1,term] := array_y_higher[1,term]* ratio;
> array_x[term] := array_x[term]* ratio;
> ratio := ratio * h_new / omniabs(glob_h);
> term := term + 1;
> od;# end do number 2;
> glob_h := h_new;
> fi;# end if 2;
> #BOTTOM ADJUST ALL SERIES
> if (reached_interval()) then # if number 2
> display_pole();
> fi;# end if 2
> end;
check_for_pole := proc()
local cnt, dr1, dr2, ds1, ds2, hdrc, hdrc_BBB, m, n, nr1, nr2, ord_no,
rad_c, rcs, rm0, rm1, rm2, rm3, rm4, found_sing, h_new, ratio, term;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
n := glob_max_terms;
m := n - 2;
while 10 <= m and (
omniabs(array_y_higher[1, m]) < glob_small_float*glob_small_float or
omniabs(array_y_higher[1, m - 1]) < glob_small_float*glob_small_float
or
omniabs(array_y_higher[1, m - 2]) < glob_small_float*glob_small_float)
do m := m - 1
end do;
if 10 < m then
rm0 := array_y_higher[1, m]/array_y_higher[1, m - 1];
rm1 := array_y_higher[1, m - 1]/array_y_higher[1, m - 2];
hdrc := convfloat(m)*rm0 - convfloat(m - 1)*rm1;
if glob_small_float*glob_small_float < omniabs(hdrc) then
rcs := glob_h/hdrc;
ord_no := (
rm1*convfloat((m - 2)*(m - 2)) - rm0*convfloat(m - 3))/hdrc
;
array_real_pole[1, 1] := rcs;
array_real_pole[1, 2] := ord_no
else
array_real_pole[1, 1] := glob_large_float;
array_real_pole[1, 2] := glob_large_float
end if
else
array_real_pole[1, 1] := glob_large_float;
array_real_pole[1, 2] := glob_large_float
end if;
n := glob_max_terms - 2;
cnt := 0;
while cnt < 5 and 10 <= n do
if glob_small_float < omniabs(array_y_higher[1, n]) then
cnt := cnt + 1
else cnt := 0
end if;
n := n - 1
end do;
m := n + cnt;
if m <= 10 then rad_c := glob_large_float; ord_no := glob_large_float
elif glob_large_float <= omniabs(array_y_higher[1, m]) or
glob_large_float <= omniabs(array_y_higher[1, m - 1]) or
glob_large_float <= omniabs(array_y_higher[1, m - 2]) or
glob_large_float <= omniabs(array_y_higher[1, m - 3]) or
glob_large_float <= omniabs(array_y_higher[1, m - 4]) or
glob_large_float <= omniabs(array_y_higher[1, m - 5]) or
omniabs(array_y_higher[1, m]) <= glob_small_float or
omniabs(array_y_higher[1, m - 1]) <= glob_small_float or
omniabs(array_y_higher[1, m - 2]) <= glob_small_float or
omniabs(array_y_higher[1, m - 3]) <= glob_small_float or
omniabs(array_y_higher[1, m - 4]) <= glob_small_float or
omniabs(array_y_higher[1, m - 5]) <= glob_small_float then
rad_c := glob_large_float; ord_no := glob_large_float
else
rm0 := array_y_higher[1, m]/array_y_higher[1, m - 1];
rm1 := array_y_higher[1, m - 1]/array_y_higher[1, m - 2];
rm2 := array_y_higher[1, m - 2]/array_y_higher[1, m - 3];
rm3 := array_y_higher[1, m - 3]/array_y_higher[1, m - 4];
rm4 := array_y_higher[1, m - 4]/array_y_higher[1, m - 5];
nr1 := convfloat(m - 1)*rm0 - 2.0*convfloat(m - 2)*rm1
+ convfloat(m - 3)*rm2;
nr2 := convfloat(m - 2)*rm1 - 2.0*convfloat(m - 3)*rm2
+ convfloat(m - 4)*rm3;
dr1 := (-1)*(1.0)/rm1 + 2.0/rm2 - 1.0/rm3;
dr2 := (-1)*(1.0)/rm2 + 2.0/rm3 - 1.0/rm4;
ds1 := 3.0/rm1 - 8.0/rm2 + 5.0/rm3;
ds2 := 3.0/rm2 - 8.0/rm3 + 5.0/rm4;
if omniabs(nr1*dr2 - nr2*dr1) <= glob_small_float or
omniabs(dr1) <= glob_small_float then
rad_c := glob_large_float; ord_no := glob_large_float
else
if glob_small_float < omniabs(nr1*dr2 - nr2*dr1) then
rcs := (ds1*dr2 - ds2*dr1 + dr1*dr2)/(nr1*dr2 - nr2*dr1);
ord_no := (rcs*nr1 - ds1)/(2.0*dr1) - convfloat(m)/2.0;
if glob_small_float < omniabs(rcs) then
if 0. < rcs then rad_c := sqrt(rcs)*omniabs(glob_h)
else rad_c := glob_large_float
end if
else rad_c := glob_large_float; ord_no := glob_large_float
end if
else rad_c := glob_large_float; ord_no := glob_large_float
end if
end if;
array_complex_pole[1, 1] := rad_c;
array_complex_pole[1, 2] := ord_no
end if;
found_sing := 0;
if 1 <> found_sing and (array_real_pole[1, 1] = glob_large_float or
array_real_pole[1, 2] = glob_large_float) and
array_complex_pole[1, 1] <> glob_large_float and
array_complex_pole[1, 2] <> glob_large_float and
0. < array_complex_pole[1, 1] and 0. < array_complex_pole[1, 2] then
array_poles[1, 1] := array_complex_pole[1, 1];
array_poles[1, 2] := array_complex_pole[1, 2];
found_sing := 1;
array_type_pole[1] := 2;
if glob_display_flag then
if reached_interval() then omniout_str(ALWAYS,
"Complex estimate of poles used for equation 1")
end if
end if
end if;
if 1 <> found_sing and array_real_pole[1, 1] <> glob_large_float and
array_real_pole[1, 2] <> glob_large_float and
0. < array_real_pole[1, 1] and
-1.0*glob_smallish_float < array_real_pole[1, 2] and (
array_complex_pole[1, 1] = glob_large_float or
array_complex_pole[1, 2] = glob_large_float or
array_complex_pole[1, 1] <= 0. or array_complex_pole[1, 2] <= 0.) then
array_poles[1, 1] := array_real_pole[1, 1];
array_poles[1, 2] := array_real_pole[1, 2];
found_sing := 1;
array_type_pole[1] := 1;
if glob_display_flag then
if reached_interval() then omniout_str(ALWAYS,
"Real estimate of pole used for equation 1")
end if
end if
end if;
if 1 <> found_sing and (array_real_pole[1, 1] = glob_large_float or
array_real_pole[1, 2] = glob_large_float) and (
array_complex_pole[1, 1] = glob_large_float or
array_complex_pole[1, 2] = glob_large_float) then
array_poles[1, 1] := glob_large_float;
array_poles[1, 2] := glob_large_float;
found_sing := 1;
array_type_pole[1] := 3;
if reached_interval() then
omniout_str(ALWAYS, "NO POLE for equation 1")
end if
end if;
if 1 <> found_sing and array_real_pole[1, 1] < array_complex_pole[1, 1]
and 0. < array_real_pole[1, 1] and
-1.0*glob_smallish_float < array_real_pole[1, 2] then
array_poles[1, 1] := array_real_pole[1, 1];
array_poles[1, 2] := array_real_pole[1, 2];
found_sing := 1;
array_type_pole[1] := 1;
if glob_display_flag then
if reached_interval() then omniout_str(ALWAYS,
"Real estimate of pole used for equation 1")
end if
end if
end if;
if 1 <> found_sing and array_complex_pole[1, 1] <> glob_large_float
and array_complex_pole[1, 2] <> glob_large_float and
0. < array_complex_pole[1, 1] and 0. < array_complex_pole[1, 2] then
array_poles[1, 1] := array_complex_pole[1, 1];
array_poles[1, 2] := array_complex_pole[1, 2];
array_type_pole[1] := 2;
found_sing := 1;
if glob_display_flag then
if reached_interval() then omniout_str(ALWAYS,
"Complex estimate of poles used for equation 1")
end if
end if
end if;
if 1 <> found_sing then
array_poles[1, 1] := glob_large_float;
array_poles[1, 2] := glob_large_float;
array_type_pole[1] := 3;
if reached_interval() then
omniout_str(ALWAYS, "NO POLE for equation 1")
end if
end if;
array_pole[1] := glob_large_float;
array_pole[2] := glob_large_float;
if array_poles[1, 1] < array_pole[1] then
array_pole[1] := array_poles[1, 1];
array_pole[2] := array_poles[1, 2]
end if;
if array_pole[1]*glob_ratio_of_radius < omniabs(glob_h) then
h_new := array_pole[1]*glob_ratio_of_radius;
term := 1;
ratio := 1.0;
while term <= glob_max_terms do
array_y[term] := array_y[term]*ratio;
array_y_higher[1, term] := array_y_higher[1, term]*ratio;
array_x[term] := array_x[term]*ratio;
ratio := ratio*h_new/omniabs(glob_h);
term := term + 1
end do;
glob_h := h_new
end if;
if reached_interval() then display_pole() end if
end proc
> # End Function number 10
> # Begin Function number 11
> get_norms := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local iii;
> if ( not glob_initial_pass) then # if number 2
> iii := 1;
> while (iii <= glob_max_terms) do # do number 2
> array_norms[iii] := 0.0;
> iii := iii + 1;
> od;# end do number 2;
> #TOP GET NORMS
> iii := 1;
> while (iii <= glob_max_terms) do # do number 2
> if (omniabs(array_y[iii]) > array_norms[iii]) then # if number 3
> array_norms[iii] := omniabs(array_y[iii]);
> fi;# end if 3;
> iii := iii + 1;
> od;# end do number 2
> #BOTTOM GET NORMS
> ;
> fi;# end if 2;
> end;
get_norms := proc()
local iii;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
if not glob_initial_pass then
iii := 1;
while iii <= glob_max_terms do
array_norms[iii] := 0.; iii := iii + 1
end do;
iii := 1;
while iii <= glob_max_terms do
if array_norms[iii] < omniabs(array_y[iii]) then
array_norms[iii] := omniabs(array_y[iii])
end if;
iii := iii + 1
end do
end if
end proc
> # End Function number 11
> # Begin Function number 12
> atomall := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local kkk, order_d, adj2, adj3 , temporary, term;
> #TOP ATOMALL
> #END OUTFILE1
> #BEGIN ATOMHDR1
> #emit pre sin 1 $eq_no = 1
> array_tmp1[1] := sin(array_x[1]);
> array_tmp1_g[1] := cos(array_x[1]);
> #emit pre mult CONST - LINEAR $eq_no = 1 i = 1
> array_tmp2[1] := array_const_0D2[1] * array_x[1];
> #emit pre add LINEAR - CONST $eq_no = 1 i = 1
> array_tmp3[1] := array_tmp2[1] + array_const_0D3[1];
> #emit pre expt FULL - LINEAR $eq_no = 1 i = 1
> array_tmp4[1] := expt(array_tmp1[1] , array_tmp3[1] ) ;
> array_tmp4_a1[1] := ln(array_tmp1[1] ) ;
> array_tmp4_a1[2] := array_tmp1[2] / array_tmp1[1];
> #emit pre add CONST FULL $eq_no = 1 i = 1
> array_tmp5[1] := array_const_0D0[1] + array_tmp4[1];
> #emit pre assign xxx $eq_no = 1 i = 1 $min_hdrs = 5
> if ( not array_y_set_initial[1,2]) then # if number 1
> if (1 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[1] * expt(glob_h , (1)) * factorial_3(0,1);
> array_y[2] := temporary;
> array_y_higher[1,2] := temporary;
> temporary := temporary / glob_h * (1.0);
> array_y_higher[2,1] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 2;
> #END ATOMHDR1
> #BEGIN ATOMHDR2
> #emit pre sin ID_LINEAR iii = 2 $eq_no = 1
> array_tmp1[2] := array_tmp1_g[1] * array_x[2] / 1;
> array_tmp1_g[2] := -array_tmp1[1] * array_x[2] / 1;
> #emit pre mult CONST - LINEAR $eq_no = 1 i = 2
> array_tmp2[2] := array_const_0D2[1] * array_x[2];
> #emit pre add LINEAR - CONST $eq_no = 1 i = 2
> array_tmp3[2] := array_tmp2[2];
> #emit pre expt FULL - LINEAR $eq_no = 1 i = 2
> array_tmp4_a2[1] := (array_tmp4_a1[1] * array_tmp3[2] + array_tmp4_a1[2] * array_tmp3[1]) / glob_h;
> array_tmp4[2] := array_tmp4[1] * array_tmp4_a2[1] * glob_h;
> #emit pre add CONST FULL $eq_no = 1 i = 2
> array_tmp5[2] := array_tmp4[2];
> #emit pre assign xxx $eq_no = 1 i = 2 $min_hdrs = 5
> if ( not array_y_set_initial[1,3]) then # if number 1
> if (2 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[2] * expt(glob_h , (1)) * factorial_3(1,2);
> array_y[3] := temporary;
> array_y_higher[1,3] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_y_higher[2,2] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 3;
> #END ATOMHDR2
> #BEGIN ATOMHDR3
> #emit pre sin ID_LINEAR iii = 3 $eq_no = 1
> array_tmp1[3] := array_tmp1_g[2] * array_x[2] / 2;
> array_tmp1_g[3] := -array_tmp1[2] * array_x[2] / 2;
> #emit pre expt FULL - LINEAR $eq_no = 1 i = 3
> array_tmp4_a1[3] := (array_tmp1[3] -att(2,array_tmp1,array_tmp4_a1,2))/ array_tmp1[1];
> array_tmp4_a2[2] := (array_tmp4_a1[3] * array_tmp3[1] + array_tmp4_a1[2] * array_tmp3[2]) * 2 / glob_h;
> array_tmp4[3] := ats(2,array_tmp4,array_tmp4_a2,1)*glob_h/2;
> #emit pre add CONST FULL $eq_no = 1 i = 3
> array_tmp5[3] := array_tmp4[3];
> #emit pre assign xxx $eq_no = 1 i = 3 $min_hdrs = 5
> if ( not array_y_set_initial[1,4]) then # if number 1
> if (3 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[3] * expt(glob_h , (1)) * factorial_3(2,3);
> array_y[4] := temporary;
> array_y_higher[1,4] := temporary;
> temporary := temporary / glob_h * (3.0);
> array_y_higher[2,3] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 4;
> #END ATOMHDR3
> #BEGIN ATOMHDR4
> #emit pre sin ID_LINEAR iii = 4 $eq_no = 1
> array_tmp1[4] := array_tmp1_g[3] * array_x[2] / 3;
> array_tmp1_g[4] := -array_tmp1[3] * array_x[2] / 3;
> #emit pre expt FULL - LINEAR $eq_no = 1 i = 4
> array_tmp4_a1[4] := (array_tmp1[4] -att(3,array_tmp1,array_tmp4_a1,2))/ array_tmp1[1];
> array_tmp4_a2[3] := (array_tmp4_a1[4] * array_tmp3[1] + array_tmp4_a1[3] * array_tmp3[2]) * 3 / glob_h;
> array_tmp4[4] := ats(3,array_tmp4,array_tmp4_a2,1)*glob_h/3;
> #emit pre add CONST FULL $eq_no = 1 i = 4
> array_tmp5[4] := array_tmp4[4];
> #emit pre assign xxx $eq_no = 1 i = 4 $min_hdrs = 5
> if ( not array_y_set_initial[1,5]) then # if number 1
> if (4 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[4] * expt(glob_h , (1)) * factorial_3(3,4);
> array_y[5] := temporary;
> array_y_higher[1,5] := temporary;
> temporary := temporary / glob_h * (4.0);
> array_y_higher[2,4] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 5;
> #END ATOMHDR4
> #BEGIN ATOMHDR5
> #emit pre sin ID_LINEAR iii = 5 $eq_no = 1
> array_tmp1[5] := array_tmp1_g[4] * array_x[2] / 4;
> array_tmp1_g[5] := -array_tmp1[4] * array_x[2] / 4;
> #emit pre expt FULL - LINEAR $eq_no = 1 i = 5
> array_tmp4_a1[5] := (array_tmp1[5] -att(4,array_tmp1,array_tmp4_a1,2))/ array_tmp1[1];
> array_tmp4_a2[4] := (array_tmp4_a1[5] * array_tmp3[1] + array_tmp4_a1[4] * array_tmp3[2]) * 4 / glob_h;
> array_tmp4[5] := ats(4,array_tmp4,array_tmp4_a2,1)*glob_h/4;
> #emit pre add CONST FULL $eq_no = 1 i = 5
> array_tmp5[5] := array_tmp4[5];
> #emit pre assign xxx $eq_no = 1 i = 5 $min_hdrs = 5
> if ( not array_y_set_initial[1,6]) then # if number 1
> if (5 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[5] * expt(glob_h , (1)) * factorial_3(4,5);
> array_y[6] := temporary;
> array_y_higher[1,6] := temporary;
> temporary := temporary / glob_h * (5.0);
> array_y_higher[2,5] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 6;
> #END ATOMHDR5
> #BEGIN OUTFILE3
> #Top Atomall While Loop-- outfile3
> while (kkk <= glob_max_terms) do # do number 1
> #END OUTFILE3
> #BEGIN OUTFILE4
> #emit sin LINEAR $eq_no = 1
> array_tmp1[kkk] := array_tmp1_g[kkk - 1] * array_x[2] / (kkk - 1);
> array_tmp1_g[kkk] := -array_tmp1[kkk - 1] * array_x[2] / (kkk - 1);
> #emit expt FULL LINEAR $eq_no = 1 i = 1
> array_tmp4_a1[kkk] := (array_tmp1[kkk] - att(kkk-1,array_tmp1,array_tmp4_a1,2))/array_tmp1[1];
> array_tmp4_a2[kkk-1] := (array_tmp4_a1[kkk] * array_tmp3[1] + array_tmp4_a1[kkk-1] * array_tmp3[2]) * (kkk-1)/glob_h;
> array_tmp4[kkk] := ats(kkk-1,array_tmp4,array_tmp4_a2,1) * glob_h/(kkk-1);
> #emit NOT FULL - FULL add $eq_no = 1
> array_tmp5[kkk] := array_tmp4[kkk];
> #emit assign $eq_no = 1
> order_d := 1;
> if (kkk + order_d + 1 <= glob_max_terms) then # if number 1
> if ( not array_y_set_initial[1,kkk + order_d]) then # if number 2
> temporary := array_tmp5[kkk] * expt(glob_h , (order_d)) * factorial_3((kkk - 1),(kkk + order_d - 1));
> array_y[kkk + order_d] := temporary;
> array_y_higher[1,kkk + order_d] := temporary;
> term := kkk + order_d - 1;
> adj2 := kkk + order_d - 1;
> adj3 := 2;
> while (term >= 1) do # do number 2
> if (adj3 <= order_d + 1) then # if number 3
> if (adj2 > 0) then # if number 4
> temporary := temporary / glob_h * convfp(adj2);
> else
> temporary := temporary;
> fi;# end if 4;
> array_y_higher[adj3,term] := temporary;
> fi;# end if 3;
> term := term - 1;
> adj2 := adj2 - 1;
> adj3 := adj3 + 1;
> od;# end do number 2
> fi;# end if 2
> fi;# end if 1;
> kkk := kkk + 1;
> od;# end do number 1;
> #BOTTOM ATOMALL
> #END OUTFILE4
> #BEGIN OUTFILE5
> #BOTTOM ATOMALL ???
> end;
atomall := proc()
local kkk, order_d, adj2, adj3, temporary, term;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
array_tmp1[1] := sin(array_x[1]);
array_tmp1_g[1] := cos(array_x[1]);
array_tmp2[1] := array_const_0D2[1]*array_x[1];
array_tmp3[1] := array_tmp2[1] + array_const_0D3[1];
array_tmp4[1] := expt(array_tmp1[1], array_tmp3[1]);
array_tmp4_a1[1] := ln(array_tmp1[1]);
array_tmp4_a1[2] := array_tmp1[2]/array_tmp1[1];
array_tmp5[1] := array_const_0D0[1] + array_tmp4[1];
if not array_y_set_initial[1, 2] then
if 1 <= glob_max_terms then
temporary := array_tmp5[1]*expt(glob_h, 1)*factorial_3(0, 1);
array_y[2] := temporary;
array_y_higher[1, 2] := temporary;
temporary := temporary*1.0/glob_h;
array_y_higher[2, 1] := temporary
end if
end if;
kkk := 2;
array_tmp1[2] := array_tmp1_g[1]*array_x[2];
array_tmp1_g[2] := -array_tmp1[1]*array_x[2];
array_tmp2[2] := array_const_0D2[1]*array_x[2];
array_tmp3[2] := array_tmp2[2];
array_tmp4_a2[1] := (
array_tmp4_a1[1]*array_tmp3[2] + array_tmp4_a1[2]*array_tmp3[1])/
glob_h;
array_tmp4[2] := array_tmp4[1]*array_tmp4_a2[1]*glob_h;
array_tmp5[2] := array_tmp4[2];
if not array_y_set_initial[1, 3] then
if 2 <= glob_max_terms then
temporary := array_tmp5[2]*expt(glob_h, 1)*factorial_3(1, 2);
array_y[3] := temporary;
array_y_higher[1, 3] := temporary;
temporary := temporary*2.0/glob_h;
array_y_higher[2, 2] := temporary
end if
end if;
kkk := 3;
array_tmp1[3] := 1/2*array_tmp1_g[2]*array_x[2];
array_tmp1_g[3] := -1/2*array_tmp1[2]*array_x[2];
array_tmp4_a1[3] := (
array_tmp1[3] - att(2, array_tmp1, array_tmp4_a1, 2))/array_tmp1[1]
;
array_tmp4_a2[2] := 2*
(array_tmp4_a1[3]*array_tmp3[1] + array_tmp4_a1[2]*array_tmp3[2])/
glob_h;
array_tmp4[3] := 1/2*ats(2, array_tmp4, array_tmp4_a2, 1)*glob_h;
array_tmp5[3] := array_tmp4[3];
if not array_y_set_initial[1, 4] then
if 3 <= glob_max_terms then
temporary := array_tmp5[3]*expt(glob_h, 1)*factorial_3(2, 3);
array_y[4] := temporary;
array_y_higher[1, 4] := temporary;
temporary := temporary*3.0/glob_h;
array_y_higher[2, 3] := temporary
end if
end if;
kkk := 4;
array_tmp1[4] := 1/3*array_tmp1_g[3]*array_x[2];
array_tmp1_g[4] := -1/3*array_tmp1[3]*array_x[2];
array_tmp4_a1[4] := (
array_tmp1[4] - att(3, array_tmp1, array_tmp4_a1, 2))/array_tmp1[1]
;
array_tmp4_a2[3] := 3*
(array_tmp4_a1[4]*array_tmp3[1] + array_tmp4_a1[3]*array_tmp3[2])/
glob_h;
array_tmp4[4] := 1/3*ats(3, array_tmp4, array_tmp4_a2, 1)*glob_h;
array_tmp5[4] := array_tmp4[4];
if not array_y_set_initial[1, 5] then
if 4 <= glob_max_terms then
temporary := array_tmp5[4]*expt(glob_h, 1)*factorial_3(3, 4);
array_y[5] := temporary;
array_y_higher[1, 5] := temporary;
temporary := temporary*4.0/glob_h;
array_y_higher[2, 4] := temporary
end if
end if;
kkk := 5;
array_tmp1[5] := 1/4*array_tmp1_g[4]*array_x[2];
array_tmp1_g[5] := -1/4*array_tmp1[4]*array_x[2];
array_tmp4_a1[5] := (
array_tmp1[5] - att(4, array_tmp1, array_tmp4_a1, 2))/array_tmp1[1]
;
array_tmp4_a2[4] := 4*
(array_tmp4_a1[5]*array_tmp3[1] + array_tmp4_a1[4]*array_tmp3[2])/
glob_h;
array_tmp4[5] := 1/4*ats(4, array_tmp4, array_tmp4_a2, 1)*glob_h;
array_tmp5[5] := array_tmp4[5];
if not array_y_set_initial[1, 6] then
if 5 <= glob_max_terms then
temporary := array_tmp5[5]*expt(glob_h, 1)*factorial_3(4, 5);
array_y[6] := temporary;
array_y_higher[1, 6] := temporary;
temporary := temporary*5.0/glob_h;
array_y_higher[2, 5] := temporary
end if
end if;
kkk := 6;
while kkk <= glob_max_terms do
array_tmp1[kkk] := array_tmp1_g[kkk - 1]*array_x[2]/(kkk - 1);
array_tmp1_g[kkk] := -array_tmp1[kkk - 1]*array_x[2]/(kkk - 1);
array_tmp4_a1[kkk] := (
array_tmp1[kkk] - att(kkk - 1, array_tmp1, array_tmp4_a1, 2))/
array_tmp1[1];
array_tmp4_a2[kkk - 1] := (array_tmp4_a1[kkk]*array_tmp3[1]
+ array_tmp4_a1[kkk - 1]*array_tmp3[2])*(kkk - 1)/glob_h;
array_tmp4[kkk] :=
ats(kkk - 1, array_tmp4, array_tmp4_a2, 1)*glob_h/(kkk - 1);
array_tmp5[kkk] := array_tmp4[kkk];
order_d := 1;
if kkk + order_d + 1 <= glob_max_terms then
if not array_y_set_initial[1, kkk + order_d] then
temporary := array_tmp5[kkk]*expt(glob_h, order_d)*
factorial_3(kkk - 1, kkk + order_d - 1);
array_y[kkk + order_d] := temporary;
array_y_higher[1, kkk + order_d] := temporary;
term := kkk + order_d - 1;
adj2 := kkk + order_d - 1;
adj3 := 2;
while 1 <= term do
if adj3 <= order_d + 1 then
if 0 < adj2 then
temporary := temporary*convfp(adj2)/glob_h
else temporary := temporary
end if;
array_y_higher[adj3, term] := temporary
end if;
term := term - 1;
adj2 := adj2 - 1;
adj3 := adj3 + 1
end do
end if
end if;
kkk := kkk + 1
end do
end proc
> # End Function number 12
> #BEGIN ATS LIBRARY BLOCK
> # Begin Function number 2
> omniout_str := proc(iolevel,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 1
> printf("%s\n",str);
> fi;# end if 1;
> end;
omniout_str := proc(iolevel, str)
global glob_iolevel;
if iolevel <= glob_iolevel then printf("%s\n", str) end if
end proc
> # End Function number 2
> # Begin Function number 3
> omniout_str_noeol := proc(iolevel,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 1
> printf("%s",str);
> fi;# end if 1;
> end;
omniout_str_noeol := proc(iolevel, str)
global glob_iolevel;
if iolevel <= glob_iolevel then printf("%s", str) end if
end proc
> # End Function number 3
> # Begin Function number 4
> omniout_labstr := proc(iolevel,label,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 1
> print(label,str);
> fi;# end if 1;
> end;
omniout_labstr := proc(iolevel, label, str)
global glob_iolevel;
if iolevel <= glob_iolevel then print(label, str) end if
end proc
> # End Function number 4
> # Begin Function number 5
> omniout_float := proc(iolevel,prelabel,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 1
> if vallen = 4 then
> printf("%-30s = %-42.4g %s \n",prelabel,value, postlabel);
> else
> printf("%-30s = %-42.32g %s \n",prelabel,value, postlabel);
> fi;# end if 1;
> fi;# end if 0;
> end;
omniout_float := proc(iolevel, prelabel, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
if vallen = 4 then
printf("%-30s = %-42.4g %s \n", prelabel, value, postlabel)
else printf("%-30s = %-42.32g %s \n", prelabel, value, postlabel)
end if
end if
end proc
> # End Function number 5
> # Begin Function number 6
> omniout_int := proc(iolevel,prelabel,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 0
> if vallen = 5 then # if number 1
> printf("%-30s = %-32d %s\n",prelabel,value, postlabel);
> else
> printf("%-30s = %-32d %s \n",prelabel,value, postlabel);
> fi;# end if 1;
> fi;# end if 0;
> end;
omniout_int := proc(iolevel, prelabel, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
if vallen = 5 then
printf("%-30s = %-32d %s\n", prelabel, value, postlabel)
else printf("%-30s = %-32d %s \n", prelabel, value, postlabel)
end if
end if
end proc
> # End Function number 6
> # Begin Function number 7
> omniout_float_arr := proc(iolevel,prelabel,elemnt,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 0
> print(prelabel,"[",elemnt,"]",value, postlabel);
> fi;# end if 0;
> end;
omniout_float_arr := proc(
iolevel, prelabel, elemnt, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
print(prelabel, "[", elemnt, "]", value, postlabel)
end if
end proc
> # End Function number 7
> # Begin Function number 8
> dump_series := proc(iolevel,dump_label,series_name,arr_series,numb)
> global glob_iolevel;
> local i;
> if (glob_iolevel >= iolevel) then # if number 0
> i := 1;
> while (i <= numb) do # do number 1
> print(dump_label,series_name
> ,i,arr_series[i]);
> i := i + 1;
> od;# end do number 1
> fi;# end if 0
> end;
dump_series := proc(iolevel, dump_label, series_name, arr_series, numb)
local i;
global glob_iolevel;
if iolevel <= glob_iolevel then
i := 1;
while i <= numb do
print(dump_label, series_name, i, arr_series[i]); i := i + 1
end do
end if
end proc
> # End Function number 8
> # Begin Function number 9
> dump_series_2 := proc(iolevel,dump_label,series_name2,arr_series2,numb,subnum,arr_x)
> global glob_iolevel;
> local i,sub,ts_term;
> if (glob_iolevel >= iolevel) then # if number 0
> sub := 1;
> while (sub <= subnum) do # do number 1
> i := 1;
> while (i <= numb) do # do number 2
> print(dump_label,series_name2,sub,i,arr_series2[sub,i]);
> od;# end do number 2;
> sub := sub + 1;
> od;# end do number 1;
> fi;# end if 0;
> end;
dump_series_2 := proc(
iolevel, dump_label, series_name2, arr_series2, numb, subnum, arr_x)
local i, sub, ts_term;
global glob_iolevel;
if iolevel <= glob_iolevel then
sub := 1;
while sub <= subnum do
i := 1;
while i <= numb do print(dump_label, series_name2, sub, i,
arr_series2[sub, i])
end do;
sub := sub + 1
end do
end if
end proc
> # End Function number 9
> # Begin Function number 10
> cs_info := proc(iolevel,str)
> global glob_iolevel,glob_correct_start_flag,glob_h,glob_reached_optimal_h;
> if (glob_iolevel >= iolevel) then # if number 0
> print("cs_info " , str , " glob_correct_start_flag = " , glob_correct_start_flag , "glob_h := " , glob_h , "glob_reached_optimal_h := " , glob_reached_optimal_h)
> fi;# end if 0;
> end;
cs_info := proc(iolevel, str)
global
glob_iolevel, glob_correct_start_flag, glob_h, glob_reached_optimal_h;
if iolevel <= glob_iolevel then print("cs_info ", str,
" glob_correct_start_flag = ", glob_correct_start_flag,
"glob_h := ", glob_h, "glob_reached_optimal_h := ",
glob_reached_optimal_h)
end if
end proc
> # End Function number 10
> # Begin Function number 11
> logitem_time := proc(fd,secs_in)
> global glob_sec_in_day, glob_sec_in_hour, glob_sec_in_minute, glob_sec_in_year;
> local days_int, hours_int,minutes_int, sec_int, sec_temp, years_int;
> fprintf(fd,"
");
> if (secs_in >= 0) then # if number 0
> years_int := trunc(secs_in / glob_sec_in_year);
> sec_temp := (trunc(secs_in) mod trunc(glob_sec_in_year));
> days_int := trunc(sec_temp / glob_sec_in_day) ;
> sec_temp := (sec_temp mod trunc(glob_sec_in_day)) ;
> hours_int := trunc(sec_temp / glob_sec_in_hour);
> sec_temp := (sec_temp mod trunc(glob_sec_in_hour));
> minutes_int := trunc(sec_temp / glob_sec_in_minute);
> sec_int := (sec_temp mod trunc(glob_sec_in_minute));
> if (years_int > 0) then # if number 1
> fprintf(fd,"%d Years %d Days %d Hours %d Minutes %d Seconds",years_int,days_int,hours_int,minutes_int,sec_int);
> elif
> (days_int > 0) then # if number 2
> fprintf(fd,"%d Days %d Hours %d Minutes %d Seconds",days_int,hours_int,minutes_int,sec_int);
> elif
> (hours_int > 0) then # if number 3
> fprintf(fd,"%d Hours %d Minutes %d Seconds",hours_int,minutes_int,sec_int);
> elif
> (minutes_int > 0) then # if number 4
> fprintf(fd,"%d Minutes %d Seconds",minutes_int,sec_int);
> else
> fprintf(fd,"%d Seconds",sec_int);
> fi;# end if 4
> else
> fprintf(fd," Unknown");
> fi;# end if 3
> fprintf(fd," | \n");
> end;
logitem_time := proc(fd, secs_in)
local days_int, hours_int, minutes_int, sec_int, sec_temp, years_int;
global
glob_sec_in_day, glob_sec_in_hour, glob_sec_in_minute, glob_sec_in_year;
fprintf(fd, "");
if 0 <= secs_in then
years_int := trunc(secs_in/glob_sec_in_year);
sec_temp := trunc(secs_in) mod trunc(glob_sec_in_year);
days_int := trunc(sec_temp/glob_sec_in_day);
sec_temp := sec_temp mod trunc(glob_sec_in_day);
hours_int := trunc(sec_temp/glob_sec_in_hour);
sec_temp := sec_temp mod trunc(glob_sec_in_hour);
minutes_int := trunc(sec_temp/glob_sec_in_minute);
sec_int := sec_temp mod trunc(glob_sec_in_minute);
if 0 < years_int then fprintf(fd,
"%d Years %d Days %d Hours %d Minutes %d Seconds", years_int,
days_int, hours_int, minutes_int, sec_int)
elif 0 < days_int then fprintf(fd,
"%d Days %d Hours %d Minutes %d Seconds", days_int, hours_int,
minutes_int, sec_int)
elif 0 < hours_int then fprintf(fd,
"%d Hours %d Minutes %d Seconds", hours_int, minutes_int,
sec_int)
elif 0 < minutes_int then
fprintf(fd, "%d Minutes %d Seconds", minutes_int, sec_int)
else fprintf(fd, "%d Seconds", sec_int)
end if
else fprintf(fd, " Unknown")
end if;
fprintf(fd, " | \n")
end proc
> # End Function number 11
> # Begin Function number 12
> omniout_timestr := proc(secs_in)
> global glob_sec_in_day, glob_sec_in_hour, glob_sec_in_minute, glob_sec_in_year;
> local days_int, hours_int,minutes_int, sec_int, sec_temp, years_int;
> if (secs_in >= 0) then # if number 3
> years_int := trunc(secs_in / glob_sec_in_year);
> sec_temp := (trunc(secs_in) mod trunc(glob_sec_in_year));
> days_int := trunc(sec_temp / glob_sec_in_day) ;
> sec_temp := (sec_temp mod trunc(glob_sec_in_day)) ;
> hours_int := trunc(sec_temp / glob_sec_in_hour);
> sec_temp := (sec_temp mod trunc(glob_sec_in_hour));
> minutes_int := trunc(sec_temp / glob_sec_in_minute);
> sec_int := (sec_temp mod trunc(glob_sec_in_minute));
> if (years_int > 0) then # if number 4
> printf(" = %d Years %d Days %d Hours %d Minutes %d Seconds\n",years_int,days_int,hours_int,minutes_int,sec_int);
> elif
> (days_int > 0) then # if number 5
> printf(" = %d Days %d Hours %d Minutes %d Seconds\n",days_int,hours_int,minutes_int,sec_int);
> elif
> (hours_int > 0) then # if number 6
> printf(" = %d Hours %d Minutes %d Seconds\n",hours_int,minutes_int,sec_int);
> elif
> (minutes_int > 0) then # if number 7
> printf(" = %d Minutes %d Seconds\n",minutes_int,sec_int);
> else
> printf(" = %d Seconds\n",sec_int);
> fi;# end if 7
> else
> printf(" Unknown\n");
> fi;# end if 6
> end;
omniout_timestr := proc(secs_in)
local days_int, hours_int, minutes_int, sec_int, sec_temp, years_int;
global
glob_sec_in_day, glob_sec_in_hour, glob_sec_in_minute, glob_sec_in_year;
if 0 <= secs_in then
years_int := trunc(secs_in/glob_sec_in_year);
sec_temp := trunc(secs_in) mod trunc(glob_sec_in_year);
days_int := trunc(sec_temp/glob_sec_in_day);
sec_temp := sec_temp mod trunc(glob_sec_in_day);
hours_int := trunc(sec_temp/glob_sec_in_hour);
sec_temp := sec_temp mod trunc(glob_sec_in_hour);
minutes_int := trunc(sec_temp/glob_sec_in_minute);
sec_int := sec_temp mod trunc(glob_sec_in_minute);
if 0 < years_int then printf(
" = %d Years %d Days %d Hours %d Minutes %d Seconds\n",
years_int, days_int, hours_int, minutes_int, sec_int)
elif 0 < days_int then printf(
" = %d Days %d Hours %d Minutes %d Seconds\n", days_int,
hours_int, minutes_int, sec_int)
elif 0 < hours_int then printf(
" = %d Hours %d Minutes %d Seconds\n", hours_int, minutes_int,
sec_int)
elif 0 < minutes_int then
printf(" = %d Minutes %d Seconds\n", minutes_int, sec_int)
else printf(" = %d Seconds\n", sec_int)
end if
else printf(" Unknown\n")
end if
end proc
> # End Function number 12
> # Begin Function number 13
> ats := proc(mmm_ats,arr_a,arr_b,jjj_ats)
> local iii_ats, lll_ats,ma_ats, ret_ats;
> ret_ats := 0.0;
> if (jjj_ats <= mmm_ats) then # if number 6
> ma_ats := mmm_ats + 1;
> iii_ats := jjj_ats;
> while (iii_ats <= mmm_ats) do # do number 1
> lll_ats := ma_ats - iii_ats;
> ret_ats := ret_ats + arr_a[iii_ats]*arr_b[lll_ats];
> iii_ats := iii_ats + 1;
> od;# end do number 1
> fi;# end if 6;
> ret_ats;
> end;
ats := proc(mmm_ats, arr_a, arr_b, jjj_ats)
local iii_ats, lll_ats, ma_ats, ret_ats;
ret_ats := 0.;
if jjj_ats <= mmm_ats then
ma_ats := mmm_ats + 1;
iii_ats := jjj_ats;
while iii_ats <= mmm_ats do
lll_ats := ma_ats - iii_ats;
ret_ats := ret_ats + arr_a[iii_ats]*arr_b[lll_ats];
iii_ats := iii_ats + 1
end do
end if;
ret_ats
end proc
> # End Function number 13
> # Begin Function number 14
> att := proc(mmm_att,arr_aa,arr_bb,jjj_att)
> global glob_max_terms;
> local al_att, iii_att,lll_att, ma_att, ret_att;
> ret_att := 0.0;
> if (jjj_att <= mmm_att) then # if number 6
> ma_att := mmm_att + 2;
> iii_att := jjj_att;
> while (iii_att <= mmm_att) do # do number 1
> lll_att := ma_att - iii_att;
> al_att := (lll_att - 1);
> if (lll_att <= glob_max_terms) then # if number 7
> ret_att := ret_att + arr_aa[iii_att]*arr_bb[lll_att]* convfp(al_att);
> fi;# end if 7;
> iii_att := iii_att + 1;
> od;# end do number 1;
> ret_att := ret_att / convfp(mmm_att) ;
> fi;# end if 6;
> ret_att;
> end;
att := proc(mmm_att, arr_aa, arr_bb, jjj_att)
local al_att, iii_att, lll_att, ma_att, ret_att;
global glob_max_terms;
ret_att := 0.;
if jjj_att <= mmm_att then
ma_att := mmm_att + 2;
iii_att := jjj_att;
while iii_att <= mmm_att do
lll_att := ma_att - iii_att;
al_att := lll_att - 1;
if lll_att <= glob_max_terms then ret_att :=
ret_att + arr_aa[iii_att]*arr_bb[lll_att]*convfp(al_att)
end if;
iii_att := iii_att + 1
end do;
ret_att := ret_att/convfp(mmm_att)
end if;
ret_att
end proc
> # End Function number 14
> # Begin Function number 15
> display_pole_debug := proc(typ,radius,order2)
> global ALWAYS,glob_display_flag, glob_large_float, array_pole;
> if (typ = 1) then # if number 6
> omniout_str(ALWAYS,"Real");
> else
> omniout_str(ALWAYS,"Complex");
> fi;# end if 6;
> omniout_float(ALWAYS,"DBG Radius of convergence ",4, radius,4," ");
> omniout_float(ALWAYS,"DBG Order of pole ",4, order2,4," ");
> end;
display_pole_debug := proc(typ, radius, order2)
global ALWAYS, glob_display_flag, glob_large_float, array_pole;
if typ = 1 then omniout_str(ALWAYS, "Real")
else omniout_str(ALWAYS, "Complex")
end if;
omniout_float(ALWAYS, "DBG Radius of convergence ", 4, radius, 4,
" ");
omniout_float(ALWAYS, "DBG Order of pole ", 4, order2, 4,
" ")
end proc
> # End Function number 15
> # Begin Function number 16
> display_pole := proc()
> global ALWAYS,glob_display_flag, glob_large_float, array_pole;
> if ((array_pole[1] <> glob_large_float) and (array_pole[1] > 0.0) and (array_pole[2] <> glob_large_float) and (array_pole[2]> 0.0) and glob_display_flag) then # if number 6
> omniout_float(ALWAYS,"Radius of convergence ",4, array_pole[1],4," ");
> omniout_float(ALWAYS,"Order of pole ",4, array_pole[2],4," ");
> fi;# end if 6
> end;
display_pole := proc()
global ALWAYS, glob_display_flag, glob_large_float, array_pole;
if array_pole[1] <> glob_large_float and 0. < array_pole[1] and
array_pole[2] <> glob_large_float and 0. < array_pole[2] and
glob_display_flag then
omniout_float(ALWAYS, "Radius of convergence ", 4,
array_pole[1], 4, " ");
omniout_float(ALWAYS, "Order of pole ", 4,
array_pole[2], 4, " ")
end if
end proc
> # End Function number 16
> # Begin Function number 17
> logditto := proc(file)
> fprintf(file,"");
> fprintf(file,"ditto");
> fprintf(file," | ");
> end;
logditto := proc(file)
fprintf(file, ""); fprintf(file, "ditto"); fprintf(file, " | ")
end proc
> # End Function number 17
> # Begin Function number 18
> logitem_integer := proc(file,n)
> fprintf(file,"");
> fprintf(file,"%d",n);
> fprintf(file," | ");
> end;
logitem_integer := proc(file, n)
fprintf(file, ""); fprintf(file, "%d", n); fprintf(file, " | ")
end proc
> # End Function number 18
> # Begin Function number 19
> logitem_str := proc(file,str)
> fprintf(file,"");
> fprintf(file,str);
> fprintf(file," | ");
> end;
logitem_str := proc(file, str)
fprintf(file, ""); fprintf(file, str); fprintf(file, " | ")
end proc
> # End Function number 19
> # Begin Function number 20
> logitem_good_digits := proc(file,rel_error)
> global glob_small_float;
> local good_digits;
> fprintf(file,"");
> if (rel_error <> -1.0) then # if number 6
> if (rel_error > + 0.0000000000000000000000000000000001) then # if number 7
> good_digits := 1-trunc(log10(rel_error));
> fprintf(file,"%d",good_digits);
> else
> good_digits := Digits;
> fprintf(file,"%d",good_digits);
> fi;# end if 7;
> else
> fprintf(file,"Unknown");
> fi;# end if 6;
> fprintf(file," | ");
> end;
logitem_good_digits := proc(file, rel_error)
local good_digits;
global glob_small_float;
fprintf(file, "");
if rel_error <> -1.0 then
if 0.1*10^(-33) < rel_error then
good_digits := 1 - trunc(log10(rel_error));
fprintf(file, "%d", good_digits)
else good_digits := Digits; fprintf(file, "%d", good_digits)
end if
else fprintf(file, "Unknown")
end if;
fprintf(file, " | ")
end proc
> # End Function number 20
> # Begin Function number 21
> log_revs := proc(file,revs)
> fprintf(file,revs);
> end;
log_revs := proc(file, revs) fprintf(file, revs) end proc
> # End Function number 21
> # Begin Function number 22
> logitem_float := proc(file,x)
> fprintf(file,"");
> fprintf(file,"%g",x);
> fprintf(file," | ");
> end;
logitem_float := proc(file, x)
fprintf(file, ""); fprintf(file, "%g", x); fprintf(file, " | ")
end proc
> # End Function number 22
> # Begin Function number 23
> logitem_pole := proc(file,pole)
> fprintf(file,"");
> if (pole = 0) then # if number 6
> fprintf(file,"NA");
> elif
> (pole = 1) then # if number 7
> fprintf(file,"Real");
> elif
> (pole = 2) then # if number 8
> fprintf(file,"Complex");
> else
> fprintf(file,"No Pole");
> fi;# end if 8
> fprintf(file," | ");
> end;
logitem_pole := proc(file, pole)
fprintf(file, "");
if pole = 0 then fprintf(file, "NA")
elif pole = 1 then fprintf(file, "Real")
elif pole = 2 then fprintf(file, "Complex")
else fprintf(file, "No Pole")
end if;
fprintf(file, " | ")
end proc
> # End Function number 23
> # Begin Function number 24
> logstart := proc(file)
> fprintf(file,"");
> end;
logstart := proc(file) fprintf(file, "
") end proc
> # End Function number 24
> # Begin Function number 25
> logend := proc(file)
> fprintf(file,"
\n");
> end;
logend := proc(file) fprintf(file, "\n") end proc
> # End Function number 25
> # Begin Function number 26
> chk_data := proc()
> global glob_max_iter,ALWAYS, glob_max_terms;
> local errflag;
> errflag := false;
> if ((glob_max_terms < 15) or (glob_max_terms > 512)) then # if number 8
> omniout_str(ALWAYS,"Illegal max_terms = -- Using 30");
> glob_max_terms := 30;
> fi;# end if 8;
> if (glob_max_iter < 2) then # if number 8
> omniout_str(ALWAYS,"Illegal max_iter");
> errflag := true;
> fi;# end if 8;
> if (errflag) then # if number 8
> quit;
> fi;# end if 8
> end;
chk_data := proc()
local errflag;
global glob_max_iter, ALWAYS, glob_max_terms;
errflag := false;
if glob_max_terms < 15 or 512 < glob_max_terms then
omniout_str(ALWAYS, "Illegal max_terms = -- Using 30");
glob_max_terms := 30
end if;
if glob_max_iter < 2 then
omniout_str(ALWAYS, "Illegal max_iter"); errflag := true
end if;
if errflag then quit end if
end proc
> # End Function number 26
> # Begin Function number 27
> comp_expect_sec := proc(t_end2,t_start2,t2,clock_sec2)
> global glob_small_float;
> local ms2, rrr, sec_left, sub1, sub2;
> ;
> ms2 := clock_sec2;
> sub1 := (t_end2-t_start2);
> sub2 := (t2-t_start2);
> if (sub1 = 0.0) then # if number 8
> sec_left := 0.0;
> else
> if (sub2 > 0.0) then # if number 9
> rrr := (sub1/sub2);
> sec_left := rrr * ms2 - ms2;
> else
> sec_left := 0.0;
> fi;# end if 9
> fi;# end if 8;
> sec_left;
> end;
comp_expect_sec := proc(t_end2, t_start2, t2, clock_sec2)
local ms2, rrr, sec_left, sub1, sub2;
global glob_small_float;
ms2 := clock_sec2;
sub1 := t_end2 - t_start2;
sub2 := t2 - t_start2;
if sub1 = 0. then sec_left := 0.
else
if 0. < sub2 then rrr := sub1/sub2; sec_left := rrr*ms2 - ms2
else sec_left := 0.
end if
end if;
sec_left
end proc
> # End Function number 27
> # Begin Function number 28
> comp_percent := proc(t_end2,t_start2, t2)
> global glob_small_float;
> local rrr, sub1, sub2;
> sub1 := (t_end2-t_start2);
> sub2 := (t2-t_start2);
> if (sub2 > glob_small_float) then # if number 8
> rrr := (100.0*sub2)/sub1;
> else
> rrr := 0.0;
> fi;# end if 8;
> rrr;
> end;
comp_percent := proc(t_end2, t_start2, t2)
local rrr, sub1, sub2;
global glob_small_float;
sub1 := t_end2 - t_start2;
sub2 := t2 - t_start2;
if glob_small_float < sub2 then rrr := 100.0*sub2/sub1
else rrr := 0.
end if;
rrr
end proc
> # End Function number 28
> # Begin Function number 29
> factorial_2 := proc(nnn)
> nnn!;
> end;
factorial_2 := proc(nnn) nnn! end proc
> # End Function number 29
> # Begin Function number 30
> factorial_1 := proc(nnn)
> global glob_max_terms,array_fact_1;
> local ret;
> if (nnn <= glob_max_terms) then # if number 8
> if (array_fact_1[nnn] = 0) then # if number 9
> ret := factorial_2(nnn);
> array_fact_1[nnn] := ret;
> else
> ret := array_fact_1[nnn];
> fi;# end if 9;
> else
> ret := factorial_2(nnn);
> fi;# end if 8;
> ret;
> end;
factorial_1 := proc(nnn)
local ret;
global glob_max_terms, array_fact_1;
if nnn <= glob_max_terms then
if array_fact_1[nnn] = 0 then
ret := factorial_2(nnn); array_fact_1[nnn] := ret
else ret := array_fact_1[nnn]
end if
else ret := factorial_2(nnn)
end if;
ret
end proc
> # End Function number 30
> # Begin Function number 31
> factorial_3 := proc(mmm,nnn)
> global glob_max_terms,array_fact_2;
> local ret;
> if ((nnn <= glob_max_terms) and (mmm <= glob_max_terms)) then # if number 8
> if (array_fact_2[mmm,nnn] = 0) then # if number 9
> ret := factorial_1(mmm)/factorial_1(nnn);
> array_fact_2[mmm,nnn] := ret;
> else
> ret := array_fact_2[mmm,nnn];
> fi;# end if 9;
> else
> ret := factorial_2(mmm)/factorial_2(nnn);
> fi;# end if 8;
> ret;
> end;
factorial_3 := proc(mmm, nnn)
local ret;
global glob_max_terms, array_fact_2;
if nnn <= glob_max_terms and mmm <= glob_max_terms then
if array_fact_2[mmm, nnn] = 0 then
ret := factorial_1(mmm)/factorial_1(nnn);
array_fact_2[mmm, nnn] := ret
else ret := array_fact_2[mmm, nnn]
end if
else ret := factorial_2(mmm)/factorial_2(nnn)
end if;
ret
end proc
> # End Function number 31
> # Begin Function number 32
> convfp := proc(mmm)
> (mmm);
> end;
convfp := proc(mmm) mmm end proc
> # End Function number 32
> # Begin Function number 33
> convfloat := proc(mmm)
> (mmm);
> end;
convfloat := proc(mmm) mmm end proc
> # End Function number 33
> # Begin Function number 34
> elapsed_time_seconds := proc()
> time();
> end;
elapsed_time_seconds := proc() time() end proc
> # End Function number 34
> # Begin Function number 35
> omniabs := proc(x)
> abs(x);
> end;
omniabs := proc(x) abs(x) end proc
> # End Function number 35
> # Begin Function number 36
> expt := proc(x,y)
> (x^y);
> end;
expt := proc(x, y) x^y end proc
> # End Function number 36
> # Begin Function number 37
> estimated_needed_step_error := proc(x_start,x_end,estimated_h,estimated_answer)
> local desired_abs_gbl_error,range,estimated_steps,step_error;
> global glob_desired_digits_correct,ALWAYS;
> omniout_float(ALWAYS,"glob_desired_digits_correct",32,glob_desired_digits_correct,32,"");
> desired_abs_gbl_error := expt(10.0,- glob_desired_digits_correct) * omniabs(estimated_answer);
> omniout_float(ALWAYS,"desired_abs_gbl_error",32,desired_abs_gbl_error,32,"");
> range := (x_end - x_start);
> omniout_float(ALWAYS,"range",32,range,32,"");
> estimated_steps := range / estimated_h;
> omniout_float(ALWAYS,"estimated_steps",32,estimated_steps,32,"");
> step_error := omniabs(desired_abs_gbl_error / estimated_steps);
> omniout_float(ALWAYS,"step_error",32,step_error,32,"");
> (step_error);;
> end;
estimated_needed_step_error := proc(
x_start, x_end, estimated_h, estimated_answer)
local desired_abs_gbl_error, range, estimated_steps, step_error;
global glob_desired_digits_correct, ALWAYS;
omniout_float(ALWAYS, "glob_desired_digits_correct", 32,
glob_desired_digits_correct, 32, "");
desired_abs_gbl_error :=
expt(10.0, -glob_desired_digits_correct)*omniabs(estimated_answer);
omniout_float(ALWAYS, "desired_abs_gbl_error", 32,
desired_abs_gbl_error, 32, "");
range := x_end - x_start;
omniout_float(ALWAYS, "range", 32, range, 32, "");
estimated_steps := range/estimated_h;
omniout_float(ALWAYS, "estimated_steps", 32, estimated_steps, 32, "");
step_error := omniabs(desired_abs_gbl_error/estimated_steps);
omniout_float(ALWAYS, "step_error", 32, step_error, 32, "");
step_error
end proc
> # End Function number 37
> #END ATS LIBRARY BLOCK
> #BEGIN USER DEF BLOCK
> #BEGIN USER DEF BLOCK
> exact_soln_y := proc(x)
> return(0.0);
> end;
exact_soln_y := proc(x) return 0. end proc
> #END USER DEF BLOCK
> #END USER DEF BLOCK
> #END OUTFILE5
> # Begin Function number 2
> main := proc()
> #BEGIN OUTFIEMAIN
> local d1,d2,d3,d4,est_err_2,niii,done_once,
> term,ord,order_diff,term_no,html_log_file,iiif,jjjf,
> rows,r_order,sub_iter,calc_term,iii,temp_sum,current_iter,
> x_start,x_end
> ,it, max_terms, opt_iter, tmp,subiter, est_needed_step_err,value3,min_value,est_answer,best_h,found_h,repeat_it;
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_max_h,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1_g,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> glob_last;
> ALWAYS := 1;
> INFO := 2;
> DEBUGL := 3;
> DEBUGMASSIVE := 4;
> glob_iolevel := INFO;
> glob_max_terms := 30;
> glob_iolevel := 5;
> ALWAYS := 1;
> INFO := 2;
> DEBUGL := 3;
> DEBUGMASSIVE := 4;
> MAX_UNCHANGED := 10;
> glob_check_sign := 1.0;
> glob_desired_digits_correct := 8.0;
> glob_max_value3 := 0.0;
> glob_ratio_of_radius := 0.01;
> glob_percent_done := 0.0;
> glob_subiter_method := 3;
> glob_total_exp_sec := 0.1;
> glob_optimal_expect_sec := 0.1;
> glob_html_log := true;
> glob_good_digits := 0;
> glob_max_opt_iter := 10;
> glob_dump := false;
> glob_djd_debug := true;
> glob_display_flag := true;
> glob_djd_debug2 := true;
> glob_sec_in_minute := 60;
> glob_min_in_hour := 60;
> glob_hours_in_day := 24;
> glob_days_in_year := 365;
> glob_sec_in_hour := 3600;
> glob_sec_in_day := 86400;
> glob_sec_in_year := 31536000;
> glob_almost_1 := 0.9990;
> glob_clock_sec := 0.0;
> glob_clock_start_sec := 0.0;
> glob_not_yet_finished := true;
> glob_initial_pass := true;
> glob_not_yet_start_msg := true;
> glob_reached_optimal_h := false;
> glob_optimal_done := false;
> glob_disp_incr := 0.1;
> glob_h := 0.1;
> glob_max_h := 0.1;
> glob_large_float := 9.0e100;
> glob_last_good_h := 0.1;
> glob_look_poles := false;
> glob_neg_h := false;
> glob_display_interval := 0.0;
> glob_next_display := 0.0;
> glob_dump_analytic := false;
> glob_abserr := 0.1e-10;
> glob_relerr := 0.1e-10;
> glob_max_hours := 0.0;
> glob_max_iter := 1000;
> glob_max_rel_trunc_err := 0.1e-10;
> glob_max_trunc_err := 0.1e-10;
> glob_no_eqs := 0;
> glob_optimal_clock_start_sec := 0.0;
> glob_optimal_start := 0.0;
> glob_small_float := 0.1e-200;
> glob_smallish_float := 0.1e-100;
> glob_unchanged_h_cnt := 0;
> glob_warned := false;
> glob_warned2 := false;
> glob_max_sec := 10000.0;
> glob_orig_start_sec := 0.0;
> glob_start := 0;
> glob_curr_iter_when_opt := 0;
> glob_current_iter := 0;
> glob_iter := 0;
> glob_normmax := 0.0;
> glob_max_minutes := 0.0;
> #Write Set Defaults
> glob_orig_start_sec := elapsed_time_seconds();
> MAX_UNCHANGED := 10;
> glob_curr_iter_when_opt := 0;
> glob_display_flag := true;
> glob_no_eqs := 1;
> glob_iter := -1;
> opt_iter := -1;
> glob_max_iter := 50000;
> glob_max_hours := 0.0;
> glob_max_minutes := 15.0;
> omniout_str(ALWAYS,"##############ECHO OF PROBLEM#################");
> omniout_str(ALWAYS,"##############temp/expt_sin_linpostode.ode#################");
> omniout_str(ALWAYS,"diff ( y , x , 1 ) = expt (sin(x) , (0.2 * x + 0.3));");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#BEGIN FIRST INPUT BLOCK");
> omniout_str(ALWAYS,"Digits:=32;");
> omniout_str(ALWAYS,"max_terms:=30;");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#END FIRST INPUT BLOCK");
> omniout_str(ALWAYS,"#BEGIN SECOND INPUT BLOCK");
> omniout_str(ALWAYS,"x_start := 0.1;");
> omniout_str(ALWAYS,"x_end := 3.0 ;");
> omniout_str(ALWAYS,"array_y_init[0 + 1] := exact_soln_y(x_start);");
> omniout_str(ALWAYS,"glob_look_poles := true;");
> omniout_str(ALWAYS,"glob_max_iter := 1000000;");
> omniout_str(ALWAYS,"#END SECOND INPUT BLOCK");
> omniout_str(ALWAYS,"#BEGIN OVERRIDE BLOCK");
> omniout_str(ALWAYS,"glob_desired_digits_correct:=10;");
> omniout_str(ALWAYS,"glob_display_interval:=0.001;");
> omniout_str(ALWAYS,"glob_look_poles:=true;");
> omniout_str(ALWAYS,"glob_max_iter:=10000000;");
> omniout_str(ALWAYS,"glob_max_minutes:=3;");
> omniout_str(ALWAYS,"glob_subiter_method:=3;");
> omniout_str(ALWAYS,"#END OVERRIDE BLOCK");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#BEGIN USER DEF BLOCK");
> omniout_str(ALWAYS,"exact_soln_y := proc(x)");
> omniout_str(ALWAYS,"return(0.0);");
> omniout_str(ALWAYS,"end;");
> omniout_str(ALWAYS,"#END USER DEF BLOCK");
> omniout_str(ALWAYS,"#######END OF ECHO OF PROBLEM#################");
> glob_unchanged_h_cnt := 0;
> glob_warned := false;
> glob_warned2 := false;
> glob_small_float := 1.0e-200;
> glob_smallish_float := 1.0e-64;
> glob_large_float := 1.0e100;
> glob_almost_1 := 0.99;
> #BEGIN FIRST INPUT BLOCK
> #BEGIN FIRST INPUT BLOCK
> Digits:=32;
> max_terms:=30;
> #END FIRST INPUT BLOCK
> #START OF INITS AFTER INPUT BLOCK
> glob_max_terms := max_terms;
> glob_html_log := true;
> #END OF INITS AFTER INPUT BLOCK
> array_y_init:= Array(0..(max_terms + 1),[]);
> array_norms:= Array(0..(max_terms + 1),[]);
> array_fact_1:= Array(0..(max_terms + 1),[]);
> array_pole:= Array(0..(max_terms + 1),[]);
> array_1st_rel_error:= Array(0..(max_terms + 1),[]);
> array_last_rel_error:= Array(0..(max_terms + 1),[]);
> array_type_pole:= Array(0..(max_terms + 1),[]);
> array_y:= Array(0..(max_terms + 1),[]);
> array_x:= Array(0..(max_terms + 1),[]);
> array_tmp0:= Array(0..(max_terms + 1),[]);
> array_tmp1_g:= Array(0..(max_terms + 1),[]);
> array_tmp1:= Array(0..(max_terms + 1),[]);
> array_tmp2:= Array(0..(max_terms + 1),[]);
> array_tmp3:= Array(0..(max_terms + 1),[]);
> array_tmp4_c1:= Array(0..(max_terms + 1),[]);
> array_tmp4_a1:= Array(0..(max_terms + 1),[]);
> array_tmp4_a2:= Array(0..(max_terms + 1),[]);
> array_tmp4:= Array(0..(max_terms + 1),[]);
> array_tmp5:= Array(0..(max_terms + 1),[]);
> array_m1:= Array(0..(max_terms + 1),[]);
> array_y_higher := Array(0..(2+ 1) ,(0..max_terms+ 1),[]);
> array_y_higher_work := Array(0..(2+ 1) ,(0..max_terms+ 1),[]);
> array_y_higher_work2 := Array(0..(2+ 1) ,(0..max_terms+ 1),[]);
> array_y_set_initial := Array(0..(2+ 1) ,(0..max_terms+ 1),[]);
> array_poles := Array(0..(1+ 1) ,(0..3+ 1),[]);
> array_real_pole := Array(0..(1+ 1) ,(0..3+ 1),[]);
> array_complex_pole := Array(0..(1+ 1) ,(0..3+ 1),[]);
> array_fact_2 := Array(0..(max_terms+ 1) ,(0..max_terms+ 1),[]);
> term := 1;
> while (term <= max_terms) do # do number 2
> array_y_init[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_norms[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_fact_1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_pole[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_1st_rel_error[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_last_rel_error[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_type_pole[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_y[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_x[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp0[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp1_g[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp3[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp4_c1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp4_a1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp4_a2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp4[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp5[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_m1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=2) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_y_higher[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=2) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_y_higher_work[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=2) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_y_higher_work2[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=2) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_y_set_initial[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=1) do # do number 2
> term := 1;
> while (term <= 3) do # do number 3
> array_poles[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=1) do # do number 2
> term := 1;
> while (term <= 3) do # do number 3
> array_real_pole[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=1) do # do number 2
> term := 1;
> while (term <= 3) do # do number 3
> array_complex_pole[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=max_terms) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_fact_2[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> #BEGIN ARRAYS DEFINED AND INITIALIZATED
> array_y := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_y[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_x := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_x[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp0[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp1_g := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp1_g[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp3 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp3[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp4_c1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp4_c1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp4_a1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp4_a1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp4_a2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp4_a2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp4 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp4[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp5 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp5[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_m1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_m1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_const_1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_1[1] := 1;
> array_const_0D0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_const_0D0[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_0D0[1] := 0.0;
> array_const_0D2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_const_0D2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_0D2[1] := 0.2;
> array_const_0D3 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_const_0D3[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_0D3[1] := 0.3;
> array_m1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms) do # do number 2
> array_m1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_m1[1] := -1.0;
> #END ARRAYS DEFINED AND INITIALIZATED
> #Initing Factorial Tables
> iiif := 0;
> while (iiif <= glob_max_terms) do # do number 2
> jjjf := 0;
> while (jjjf <= glob_max_terms) do # do number 3
> array_fact_1[iiif] := 0;
> array_fact_2[iiif,jjjf] := 0;
> jjjf := jjjf + 1;
> od;# end do number 3;
> iiif := iiif + 1;
> od;# end do number 2;
> #Done Initing Factorial Tables
> #TOP SECOND INPUT BLOCK
> #BEGIN SECOND INPUT BLOCK
> #END FIRST INPUT BLOCK
> #BEGIN SECOND INPUT BLOCK
> x_start := 0.1;
> x_end := 3.0 ;
> array_y_init[0 + 1] := exact_soln_y(x_start);
> glob_look_poles := true;
> glob_max_iter := 1000000;
> #END SECOND INPUT BLOCK
> #BEGIN OVERRIDE BLOCK
> glob_desired_digits_correct:=10;
> glob_display_interval:=0.001;
> glob_look_poles:=true;
> glob_max_iter:=10000000;
> glob_max_minutes:=3;
> glob_subiter_method:=3;
> #END OVERRIDE BLOCK
> #END SECOND INPUT BLOCK
> #BEGIN INITS AFTER SECOND INPUT BLOCK
> glob_last_good_h := glob_h;
> glob_max_terms := max_terms;
> glob_max_sec := convfloat(60.0) * convfloat(glob_max_minutes) + convfloat(3600.0) * convfloat(glob_max_hours);
> if (glob_h > 0.0) then # if number 1
> glob_neg_h := false;
> glob_display_interval := omniabs(glob_display_interval);
> else
> glob_neg_h := true;
> glob_display_interval := -omniabs(glob_display_interval);
> fi;# end if 1;
> chk_data();
> #AFTER INITS AFTER SECOND INPUT BLOCK
> array_y_set_initial[1,1] := true;
> array_y_set_initial[1,2] := false;
> array_y_set_initial[1,3] := false;
> array_y_set_initial[1,4] := false;
> array_y_set_initial[1,5] := false;
> array_y_set_initial[1,6] := false;
> array_y_set_initial[1,7] := false;
> array_y_set_initial[1,8] := false;
> array_y_set_initial[1,9] := false;
> array_y_set_initial[1,10] := false;
> array_y_set_initial[1,11] := false;
> array_y_set_initial[1,12] := false;
> array_y_set_initial[1,13] := false;
> array_y_set_initial[1,14] := false;
> array_y_set_initial[1,15] := false;
> array_y_set_initial[1,16] := false;
> array_y_set_initial[1,17] := false;
> array_y_set_initial[1,18] := false;
> array_y_set_initial[1,19] := false;
> array_y_set_initial[1,20] := false;
> array_y_set_initial[1,21] := false;
> array_y_set_initial[1,22] := false;
> array_y_set_initial[1,23] := false;
> array_y_set_initial[1,24] := false;
> array_y_set_initial[1,25] := false;
> array_y_set_initial[1,26] := false;
> array_y_set_initial[1,27] := false;
> array_y_set_initial[1,28] := false;
> array_y_set_initial[1,29] := false;
> array_y_set_initial[1,30] := false;
> #BEGIN OPTIMIZE CODE
> omniout_str(ALWAYS,"START of Optimize");
> #Start Series -- INITIALIZE FOR OPTIMIZE
> glob_check_sign := check_sign(x_start,x_end);
> glob_h := check_sign(x_start,x_end);
> if (glob_display_interval < glob_h) then # if number 2
> glob_h := glob_display_interval;
> fi;# end if 2;
> if (glob_max_h < glob_h) then # if number 2
> glob_h := glob_max_h;
> fi;# end if 2;
> found_h := -1.0;
> best_h := 0.0;
> min_value := glob_large_float;
> est_answer := est_size_answer();
> opt_iter := 1;
> while ((opt_iter <= 20) and (found_h < 0.0)) do # do number 2
> omniout_int(ALWAYS,"opt_iter",32,opt_iter,4,"");
> array_x[1] := x_start;
> array_x[2] := glob_h;
> glob_next_display := x_start;
> order_diff := 1;
> #Start Series array_y
> term_no := 1;
> while (term_no <= order_diff) do # do number 3
> array_y[term_no] := array_y_init[term_no] * expt(glob_h , (term_no - 1)) / factorial_1(term_no - 1);
> term_no := term_no + 1;
> od;# end do number 3;
> rows := order_diff;
> r_order := 1;
> while (r_order <= rows) do # do number 3
> term_no := 1;
> while (term_no <= (rows - r_order + 1)) do # do number 4
> it := term_no + r_order - 1;
> array_y_higher[r_order,term_no] := array_y_init[it]* expt(glob_h , (term_no - 1)) / ((factorial_1(term_no - 1)));
> term_no := term_no + 1;
> od;# end do number 4;
> r_order := r_order + 1;
> od;# end do number 3
> ;
> atomall();
> est_needed_step_err := estimated_needed_step_error(x_start,x_end,glob_h,est_answer);
> omniout_float(ALWAYS,"est_needed_step_err",32,est_needed_step_err,16,"");
> value3 := test_suggested_h();
> omniout_float(ALWAYS,"value3",32,value3,32,"");
> if ((value3 < est_needed_step_err) and (found_h < 0.0)) then # if number 2
> best_h := glob_h;
> found_h := 1.0;
> fi;# end if 2;
> omniout_float(ALWAYS,"best_h",32,best_h,32,"");
> opt_iter := opt_iter + 1;
> glob_h := glob_h * 0.5;
> od;# end do number 2;
> if (found_h > 0.0) then # if number 2
> glob_h := best_h ;
> else
> omniout_str(ALWAYS,"No increment to obtain desired accuracy found");
> fi;# end if 2;
> #END OPTIMIZE CODE
> if (glob_html_log) then # if number 2
> html_log_file := fopen("html/entry.html",WRITE,TEXT);
> fi;# end if 2;
> #BEGIN SOLUTION CODE
> if (found_h > 0.0) then # if number 2
> omniout_str(ALWAYS,"START of Soultion");
> #Start Series -- INITIALIZE FOR SOLUTION
> array_x[1] := x_start;
> array_x[2] := glob_h;
> glob_next_display := x_start;
> order_diff := 1;
> #Start Series array_y
> term_no := 1;
> while (term_no <= order_diff) do # do number 2
> array_y[term_no] := array_y_init[term_no] * expt(glob_h , (term_no - 1)) / factorial_1(term_no - 1);
> term_no := term_no + 1;
> od;# end do number 2;
> rows := order_diff;
> r_order := 1;
> while (r_order <= rows) do # do number 2
> term_no := 1;
> while (term_no <= (rows - r_order + 1)) do # do number 3
> it := term_no + r_order - 1;
> array_y_higher[r_order,term_no] := array_y_init[it]* expt(glob_h , (term_no - 1)) / ((factorial_1(term_no - 1)));
> term_no := term_no + 1;
> od;# end do number 3;
> r_order := r_order + 1;
> od;# end do number 2
> ;
> current_iter := 1;
> glob_clock_start_sec := elapsed_time_seconds();
> glob_clock_sec := elapsed_time_seconds();
> glob_current_iter := 0;
> glob_iter := 0;
> omniout_str(DEBUGL," ");
> glob_reached_optimal_h := true;
> glob_optimal_clock_start_sec := elapsed_time_seconds();
> while ((glob_current_iter < glob_max_iter) and ((glob_check_sign * array_x[1]) < (glob_check_sign * x_end )) and ((convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec)) < convfloat(glob_max_sec))) do # do number 2
> #left paren 0001C
> if (reached_interval()) then # if number 3
> omniout_str(INFO," ");
> omniout_str(INFO,"TOP MAIN SOLVE Loop");
> fi;# end if 3;
> glob_iter := glob_iter + 1;
> glob_clock_sec := elapsed_time_seconds();
> glob_current_iter := glob_current_iter + 1;
> atomall();
> display_alot(current_iter);
> if (glob_look_poles) then # if number 3
> #left paren 0004C
> check_for_pole();
> fi;# end if 3;#was right paren 0004C
> if (reached_interval()) then # if number 3
> glob_next_display := glob_next_display + glob_display_interval;
> fi;# end if 3;
> array_x[1] := array_x[1] + glob_h;
> array_x[2] := glob_h;
> #Jump Series array_y;
> order_diff := 2;
> #START PART 1 SUM AND ADJUST
> #START SUM AND ADJUST EQ =1
> #sum_and_adjust array_y
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 2;
> calc_term := 1;
> #adjust_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_y_higher_work[2,iii] := array_y_higher[2,iii] / expt(glob_h , (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 2;
> calc_term := 1;
> #sum_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_y_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3;
> array_y_higher_work2[ord,calc_term] := temp_sum * expt(glob_h , (calc_term - 1)) / (factorial_1(calc_term - 1));
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 1;
> calc_term := 2;
> #adjust_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_y_higher_work[1,iii] := array_y_higher[1,iii] / expt(glob_h , (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 1;
> calc_term := 2;
> #sum_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_y_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3;
> array_y_higher_work2[ord,calc_term] := temp_sum * expt(glob_h , (calc_term - 1)) / (factorial_1(calc_term - 1));
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 1;
> calc_term := 1;
> #adjust_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_y_higher_work[1,iii] := array_y_higher[1,iii] / expt(glob_h , (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 1;
> calc_term := 1;
> #sum_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_y_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3;
> array_y_higher_work2[ord,calc_term] := temp_sum * expt(glob_h , (calc_term - 1)) / (factorial_1(calc_term - 1));
> #AFTER SUM SUBSERIES EQ =1
> #END SUM AND ADJUST EQ =1
> #END PART 1
> #START PART 2 MOVE TERMS to REGULAR Array
> term_no := glob_max_terms;
> while (term_no >= 1) do # do number 3
> array_y[term_no] := array_y_higher_work2[1,term_no];
> ord := 1;
> while (ord <= order_diff) do # do number 4
> array_y_higher[ord,term_no] := array_y_higher_work2[ord,term_no];
> ord := ord + 1;
> od;# end do number 4;
> term_no := term_no - 1;
> od;# end do number 3;
> #END PART 2 HEVE MOVED TERMS to REGULAR Array
> ;
> od;# end do number 2;#right paren 0001C
> omniout_str(ALWAYS,"Finished!");
> if (glob_iter >= glob_max_iter) then # if number 3
> omniout_str(ALWAYS,"Maximum Iterations Reached before Solution Completed!");
> fi;# end if 3;
> if (elapsed_time_seconds() - convfloat(glob_orig_start_sec) >= convfloat(glob_max_sec )) then # if number 3
> omniout_str(ALWAYS,"Maximum Time Reached before Solution Completed!");
> fi;# end if 3;
> glob_clock_sec := elapsed_time_seconds();
> omniout_str(INFO,"diff ( y , x , 1 ) = expt (sin(x) , (0.2 * x + 0.3));");
> omniout_int(INFO,"Iterations ",32,glob_iter,4," ")
> ;
> prog_report(x_start,x_end);
> if (glob_html_log) then # if number 3
> logstart(html_log_file);
> logitem_str(html_log_file,"2013-01-28T14:41:45-06:00")
> ;
> logitem_str(html_log_file,"Maple")
> ;
> logitem_str(html_log_file,"expt_sin_lin")
> ;
> logitem_str(html_log_file,"diff ( y , x , 1 ) = expt (sin(x) , (0.2 * x + 0.3));")
> ;
> logitem_float(html_log_file,x_start)
> ;
> logitem_float(html_log_file,x_end)
> ;
> logitem_float(html_log_file,array_x[1])
> ;
> logitem_float(html_log_file,glob_h)
> ;
> logitem_integer(html_log_file,Digits)
> ;
> ;
> logitem_good_digits(html_log_file,array_last_rel_error[1])
> ;
> logitem_integer(html_log_file,glob_max_terms)
> ;
> logitem_float(html_log_file,array_1st_rel_error[1])
> ;
> logitem_float(html_log_file,array_last_rel_error[1])
> ;
> logitem_integer(html_log_file,glob_iter)
> ;
> logitem_pole(html_log_file,array_type_pole[1])
> ;
> if (array_type_pole[1] = 1 or array_type_pole[1] = 2) then # if number 4
> logitem_float(html_log_file,array_pole[1])
> ;
> logitem_float(html_log_file,array_pole[2])
> ;
> 0;
> else
> logitem_str(html_log_file,"NA")
> ;
> logitem_str(html_log_file,"NA")
> ;
> 0;
> fi;# end if 4;
> logitem_time(html_log_file,convfloat(glob_clock_sec))
> ;
> if (glob_percent_done < 100.0) then # if number 4
> logitem_time(html_log_file,convfloat(glob_total_exp_sec))
> ;
> 0;
> else
> logitem_str(html_log_file,"Done")
> ;
> 0;
> fi;# end if 4;
> log_revs(html_log_file," 165 | ")
> ;
> logitem_str(html_log_file,"expt_sin_lin diffeq.mxt")
> ;
> logitem_str(html_log_file,"expt_sin_lin maple results")
> ;
> logitem_str(html_log_file,"All Tests - All Languages")
> ;
> logend(html_log_file)
> ;
> ;
> fi;# end if 3;
> if (glob_html_log) then # if number 3
> fclose(html_log_file);
> fi;# end if 3
> ;
> ;;
> fi;# end if 2
> #END OUTFILEMAIN
> end;
main := proc()
local d1, d2, d3, d4, est_err_2, niii, done_once, term, ord, order_diff,
term_no, html_log_file, iiif, jjjf, rows, r_order, sub_iter, calc_term, iii,
temp_sum, current_iter, x_start, x_end, it, max_terms, opt_iter, tmp,
subiter, est_needed_step_err, value3, min_value, est_answer, best_h,
found_h, repeat_it;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_total_exp_sec, glob_optimal_expect_sec,
glob_html_log, glob_good_digits, glob_max_opt_iter, glob_dump,
glob_djd_debug, glob_display_flag, glob_djd_debug2, glob_sec_in_minute,
glob_min_in_hour, glob_hours_in_day, glob_days_in_year, glob_sec_in_hour,
glob_sec_in_day, glob_sec_in_year, glob_almost_1, glob_clock_sec,
glob_clock_start_sec, glob_not_yet_finished, glob_initial_pass,
glob_not_yet_start_msg, glob_reached_optimal_h, glob_optimal_done,
glob_disp_incr, glob_h, glob_max_h, glob_large_float, glob_last_good_h,
glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display,
glob_dump_analytic, glob_abserr, glob_relerr, glob_max_hours, glob_max_iter,
glob_max_rel_trunc_err, glob_max_trunc_err, glob_no_eqs,
glob_optimal_clock_start_sec, glob_optimal_start, glob_small_float,
glob_smallish_float, glob_unchanged_h_cnt, glob_warned, glob_warned2,
glob_max_sec, glob_orig_start_sec, glob_start, glob_curr_iter_when_opt,
glob_current_iter, glob_iter, glob_normmax, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1_g, array_tmp1, array_tmp2, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
glob_last;
ALWAYS := 1;
INFO := 2;
DEBUGL := 3;
DEBUGMASSIVE := 4;
glob_iolevel := INFO;
glob_max_terms := 30;
glob_iolevel := 5;
ALWAYS := 1;
INFO := 2;
DEBUGL := 3;
DEBUGMASSIVE := 4;
MAX_UNCHANGED := 10;
glob_check_sign := 1.0;
glob_desired_digits_correct := 8.0;
glob_max_value3 := 0.;
glob_ratio_of_radius := 0.01;
glob_percent_done := 0.;
glob_subiter_method := 3;
glob_total_exp_sec := 0.1;
glob_optimal_expect_sec := 0.1;
glob_html_log := true;
glob_good_digits := 0;
glob_max_opt_iter := 10;
glob_dump := false;
glob_djd_debug := true;
glob_display_flag := true;
glob_djd_debug2 := true;
glob_sec_in_minute := 60;
glob_min_in_hour := 60;
glob_hours_in_day := 24;
glob_days_in_year := 365;
glob_sec_in_hour := 3600;
glob_sec_in_day := 86400;
glob_sec_in_year := 31536000;
glob_almost_1 := 0.9990;
glob_clock_sec := 0.;
glob_clock_start_sec := 0.;
glob_not_yet_finished := true;
glob_initial_pass := true;
glob_not_yet_start_msg := true;
glob_reached_optimal_h := false;
glob_optimal_done := false;
glob_disp_incr := 0.1;
glob_h := 0.1;
glob_max_h := 0.1;
glob_large_float := 0.90*10^101;
glob_last_good_h := 0.1;
glob_look_poles := false;
glob_neg_h := false;
glob_display_interval := 0.;
glob_next_display := 0.;
glob_dump_analytic := false;
glob_abserr := 0.1*10^(-10);
glob_relerr := 0.1*10^(-10);
glob_max_hours := 0.;
glob_max_iter := 1000;
glob_max_rel_trunc_err := 0.1*10^(-10);
glob_max_trunc_err := 0.1*10^(-10);
glob_no_eqs := 0;
glob_optimal_clock_start_sec := 0.;
glob_optimal_start := 0.;
glob_small_float := 0.1*10^(-200);
glob_smallish_float := 0.1*10^(-100);
glob_unchanged_h_cnt := 0;
glob_warned := false;
glob_warned2 := false;
glob_max_sec := 10000.0;
glob_orig_start_sec := 0.;
glob_start := 0;
glob_curr_iter_when_opt := 0;
glob_current_iter := 0;
glob_iter := 0;
glob_normmax := 0.;
glob_max_minutes := 0.;
glob_orig_start_sec := elapsed_time_seconds();
MAX_UNCHANGED := 10;
glob_curr_iter_when_opt := 0;
glob_display_flag := true;
glob_no_eqs := 1;
glob_iter := -1;
opt_iter := -1;
glob_max_iter := 50000;
glob_max_hours := 0.;
glob_max_minutes := 15.0;
omniout_str(ALWAYS, "##############ECHO OF PROBLEM#################");
omniout_str(ALWAYS,
"##############temp/expt_sin_linpostode.ode#################");
omniout_str(ALWAYS,
"diff ( y , x , 1 ) = expt (sin(x) , (0.2 * x + 0.3));");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#BEGIN FIRST INPUT BLOCK");
omniout_str(ALWAYS, "Digits:=32;");
omniout_str(ALWAYS, "max_terms:=30;");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#END FIRST INPUT BLOCK");
omniout_str(ALWAYS, "#BEGIN SECOND INPUT BLOCK");
omniout_str(ALWAYS, "x_start := 0.1;");
omniout_str(ALWAYS, "x_end := 3.0 ;");
omniout_str(ALWAYS, "array_y_init[0 + 1] := exact_soln_y(x_start);");
omniout_str(ALWAYS, "glob_look_poles := true;");
omniout_str(ALWAYS, "glob_max_iter := 1000000;");
omniout_str(ALWAYS, "#END SECOND INPUT BLOCK");
omniout_str(ALWAYS, "#BEGIN OVERRIDE BLOCK");
omniout_str(ALWAYS, "glob_desired_digits_correct:=10;");
omniout_str(ALWAYS, "glob_display_interval:=0.001;");
omniout_str(ALWAYS, "glob_look_poles:=true;");
omniout_str(ALWAYS, "glob_max_iter:=10000000;");
omniout_str(ALWAYS, "glob_max_minutes:=3;");
omniout_str(ALWAYS, "glob_subiter_method:=3;");
omniout_str(ALWAYS, "#END OVERRIDE BLOCK");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#BEGIN USER DEF BLOCK");
omniout_str(ALWAYS, "exact_soln_y := proc(x)");
omniout_str(ALWAYS, "return(0.0);");
omniout_str(ALWAYS, "end;");
omniout_str(ALWAYS, "#END USER DEF BLOCK");
omniout_str(ALWAYS, "#######END OF ECHO OF PROBLEM#################");
glob_unchanged_h_cnt := 0;
glob_warned := false;
glob_warned2 := false;
glob_small_float := 0.10*10^(-199);
glob_smallish_float := 0.10*10^(-63);
glob_large_float := 0.10*10^101;
glob_almost_1 := 0.99;
Digits := 32;
max_terms := 30;
glob_max_terms := max_terms;
glob_html_log := true;
array_y_init := Array(0 .. max_terms + 1, []);
array_norms := Array(0 .. max_terms + 1, []);
array_fact_1 := Array(0 .. max_terms + 1, []);
array_pole := Array(0 .. max_terms + 1, []);
array_1st_rel_error := Array(0 .. max_terms + 1, []);
array_last_rel_error := Array(0 .. max_terms + 1, []);
array_type_pole := Array(0 .. max_terms + 1, []);
array_y := Array(0 .. max_terms + 1, []);
array_x := Array(0 .. max_terms + 1, []);
array_tmp0 := Array(0 .. max_terms + 1, []);
array_tmp1_g := Array(0 .. max_terms + 1, []);
array_tmp1 := Array(0 .. max_terms + 1, []);
array_tmp2 := Array(0 .. max_terms + 1, []);
array_tmp3 := Array(0 .. max_terms + 1, []);
array_tmp4_c1 := Array(0 .. max_terms + 1, []);
array_tmp4_a1 := Array(0 .. max_terms + 1, []);
array_tmp4_a2 := Array(0 .. max_terms + 1, []);
array_tmp4 := Array(0 .. max_terms + 1, []);
array_tmp5 := Array(0 .. max_terms + 1, []);
array_m1 := Array(0 .. max_terms + 1, []);
array_y_higher := Array(0 .. 3, 0 .. max_terms + 1, []);
array_y_higher_work := Array(0 .. 3, 0 .. max_terms + 1, []);
array_y_higher_work2 := Array(0 .. 3, 0 .. max_terms + 1, []);
array_y_set_initial := Array(0 .. 3, 0 .. max_terms + 1, []);
array_poles := Array(0 .. 2, 0 .. 4, []);
array_real_pole := Array(0 .. 2, 0 .. 4, []);
array_complex_pole := Array(0 .. 2, 0 .. 4, []);
array_fact_2 := Array(0 .. max_terms + 1, 0 .. max_terms + 1, []);
term := 1;
while term <= max_terms do array_y_init[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_norms[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_fact_1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_pole[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do
array_1st_rel_error[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do
array_last_rel_error[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do
array_type_pole[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_y[term] := 0.; term := term + 1 end do
;
term := 1;
while term <= max_terms do array_x[term] := 0.; term := term + 1 end do
;
term := 1;
while term <= max_terms do array_tmp0[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp1_g[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp2[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp3[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4_c1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4_a1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4_a2[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp5[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_m1[term] := 0.; term := term + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= max_terms do
array_y_higher[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= max_terms do
array_y_higher_work[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= max_terms do
array_y_higher_work2[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= max_terms do
array_y_set_initial[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 1 do
term := 1;
while term <= 3 do array_poles[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 1 do
term := 1;
while term <= 3 do
array_real_pole[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 1 do
term := 1;
while term <= 3 do
array_complex_pole[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= max_terms do
term := 1;
while term <= max_terms do
array_fact_2[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
array_y := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_y[term] := 0.; term := term + 1
end do;
array_x := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_x[term] := 0.; term := term + 1
end do;
array_tmp0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp0[term] := 0.; term := term + 1
end do;
array_tmp1_g := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp1_g[term] := 0.; term := term + 1
end do;
array_tmp1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp1[term] := 0.; term := term + 1
end do;
array_tmp2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp2[term] := 0.; term := term + 1
end do;
array_tmp3 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp3[term] := 0.; term := term + 1
end do;
array_tmp4_c1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp4_c1[term] := 0.; term := term + 1
end do;
array_tmp4_a1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp4_a1[term] := 0.; term := term + 1
end do;
array_tmp4_a2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp4_a2[term] := 0.; term := term + 1
end do;
array_tmp4 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp4[term] := 0.; term := term + 1
end do;
array_tmp5 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp5[term] := 0.; term := term + 1
end do;
array_m1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_m1[term] := 0.; term := term + 1
end do;
array_const_1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_1[term] := 0.; term := term + 1
end do;
array_const_1[1] := 1;
array_const_0D0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_0D0[term] := 0.; term := term + 1
end do;
array_const_0D0[1] := 0.;
array_const_0D2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_0D2[term] := 0.; term := term + 1
end do;
array_const_0D2[1] := 0.2;
array_const_0D3 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_0D3[term] := 0.; term := term + 1
end do;
array_const_0D3[1] := 0.3;
array_m1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms do array_m1[term] := 0.; term := term + 1
end do;
array_m1[1] := -1.0;
iiif := 0;
while iiif <= glob_max_terms do
jjjf := 0;
while jjjf <= glob_max_terms do
array_fact_1[iiif] := 0;
array_fact_2[iiif, jjjf] := 0;
jjjf := jjjf + 1
end do;
iiif := iiif + 1
end do;
x_start := 0.1;
x_end := 3.0;
array_y_init[1] := exact_soln_y(x_start);
glob_look_poles := true;
glob_max_iter := 1000000;
glob_desired_digits_correct := 10;
glob_display_interval := 0.001;
glob_look_poles := true;
glob_max_iter := 10000000;
glob_max_minutes := 3;
glob_subiter_method := 3;
glob_last_good_h := glob_h;
glob_max_terms := max_terms;
glob_max_sec := convfloat(60.0)*convfloat(glob_max_minutes)
+ convfloat(3600.0)*convfloat(glob_max_hours);
if 0. < glob_h then
glob_neg_h := false;
glob_display_interval := omniabs(glob_display_interval)
else
glob_neg_h := true;
glob_display_interval := -omniabs(glob_display_interval)
end if;
chk_data();
array_y_set_initial[1, 1] := true;
array_y_set_initial[1, 2] := false;
array_y_set_initial[1, 3] := false;
array_y_set_initial[1, 4] := false;
array_y_set_initial[1, 5] := false;
array_y_set_initial[1, 6] := false;
array_y_set_initial[1, 7] := false;
array_y_set_initial[1, 8] := false;
array_y_set_initial[1, 9] := false;
array_y_set_initial[1, 10] := false;
array_y_set_initial[1, 11] := false;
array_y_set_initial[1, 12] := false;
array_y_set_initial[1, 13] := false;
array_y_set_initial[1, 14] := false;
array_y_set_initial[1, 15] := false;
array_y_set_initial[1, 16] := false;
array_y_set_initial[1, 17] := false;
array_y_set_initial[1, 18] := false;
array_y_set_initial[1, 19] := false;
array_y_set_initial[1, 20] := false;
array_y_set_initial[1, 21] := false;
array_y_set_initial[1, 22] := false;
array_y_set_initial[1, 23] := false;
array_y_set_initial[1, 24] := false;
array_y_set_initial[1, 25] := false;
array_y_set_initial[1, 26] := false;
array_y_set_initial[1, 27] := false;
array_y_set_initial[1, 28] := false;
array_y_set_initial[1, 29] := false;
array_y_set_initial[1, 30] := false;
omniout_str(ALWAYS, "START of Optimize");
glob_check_sign := check_sign(x_start, x_end);
glob_h := check_sign(x_start, x_end);
if glob_display_interval < glob_h then glob_h := glob_display_interval
end if;
if glob_max_h < glob_h then glob_h := glob_max_h end if;
found_h := -1.0;
best_h := 0.;
min_value := glob_large_float;
est_answer := est_size_answer();
opt_iter := 1;
while opt_iter <= 20 and found_h < 0. do
omniout_int(ALWAYS, "opt_iter", 32, opt_iter, 4, "");
array_x[1] := x_start;
array_x[2] := glob_h;
glob_next_display := x_start;
order_diff := 1;
term_no := 1;
while term_no <= order_diff do
array_y[term_no] := array_y_init[term_no]*
expt(glob_h, term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
rows := order_diff;
r_order := 1;
while r_order <= rows do
term_no := 1;
while term_no <= rows - r_order + 1 do
it := term_no + r_order - 1;
array_y_higher[r_order, term_no] := array_y_init[it]*
expt(glob_h, term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
r_order := r_order + 1
end do;
atomall();
est_needed_step_err :=
estimated_needed_step_error(x_start, x_end, glob_h, est_answer)
;
omniout_float(ALWAYS, "est_needed_step_err", 32,
est_needed_step_err, 16, "");
value3 := test_suggested_h();
omniout_float(ALWAYS, "value3", 32, value3, 32, "");
if value3 < est_needed_step_err and found_h < 0. then
best_h := glob_h; found_h := 1.0
end if;
omniout_float(ALWAYS, "best_h", 32, best_h, 32, "");
opt_iter := opt_iter + 1;
glob_h := glob_h*0.5
end do;
if 0. < found_h then glob_h := best_h
else omniout_str(ALWAYS,
"No increment to obtain desired accuracy found")
end if;
if glob_html_log then
html_log_file := fopen("html/entry.html", WRITE, TEXT)
end if;
if 0. < found_h then
omniout_str(ALWAYS, "START of Soultion");
array_x[1] := x_start;
array_x[2] := glob_h;
glob_next_display := x_start;
order_diff := 1;
term_no := 1;
while term_no <= order_diff do
array_y[term_no] := array_y_init[term_no]*
expt(glob_h, term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
rows := order_diff;
r_order := 1;
while r_order <= rows do
term_no := 1;
while term_no <= rows - r_order + 1 do
it := term_no + r_order - 1;
array_y_higher[r_order, term_no] := array_y_init[it]*
expt(glob_h, term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
r_order := r_order + 1
end do;
current_iter := 1;
glob_clock_start_sec := elapsed_time_seconds();
glob_clock_sec := elapsed_time_seconds();
glob_current_iter := 0;
glob_iter := 0;
omniout_str(DEBUGL, " ");
glob_reached_optimal_h := true;
glob_optimal_clock_start_sec := elapsed_time_seconds();
while glob_current_iter < glob_max_iter and
glob_check_sign*array_x[1] < glob_check_sign*x_end and
convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec) <
convfloat(glob_max_sec) do
if reached_interval() then
omniout_str(INFO, " ");
omniout_str(INFO, "TOP MAIN SOLVE Loop")
end if;
glob_iter := glob_iter + 1;
glob_clock_sec := elapsed_time_seconds();
glob_current_iter := glob_current_iter + 1;
atomall();
display_alot(current_iter);
if glob_look_poles then check_for_pole() end if;
if reached_interval() then glob_next_display :=
glob_next_display + glob_display_interval
end if;
array_x[1] := array_x[1] + glob_h;
array_x[2] := glob_h;
order_diff := 2;
ord := 2;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_y_higher_work[2, iii] := array_y_higher[2, iii]/(
expt(glob_h, calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 2;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_y_higher_work[ord, iii];
iii := iii - 1
end do;
array_y_higher_work2[ord, calc_term] := temp_sum*
expt(glob_h, calc_term - 1)/factorial_1(calc_term - 1);
ord := 1;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
array_y_higher_work[1, iii] := array_y_higher[1, iii]/(
expt(glob_h, calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_y_higher_work[ord, iii];
iii := iii - 1
end do;
array_y_higher_work2[ord, calc_term] := temp_sum*
expt(glob_h, calc_term - 1)/factorial_1(calc_term - 1);
ord := 1;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_y_higher_work[1, iii] := array_y_higher[1, iii]/(
expt(glob_h, calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_y_higher_work[ord, iii];
iii := iii - 1
end do;
array_y_higher_work2[ord, calc_term] := temp_sum*
expt(glob_h, calc_term - 1)/factorial_1(calc_term - 1);
term_no := glob_max_terms;
while 1 <= term_no do
array_y[term_no] := array_y_higher_work2[1, term_no];
ord := 1;
while ord <= order_diff do
array_y_higher[ord, term_no] :=
array_y_higher_work2[ord, term_no];
ord := ord + 1
end do;
term_no := term_no - 1
end do
end do;
omniout_str(ALWAYS, "Finished!");
if glob_max_iter <= glob_iter then omniout_str(ALWAYS,
"Maximum Iterations Reached before Solution Completed!")
end if;
if convfloat(glob_max_sec) <=
elapsed_time_seconds() - convfloat(glob_orig_start_sec) then
omniout_str(ALWAYS,
"Maximum Time Reached before Solution Completed!")
end if;
glob_clock_sec := elapsed_time_seconds();
omniout_str(INFO,
"diff ( y , x , 1 ) = expt (sin(x) , (0.2 * x + 0.3));");
omniout_int(INFO, "Iterations ", 32,
glob_iter, 4, " ");
prog_report(x_start, x_end);
if glob_html_log then
logstart(html_log_file);
logitem_str(html_log_file, "2013-01-28T14:41:45-06:00");
logitem_str(html_log_file, "Maple");
logitem_str(html_log_file,
"expt_sin_lin");
logitem_str(html_log_file,
"diff ( y , x , 1 ) = expt (sin(x) , (0.2 * x + 0.3));");
logitem_float(html_log_file, x_start);
logitem_float(html_log_file, x_end);
logitem_float(html_log_file, array_x[1]);
logitem_float(html_log_file, glob_h);
logitem_integer(html_log_file, Digits);
logitem_good_digits(html_log_file, array_last_rel_error[1]);
logitem_integer(html_log_file, glob_max_terms);
logitem_float(html_log_file, array_1st_rel_error[1]);
logitem_float(html_log_file, array_last_rel_error[1]);
logitem_integer(html_log_file, glob_iter);
logitem_pole(html_log_file, array_type_pole[1]);
if array_type_pole[1] = 1 or array_type_pole[1] = 2 then
logitem_float(html_log_file, array_pole[1]);
logitem_float(html_log_file, array_pole[2]);
0
else
logitem_str(html_log_file, "NA");
logitem_str(html_log_file, "NA");
0
end if;
logitem_time(html_log_file, convfloat(glob_clock_sec));
if glob_percent_done < 100.0 then
logitem_time(html_log_file, convfloat(glob_total_exp_sec));
0
else logitem_str(html_log_file, "Done"); 0
end if;
log_revs(html_log_file, " 165 | ");
logitem_str(html_log_file, "expt_sin_lin diffeq.mxt");
logitem_str(html_log_file, "expt_sin_lin maple results");
logitem_str(html_log_file, "All Tests - All Languages");
logend(html_log_file)
end if;
if glob_html_log then fclose(html_log_file) end if
end if
end proc
> # End Function number 12
> main();
##############ECHO OF PROBLEM#################
##############temp/expt_sin_linpostode.ode#################
diff ( y , x , 1 ) = expt (sin(x) , (0.2 * x + 0.3));
!
#BEGIN FIRST INPUT BLOCK
Digits:=32;
max_terms:=30;
!
#END FIRST INPUT BLOCK
#BEGIN SECOND INPUT BLOCK
x_start := 0.1;
x_end := 3.0 ;
array_y_init[0 + 1] := exact_soln_y(x_start);
glob_look_poles := true;
glob_max_iter := 1000000;
#END SECOND INPUT BLOCK
#BEGIN OVERRIDE BLOCK
glob_desired_digits_correct:=10;
glob_display_interval:=0.001;
glob_look_poles:=true;
glob_max_iter:=10000000;
glob_max_minutes:=3;
glob_subiter_method:=3;
#END OVERRIDE BLOCK
!
#BEGIN USER DEF BLOCK
exact_soln_y := proc(x)
return(0.0);
end;
#END USER DEF BLOCK
#######END OF ECHO OF PROBLEM#################
START of Optimize
min_size = 0
min_size = 1
opt_iter = 1
glob_desired_digits_correct = 10
desired_abs_gbl_error = 1.0000000000000000000000000000000e-10
range = 2.9
estimated_steps = 2900
step_error = 3.4482758620689655172413793103448e-14
est_needed_step_err = 3.4482758620689655172413793103448e-14
hn_div_ho = 0.5
hn_div_ho_2 = 0.25
hn_div_ho_3 = 0.125
value3 = 1.1431050946350754214216359261502e-59
max_value3 = 1.1431050946350754214216359261502e-59
value3 = 1.1431050946350754214216359261502e-59
best_h = 0.001
START of Soultion
TOP MAIN SOLVE Loop
x[1] = 0.1
y[1] (analytic) = 0
y[1] (numeric) = 0
absolute error = 0
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.101
y[1] (analytic) = 0
y[1] (numeric) = 0.00047902578181303554931708340753208
absolute error = 0.00047902578181303554931708340753208
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=3.8MB, alloc=2.8MB, time=0.30
x[1] = 0.102
y[1] (analytic) = 0
y[1] (numeric) = 0.00095934708535083255222876122700735
absolute error = 0.00095934708535083255222876122700735
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.103
y[1] (analytic) = 0
y[1] (numeric) = 0.0014409542033700479886409852678562
absolute error = 0.0014409542033700479886409852678562
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.104
y[1] (analytic) = 0
y[1] (numeric) = 0.001923837672380569315605283969617
absolute error = 0.001923837672380569315605283969617
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.105
y[1] (analytic) = 0
y[1] (numeric) = 0.0024079881921591132819398074253486
absolute error = 0.0024079881921591132819398074253486
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.106
y[1] (analytic) = 0
y[1] (numeric) = 0.0028933966214950379025701512320467
absolute error = 0.0028933966214950379025701512320467
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.107
y[1] (analytic) = 0
y[1] (numeric) = 0.0033800539740853363274661218653002
absolute error = 0.0033800539740853363274661218653002
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.108
y[1] (analytic) = 0
y[1] (numeric) = 0.0038679514145722424888817723034455
absolute error = 0.0038679514145722424888817723034455
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=7.6MB, alloc=3.9MB, time=0.65
x[1] = 0.109
y[1] (analytic) = 0
y[1] (numeric) = 0.0043570802547172258299502758430597
absolute error = 0.0043570802547172258299502758430597
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.11
y[1] (analytic) = 0
y[1] (numeric) = 0.0048474319497054784473161340540772
absolute error = 0.0048474319497054784473161340540772
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.111
y[1] (analytic) = 0
y[1] (numeric) = 0.005338998094575304119914651878314
absolute error = 0.005338998094575304119914651878314
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.112
y[1] (analytic) = 0
y[1] (numeric) = 0.0058317704207671063270451600351552
absolute error = 0.0058317704207671063270451600351552
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.113
y[1] (analytic) = 0
y[1] (numeric) = 0.006325740792786942755853235769971
absolute error = 0.006325740792786942755853235769971
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.114
y[1] (analytic) = 0
y[1] (numeric) = 0.006820901204979868137311604743978
absolute error = 0.006820901204979868137311604743978
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.115
y[1] (analytic) = 0
y[1] (numeric) = 0.0073172437784085266169646282108932
absolute error = 0.0073172437784085266169646282108932
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.116
y[1] (analytic) = 0
y[1] (numeric) = 0.0078147607578326802659855121407214
absolute error = 0.0078147607578326802659855121407214
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=11.4MB, alloc=4.1MB, time=1.01
x[1] = 0.117
y[1] (analytic) = 0
y[1] (numeric) = 0.0083134445087855726980001444080646
absolute error = 0.0083134445087855726980001444080646
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.118
y[1] (analytic) = 0
y[1] (numeric) = 0.0088132875147432269370308375621687
absolute error = 0.0088132875147432269370308375621687
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.119
y[1] (analytic) = 0
y[1] (numeric) = 0.0093142823743829654777347377259825
absolute error = 0.0093142823743829654777347377259825
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.12
y[1] (analytic) = 0
y[1] (numeric) = 0.0098164217989276186285147369792561
absolute error = 0.0098164217989276186285147369792561
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.121
y[1] (analytic) = 0
y[1] (numeric) = 0.01031969860957205541517302431498
absolute error = 0.01031969860957205541517302431498
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.122
y[1] (analytic) = 0
y[1] (numeric) = 0.010824105734988830182413283639902
absolute error = 0.010824105734988830182413283639902
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.123
y[1] (analytic) = 0
y[1] (numeric) = 0.011329636208909888152199170412762
absolute error = 0.011329636208909888152199170412762
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=15.2MB, alloc=4.1MB, time=1.37
x[1] = 0.124
y[1] (analytic) = 0
y[1] (numeric) = 0.011836283167781415129513619417866
absolute error = 0.011836283167781415129513619417866
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.125
y[1] (analytic) = 0
y[1] (numeric) = 0.012344039848489050796722960678383
absolute error = 0.012344039848489050796722960678383
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.126
y[1] (analytic) = 0
y[1] (numeric) = 0.01285289958615081208132660939869
absolute error = 0.01285289958615081208132660939869
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.127
y[1] (analytic) = 0
y[1] (numeric) = 0.013362855811975193359405534319822
absolute error = 0.013362855811975193359405534319822
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.128
y[1] (analytic) = 0
y[1] (numeric) = 0.013873902051182024179357498355002
absolute error = 0.013873902051182024179357498355002
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.129
y[1] (analytic) = 0
y[1] (numeric) = 0.014386031920983773140354657574457
absolute error = 0.014386031920983773140354657574457
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.13
y[1] (analytic) = 0
y[1] (numeric) = 0.014899239128625088894358416835206
absolute error = 0.014899239128625088894358416835206
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=19.0MB, alloc=4.2MB, time=1.74
x[1] = 0.131
y[1] (analytic) = 0
y[1] (numeric) = 0.015413517469478466292536128052749
absolute error = 0.015413517469478466292536128052749
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.132
y[1] (analytic) = 0
y[1] (numeric) = 0.015928860825194017777456012957054
absolute error = 0.015928860825194017777456012957054
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.133
y[1] (analytic) = 0
y[1] (numeric) = 0.016445263161901417521884826836321
absolute error = 0.016445263161901417521884826836321
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.134
y[1] (analytic) = 0
y[1] (numeric) = 0.016962718528462168804752159750939
absolute error = 0.016962718528462168804752159750939
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.135
y[1] (analytic) = 0
y[1] (numeric) = 0.017481221054770423948609886816463
absolute error = 0.017481221054770423948609886816463
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.136
y[1] (analytic) = 0
y[1] (numeric) = 0.018000764950100661058067231775545
absolute error = 0.018000764950100661058067231775545
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.137
y[1] (analytic) = 0
y[1] (numeric) = 0.018521344501500593017380484623814
absolute error = 0.018521344501500593017380484623814
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.138
y[1] (analytic) = 0
y[1] (numeric) = 0.019042954072227751935655745021207
absolute error = 0.019042954072227751935655745021207
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=22.8MB, alloc=4.2MB, time=2.11
x[1] = 0.139
y[1] (analytic) = 0
y[1] (numeric) = 0.019565588100228256664886130582305
absolute error = 0.019565588100228256664886130582305
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.14
y[1] (analytic) = 0
y[1] (numeric) = 0.020089241096656332341980930275894
absolute error = 0.020089241096656332341980930275894
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.141
y[1] (analytic) = 0
y[1] (numeric) = 0.020613907644433209292375900298231
absolute error = 0.020613907644433209292375900298231
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.142
y[1] (analytic) = 0
y[1] (numeric) = 0.021139582396844084240480306017317
absolute error = 0.021139582396844084240480306017317
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.143
y[1] (analytic) = 0
y[1] (numeric) = 0.021666260076171879751996524521661
absolute error = 0.021666260076171879751996524521661
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.144
y[1] (analytic) = 0
y[1] (numeric) = 0.022193935472366588326730830259413
absolute error = 0.022193935472366588326730830259413
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.145
y[1] (analytic) = 0
y[1] (numeric) = 0.022722603441749035701017626955899
absolute error = 0.022722603441749035701017626955899
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=26.7MB, alloc=4.3MB, time=2.48
x[1] = 0.146
y[1] (analytic) = 0
y[1] (numeric) = 0.023252258905747943831425524091342
absolute error = 0.023252258905747943831425524091342
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.147
y[1] (analytic) = 0
y[1] (numeric) = 0.023782896849669217833659244443076
absolute error = 0.023782896849669217833659244443076
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.148
y[1] (analytic) = 0
y[1] (numeric) = 0.02431451232149642295320176153614
absolute error = 0.02431451232149642295320176153614
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.149
y[1] (analytic) = 0
y[1] (numeric) = 0.024847100430721457551427511714159
absolute error = 0.024847100430721457551427511714159
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.15
y[1] (analytic) = 0
y[1] (numeric) = 0.025380656347204466200741595317899
absolute error = 0.025380656347204466200741595317899
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.151
y[1] (analytic) = 0
y[1] (numeric) = 0.025915175300062073387147772995625
absolute error = 0.025915175300062073387147772995625
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.152
y[1] (analytic) = 0
y[1] (numeric) = 0.026450652576583053105576843683861
absolute error = 0.026450652576583053105576843683861
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.153
y[1] (analytic) = 0
y[1] (numeric) = 0.026987083521170582884385048887915
absolute error = 0.026987083521170582884385048887915
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=30.5MB, alloc=4.3MB, time=2.84
x[1] = 0.154
y[1] (analytic) = 0
y[1] (numeric) = 0.027524463534310262568055811400858
absolute error = 0.027524463534310262568055811400858
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.155
y[1] (analytic) = 0
y[1] (numeric) = 0.028062788071563108594326248931739
absolute error = 0.028062788071563108594326248931739
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.156
y[1] (analytic) = 0
y[1] (numeric) = 0.028602052642582763592628141958239
absolute error = 0.028602052642582763592628141958239
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.157
y[1] (analytic) = 0
y[1] (numeric) = 0.029142252810156188969949201930451
absolute error = 0.029142252810156188969949201930451
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.158
y[1] (analytic) = 0
y[1] (numeric) = 0.02968338418926713479944257078483
absolute error = 0.02968338418926713479944257078483
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.159
y[1] (analytic) = 0
y[1] (numeric) = 0.030225442446181706844410496007959
absolute error = 0.030225442446181706844410496007959
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.16
y[1] (analytic) = 0
y[1] (numeric) = 0.030768423297555374990551005054438
absolute error = 0.030768423297555374990551005054438
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=34.3MB, alloc=4.3MB, time=3.21
x[1] = 0.161
y[1] (analytic) = 0
y[1] (numeric) = 0.031312322509560790774485070219057
absolute error = 0.031312322509560790774485070219057
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.162
y[1] (analytic) = 0
y[1] (numeric) = 0.031857135897035804135669328051637
absolute error = 0.031857135897035804135669328051637
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.163
y[1] (analytic) = 0
y[1] (numeric) = 0.032402859322651091028299508635222
absolute error = 0.032402859322651091028299508635222
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.164
y[1] (analytic) = 0
y[1] (numeric) = 0.032949488696096824153693685977769
absolute error = 0.032949488696096824153693685977769
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.165
y[1] (analytic) = 0
y[1] (numeric) = 0.03349701997328783885354833200147
absolute error = 0.03349701997328783885354833200147
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.166
y[1] (analytic) = 0
y[1] (numeric) = 0.034045449155586765179822127974339
absolute error = 0.034045449155586765179822127974339
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.167
y[1] (analytic) = 0
y[1] (numeric) = 0.034594772289044615365191440671224
absolute error = 0.034594772289044615365191440671224
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.168
y[1] (analytic) = 0
y[1] (numeric) = 0.035144985463658333394457202761753
absolute error = 0.035144985463658333394457202761753
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=38.1MB, alloc=4.3MB, time=3.58
x[1] = 0.169
y[1] (analytic) = 0
y[1] (numeric) = 0.035696084812644830155549206360616
absolute error = 0.035696084812644830155549206360616
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.17
y[1] (analytic) = 0
y[1] (numeric) = 0.036248066511731043760723253601477
absolute error = 0.036248066511731043760723253601477
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.171
y[1] (analytic) = 0
y[1] (numeric) = 0.036800926778459580104399967372659
absolute error = 0.036800926778459580104399967372659
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.172
y[1] (analytic) = 0
y[1] (numeric) = 0.037354661871509503592532807255005
absolute error = 0.037354661871509503592532807255005
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.173
y[1] (analytic) = 0
y[1] (numeric) = 0.037909268090031862266646016322407
absolute error = 0.037909268090031862266646016322407
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.174
y[1] (analytic) = 0
y[1] (numeric) = 0.038464741772999545279609016329479
absolute error = 0.038464741772999545279609016329479
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.175
y[1] (analytic) = 0
y[1] (numeric) = 0.039021079298571083884375961780262
absolute error = 0.039021079298571083884375961780262
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=41.9MB, alloc=4.3MB, time=3.94
x[1] = 0.176
y[1] (analytic) = 0
y[1] (numeric) = 0.03957827708346801979465898360836
absolute error = 0.03957827708346801979465898360836
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.177
y[1] (analytic) = 0
y[1] (numeric) = 0.040136331582365476990007211717466
absolute error = 0.040136331582365476990007211717466
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.178
y[1] (analytic) = 0
y[1] (numeric) = 0.04069523928729558478812532559523
absolute error = 0.04069523928729558478812532559523
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.179
y[1] (analytic) = 0
y[1] (numeric) = 0.041254996727063411314547313477056
absolute error = 0.041254996727063411314547313477056
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.18
y[1] (analytic) = 0
y[1] (numeric) = 0.041815600466675077383069290871261
absolute error = 0.041815600466675077383069290871261
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.181
y[1] (analytic) = 0
y[1] (numeric) = 0.042377047106777731277802064086926
absolute error = 0.042377047106777731277802064086926
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.182
y[1] (analytic) = 0
y[1] (numeric) = 0.042939333283111075016618050591753
absolute error = 0.042939333283111075016618050591753
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.183
y[1] (analytic) = 0
y[1] (numeric) = 0.043502455665970142392599242193362
absolute error = 0.043502455665970142392599242193362
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=45.7MB, alloc=4.3MB, time=4.31
x[1] = 0.184
y[1] (analytic) = 0
y[1] (numeric) = 0.044066410959679038450520704999401
absolute error = 0.044066410959679038450520704999401
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.185
y[1] (analytic) = 0
y[1] (numeric) = 0.044631195902075359074363111085349
absolute error = 0.044631195902075359074363111085349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.186
y[1] (analytic) = 0
y[1] (numeric) = 0.045196807264005018053570274130043
absolute error = 0.045196807264005018053570274130043
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.187
y[1] (analytic) = 0
y[1] (numeric) = 0.045763241848827217373819430385955
absolute error = 0.045763241848827217373819430385955
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.188
y[1] (analytic) = 0
y[1] (numeric) = 0.046330496491929304555387020325323
absolute error = 0.046330496491929304555387020325323
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.189
y[1] (analytic) = 0
y[1] (numeric) = 0.046898568060251268651105710119233
absolute error = 0.046898568060251268651105710119233
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.19
y[1] (analytic) = 0
y[1] (numeric) = 0.047467453451819634028185627588626
absolute error = 0.047467453451819634028185627588626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=49.5MB, alloc=4.3MB, time=4.69
x[1] = 0.191
y[1] (analytic) = 0
y[1] (numeric) = 0.048037149595290518305041162780426
absolute error = 0.048037149595290518305041162780426
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.192
y[1] (analytic) = 0
y[1] (numeric) = 0.048607653449501627806439114587518
absolute error = 0.048607653449501627806439114587518
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.193
y[1] (analytic) = 0
y[1] (numeric) = 0.049178962003032970647993286192261
absolute error = 0.049178962003032970647993286192261
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.194
y[1] (analytic) = 0
y[1] (numeric) = 0.049751072273776074074042051076342
absolute error = 0.049751072273776074074042051076342
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.195
y[1] (analytic) = 0
y[1] (numeric) = 0.050323981308511498960587613100601
absolute error = 0.050323981308511498960587613100601
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.196
y[1] (analytic) = 0
y[1] (numeric) = 0.05089768618249445046616066718507
absolute error = 0.05089768618249445046616066718507
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.197
y[1] (analytic) = 0
y[1] (numeric) = 0.051472183999048289676717885607384
absolute error = 0.051472183999048289676717885607384
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.198
y[1] (analytic) = 0
y[1] (numeric) = 0.052047471889165756754121539056592
absolute error = 0.052047471889165756754121539056592
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=53.4MB, alloc=4.3MB, time=5.05
TOP MAIN SOLVE Loop
x[1] = 0.199
y[1] (analytic) = 0
y[1] (numeric) = 0.052623547011117721569171981880577
absolute error = 0.052623547011117721569171981880577
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.2
y[1] (analytic) = 0
y[1] (numeric) = 0.053200406550069283087005469079337
absolute error = 0.053200406550069283087005469079337
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.201
y[1] (analytic) = 0
y[1] (numeric) = 0.053778047717703043882048556402358
absolute error = 0.053778047717703043882048556402358
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.202
y[1] (analytic) = 0
y[1] (numeric) = 0.054356467751849391098444492675932
absolute error = 0.054356467751849391098444492675932
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.203
y[1] (analytic) = 0
y[1] (numeric) = 0.054935663916123619946451298064833
absolute error = 0.054935663916123619946451298064833
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.204
y[1] (analytic) = 0
y[1] (numeric) = 0.05551563349956974044199085290051
absolute error = 0.05551563349956974044199085290051
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.205
y[1] (analytic) = 0
y[1] (numeric) = 0.056096373816310812561272290135185
absolute error = 0.056096373816310812561272290135185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=57.2MB, alloc=4.3MB, time=5.43
x[1] = 0.206
y[1] (analytic) = 0
y[1] (numeric) = 0.056677882205205659300936663014943
absolute error = 0.056677882205205659300936663014943
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.207
y[1] (analytic) = 0
y[1] (numeric) = 0.057260156029511811311946956546363
absolute error = 0.057260156029511811311946956546363
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.208
y[1] (analytic) = 0
y[1] (numeric) = 0.057843192676554540817721406630775
absolute error = 0.057843192676554540817721406630775
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.209
y[1] (analytic) = 0
y[1] (numeric) = 0.058426989557401846438802587887973
absolute error = 0.058426989557401846438802587887973
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.21
y[1] (analytic) = 0
y[1] (numeric) = 0.059011544106545254332484258544977
absolute error = 0.059011544106545254332484258544977
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.211
y[1] (analytic) = 0
y[1] (numeric) = 0.05959685378158630472089724243746
absolute error = 0.05959685378158630472089724243746
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.212
y[1] (analytic) = 0
y[1] (numeric) = 0.060182916062928596429508913585774
absolute error = 0.060182916062928596429508913585774
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.213
y[1] (analytic) = 0
y[1] (numeric) = 0.060769728453475265494060578028105
absolute error = 0.060769728453475265494060578028105
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=61.0MB, alloc=4.3MB, time=5.80
TOP MAIN SOLVE Loop
x[1] = 0.214
y[1] (analytic) = 0
y[1] (numeric) = 0.061357288478331777221722177943795
absolute error = 0.061357288478331777221722177943795
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.215
y[1] (analytic) = 0
y[1] (numeric) = 0.061945593684513914315587611080933
absolute error = 0.061945593684513914315587611080933
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.216
y[1] (analytic) = 0
y[1] (numeric) = 0.062534641640660846794311759591247
absolute error = 0.062534641640660846794311759591247
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.217
y[1] (analytic) = 0
y[1] (numeric) = 0.063124429936753172464296219966983
absolute error = 0.063124429936753172464296219966983
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.218
y[1] (analytic) = 0
y[1] (numeric) = 0.063714956183835819633814609273678
absolute error = 0.063714956183835819633814609273678
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.219
y[1] (analytic) = 0
y[1] (numeric) = 0.064306218013745706600142233785009
absolute error = 0.064306218013745706600142233785009
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.22
y[1] (analytic) = 0
y[1] (numeric) = 0.064898213078844055195299149897276
absolute error = 0.064898213078844055195299149897276
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=64.8MB, alloc=4.4MB, time=6.17
x[1] = 0.221
y[1] (analytic) = 0
y[1] (numeric) = 0.065490939051753258346484607533268
absolute error = 0.065490939051753258346484607533268
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.222
y[1] (analytic) = 0
y[1] (numeric) = 0.066084393625098204196608537650811
absolute error = 0.066084393625098204196608537650811
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.223
y[1] (analytic) = 0
y[1] (numeric) = 0.066678574511251961841330998929666
absolute error = 0.066678574511251961841330998929666
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.224
y[1] (analytic) = 0
y[1] (numeric) = 0.06727347944208573617441209444023
absolute error = 0.06727347944208573617441209444023
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.225
y[1] (analytic) = 0
y[1] (numeric) = 0.06786910616872300169555622966405
absolute error = 0.06786910616872300169555622966405
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.226
y[1] (analytic) = 0
y[1] (numeric) = 0.068465452461297727426808339467112
absolute error = 0.068465452461297727426808339467112
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.227
y[1] (analytic) = 0
y[1] (numeric) = 0.069062516108716607307332033107347
absolute error = 0.069062516108716607307332033107347
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=68.6MB, alloc=4.4MB, time=6.53
x[1] = 0.228
y[1] (analytic) = 0
y[1] (numeric) = 0.069660294918425212594384327616936
absolute error = 0.069660294918425212594384327616936
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.229
y[1] (analytic) = 0
y[1] (numeric) = 0.070258786716177984892724192781983
absolute error = 0.070258786716177984892724192781983
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.23
y[1] (analytic) = 0
y[1] (numeric) = 0.070857989345811990467693293072173
absolute error = 0.070857989345811990467693293072173
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.231
y[1] (analytic) = 0
y[1] (numeric) = 0.071457900669024358470846780580562
absolute error = 0.071457900669024358470846780580562
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.232
y[1] (analytic) = 0
y[1] (numeric) = 0.072058518565153327623271793581042
absolute error = 0.072058518565153327623271793581042
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.233
y[1] (analytic) = 0
y[1] (numeric) = 0.072659840930962827762519051790524
absolute error = 0.072659840930962827762519051790524
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.234
y[1] (analytic) = 0
y[1] (numeric) = 0.073261865680430524466224896228043
absolute error = 0.073261865680430524466224896228043
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.235
y[1] (analytic) = 0
y[1] (numeric) = 0.073864590744539256720785222912968
absolute error = 0.073864590744539256720785222912968
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=72.4MB, alloc=4.4MB, time=6.91
x[1] = 0.236
y[1] (analytic) = 0
y[1] (numeric) = 0.074468014071071799308561394233008
absolute error = 0.074468014071071799308561394233008
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.237
y[1] (analytic) = 0
y[1] (numeric) = 0.075072133624408883243690929274458
absolute error = 0.075072133624408883243690929274458
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.238
y[1] (analytic) = 0
y[1] (numeric) = 0.075676947385330409196221859934465
absolute error = 0.075676947385330409196221859934465
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.239
y[1] (analytic) = 0
y[1] (numeric) = 0.076282453350819790408510572740043
absolute error = 0.076282453350819790408510572740043
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.24
y[1] (analytic) = 0
y[1] (numeric) = 0.076888649533871363128084759396068
absolute error = 0.076888649533871363128084759396068
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.241
y[1] (analytic) = 0
y[1] (numeric) = 0.077495533963300804058888581273041
absolute error = 0.077495533963300804058888581273041
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.242
y[1] (analytic) = 0
y[1] (numeric) = 0.078103104683558495769358054176264
absolute error = 0.078103104683558495769358054176264
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=76.2MB, alloc=4.4MB, time=7.28
x[1] = 0.243
y[1] (analytic) = 0
y[1] (numeric) = 0.078711359754545782392433699598602
absolute error = 0.078711359754545782392433699598602
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.244
y[1] (analytic) = 0
y[1] (numeric) = 0.079320297251434059310670345841881
absolute error = 0.079320297251434059310670345841881
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.245
y[1] (analytic) = 0
y[1] (numeric) = 0.07992991526448664184027106718436
absolute error = 0.07992991526448664184027106718436
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.246
y[1] (analytic) = 0
y[1] (numeric) = 0.080540211898883359212330694674461
absolute error = 0.080540211898883359212330694674461
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.247
y[1] (analytic) = 0
y[1] (numeric) = 0.081151185274547821398959506903489
absolute error = 0.081151185274547821398959506903489
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.248
y[1] (analytic) = 0
y[1] (numeric) = 0.081762833525977307547364956539122
absolute error = 0.081762833525977307547364956539122
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.249
y[1] (analytic) = 0
y[1] (numeric) = 0.08237515480207522596745547429904
absolute error = 0.08237515480207522596745547429904
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.25
y[1] (analytic) = 0
y[1] (numeric) = 0.082988147265986096769115405303952
absolute error = 0.082988147265986096769115405303952
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=80.1MB, alloc=4.4MB, time=7.65
x[1] = 0.251
y[1] (analytic) = 0
y[1] (numeric) = 0.083601809094933009364968321620345
absolute error = 0.083601809094933009364968321620345
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.252
y[1] (analytic) = 0
y[1] (numeric) = 0.084216138480057508144147501878414
absolute error = 0.084216138480057508144147501878414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.253
y[1] (analytic) = 0
y[1] (numeric) = 0.08483113362626186068324460761934
absolute error = 0.08483113362626186068324460761934
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.254
y[1] (analytic) = 0
y[1] (numeric) = 0.08544679275205366389309626169514
absolute error = 0.08544679275205366389309626169514
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.255
y[1] (analytic) = 0
y[1] (numeric) = 0.086063114089392744505248711195551
absolute error = 0.086063114089392744505248711195551
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.256
y[1] (analytic) = 0
y[1] (numeric) = 0.086680095883540311280639176903373
absolute error = 0.086680095883540311280639176903373
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.257
y[1] (analytic) = 0
y[1] (numeric) = 0.087297736392910317276046878922527
absolute error = 0.087297736392910317276046878922527
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=83.9MB, alloc=4.4MB, time=8.02
x[1] = 0.258
y[1] (analytic) = 0
y[1] (numeric) = 0.087916033888922991431968056807647
absolute error = 0.087916033888922991431968056807647
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.259
y[1] (analytic) = 0
y[1] (numeric) = 0.088534986655860499649502510601169
absolute error = 0.088534986655860499649502510601169
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.26
y[1] (analytic) = 0
y[1] (numeric) = 0.089154592990724696404324156563379
absolute error = 0.089154592990724696404324156563379
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.261
y[1] (analytic) = 0
y[1] (numeric) = 0.08977485120309692880354057545561
absolute error = 0.08977485120309692880354057545561
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.262
y[1] (analytic) = 0
y[1] (numeric) = 0.090395759614999855826899064401752
absolute error = 0.090395759614999855826899064401752
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.263
y[1] (analytic) = 0
y[1] (numeric) = 0.091017316560761246308019453835518
absolute error = 0.091017316560761246308019453835518
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.264
y[1] (analytic) = 0
y[1] (numeric) = 0.091639520386879720004755548674098
absolute error = 0.091639520386879720004755548674098
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.265
y[1] (analytic) = 0
y[1] (numeric) = 0.092262369451892396881015381356975
absolute error = 0.092262369451892396881015381356975
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=87.7MB, alloc=4.4MB, time=8.40
x[1] = 0.266
y[1] (analytic) = 0
y[1] (numeric) = 0.092885862126244420475993421599887
absolute error = 0.092885862126244420475993421599887
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.267
y[1] (analytic) = 0
y[1] (numeric) = 0.093509996792160321971354115263333
absolute error = 0.093509996792160321971354115263333
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.268
y[1] (analytic) = 0
y[1] (numeric) = 0.094134771843517192283005708399346
absolute error = 0.094134771843517192283005708399346
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.269
y[1] (analytic) = 0
y[1] (numeric) = 0.094760185685719630202248454633215
absolute error = 0.094760185685719630202248454633215
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.27
y[1] (analytic) = 0
y[1] (numeric) = 0.095386236735576435291786969023126
absolute error = 0.095386236735576435291786969023126
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.271
y[1] (analytic) = 0
y[1] (numeric) = 0.096012923421179014905861026040477
absolute error = 0.096012923421179014905861026040477
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.272
y[1] (analytic) = 0
y[1] (numeric) = 0.096640244181781475351054827603078
absolute error = 0.096640244181781475351054827603078
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=91.5MB, alloc=4.4MB, time=8.77
x[1] = 0.273
y[1] (analytic) = 0
y[1] (numeric) = 0.097268197467682367835658563157263
absolute error = 0.097268197467682367835658563157263
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.274
y[1] (analytic) = 0
y[1] (numeric) = 0.097896781740108060471229920945701
absolute error = 0.097896781740108060471229920945701
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.275
y[1] (analytic) = 0
y[1] (numeric) = 0.098525995471097708190674688561853
absolute error = 0.098525995471097708190674688561853
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.276
y[1] (analytic) = 0
y[1] (numeric) = 0.099155837143389793033158437426954
absolute error = 0.099155837143389793033158437426954
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.277
y[1] (analytic) = 0
y[1] (numeric) = 0.099786305250310207817885878540285
absolute error = 0.099786305250310207817885878540285
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.278
y[1] (analytic) = 0
y[1] (numeric) = 0.10041739829566185678663825621661
absolute error = 0.10041739829566185678663825621661
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.279
y[1] (analytic) = 0
y[1] (numeric) = 0.10104911479361574733932710579195
absolute error = 0.10104911479361574733932710579195
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.28
y[1] (analytic) = 0
y[1] (numeric) = 0.10168145326860354751807781011124
absolute error = 0.10168145326860354751807781011124
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=95.3MB, alloc=4.4MB, time=9.14
x[1] = 0.281
y[1] (analytic) = 0
y[1] (numeric) = 0.10231441225521158441386001110673
absolute error = 0.10231441225521158441386001110673
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.282
y[1] (analytic) = 0
y[1] (numeric) = 0.10294799029807625917578422460321
absolute error = 0.10294799029807625917578422460321
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.283
y[1] (analytic) = 0
y[1] (numeric) = 0.10358218595178085479722430678742
absolute error = 0.10358218595178085479722430678742
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.284
y[1] (analytic) = 0
y[1] (numeric) = 0.10421699778075371333523261946297
absolute error = 0.10421699778075371333523261946297
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.285
y[1] (analytic) = 0
y[1] (numeric) = 0.10485242435916775969060763724764
absolute error = 0.10485242435916775969060763724764
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.286
y[1] (analytic) = 0
y[1] (numeric) = 0.10548846427084134953576138515067
absolute error = 0.10548846427084134953576138515067
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.287
y[1] (analytic) = 0
y[1] (numeric) = 0.10612511610914041942651612529822
absolute error = 0.10612511610914041942651612529822
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=99.1MB, alloc=4.4MB, time=9.51
x[1] = 0.288
y[1] (analytic) = 0
y[1] (numeric) = 0.10676237847688191757242666530809
absolute error = 0.10676237847688191757242666530809
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.289
y[1] (analytic) = 0
y[1] (numeric) = 0.1074002499862384941684582856331
absolute error = 0.1074002499862384941684582856331
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.29
y[1] (analytic) = 0
y[1] (numeric) = 0.10803872925864443060912383152658
absolute error = 0.10803872925864443060912383152658
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.291
y[1] (analytic) = 0
y[1] (numeric) = 0.10867781492470278731476202881349
absolute error = 0.10867781492470278731476202881349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.292
y[1] (analytic) = 0
y[1] (numeric) = 0.10931750562409375029877966634146
absolute error = 0.10931750562409375029877966634146
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.293
y[1] (analytic) = 0
y[1] (numeric) = 0.1099578000054841569946323740646
absolute error = 0.1099578000054841569946323740646
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.294
y[1] (analytic) = 0
y[1] (numeric) = 0.11059869672643818224232432800214
absolute error = 0.11059869672643818224232432800214
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.295
y[1] (analytic) = 0
y[1] (numeric) = 0.1112401944533291657065011722956
absolute error = 0.1112401944533291657065011722956
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=103.0MB, alloc=4.4MB, time=9.88
x[1] = 0.296
y[1] (analytic) = 0
y[1] (numeric) = 0.11188229186125256236202066757027
absolute error = 0.11188229186125256236202066757027
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.297
y[1] (analytic) = 0
y[1] (numeric) = 0.11252498763393999803843324754606
absolute error = 0.11252498763393999803843324754606
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.298
y[1] (analytic) = 0
y[1] (numeric) = 0.11316828046367441236230449595484
absolute error = 0.11316828046367441236230449595484
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.299
y[1] (analytic) = 0
y[1] (numeric) = 0.11381216905120627177597196830877
absolute error = 0.11381216905120627177597196830877
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.3
y[1] (analytic) = 0
y[1] (numeric) = 0.11445665210567083564335212826304
absolute error = 0.11445665210567083564335212826304
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.301
y[1] (analytic) = 0
y[1] (numeric) = 0.11510172834450645877799591856496
absolute error = 0.11510172834450645877799591856496
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.302
y[1] (analytic) = 0
y[1] (numeric) = 0.11574739649337391404592442588616
absolute error = 0.11574739649337391404592442588616
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=106.8MB, alloc=4.4MB, time=10.25
x[1] = 0.303
y[1] (analytic) = 0
y[1] (numeric) = 0.11639365528607671900604450581431
absolute error = 0.11639365528607671900604450581431
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.304
y[1] (analytic) = 0
y[1] (numeric) = 0.11704050346448245085432805863795
absolute error = 0.11704050346448245085432805863795
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.305
y[1] (analytic) = 0
y[1] (numeric) = 0.11768793977844503423461267933685
absolute error = 0.11768793977844503423461267933685
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.306
y[1] (analytic) = 0
y[1] (numeric) = 0.11833596298572798676901544305419
absolute error = 0.11833596298572798676901544305419
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.307
y[1] (analytic) = 0
y[1] (numeric) = 0.11898457185192860744471059108296
absolute error = 0.11898457185192860744471059108296
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.308
y[1] (analytic) = 0
y[1] (numeric) = 0.11963376515040309327136612999599
absolute error = 0.11963376515040309327136612999599
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.309
y[1] (analytic) = 0
y[1] (numeric) = 0.12028354166219256989501959075167
absolute error = 0.12028354166219256989501959075167
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.31
y[1] (analytic) = 0
y[1] (numeric) = 0.1209339001759500221197507655505
absolute error = 0.1209339001759500221197507655505
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=110.6MB, alloc=4.4MB, time=10.62
x[1] = 0.311
y[1] (analytic) = 0
y[1] (numeric) = 0.12158483948786811054832624303922
absolute error = 0.12158483948786811054832624303922
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.312
y[1] (analytic) = 0
y[1] (numeric) = 0.12223635840160786080718997018707
absolute error = 0.12223635840160786080718997018707
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.313
y[1] (analytic) = 0
y[1] (numeric) = 0.12288845572822821206989486104061
absolute error = 0.12288845572822821206989486104061
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.314
y[1] (analytic) = 0
y[1] (numeric) = 0.1235411302861164118364477580011
absolute error = 0.1235411302861164118364477580011
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.315
y[1] (analytic) = 0
y[1] (numeric) = 0.12419438090091924416420518952634
absolute error = 0.12419438090091924416420518952634
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.316
y[1] (analytic) = 0
y[1] (numeric) = 0.12484820640547507877903808400176
absolute error = 0.12484820640547507877903808400176
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.317
y[1] (analytic) = 0
y[1] (numeric) = 0.12550260563974672872360409493484
absolute error = 0.12550260563974672872360409493484
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=114.4MB, alloc=4.4MB, time=10.99
x[1] = 0.318
y[1] (analytic) = 0
y[1] (numeric) = 0.12615757745075510442284725474507
absolute error = 0.12615757745075510442284725474507
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.319
y[1] (analytic) = 0
y[1] (numeric) = 0.12681312069251365226540377985607
absolute error = 0.12681312069251365226540377985607
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.32
y[1] (analytic) = 0
y[1] (numeric) = 0.12746923422596356601354426542588
absolute error = 0.12746923422596356601354426542588
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.321
y[1] (analytic) = 0
y[1] (numeric) = 0.12812591691890975956373738845397
absolute error = 0.12812591691890975956373738845397
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.322
y[1] (analytic) = 0
y[1] (numeric) = 0.12878316764595758978498671963539
absolute error = 0.12878316764595758978498671963539
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.323
y[1] (analytic) = 0
y[1] (numeric) = 0.12944098528845031836287553657395
absolute error = 0.12944098528845031836287553657395
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.324
y[1] (analytic) = 0
y[1] (numeric) = 0.13009936873440730177385700414652
absolute error = 0.13009936873440730177385700414652
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.325
y[1] (analytic) = 0
y[1] (numeric) = 0.13075831687846289870684835832464
absolute error = 0.13075831687846289870684835832464
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=118.2MB, alloc=4.4MB, time=11.36
x[1] = 0.326
y[1] (analytic) = 0
y[1] (numeric) = 0.13141782862180608443772474237711
absolute error = 0.13141782862180608443772474237711
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.327
y[1] (analytic) = 0
y[1] (numeric) = 0.13207790287212076184695545185001
absolute error = 0.13207790287212076184695545185001
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.328
y[1] (analytic) = 0
y[1] (numeric) = 0.13273853854352675895147438477839
absolute error = 0.13273853854352675895147438477839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.329
y[1] (analytic) = 0
y[1] (numeric) = 0.13339973455652150299901686341956
absolute error = 0.13339973455652150299901686341956
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.33
y[1] (analytic) = 0
y[1] (numeric) = 0.13406148983792236134667372212397
absolute error = 0.13406148983792236134667372212397
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.331
y[1] (analytic) = 0
y[1] (numeric) = 0.13472380332080963951539537272822
absolute error = 0.13472380332080963951539537272822
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.332
y[1] (analytic) = 0
y[1] (numeric) = 0.13538667394447022697870596271991
absolute error = 0.13538667394447022697870596271991
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=122.0MB, alloc=4.4MB, time=11.73
x[1] = 0.333
y[1] (analytic) = 0
y[1] (numeric) = 0.13605010065434188140704106502746
absolute error = 0.13605010065434188140704106502746
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.334
y[1] (analytic) = 0
y[1] (numeric) = 0.13671408240195814224897981144539
absolute error = 0.13671408240195814224897981144539
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.335
y[1] (analytic) = 0
y[1] (numeric) = 0.13737861814489386468728019256513
absolute error = 0.13737861814489386468728019256513
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.336
y[1] (analytic) = 0
y[1] (numeric) = 0.13804370684671136516111860132755
absolute error = 0.13804370684671136516111860132755
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.337
y[1] (analytic) = 0
y[1] (numeric) = 0.1387093474769071697963538754835
absolute error = 0.1387093474769071697963538754835
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.338
y[1] (analytic) = 0
y[1] (numeric) = 0.13937553901085935723305250722552
absolute error = 0.13937553901085935723305250722552
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.339
y[1] (analytic) = 0
y[1] (numeric) = 0.14004228042977548748399393100219
absolute error = 0.14004228042977548748399393100219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.34
y[1] (analytic) = 0
y[1] (numeric) = 0.1407095707206411085994897041301
absolute error = 0.1407095707206411085994897041301
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=125.8MB, alloc=4.4MB, time=12.11
TOP MAIN SOLVE Loop
x[1] = 0.341
y[1] (analytic) = 0
y[1] (numeric) = 0.14137740887616883305266307687647
absolute error = 0.14137740887616883305266307687647
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.342
y[1] (analytic) = 0
y[1] (numeric) = 0.14204579389474797589540936212821
absolute error = 0.14204579389474797589540936212821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.343
y[1] (analytic) = 0
y[1] (numeric) = 0.14271472478039474686865449513716
absolute error = 0.14271472478039474686865449513716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.344
y[1] (analytic) = 0
y[1] (numeric) = 0.1433842005427029887813094851065
absolute error = 0.1433842005427029887813094851065
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.345
y[1] (analytic) = 0
y[1] (numeric) = 0.14405422019679545460054083933701
absolute error = 0.14405422019679545460054083933701
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.346
y[1] (analytic) = 0
y[1] (numeric) = 0.14472478276327561582169873987049
absolute error = 0.14472478276327561582169873987049
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.347
y[1] (analytic) = 0
y[1] (numeric) = 0.14539588726817999480952158212091
absolute error = 0.14539588726817999480952158212091
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=129.7MB, alloc=4.4MB, time=12.48
x[1] = 0.348
y[1] (analytic) = 0
y[1] (numeric) = 0.14606753274293101392312185280879
absolute error = 0.14606753274293101392312185280879
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.349
y[1] (analytic) = 0
y[1] (numeric) = 0.14673971822429035435580727555907
absolute error = 0.14673971822429035435580727555907
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.35
y[1] (analytic) = 0
y[1] (numeric) = 0.14741244275431281773705440668749
absolute error = 0.14741244275431281773705440668749
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.351
y[1] (analytic) = 0
y[1] (numeric) = 0.14808570538030068365797985261579
absolute error = 0.14808570538030068365797985261579
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.352
y[1] (analytic) = 0
y[1] (numeric) = 0.14875950515475855639349618304204
absolute error = 0.14875950515475855639349618304204
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.353
y[1] (analytic) = 0
y[1] (numeric) = 0.14943384113534869420404339142874
absolute error = 0.14943384113534869420404339142874
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.354
y[1] (analytic) = 0
y[1] (numeric) = 0.15010871238484681470739918302159
absolute error = 0.15010871238484681470739918302159
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.355
y[1] (analytic) = 0
y[1] (numeric) = 0.15078411797109836991663807492941
absolute error = 0.15078411797109836991663807492941
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=133.5MB, alloc=4.4MB, time=12.85
TOP MAIN SOLVE Loop
x[1] = 0.356
y[1] (analytic) = 0
y[1] (numeric) = 0.15146005696697528464387477675435
absolute error = 0.15146005696697528464387477675435
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.357
y[1] (analytic) = 0
y[1] (numeric) = 0.15213652845033315207103499792975
absolute error = 0.15213652845033315207103499792975
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.358
y[1] (analytic) = 0
y[1] (numeric) = 0.15281353150396888038858905312821
absolute error = 0.15281353150396888038858905312821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.359
y[1] (analytic) = 0
y[1] (numeric) = 0.15349106521557878450100173220206
absolute error = 0.15349106521557878450100173220206
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.36
y[1] (analytic) = 0
y[1] (numeric) = 0.1541691286777171168936361849147
absolute error = 0.1541691286777171168936361849147
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.361
y[1] (analytic) = 0
y[1] (numeric) = 0.15484772098775503185003938554651
absolute error = 0.15484772098775503185003938554651
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.362
y[1] (analytic) = 0
y[1] (numeric) = 0.15552684124783997730097048045251
absolute error = 0.15552684124783997730097048045251
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=137.3MB, alloc=4.4MB, time=13.22
x[1] = 0.363
y[1] (analytic) = 0
y[1] (numeric) = 0.1562064885648555086772484502629
absolute error = 0.1562064885648555086772484502629
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.364
y[1] (analytic) = 0
y[1] (numeric) = 0.15688666205038151922752860516342
absolute error = 0.15688666205038151922752860516342
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.365
y[1] (analytic) = 0
y[1] (numeric) = 0.15756736082065488134950416816415
absolute error = 0.15756736082065488134950416816415
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.366
y[1] (analytic) = 0
y[1] (numeric) = 0.15824858399653049356880442645378
absolute error = 0.15824858399653049356880442645378
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.367
y[1] (analytic) = 0
y[1] (numeric) = 0.15893033070344272788405865386477
absolute error = 0.15893033070344272788405865386477
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.368
y[1] (analytic) = 0
y[1] (numeric) = 0.15961260007136727227924842916861
absolute error = 0.15961260007136727227924842916861
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.369
y[1] (analytic) = 0
y[1] (numeric) = 0.16029539123478336328561250974422
absolute error = 0.16029539123478336328561250974422
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.37
y[1] (analytic) = 0
y[1] (numeric) = 0.16097870333263640355502971652925
absolute error = 0.16097870333263640355502971652925
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=141.1MB, alloc=4.4MB, time=13.59
TOP MAIN SOLVE Loop
x[1] = 0.371
y[1] (analytic) = 0
y[1] (numeric) = 0.1616625355083009594850172466535
absolute error = 0.1616625355083009594850172466535
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.372
y[1] (analytic) = 0
y[1] (numeric) = 0.16234688690954413401227463104068
absolute error = 0.16234688690954413401227463104068
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.373
y[1] (analytic) = 0
y[1] (numeric) = 0.16303175668848930976710666449446
absolute error = 0.16303175668848930976710666449446
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.374
y[1] (analytic) = 0
y[1] (numeric) = 0.16371714400158025785510083539379
absolute error = 0.16371714400158025785510083539379
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.375
y[1] (analytic) = 0
y[1] (numeric) = 0.16440304800954560760514418013974
absolute error = 0.16440304800954560760514418013974
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.376
y[1] (analytic) = 0
y[1] (numeric) = 0.16508946787736367269426853932773
absolute error = 0.16508946787736367269426853932773
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.377
y[1] (analytic) = 0
y[1] (numeric) = 0.16577640277422762912993871693877
absolute error = 0.16577640277422762912993871693877
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=144.9MB, alloc=4.4MB, time=13.97
x[1] = 0.378
y[1] (analytic) = 0
y[1] (numeric) = 0.16646385187351104063927123900549
absolute error = 0.16646385187351104063927123900549
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.379
y[1] (analytic) = 0
y[1] (numeric) = 0.16715181435273372708231786819096
absolute error = 0.16715181435273372708231786819096
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.38
y[1] (analytic) = 0
y[1] (numeric) = 0.16784028939352797157299276061938
absolute error = 0.16784028939352797157299276061938
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.381
y[1] (analytic) = 0
y[1] (numeric) = 0.16852927618160506205648958239313
absolute error = 0.16852927618160506205648958239313
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.382
y[1] (analytic) = 0
y[1] (numeric) = 0.16921877390672216315614890760954
absolute error = 0.16921877390672216315614890760954
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.383
y[1] (analytic) = 0
y[1] (numeric) = 0.16990878176264951416572012447709
absolute error = 0.16990878176264951416572012447709
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.384
y[1] (analytic) = 0
y[1] (numeric) = 0.17059929894713794912483867731303
absolute error = 0.17059929894713794912483867731303
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.385
y[1] (analytic) = 0
y[1] (numeric) = 0.17129032466188673497633104807243
absolute error = 0.17129032466188673497633104807243
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=148.7MB, alloc=4.4MB, time=14.35
TOP MAIN SOLVE Loop
x[1] = 0.386
y[1] (analytic) = 0
y[1] (numeric) = 0.17198185811251172386368820527285
absolute error = 0.17198185811251172386368820527285
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.387
y[1] (analytic) = 0
y[1] (numeric) = 0.17267389850851381568573460247177
absolute error = 0.17267389850851381568573460247177
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.388
y[1] (analytic) = 0
y[1] (numeric) = 0.17336644506324772708318499498365
absolute error = 0.17336644506324772708318499498365
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.389
y[1] (analytic) = 0
y[1] (numeric) = 0.17405949699389106308844569688323
absolute error = 0.17405949699389106308844569688323
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.39
y[1] (analytic) = 0
y[1] (numeric) = 0.17475305352141368772570029924111
absolute error = 0.17475305352141368772570029924111
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.391
y[1] (analytic) = 0
y[1] (numeric) = 0.17544711387054738990304174915987
absolute error = 0.17544711387054738990304174915987
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.392
y[1] (analytic) = 0
y[1] (numeric) = 0.17614167726975584099219204823155
absolute error = 0.17614167726975584099219204823155
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=152.5MB, alloc=4.4MB, time=14.72
x[1] = 0.393
y[1] (analytic) = 0
y[1] (numeric) = 0.17683674295120484054420624649409
absolute error = 0.17683674295120484054420624649409
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.394
y[1] (analytic) = 0
y[1] (numeric) = 0.17753231015073284664150704952207
absolute error = 0.17753231015073284664150704952207
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.395
y[1] (analytic) = 0
y[1] (numeric) = 0.17822837810782178743765798553114
absolute error = 0.17822837810782178743765798553114
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.396
y[1] (analytic) = 0
y[1] (numeric) = 0.17892494606556815048647406767468
absolute error = 0.17892494606556815048647406767468
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.397
y[1] (analytic) = 0
y[1] (numeric) = 0.1796220132706543465114062228405
absolute error = 0.1796220132706543465114062228405
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.398
y[1] (analytic) = 0
y[1] (numeric) = 0.18031957897332034431463605776433
absolute error = 0.18031957897332034431463605776433
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.399
y[1] (analytic) = 0
y[1] (numeric) = 0.18101764242733557357299704759905
absolute error = 0.18101764242733557357299704759905
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.4
y[1] (analytic) = 0
y[1] (numeric) = 0.18171620288997109231471285740306
absolute error = 0.18171620288997109231471285740306
relative error = -1 %
Correct digits = -1
memory used=156.4MB, alloc=4.4MB, time=15.09
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.401
y[1] (analytic) = 0
y[1] (numeric) = 0.18241525962197201591702879291177
absolute error = 0.18241525962197201591702879291177
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.402
y[1] (analytic) = 0
y[1] (numeric) = 0.18311481188753020451012353479154
absolute error = 0.18311481188753020451012353479154
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.403
y[1] (analytic) = 0
y[1] (numeric) = 0.18381485895425720571724022166606
absolute error = 0.18381485895425720571724022166606
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.404
y[1] (analytic) = 0
y[1] (numeric) = 0.18451540009315744970478317079203
absolute error = 0.18451540009315744970478317079203
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.405
y[1] (analytic) = 0
y[1] (numeric) = 0.18521643457860169355920330625256
absolute error = 0.18521643457860169355920330625256
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.406
y[1] (analytic) = 0
y[1] (numeric) = 0.18591796168830071204985564105307
absolute error = 0.18591796168830071204985564105307
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.407
y[1] (analytic) = 0
y[1] (numeric) = 0.18661998070327923187866957021982
absolute error = 0.18661998070327923187866957021982
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=160.2MB, alloc=4.4MB, time=15.46
x[1] = 0.408
y[1] (analytic) = 0
y[1] (numeric) = 0.18732249090785010655844062329418
absolute error = 0.18732249090785010655844062329418
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.409
y[1] (analytic) = 0
y[1] (numeric) = 0.1880254915895887291018437575339
absolute error = 0.1880254915895887291018437575339
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.41
y[1] (analytic) = 0
y[1] (numeric) = 0.18872898203930767974289603016921
absolute error = 0.18872898203930767974289603016921
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.411
y[1] (analytic) = 0
y[1] (numeric) = 0.18943296155103160595157307976144
absolute error = 0.18943296155103160595157307976144
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.412
y[1] (analytic) = 0
y[1] (numeric) = 0.19013742942197233204062151810099
absolute error = 0.19013742942197233204062151810099
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.413
y[1] (analytic) = 0
y[1] (numeric) = 0.19084238495250419570132007093022
absolute error = 0.19084238495250419570132007093022
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.414
y[1] (analytic) = 0
y[1] (numeric) = 0.19154782744613960884203784070092
absolute error = 0.19154782744613960884203784070092
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=164.0MB, alloc=4.4MB, time=15.83
x[1] = 0.415
y[1] (analytic) = 0
y[1] (numeric) = 0.19225375620950484013992988298137
absolute error = 0.19225375620950484013992988298137
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.416
y[1] (analytic) = 0
y[1] (numeric) = 0.19296017055231601675200963399639
absolute error = 0.19296017055231601675200963399639
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.417
y[1] (analytic) = 0
y[1] (numeric) = 0.19366706978735534266715560831848
absolute error = 0.19366706978735534266715560831848
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.418
y[1] (analytic) = 0
y[1] (numeric) = 0.1943744532304475312153569808443
absolute error = 0.1943744532304475312153569808443
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.419
y[1] (analytic) = 0
y[1] (numeric) = 0.19508232020043644928468972887426
absolute error = 0.19508232020043644928468972887426
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.42
y[1] (analytic) = 0
y[1] (numeric) = 0.19579067001916197083015227163437
absolute error = 0.19579067001916197083015227163437
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.421
y[1] (analytic) = 0
y[1] (numeric) = 0.19649950201143703729158712458279
absolute error = 0.19649950201143703729158712458279
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.422
y[1] (analytic) = 0
y[1] (numeric) = 0.19720881550502492257048289329584
absolute error = 0.19720881550502492257048289329584
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=167.8MB, alloc=4.4MB, time=16.20
x[1] = 0.423
y[1] (analytic) = 0
y[1] (numeric) = 0.19791860983061670024749867075498
absolute error = 0.19791860983061670024749867075498
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.424
y[1] (analytic) = 0
y[1] (numeric) = 0.19862888432180891075409007644337
absolute error = 0.19862888432180891075409007644337
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.425
y[1] (analytic) = 0
y[1] (numeric) = 0.19933963831508142624265209424465
absolute error = 0.19933963831508142624265209424465
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.426
y[1] (analytic) = 0
y[1] (numeric) = 0.20005087114977551093013764607726
absolute error = 0.20005087114977551093013764607726
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.427
y[1] (analytic) = 0
y[1] (numeric) = 0.20076258216807207472017141013597
absolute error = 0.20076258216807207472017141013597
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.428
y[1] (analytic) = 0
y[1] (numeric) = 0.20147477071497011793826450472286
absolute error = 0.20147477071497011793826450472286
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.429
y[1] (analytic) = 0
y[1] (numeric) = 0.20218743613826536504385588078308
absolute error = 0.20218743613826536504385588078308
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=171.6MB, alloc=4.4MB, time=16.58
x[1] = 0.43
y[1] (analytic) = 0
y[1] (numeric) = 0.2029005777885290852115689939841
absolute error = 0.2029005777885290852115689939841
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.431
y[1] (analytic) = 0
y[1] (numeric) = 0.20361419501908709770228578571478
absolute error = 0.20361419501908709770228578571478
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.432
y[1] (analytic) = 0
y[1] (numeric) = 0.20432828718599895997241225045482
absolute error = 0.20432828718599895997241225045482
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.433
y[1] (analytic) = 0
y[1] (numeric) = 0.20504285364803733649704880054325
absolute error = 0.20504285364803733649704880054325
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.434
y[1] (analytic) = 0
y[1] (numeric) = 0.20575789376666754630969199532196
absolute error = 0.20575789376666754630969199532196
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.435
y[1] (analytic) = 0
y[1] (numeric) = 0.20647340690602728728758956127392
absolute error = 0.20647340690602728728758956127392
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.436
y[1] (analytic) = 0
y[1] (numeric) = 0.20718939243290653523795542238118
absolute error = 0.20718939243290653523795542238118
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.437
y[1] (analytic) = 0
y[1] (numeric) = 0.207905849716727615865932966087
absolute error = 0.207905849716727615865932966087
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=175.4MB, alloc=4.4MB, time=16.96
x[1] = 0.438
y[1] (analytic) = 0
y[1] (numeric) = 0.20862277812952544773048012518692
absolute error = 0.20862277812952544773048012518692
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.439
y[1] (analytic) = 0
y[1] (numeric) = 0.20934017704592795431924605278444
absolute error = 0.20934017704592795431924605278444
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.44
y[1] (analytic) = 0
y[1] (numeric) = 0.2100580458431366433980230602238
absolute error = 0.2100580458431366433980230602238
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.441
y[1] (analytic) = 0
y[1] (numeric) = 0.21077638390090735181449579483235
absolute error = 0.21077638390090735181449579483235
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.442
y[1] (analytic) = 0
y[1] (numeric) = 0.21149519060153115395977894061826
absolute error = 0.21149519060153115395977894061826
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.443
y[1] (analytic) = 0
y[1] (numeric) = 0.21221446532981543211464148602658
absolute error = 0.21221446532981543211464148602658
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.444
y[1] (analytic) = 0
y[1] (numeric) = 0.21293420747306510693036614655845
absolute error = 0.21293420747306510693036614655845
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=179.2MB, alloc=4.4MB, time=17.33
x[1] = 0.445
y[1] (analytic) = 0
y[1] (numeric) = 0.21365441642106402631689306024166
absolute error = 0.21365441642106402631689306024166
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.446
y[1] (analytic) = 0
y[1] (numeric) = 0.21437509156605651103325347269428
absolute error = 0.21437509156605651103325347269428
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.447
y[1] (analytic) = 0
y[1] (numeric) = 0.21509623230272905529731775893863
absolute error = 0.21509623230272905529731775893863
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.448
y[1] (analytic) = 0
y[1] (numeric) = 0.2158178380281921807535686378851
absolute error = 0.2158178380281921807535686378851
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.449
y[1] (analytic) = 0
y[1] (numeric) = 0.21653990814196244215897055531456
absolute error = 0.21653990814196244215897055531456
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.45
y[1] (analytic) = 0
y[1] (numeric) = 0.21726244204594458316804556363028
absolute error = 0.21726244204594458316804556363028
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.451
y[1] (analytic) = 0
y[1] (numeric) = 0.21798543914441384061899012399957
absolute error = 0.21798543914441384061899012399957
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.452
y[1] (analytic) = 0
y[1] (numeric) = 0.21870889884399839574308150447746
absolute error = 0.21870889884399839574308150447746
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=183.1MB, alloc=4.4MB, time=17.71
x[1] = 0.453
y[1] (analytic) = 0
y[1] (numeric) = 0.21943282055366197073973214764919
absolute error = 0.21943282055366197073973214764919
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.454
y[1] (analytic) = 0
y[1] (numeric) = 0.22015720368468656917936073246828
absolute error = 0.22015720368468656917936073246828
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.455
y[1] (analytic) = 0
y[1] (numeric) = 0.22088204765065535871576475658688
absolute error = 0.22088204765065535871576475658688
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.456
y[1] (analytic) = 0
y[1] (numeric) = 0.22160735186743569460890631905632
absolute error = 0.22160735186743569460890631905632
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.457
y[1] (analytic) = 0
y[1] (numeric) = 0.22233311575316228257796529457963
absolute error = 0.22233311575316228257796529457963
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.458
y[1] (analytic) = 0
y[1] (numeric) = 0.22305933872822047952317707160529
absolute error = 0.22305933872822047952317707160529
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.459
y[1] (analytic) = 0
y[1] (numeric) = 0.22378602021522973067336019784873
absolute error = 0.22378602021522973067336019784873
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=186.9MB, alloc=4.4MB, time=18.08
x[1] = 0.46
y[1] (analytic) = 0
y[1] (numeric) = 0.22451315963902714173415726895064
absolute error = 0.22451315963902714173415726895064
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.461
y[1] (analytic) = 0
y[1] (numeric) = 0.2252407564266511846298647517098
absolute error = 0.2252407564266511846298647517098
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.462
y[1] (analytic) = 0
y[1] (numeric) = 0.22596881000732553544931860944286
absolute error = 0.22596881000732553544931860944286
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.463
y[1] (analytic) = 0
y[1] (numeric) = 0.22669731981244304322363696611111
absolute error = 0.22669731981244304322363696611111
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.464
y[1] (analytic) = 0
y[1] (numeric) = 0.22742628527554982818070289808003
absolute error = 0.22742628527554982818070289808003
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.465
y[1] (analytic) = 0
y[1] (numeric) = 0.2281557058323295081381039872079
absolute error = 0.2281557058323295081381039872079
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.466
y[1] (analytic) = 0
y[1] (numeric) = 0.22888558092058755171283463685361
absolute error = 0.22888558092058755171283463685361
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.467
y[1] (analytic) = 0
y[1] (numeric) = 0.22961590998023575704241639644835
absolute error = 0.22961590998023575704241639644835
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=190.7MB, alloc=4.4MB, time=18.45
x[1] = 0.468
y[1] (analytic) = 0
y[1] (numeric) = 0.23034669245327685472820463783827
absolute error = 0.23034669245327685472820463783827
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.469
y[1] (analytic) = 0
y[1] (numeric) = 0.2310779277837892337275307808461
absolute error = 0.2310779277837892337275307808461
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.47
y[1] (analytic) = 0
y[1] (numeric) = 0.23180961541791178893698170695176
absolute error = 0.23180961541791178893698170695176
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.471
y[1] (analytic) = 0
y[1] (numeric) = 0.23254175480382888922454578805102
absolute error = 0.23254175480382888922454578805102
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.472
y[1] (analytic) = 0
y[1] (numeric) = 0.23327434539175546468356178164606
absolute error = 0.23327434539175546468356178164606
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.473
y[1] (analytic) = 0
y[1] (numeric) = 0.23400738663392221189639632604961
absolute error = 0.23400738663392221189639632604961
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.474
y[1] (analytic) = 0
y[1] (numeric) = 0.23474087798456091601055146391149
absolute error = 0.23474087798456091601055146391149
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=194.5MB, alloc=4.4MB, time=18.82
x[1] = 0.475
y[1] (analytic) = 0
y[1] (numeric) = 0.23547481889988988844446901881173
absolute error = 0.23547481889988988844446901881173
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.476
y[1] (analytic) = 0
y[1] (numeric) = 0.23620920883809951905465717289725
absolute error = 0.23620920883809951905465717289725
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.477
y[1] (analytic) = 0
y[1] (numeric) = 0.23694404725933794160991960585063
absolute error = 0.23694404725933794160991960585063
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.478
y[1] (analytic) = 0
y[1] (numeric) = 0.2376793336256968114324223576211
absolute error = 0.2376793336256968114324223576211
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.479
y[1] (analytic) = 0
y[1] (numeric) = 0.23841506740119719407909140979606
absolute error = 0.23841506740119719407909140979606
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.48
y[1] (analytic) = 0
y[1] (numeric) = 0.23915124805177556395039802466696
absolute error = 0.23915124805177556395039802466696
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.481
y[1] (analytic) = 0
y[1] (numeric) = 0.23988787504526991172696226051221
absolute error = 0.23988787504526991172696226051221
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.482
y[1] (analytic) = 0
y[1] (numeric) = 0.24062494785140595954759086325973
absolute error = 0.24062494785140595954759086325973
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=198.3MB, alloc=4.4MB, time=19.19
x[1] = 0.483
y[1] (analytic) = 0
y[1] (numeric) = 0.24136246594178348285536692983615
absolute error = 0.24136246594178348285536692983615
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.484
y[1] (analytic) = 0
y[1] (numeric) = 0.24210042878986273785122830406832
absolute error = 0.24210042878986273785122830406832
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.485
y[1] (analytic) = 0
y[1] (numeric) = 0.24283883587095099350711250555185
absolute error = 0.24283883587095099350711250555185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.486
y[1] (analytic) = 0
y[1] (numeric) = 0.24357768666218916710321095675485
absolute error = 0.24357768666218916710321095675485
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.487
y[1] (analytic) = 0
y[1] (numeric) = 0.24431698064253856226616716388114
absolute error = 0.24431698064253856226616716388114
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.488
y[1] (analytic) = 0
y[1] (numeric) = 0.24505671729276770849717507257766
absolute error = 0.24505671729276770849717507257766
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.489
y[1] (analytic) = 0
y[1] (numeric) = 0.2457968960954393011908877611461
absolute error = 0.2457968960954393011908877611461
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=202.1MB, alloc=4.4MB, time=19.56
x[1] = 0.49
y[1] (analytic) = 0
y[1] (numeric) = 0.24653751653489724115783560400129
absolute error = 0.24653751653489724115783560400129
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.491
y[1] (analytic) = 0
y[1] (numeric) = 0.24727857809725377267467964194414
absolute error = 0.24727857809725377267467964194414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.492
y[1] (analytic) = 0
y[1] (numeric) = 0.24802008027037671909809269229642
absolute error = 0.24802008027037671909809269229642
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.493
y[1] (analytic) = 0
y[1] (numeric) = 0.24876202254387681508937023458354
absolute error = 0.24876202254387681508937023458354
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.494
y[1] (analytic) = 0
y[1] (numeric) = 0.24950440440909513450802778524306
absolute error = 0.24950440440909513450802778524306
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.495
y[1] (analytic) = 0
y[1] (numeric) = 0.25024722535909061304364375313927
absolute error = 0.25024722535909061304364375313927
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.496
y[1] (analytic) = 0
y[1] (numeric) = 0.25099048488862766466605902905834
absolute error = 0.25099048488862766466605902905834
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.497
y[1] (analytic) = 0
y[1] (numeric) = 0.25173418249416389098474914748541
absolute error = 0.25173418249416389098474914748541
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=206.0MB, alloc=4.4MB, time=19.93
x[1] = 0.498
y[1] (analytic) = 0
y[1] (numeric) = 0.25247831767383788261874406734745
absolute error = 0.25247831767383788261874406734745
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.499
y[1] (analytic) = 0
y[1] (numeric) = 0.25322288992745711168888670925142
absolute error = 0.25322288992745711168888670925142
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.5
y[1] (analytic) = 0
y[1] (numeric) = 0.25396789875648591455449657973336
absolute error = 0.25396789875648591455449657973336
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.501
y[1] (analytic) = 0
y[1] (numeric) = 0.25471334366403356392664128907801
absolute error = 0.25471334366403356392664128907801
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.502
y[1] (analytic) = 0
y[1] (numeric) = 0.25545922415484242950021867127846
absolute error = 0.25545922415484242950021867127846
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.503
y[1] (analytic) = 0
y[1] (numeric) = 0.25620553973527622625691764831742
absolute error = 0.25620553973527622625691764831742
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.504
y[1] (analytic) = 0
y[1] (numeric) = 0.25695228991330834960085901525182
absolute error = 0.25695228991330834960085901525182
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=209.8MB, alloc=4.4MB, time=20.31
x[1] = 0.505
y[1] (analytic) = 0
y[1] (numeric) = 0.25769947419851029649831999080878
absolute error = 0.25769947419851029649831999080878
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.506
y[1] (analytic) = 0
y[1] (numeric) = 0.25844709210204017180242067843765
absolute error = 0.25844709210204017180242067843765
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.507
y[1] (analytic) = 0
y[1] (numeric) = 0.25919514313663127895299847861284
absolute error = 0.25919514313663127895299847861284
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.508
y[1] (analytic) = 0
y[1] (numeric) = 0.25994362681658079425111991443116
absolute error = 0.25994362681658079425111991443116
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.509
y[1] (analytic) = 0
y[1] (numeric) = 0.26069254265773852391678017580876
absolute error = 0.26069254265773852391678017580876
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.51
y[1] (analytic) = 0
y[1] (numeric) = 0.26144189017749574314732081693439
absolute error = 0.26144189017749574314732081693439
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.511
y[1] (analytic) = 0
y[1] (numeric) = 0.26219166889477411640295728923689
absolute error = 0.26219166889477411640295728923689
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.512
y[1] (analytic) = 0
y[1] (numeric) = 0.26294187833001469815455215882795
absolute error = 0.26294187833001469815455215882795
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=213.6MB, alloc=4.4MB, time=20.67
x[1] = 0.513
y[1] (analytic) = 0
y[1] (numeric) = 0.26369251800516701333739871332232
absolute error = 0.26369251800516701333739871332232
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.514
y[1] (analytic) = 0
y[1] (numeric) = 0.26444358744367821676329494812232
absolute error = 0.26444358744367821676329494812232
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.515
y[1] (analytic) = 0
y[1] (numeric) = 0.26519508617048233075159134712469
absolute error = 0.26519508617048233075159134712469
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.516
y[1] (analytic) = 0
y[1] (numeric) = 0.26594701371198956024818911880539
absolute error = 0.26594701371198956024818911880539
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.517
y[1] (analytic) = 0
y[1] (numeric) = 0.26669936959607568470965026874483
absolute error = 0.26669936959607568470965026874483
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.518
y[1] (analytic) = 0
y[1] (numeric) = 0.26745215335207152603765870893414
absolute error = 0.26745215335207152603765870893414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.519
y[1] (analytic) = 0
y[1] (numeric) = 0.26820536451075249185704412031695
absolute error = 0.26820536451075249185704412031695
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=217.4MB, alloc=4.4MB, time=21.04
x[1] = 0.52
y[1] (analytic) = 0
y[1] (numeric) = 0.26895900260432819343844906875193
absolute error = 0.26895900260432819343844906875193
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.521
y[1] (analytic) = 0
y[1] (numeric) = 0.2697130671664321375744864703297
absolute error = 0.2697130671664321375744864703297
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.522
y[1] (analytic) = 0
y[1] (numeric) = 0.27046755773211149172590042825563
absolute error = 0.27046755773211149172590042825563
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.523
y[1] (analytic) = 0
y[1] (numeric) = 0.27122247383781692176181021342472
absolute error = 0.27122247383781692176181021342472
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.524
y[1] (analytic) = 0
y[1] (numeric) = 0.27197781502139250162558620253874
absolute error = 0.27197781502139250162558620253874
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.525
y[1] (analytic) = 0
y[1] (numeric) = 0.27273358082206569426527936485328
absolute error = 0.27273358082206569426527936485328
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.526
y[1] (analytic) = 0
y[1] (numeric) = 0.27348977078043740317480382107855
absolute error = 0.27348977078043740317480382107855
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.527
y[1] (analytic) = 0
y[1] (numeric) = 0.27424638443847209389925648170654
absolute error = 0.27424638443847209389925648170654
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=221.2MB, alloc=4.4MB, time=21.41
x[1] = 0.528
y[1] (analytic) = 0
y[1] (numeric) = 0.27500342133948798486485018007429
absolute error = 0.27500342133948798486485018007429
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.529
y[1] (analytic) = 0
y[1] (numeric) = 0.2757608810281473069009383980626
absolute error = 0.2757608810281473069009383980626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.53
y[1] (analytic) = 0
y[1] (numeric) = 0.27651876305044663082852196744243
absolute error = 0.27651876305044663082852196744243
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.531
y[1] (analytic) = 0
y[1] (numeric) = 0.27727706695370726249645232360354
absolute error = 0.27727706695370726249645232360354
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.532
y[1] (analytic) = 0
y[1] (numeric) = 0.27803579228656570465328327533421
absolute error = 0.27803579228656570465328327533421
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.533
y[1] (analytic) = 0
y[1] (numeric) = 0.27879493859896418504937509797868
absolute error = 0.27879493859896418504937509797868
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.534
y[1] (analytic) = 0
y[1] (numeric) = 0.27955450544214125017042230048673
absolute error = 0.27955450544214125017042230048673
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=225.0MB, alloc=4.4MB, time=21.79
x[1] = 0.535
y[1] (analytic) = 0
y[1] (numeric) = 0.28031449236862242401006088206423
absolute error = 0.28031449236862242401006088206423
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.536
y[1] (analytic) = 0
y[1] (numeric) = 0.28107489893221093129561348385391
absolute error = 0.28107489893221093129561348385391
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.537
y[1] (analytic) = 0
y[1] (numeric) = 0.28183572468797848458735273824271
absolute error = 0.28183572468797848458735273824271
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.538
y[1] (analytic) = 0
y[1] (numeric) = 0.28259696919225613467790548668718
absolute error = 0.28259696919225613467790548668718
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.539
y[1] (analytic) = 0
y[1] (numeric) = 0.28335863200262518372458452115653
absolute error = 0.28335863200262518372458452115653
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.54
y[1] (analytic) = 0
y[1] (numeric) = 0.28412071267790816055352123064935
absolute error = 0.28412071267790816055352123064935
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.541
y[1] (analytic) = 0
y[1] (numeric) = 0.28488321077815985758048311075835
absolute error = 0.28488321077815985758048311075835
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.542
y[1] (analytic) = 0
y[1] (numeric) = 0.28564612586465842879919561106381
absolute error = 0.28564612586465842879919561106381
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=228.8MB, alloc=4.4MB, time=22.16
x[1] = 0.543
y[1] (analytic) = 0
y[1] (numeric) = 0.28640945749989654829384932478394
absolute error = 0.28640945749989654829384932478394
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.544
y[1] (analytic) = 0
y[1] (numeric) = 0.28717320524757262873826212290067
absolute error = 0.28717320524757262873826212290067
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.545
y[1] (analytic) = 0
y[1] (numeric) = 0.28793736867258209934988253926437
absolute error = 0.28793736867258209934988253926437
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.546
y[1] (analytic) = 0
y[1] (numeric) = 0.28870194734100874277246654567229
absolute error = 0.28870194734100874277246654567229
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.547
y[1] (analytic) = 0
y[1] (numeric) = 0.28946694082011609036683582197439
absolute error = 0.28946694082011609036683582197439
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.548
y[1] (analytic) = 0
y[1] (numeric) = 0.29023234867833887539463271519398
absolute error = 0.29023234867833887539463271519398
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.549
y[1] (analytic) = 0
y[1] (numeric) = 0.29099817048527454358542626699379
absolute error = 0.29099817048527454358542626699379
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=232.7MB, alloc=4.4MB, time=22.53
x[1] = 0.55
y[1] (analytic) = 0
y[1] (numeric) = 0.29176440581167482058289592861392
absolute error = 0.29176440581167482058289592861392
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.551
y[1] (analytic) = 0
y[1] (numeric) = 0.29253105422943733577112581948211
absolute error = 0.29253105422943733577112581948211
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.552
y[1] (analytic) = 0
y[1] (numeric) = 0.29329811531159730198728354792509
absolute error = 0.29329811531159730198728354792509
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.553
y[1] (analytic) = 0
y[1] (numeric) = 0.2940655886323192506321346129835
absolute error = 0.2940655886323192506321346129835
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.554
y[1] (analytic) = 0
y[1] (numeric) = 0.29483347376688882169495714401519
absolute error = 0.29483347376688882169495714401519
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.555
y[1] (analytic) = 0
y[1] (numeric) = 0.29560177029170460821447309415292
absolute error = 0.29560177029170460821447309415292
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.556
y[1] (analytic) = 0
y[1] (numeric) = 0.29637047778427005470240185542695
absolute error = 0.29637047778427005470240185542695
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.557
y[1] (analytic) = 0
y[1] (numeric) = 0.29713959582318540906117146445367
absolute error = 0.29713959582318540906117146445367
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=236.5MB, alloc=4.4MB, time=22.90
x[1] = 0.558
y[1] (analytic) = 0
y[1] (numeric) = 0.29790912398813972753219196156886
absolute error = 0.29790912398813972753219196156886
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.559
y[1] (analytic) = 0
y[1] (numeric) = 0.2986790618599029322159058834803
absolute error = 0.2986790618599029322159058834803
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.56
y[1] (analytic) = 0
y[1] (numeric) = 0.29944940902031792070958312728388
absolute error = 0.29944940902031792070958312728388
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.561
y[1] (analytic) = 0
y[1] (numeric) = 0.30022016505229272741352232663034
absolute error = 0.30022016505229272741352232663034
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.562
y[1] (analytic) = 0
y[1] (numeric) = 0.30099132953979273606095922101714
absolute error = 0.30099132953979273606095922101714
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.563
y[1] (analytic) = 0
y[1] (numeric) = 0.30176290206783294303156505636568
absolute error = 0.30176290206783294303156505636568
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.564
y[1] (analytic) = 0
y[1] (numeric) = 0.30253488222247027101294559688259
absolute error = 0.30253488222247027101294559688259
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=240.3MB, alloc=4.4MB, time=23.28
x[1] = 0.565
y[1] (analytic) = 0
y[1] (numeric) = 0.30330726959079593257902461045456
absolute error = 0.30330726959079593257902461045456
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.566
y[1] (analytic) = 0
y[1] (numeric) = 0.30408006376092784325861545656238
absolute error = 0.30408006376092784325861545656238
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.567
y[1] (analytic) = 0
y[1] (numeric) = 0.30485326432200308367185138950617
absolute error = 0.30485326432200308367185138950617
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.568
y[1] (analytic) = 0
y[1] (numeric) = 0.30562687086417041031646011190536
absolute error = 0.30562687086417041031646011190536
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.569
y[1] (analytic) = 0
y[1] (numeric) = 0.3064008829785828145901316841729
absolute error = 0.3064008829785828145901316841729
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.57
y[1] (analytic) = 0
y[1] (numeric) = 0.30717530025739012963944181425472
absolute error = 0.30717530025739012963944181425472
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.571
y[1] (analytic) = 0
y[1] (numeric) = 0.30795012229373168462995550694414
absolute error = 0.30795012229373168462995550694414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.572
y[1] (analytic) = 0
y[1] (numeric) = 0.30872534868172900603624972156005
absolute error = 0.30872534868172900603624972156005
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=244.1MB, alloc=4.4MB, time=23.65
x[1] = 0.573
y[1] (analytic) = 0
y[1] (numeric) = 0.30950097901647856555465873839181
absolute error = 0.30950097901647856555465873839181
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.574
y[1] (analytic) = 0
y[1] (numeric) = 0.31027701289404457424556302555525
absolute error = 0.31027701289404457424556302555525
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.575
y[1] (analytic) = 0
y[1] (numeric) = 0.31105344991145182251601217625479
absolute error = 0.31105344991145182251601217625479
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.576
y[1] (analytic) = 0
y[1] (numeric) = 0.31183028966667856555739558954801
absolute error = 0.31183028966667856555739558954801
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.577
y[1] (analytic) = 0
y[1] (numeric) = 0.31260753175864945385675162352798
absolute error = 0.31260753175864945385675162352798
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.578
y[1] (analytic) = 0
y[1] (numeric) = 0.31338517578722850840413757683146
absolute error = 0.31338517578722850840413757683146
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.579
y[1] (analytic) = 0
y[1] (numeric) = 0.31416322135321214022226966165219
absolute error = 0.31416322135321214022226966165219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=247.9MB, alloc=4.4MB, time=24.02
x[1] = 0.58
y[1] (analytic) = 0
y[1] (numeric) = 0.3149416680583222138483847188995
absolute error = 0.3149416680583222138483847188995
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.581
y[1] (analytic) = 0
y[1] (numeric) = 0.31572051550519915440197438466411
absolute error = 0.31572051550519915440197438466411
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.582
y[1] (analytic) = 0
y[1] (numeric) = 0.31649976329739509787569832871936
absolute error = 0.31649976329739509787569832871936
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.583
y[1] (analytic) = 0
y[1] (numeric) = 0.31727941103936708429039662364036
absolute error = 0.31727941103936708429039662364036
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.584
y[1] (analytic) = 0
y[1] (numeric) = 0.3180594583364702933586928319161
absolute error = 0.3180594583364702933586928319161
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.585
y[1] (analytic) = 0
y[1] (numeric) = 0.31883990479495132230520957436033
absolute error = 0.31883990479495132230520957436033
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.586
y[1] (analytic) = 0
y[1] (numeric) = 0.31962075002194150549490771408545
absolute error = 0.31962075002194150549490771408545
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.587
y[1] (analytic) = 0
y[1] (numeric) = 0.32040199362545027552450939600845
absolute error = 0.32040199362545027552450939600845
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=251.7MB, alloc=4.4MB, time=24.40
x[1] = 0.588
y[1] (analytic) = 0
y[1] (numeric) = 0.32118363521435856543537455399048
absolute error = 0.32118363521435856543537455399048
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.589
y[1] (analytic) = 0
y[1] (numeric) = 0.32196567439841225170957066005072
absolute error = 0.32196567439841225170957066005072
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.59
y[1] (analytic) = 0
y[1] (numeric) = 0.32274811078821563771420695864673
absolute error = 0.32274811078821563771420695864673
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.591
y[1] (analytic) = 0
y[1] (numeric) = 0.32353094399522497726239771213839
absolute error = 0.32353094399522497726239771213839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.592
y[1] (analytic) = 0
y[1] (numeric) = 0.32431417363174203796247458209453
absolute error = 0.32431417363174203796247458209453
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.593
y[1] (analytic) = 0
y[1] (numeric) = 0.32509779931090770403028667850751
absolute error = 0.32509779931090770403028667850751
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.594
y[1] (analytic) = 0
y[1] (numeric) = 0.32588182064669561824260851142612
absolute error = 0.32588182064669561824260851142612
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=255.5MB, alloc=4.4MB, time=24.77
x[1] = 0.595
y[1] (analytic) = 0
y[1] (numeric) = 0.32666623725390586271282155602109
absolute error = 0.32666623725390586271282155602109
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.596
y[1] (analytic) = 0
y[1] (numeric) = 0.32745104874815867817314486464313
absolute error = 0.32745104874815867817314486464313
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.597
y[1] (analytic) = 0
y[1] (numeric) = 0.32823625474588822145076459308032
absolute error = 0.32823625474588822145076459308032
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.598
y[1] (analytic) = 0
y[1] (numeric) = 0.32902185486433636082825191122142
absolute error = 0.32902185486433636082825191122142
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.599
y[1] (analytic) = 0
y[1] (numeric) = 0.32980784872154650898166399223571
absolute error = 0.32980784872154650898166399223571
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.6
y[1] (analytic) = 0
y[1] (numeric) = 0.33059423593635749319269406415055
absolute error = 0.33059423593635749319269406415055
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.601
y[1] (analytic) = 0
y[1] (numeric) = 0.33138101612839746253417430182441
absolute error = 0.33138101612839746253417430182441
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.602
y[1] (analytic) = 0
y[1] (numeric) = 0.33216818891807783173114006787688
absolute error = 0.33216818891807783173114006787688
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=259.4MB, alloc=4.4MB, time=25.14
x[1] = 0.603
y[1] (analytic) = 0
y[1] (numeric) = 0.33295575392658726140253610397469
absolute error = 0.33295575392658726140253610397469
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.604
y[1] (analytic) = 0
y[1] (numeric) = 0.33374371077588567439148514863688
absolute error = 0.33374371077588567439148514863688
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.605
y[1] (analytic) = 0
y[1] (numeric) = 0.33453205908869830789484752799255
absolute error = 0.33453205908869830789484752799255
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.606
y[1] (analytic) = 0
y[1] (numeric) = 0.33532079848850980110557693930308
absolute error = 0.33532079848850980110557693930308
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.607
y[1] (analytic) = 0
y[1] (numeric) = 0.3361099285995583180841233252706
absolute error = 0.3361099285995583180841233252706
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.608
y[1] (analytic) = 0
y[1] (numeric) = 0.33689944904682970557784881613186
absolute error = 0.33689944904682970557784881613186
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.609
y[1] (analytic) = 0
y[1] (numeric) = 0.33768935945605168551010758652474
absolute error = 0.33768935945605168551010758652474
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=263.2MB, alloc=4.4MB, time=25.52
x[1] = 0.61
y[1] (analytic) = 0
y[1] (numeric) = 0.33847965945368808186329551975469
absolute error = 0.33847965945368808186329551975469
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.611
y[1] (analytic) = 0
y[1] (numeric) = 0.33927034866693308168280117250812
absolute error = 0.33927034866693308168280117250812
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.612
y[1] (analytic) = 0
y[1] (numeric) = 0.34006142672370552993138606196189
absolute error = 0.34006142672370552993138606196189
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.613
y[1] (analytic) = 0
y[1] (numeric) = 0.34085289325264325792609012298748
absolute error = 0.34085289325264325792609012298748
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.614
y[1] (analytic) = 0
y[1] (numeric) = 0.34164474788309744509229766885421
absolute error = 0.34164474788309744509229766885421
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.615
y[1] (analytic) = 0
y[1] (numeric) = 0.34243699024512701377211069243882
absolute error = 0.34243699024512701377211069243882
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.616
y[1] (analytic) = 0
y[1] (numeric) = 0.34322961996949305682666021929819
absolute error = 0.34322961996949305682666021929819
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.617
y[1] (analytic) = 0
y[1] (numeric) = 0.34402263668765329777444301690119
absolute error = 0.34402263668765329777444301690119
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=267.0MB, alloc=4.4MB, time=25.89
x[1] = 0.618
y[1] (analytic) = 0
y[1] (numeric) = 0.34481604003175658321020061875711
absolute error = 0.34481604003175658321020061875711
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.619
y[1] (analytic) = 0
y[1] (numeric) = 0.34560982963463740725126067618303
absolute error = 0.34560982963463740725126067618303
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.62
y[1] (analytic) = 0
y[1] (numeric) = 0.34640400512981046776063743730648
absolute error = 0.34640400512981046776063743730648
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.621
y[1] (analytic) = 0
y[1] (numeric) = 0.34719856615146525409853900118872
absolute error = 0.34719856615146525409853900118872
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.622
y[1] (analytic) = 0
y[1] (numeric) = 0.34799351233446066615625422863566
absolute error = 0.34799351233446066615625422863566
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.623
y[1] (analytic) = 0
y[1] (numeric) = 0.34878884331431966442869212974319
absolute error = 0.34878884331431966442869212974319
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.624
y[1] (analytic) = 0
y[1] (numeric) = 0.34958455872722395088412150642174
absolute error = 0.34958455872722395088412150642174
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=270.8MB, alloc=4.4MB, time=26.26
x[1] = 0.625
y[1] (analytic) = 0
y[1] (numeric) = 0.35038065821000868039190891657005
absolute error = 0.35038065821000868039190891657005
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.626
y[1] (analytic) = 0
y[1] (numeric) = 0.35117714140015720247127895138351
absolute error = 0.35117714140015720247127895138351
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.627
y[1] (analytic) = 0
y[1] (numeric) = 0.35197400793579583312632268037477
absolute error = 0.35197400793579583312632268037477
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.628
y[1] (analytic) = 0
y[1] (numeric) = 0.35277125745568865653465821773039
absolute error = 0.35277125745568865653465821773039
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.629
y[1] (analytic) = 0
y[1] (numeric) = 0.35356888959923235635930199215755
absolute error = 0.35356888959923235635930199215755
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.63
y[1] (analytic) = 0
y[1] (numeric) = 0.35436690400645107645544074983991
absolute error = 0.35436690400645107645544074983991
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.631
y[1] (analytic) = 0
y[1] (numeric) = 0.35516530031799131074590287195381
absolute error = 0.35516530031799131074590287195381
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.632
y[1] (analytic) = 0
y[1] (numeric) = 0.35596407817511682204121352587082
absolute error = 0.35596407817511682204121352587082
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=274.6MB, alloc=4.4MB, time=26.62
x[1] = 0.633
y[1] (analytic) = 0
y[1] (numeric) = 0.35676323721970358958218177027252
absolute error = 0.35676323721970358958218177027252
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.634
y[1] (analytic) = 0
y[1] (numeric) = 0.3575627770942347850850092726736
absolute error = 0.3575627770942347850850092726736
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.635
y[1] (analytic) = 0
y[1] (numeric) = 0.35836269744179577707093004326059
absolute error = 0.35836269744179577707093004326059
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.636
y[1] (analytic) = 0
y[1] (numeric) = 0.35916299790606916326438880775748
absolute error = 0.35916299790606916326438880775748
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.637
y[1] (analytic) = 0
y[1] (numeric) = 0.35996367813132983084574259681661
absolute error = 0.35996367813132983084574259681661
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.638
y[1] (analytic) = 0
y[1] (numeric) = 0.3607647377624400443464260791888
absolute error = 0.3607647377624400443464260791888
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.639
y[1] (analytic) = 0
y[1] (numeric) = 0.36156617644484456097645636608545
absolute error = 0.36156617644484456097645636608545
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=278.4MB, alloc=4.4MB, time=27.00
x[1] = 0.64
y[1] (analytic) = 0
y[1] (numeric) = 0.36236799382456577317606771664596
absolute error = 0.36236799382456577317606771664596
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.641
y[1] (analytic) = 0
y[1] (numeric) = 0.3631701895481988781851610277621
absolute error = 0.3631701895481988781851610277621
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.642
y[1] (analytic) = 0
y[1] (numeric) = 0.36397276326290707442612744079119
absolute error = 0.36397276326290707442612744079119
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.643
y[1] (analytic) = 0
y[1] (numeric) = 0.36477571461641678449746008467838
absolute error = 0.36477571461641678449746008467838
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.644
y[1] (analytic) = 0
y[1] (numeric) = 0.36557904325701290457740313818149
absolute error = 0.36557904325701290457740313818149
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.645
y[1] (analytic) = 0
y[1] (numeric) = 0.36638274883353408003870326848736
absolute error = 0.36638274883353408003870326848736
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.646
y[1] (analytic) = 0
y[1] (numeric) = 0.36718683099536800707732532157503
absolute error = 0.36718683099536800707732532157503
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.647
y[1] (analytic) = 0
y[1] (numeric) = 0.3679912893924467601597721301232
absolute error = 0.3679912893924467601597721301232
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=282.3MB, alloc=4.4MB, time=27.37
x[1] = 0.648
y[1] (analytic) = 0
y[1] (numeric) = 0.36879612367524214509540769338917
absolute error = 0.36879612367524214509540769338917
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.649
y[1] (analytic) = 0
y[1] (numeric) = 0.36960133349476107754192399306615
absolute error = 0.36960133349476107754192399306615
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.65
y[1] (analytic) = 0
y[1] (numeric) = 0.37040691850254098675381455941634
absolute error = 0.37040691850254098675381455941634
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.651
y[1] (analytic) = 0
y[1] (numeric) = 0.37121287835064524438542280978105
absolute error = 0.37121287835064524438542280978105
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.652
y[1] (analytic) = 0
y[1] (numeric) = 0.37201921269165861816182036077678
absolute error = 0.37201921269165861816182036077678
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.653
y[1] (analytic) = 0
y[1] (numeric) = 0.37282592117868275023244017711656
absolute error = 0.37282592117868275023244017711656
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.654
y[1] (analytic) = 0
y[1] (numeric) = 0.37363300346533166002404177224348
absolute error = 0.37363300346533166002404177224348
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=286.1MB, alloc=4.4MB, time=27.75
x[1] = 0.655
y[1] (analytic) = 0
y[1] (numeric) = 0.37444045920572727141122092423526
absolute error = 0.37444045920572727141122092423526
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.656
y[1] (analytic) = 0
y[1] (numeric) = 0.37524828805449496402429471740061
absolute error = 0.37524828805449496402429471740061
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.657
y[1] (analytic) = 0
y[1] (numeric) = 0.37605648966675914851599436560206
absolute error = 0.37605648966675914851599436560206
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.658
y[1] (analytic) = 0
y[1] (numeric) = 0.3768650636981388656099834149054
absolute error = 0.3768650636981388656099834149054
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.659
y[1] (analytic) = 0
y[1] (numeric) = 0.37767400980474340875578775534939
absolute error = 0.37767400980474340875578775534939
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.66
y[1] (analytic) = 0
y[1] (numeric) = 0.37848332764316797021627658654307
absolute error = 0.37848332764316797021627658654307
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.661
y[1] (analytic) = 0
y[1] (numeric) = 0.37929301687048931041537026897738
absolute error = 0.37929301687048931041537026897738
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.662
y[1] (analytic) = 0
y[1] (numeric) = 0.38010307714426145037517203941989
absolute error = 0.38010307714426145037517203941989
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=289.9MB, alloc=4.4MB, time=28.12
x[1] = 0.663
y[1] (analytic) = 0
y[1] (numeric) = 0.38091350812251138707322605911132
absolute error = 0.38091350812251138707322605911132
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.664
y[1] (analytic) = 0
y[1] (numeric) = 0.38172430946373483155209437982992
absolute error = 0.38172430946373483155209437982992
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.665
y[1] (analytic) = 0
y[1] (numeric) = 0.38253548082689196961492033496393
absolute error = 0.38253548082689196961492033496393
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.666
y[1] (analytic) = 0
y[1] (numeric) = 0.38334702187140324494210576789893
absolute error = 0.38334702187140324494210576789893
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.667
y[1] (analytic) = 0
y[1] (numeric) = 0.38415893225714516446567457332035
absolute error = 0.38415893225714516446567457332035
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.668
y[1] (analytic) = 0
y[1] (numeric) = 0.38497121164444612583932542119086
absolute error = 0.38497121164444612583932542119086
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.669
y[1] (analytic) = 0
y[1] (numeric) = 0.38578385969408226684359242866437
absolute error = 0.38578385969408226684359242866437
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=293.7MB, alloc=4.4MB, time=28.49
x[1] = 0.67
y[1] (analytic) = 0
y[1] (numeric) = 0.38659687606727333656693411028909
absolute error = 0.38659687606727333656693411028909
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.671
y[1] (analytic) = 0
y[1] (numeric) = 0.38741026042567858820495833758146
absolute error = 0.38741026042567858820495833758146
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.672
y[1] (analytic) = 0
y[1] (numeric) = 0.3882240124313926933213644393049
absolute error = 0.3882240124313926933213644393049
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.673
y[1] (analytic) = 0
y[1] (numeric) = 0.3890381317469416774155431353121
absolute error = 0.3890381317469416774155431353121
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.674
y[1] (analytic) = 0
y[1] (numeric) = 0.38985261803527887664312087925445
absolute error = 0.38985261803527887664312087925445
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.675
y[1] (analytic) = 0
y[1] (numeric) = 0.39066747095978091553706754640185
absolute error = 0.39066747095978091553706754640185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.676
y[1] (analytic) = 0
y[1] (numeric) = 0.39148269018424370557830539778181
absolute error = 0.39148269018424370557830539778181
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.677
y[1] (analytic) = 0
y[1] (numeric) = 0.39229827537287846446606303435733
absolute error = 0.39229827537287846446606303435733
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=297.5MB, alloc=4.4MB, time=28.86
x[1] = 0.678
y[1] (analytic) = 0
y[1] (numeric) = 0.39311422619030775593951077655268
absolute error = 0.39311422619030775593951077655268
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.679
y[1] (analytic) = 0
y[1] (numeric) = 0.39393054230156155000349371468278
absolute error = 0.39393054230156155000349371468278
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.68
y[1] (analytic) = 0
y[1] (numeric) = 0.39474722337207330341244572239657
absolute error = 0.39474722337207330341244572239657
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.681
y[1] (analytic) = 0
y[1] (numeric) = 0.3955642690676760602678221538571
absolute error = 0.3955642690676760602678221538571
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.682
y[1] (analytic) = 0
y[1] (numeric) = 0.3963816790545985725856308999296
absolute error = 0.3963816790545985725856308999296
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.683
y[1] (analytic) = 0
y[1] (numeric) = 0.39719945299946144069187110116353
absolute error = 0.39719945299946144069187110116353
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.684
y[1] (analytic) = 0
y[1] (numeric) = 0.39801759056927327330490624604769
absolute error = 0.39801759056927327330490624604769
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=301.3MB, alloc=4.4MB, time=29.23
x[1] = 0.685
y[1] (analytic) = 0
y[1] (numeric) = 0.39883609143142686716500376030612
absolute error = 0.39883609143142686716500376030612
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.686
y[1] (analytic) = 0
y[1] (numeric) = 0.39965495525369540607246665353536
absolute error = 0.39965495525369540607246665353536
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.687
y[1] (analytic) = 0
y[1] (numeric) = 0.40047418170422867919696446816642
absolute error = 0.40047418170422867919696446816642
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.688
y[1] (analytic) = 0
y[1] (numeric) = 0.40129377045154931852184080575495
absolute error = 0.40129377045154931852184080575495
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.689
y[1] (analytic) = 0
y[1] (numeric) = 0.40211372116454905528833321845229
absolute error = 0.40211372116454905528833321845229
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.69
y[1] (analytic) = 0
y[1] (numeric) = 0.40293403351248499530578837901193
absolute error = 0.40293403351248499530578837901193
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.691
y[1] (analytic) = 0
y[1] (numeric) = 0.40375470716497591299509130901511
absolute error = 0.40375470716497591299509130901511
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.692
y[1] (analytic) = 0
y[1] (numeric) = 0.4045757417919985640336521787085
absolute error = 0.4045757417919985640336521787085
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=305.1MB, alloc=4.4MB, time=29.60
x[1] = 0.693
y[1] (analytic) = 0
y[1] (numeric) = 0.40539713706388401647140791788761
absolute error = 0.40539713706388401647140791788761
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.694
y[1] (analytic) = 0
y[1] (numeric) = 0.40621889265131400018839871900479
absolute error = 0.40621889265131400018839871900479
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.695
y[1] (analytic) = 0
y[1] (numeric) = 0.40704100822531727456557159294812
absolute error = 0.40704100822531727456557159294812
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.696
y[1] (analytic) = 0
y[1] (numeric) = 0.4078634834572660142415445750103
absolute error = 0.4078634834572660142415445750103
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.697
y[1] (analytic) = 0
y[1] (numeric) = 0.40868631801887221282913609221487
absolute error = 0.40868631801887221282913609221487
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.698
y[1] (analytic) = 0
y[1] (numeric) = 0.40950951158218410446652451067033
absolute error = 0.40950951158218410446652451067033
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.699
y[1] (analytic) = 0
y[1] (numeric) = 0.41033306381958260307895309878844
absolute error = 0.41033306381958260307895309878844
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=309.0MB, alloc=4.4MB, time=29.98
x[1] = 0.7
y[1] (analytic) = 0
y[1] (numeric) = 0.41115697440377775922793568338971
absolute error = 0.41115697440377775922793568338971
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.701
y[1] (analytic) = 0
y[1] (numeric) = 0.41198124300780523442594825385419
absolute error = 0.41198124300780523442594825385419
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.702
y[1] (analytic) = 0
y[1] (numeric) = 0.41280586930502279279561179607743
absolute error = 0.41280586930502279279561179607743
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.703
y[1] (analytic) = 0
y[1] (numeric) = 0.41363085296910680995338182318626
absolute error = 0.41363085296910680995338182318626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.704
y[1] (analytic) = 0
y[1] (numeric) = 0.41445619367404879899876052251358
absolute error = 0.41445619367404879899876052251358
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.705
y[1] (analytic) = 0
y[1] (numeric) = 0.41528189109415195349103826562808
absolute error = 0.41528189109415195349103826562808
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.706
y[1] (analytic) = 0
y[1] (numeric) = 0.41610794490402770729655253633437
absolute error = 0.41610794490402770729655253633437
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.707
y[1] (analytic) = 0
y[1] (numeric) = 0.41693435477859231119042422525542
absolute error = 0.41693435477859231119042422525542
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=312.8MB, alloc=4.4MB, time=30.34
x[1] = 0.708
y[1] (analytic) = 0
y[1] (numeric) = 0.41776112039306342609769382234005
absolute error = 0.41776112039306342609769382234005
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.709
y[1] (analytic) = 0
y[1] (numeric) = 0.41858824142295673285973341258173
absolute error = 0.41858824142295673285973341258173
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.71
y[1] (analytic) = 0
y[1] (numeric) = 0.41941571754408255841275464630765
absolute error = 0.41941571754408255841275464630765
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.711
y[1] (analytic) = 0
y[1] (numeric) = 0.42024354843254251826616811327054
absolute error = 0.42024354843254251826616811327054
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.712
y[1] (analytic) = 0
y[1] (numeric) = 0.42107173376472617516947589789573
absolute error = 0.42107173376472617516947589789573
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.713
y[1] (analytic) = 0
y[1] (numeric) = 0.42190027321730771385729662863587
absolute error = 0.42190027321730771385729662863587
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.714
y[1] (analytic) = 0
y[1] (numeric) = 0.42272916646724263176303115350631
absolute error = 0.42272916646724263176303115350631
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=316.6MB, alloc=4.4MB, time=30.72
x[1] = 0.715
y[1] (analytic) = 0
y[1] (numeric) = 0.42355841319176444559257717137812
absolute error = 0.42355841319176444559257717137812
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.716
y[1] (analytic) = 0
y[1] (numeric) = 0.42438801306838141365039281819376
absolute error = 0.42438801306838141365039281819376
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.717
y[1] (analytic) = 0
y[1] (numeric) = 0.42521796577487327381109244149801
absolute error = 0.42521796577487327381109244149801
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.718
y[1] (analytic) = 0
y[1] (numeric) = 0.42604827098928799703063268696871
absolute error = 0.42604827098928799703063268696871
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.719
y[1] (analytic) = 0
y[1] (numeric) = 0.42687892838993855629201365729846
absolute error = 0.42687892838993855629201365729846
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.72
y[1] (analytic) = 0
y[1] (numeric) = 0.42770993765539971088127837602955
absolute error = 0.42770993765539971088127837602955
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.721
y[1] (analytic) = 0
y[1] (numeric) = 0.42854129846450480589044418490603
absolute error = 0.42854129846450480589044418490603
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.722
y[1] (analytic) = 0
y[1] (numeric) = 0.42937301049634258684484211003334
absolute error = 0.42937301049634258684484211003334
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=320.4MB, alloc=4.4MB, time=31.09
x[1] = 0.723
y[1] (analytic) = 0
y[1] (numeric) = 0.43020507343025402935317473562757
absolute error = 0.43020507343025402935317473562757
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.724
y[1] (analytic) = 0
y[1] (numeric) = 0.43103748694582918367942980935027
absolute error = 0.43103748694582918367942980935027
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.725
y[1] (analytic) = 0
y[1] (numeric) = 0.43187025072290403413660575409133
absolute error = 0.43187025072290403413660575409133
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.726
y[1] (analytic) = 0
y[1] (numeric) = 0.43270336444155737320301656049861
absolute error = 0.43270336444155737320301656049861
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.727
y[1] (analytic) = 0
y[1] (numeric) = 0.43353682778210769026274726447455
absolute error = 0.43353682778210769026274726447455
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.728
y[1] (analytic) = 0
y[1] (numeric) = 0.43437064042511007487262745519725
absolute error = 0.43437064042511007487262745519725
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.729
y[1] (analytic) = 0
y[1] (numeric) = 0.43520480205135313445887909193243
absolute error = 0.43520480205135313445887909193243
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=324.2MB, alloc=4.4MB, time=31.46
x[1] = 0.73
y[1] (analytic) = 0
y[1] (numeric) = 0.43603931234185592634737641097892
absolute error = 0.43603931234185592634737641097892
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.731
y[1] (analytic) = 0
y[1] (numeric) = 0.43687417097786490403222995558224
absolute error = 0.43687417097786490403222995558224
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.732
y[1] (analytic) = 0
y[1] (numeric) = 0.43770937764085087758817383867137
absolute error = 0.43770937764085087758817383867137
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.733
y[1] (analytic) = 0
y[1] (numeric) = 0.43854493201250598813299532701323
absolute error = 0.43854493201250598813299532701323
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.734
y[1] (analytic) = 0
y[1] (numeric) = 0.43938083377474069624699879111853
absolute error = 0.43938083377474069624699879111853
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.735
y[1] (analytic) = 0
y[1] (numeric) = 0.44021708260968078425724207235262
absolute error = 0.44021708260968078425724207235262
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.736
y[1] (analytic) = 0
y[1] (numeric) = 0.44105367819966437229502245070228
absolute error = 0.44105367819966437229502245070228
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.737
y[1] (analytic) = 0
y[1] (numeric) = 0.44189062022723894803582172614465
absolute error = 0.44189062022723894803582172614465
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=328.0MB, alloc=4.4MB, time=31.83
x[1] = 0.738
y[1] (analytic) = 0
y[1] (numeric) = 0.4427279083751584100316455253159
absolute error = 0.4427279083751584100316455253159
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.739
y[1] (analytic) = 0
y[1] (numeric) = 0.44356554232638012454641088409145
absolute error = 0.44356554232638012454641088409145
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.74
y[1] (analytic) = 0
y[1] (numeric) = 0.44440352176406199580574850583267
absolute error = 0.44440352176406199580574850583267
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.741
y[1] (analytic) = 0
y[1] (numeric) = 0.44524184637155954957329192366362
absolute error = 0.44524184637155954957329192366362
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.742
y[1] (analytic) = 0
y[1] (numeric) = 0.44608051583242302996622517163443
absolute error = 0.44608051583242302996622517163443
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.743
y[1] (analytic) = 0
y[1] (numeric) = 0.44691952983039450942355356161589
absolute error = 0.44691952983039450942355356161589
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.744
y[1] (analytic) = 0
y[1] (numeric) = 0.4477588880494050117412488370664
absolute error = 0.4477588880494050117412488370664
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=331.8MB, alloc=4.4MB, time=32.20
x[1] = 0.745
y[1] (analytic) = 0
y[1] (numeric) = 0.44859859017357164808910039744529
absolute error = 0.44859859017357164808910039744529
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.746
y[1] (analytic) = 0
y[1] (numeric) = 0.44943863588719476592477852326586
absolute error = 0.44943863588719476592477852326586
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.747
y[1] (analytic) = 0
y[1] (numeric) = 0.4502790248747551107212836460728
absolute error = 0.4502790248747551107212836460728
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.748
y[1] (analytic) = 0
y[1] (numeric) = 0.45111975682091100042461776371965
absolute error = 0.45111975682091100042461776371965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.749
y[1] (analytic) = 0
y[1] (numeric) = 0.45196083141049551255917016219564
absolute error = 0.45196083141049551255917016219564
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.75
y[1] (analytic) = 0
y[1] (numeric) = 0.45280224832851368389895973315281
absolute error = 0.45280224832851368389895973315281
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.751
y[1] (analytic) = 0
y[1] (numeric) = 0.45364400726013972262352043273249
absolute error = 0.45364400726013972262352043273249
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.752
y[1] (analytic) = 0
y[1] (numeric) = 0.45448610789071423287785487308619
absolute error = 0.45448610789071423287785487308619
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=335.7MB, alloc=4.4MB, time=32.57
x[1] = 0.753
y[1] (analytic) = 0
y[1] (numeric) = 0.45532854990574145165651373322223
absolute error = 0.45532854990574145165651373322223
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.754
y[1] (analytic) = 0
y[1] (numeric) = 0.45617133299088649793248567988006
absolute error = 0.45617133299088649793248567988006
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.755
y[1] (analytic) = 0
y[1] (numeric) = 0.45701445683197263395220386074223
absolute error = 0.45701445683197263395220386074223
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.756
y[1] (analytic) = 0
y[1] (numeric) = 0.45785792111497853861859082946249
absolute error = 0.45785792111497853861859082946249
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.757
y[1] (analytic) = 0
y[1] (numeric) = 0.45870172552603559288467404206689
absolute error = 0.45870172552603559288467404206689
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.758
y[1] (analytic) = 0
y[1] (numeric) = 0.45954586975142517708090888395975
absolute error = 0.45954586975142517708090888395975
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.759
y[1] (analytic) = 0
y[1] (numeric) = 0.46039035347757598009994560206924
absolute error = 0.46039035347757598009994560206924
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.76
y[1] (analytic) = 0
y[1] (numeric) = 0.4612351763910613203631705829819
memory used=339.5MB, alloc=4.4MB, time=32.94
absolute error = 0.4612351763910613203631705829819
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.761
y[1] (analytic) = 0
y[1] (numeric) = 0.46208033817859647849394118998838
absolute error = 0.46208033817859647849394118998838
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.762
y[1] (analytic) = 0
y[1] (numeric) = 0.46292583852703604162301690390899
absolute error = 0.46292583852703604162301690390899
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.763
y[1] (analytic) = 0
y[1] (numeric) = 0.46377167712337125925226785788115
absolute error = 0.46377167712337125925226785788115
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.764
y[1] (analytic) = 0
y[1] (numeric) = 0.46461785365472741060331506785056
absolute error = 0.46461785365472741060331506785056
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.765
y[1] (analytic) = 0
y[1] (numeric) = 0.46546436780836118337832479058647
absolute error = 0.46546436780836118337832479058647
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.766
y[1] (analytic) = 0
y[1] (numeric) = 0.46631121927165806386074254131296
absolute error = 0.46631121927165806386074254131296
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.767
y[1] (analytic) = 0
y[1] (numeric) = 0.46715840773212973828431042459564
absolute error = 0.46715840773212973828431042459564
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=343.3MB, alloc=4.4MB, time=33.31
x[1] = 0.768
y[1] (analytic) = 0
y[1] (numeric) = 0.4680059328774115053992646254457
absolute error = 0.4680059328774115053992646254457
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.769
y[1] (analytic) = 0
y[1] (numeric) = 0.46885379439525970016515822262443
absolute error = 0.46885379439525970016515822262443
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.77
y[1] (analytic) = 0
y[1] (numeric) = 0.46970199197354912850029797220508
absolute error = 0.46970199197354912850029797220508
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.771
y[1] (analytic) = 0
y[1] (numeric) = 0.47055052530027051301832241536854
absolute error = 0.47055052530027051301832241536854
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.772
y[1] (analytic) = 0
y[1] (numeric) = 0.47139939406352794968298263841203
absolute error = 0.47139939406352794968298263841203
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.773
y[1] (analytic) = 0
y[1] (numeric) = 0.47224859795153637531271630272759
absolute error = 0.47224859795153637531271630272759
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.774
y[1] (analytic) = 0
y[1] (numeric) = 0.47309813665261904586713021520852
absolute error = 0.47309813665261904586713021520852
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.775
y[1] (analytic) = 0
y[1] (numeric) = 0.47394800985520502544802677178394
absolute error = 0.47394800985520502544802677178394
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=347.1MB, alloc=4.4MB, time=33.69
TOP MAIN SOLVE Loop
x[1] = 0.776
y[1] (analytic) = 0
y[1] (numeric) = 0.47479821724782668594812512465315
absolute error = 0.47479821724782668594812512465315
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.777
y[1] (analytic) = 0
y[1] (numeric) = 0.47564875851911721728113894286072
absolute error = 0.47564875851911721728113894286072
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.778
y[1] (analytic) = 0
y[1] (numeric) = 0.47649963335780814812737920117551
absolute error = 0.47649963335780814812737920117551
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.779
y[1] (analytic) = 0
y[1] (numeric) = 0.47735084145272687712955258835853
absolute error = 0.47735084145272687712955258835853
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.78
y[1] (analytic) = 0
y[1] (numeric) = 0.47820238249279421447392391687213
absolute error = 0.47820238249279421447392391687213
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.781
y[1] (analytic) = 0
y[1] (numeric) = 0.47905425616702193379250438544727
absolute error = 0.47905425616702193379250438544727
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.782
y[1] (analytic) = 0
y[1] (numeric) = 0.47990646216451033432241673674889
absolute error = 0.47990646216451033432241673674889
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=350.9MB, alloc=4.4MB, time=34.05
x[1] = 0.783
y[1] (analytic) = 0
y[1] (numeric) = 0.48075900017444581325907330724176
absolute error = 0.48075900017444581325907330724176
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.784
y[1] (analytic) = 0
y[1] (numeric) = 0.48161186988609844824028372736322
absolute error = 0.48161186988609844824028372736322
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.785
y[1] (analytic) = 0
y[1] (numeric) = 0.48246507098881958989888563888768
absolute error = 0.48246507098881958989888563888768
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.786
y[1] (analytic) = 0
y[1] (numeric) = 0.48331860317203946442196429408858
absolute error = 0.48331860317203946442196429408858
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.787
y[1] (analytic) = 0
y[1] (numeric) = 0.48417246612526478605519532867419
absolute error = 0.48417246612526478605519532867419
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.788
y[1] (analytic) = 0
y[1] (numeric) = 0.48502665953807637949130939775093
absolute error = 0.48502665953807637949130939775093
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.789
y[1] (analytic) = 0
y[1] (numeric) = 0.48588118310012681208213777105756
absolute error = 0.48588118310012681208213777105756
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.79
y[1] (analytic) = 0
y[1] (numeric) = 0.48673603650113803581415443978211
absolute error = 0.48673603650113803581415443978211
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=354.7MB, alloc=4.4MB, time=34.43
x[1] = 0.791
y[1] (analytic) = 0
y[1] (numeric) = 0.48759121943089903898788283134846
absolute error = 0.48759121943089903898788283134846
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.792
y[1] (analytic) = 0
y[1] (numeric) = 0.48844673157926350754198389913849
absolute error = 0.48844673157926350754198389913849
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.793
y[1] (analytic) = 0
y[1] (numeric) = 0.48930257263614749596328718926929
absolute error = 0.48930257263614749596328718926929
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.794
y[1] (analytic) = 0
y[1] (numeric) = 0.49015874229152710772446752392344
absolute error = 0.49015874229152710772446752392344
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.795
y[1] (analytic) = 0
y[1] (numeric) = 0.49101524023543618519150721756854
absolute error = 0.49101524023543618519150721756854
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.796
y[1] (analytic) = 0
y[1] (numeric) = 0.49187206615796400894351729552306
absolute error = 0.49187206615796400894351729552306
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.797
y[1] (analytic) = 0
y[1] (numeric) = 0.49272921974925300644792105014861
absolute error = 0.49272921974925300644792105014861
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=358.5MB, alloc=4.4MB, time=34.80
x[1] = 0.798
y[1] (analytic) = 0
y[1] (numeric) = 0.49358670069949647003442948449101
absolute error = 0.49358670069949647003442948449101
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.799
y[1] (analytic) = 0
y[1] (numeric) = 0.49444450869893628411166079207631
absolute error = 0.49444450869893628411166079207631
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.8
y[1] (analytic) = 0
y[1] (numeric) = 0.4953026434378606615706750400248
absolute error = 0.4953026434378606615706750400248
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.801
y[1] (analytic) = 0
y[1] (numeric) = 0.49616110460660188932011069552084
absolute error = 0.49616110460660188932011069552084
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.802
y[1] (analytic) = 0
y[1] (numeric) = 0.49701989189553408289802159743304
absolute error = 0.49701989189553408289802159743304
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.803
y[1] (analytic) = 0
y[1] (numeric) = 0.4978790049950709501059214596053
absolute error = 0.4978790049950709501059214596053
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.804
y[1] (analytic) = 0
y[1] (numeric) = 0.49873844359566356361094803374877
absolute error = 0.49873844359566356361094803374877
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.805
y[1] (analytic) = 0
y[1] (numeric) = 0.499598207387798142462460691306
absolute error = 0.499598207387798142462460691306
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=362.4MB, alloc=4.4MB, time=35.17
x[1] = 0.806
y[1] (analytic) = 0
y[1] (numeric) = 0.50045829606199384246978343811473
absolute error = 0.50045829606199384246978343811473
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.807
y[1] (analytic) = 0
y[1] (numeric) = 0.50131870930880055538820028579602
absolute error = 0.50131870930880055538820028579602
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.808
y[1] (analytic) = 0
y[1] (numeric) = 0.50217944681879671686070150179968
absolute error = 0.50217944681879671686070150179968
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.809
y[1] (analytic) = 0
y[1] (numeric) = 0.50304050828258712306336757788088
absolute error = 0.50304050828258712306336757788088
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.81
y[1] (analytic) = 0
y[1] (numeric) = 0.50390189339080075600266282602924
absolute error = 0.50390189339080075600266282602924
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.811
y[1] (analytic) = 0
y[1] (numeric) = 0.50476360183408861741329236275899
absolute error = 0.50476360183408861741329236275899
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.812
y[1] (analytic) = 0
y[1] (numeric) = 0.50562563330312157120565490809125
absolute error = 0.50562563330312157120565490809125
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=366.2MB, alloc=4.4MB, time=35.55
x[1] = 0.813
y[1] (analytic) = 0
y[1] (numeric) = 0.5064879874885881944122993350784
absolute error = 0.5064879874885881944122993350784
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.814
y[1] (analytic) = 0
y[1] (numeric) = 0.50735066408119263658316528956794
absolute error = 0.50735066408119263658316528956794
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.815
y[1] (analytic) = 0
y[1] (numeric) = 0.50821366277165248757975748798601
absolute error = 0.50821366277165248757975748798601
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.816
y[1] (analytic) = 0
y[1] (numeric) = 0.50907698325069665371876952282239
absolute error = 0.50907698325069665371876952282239
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.817
y[1] (analytic) = 0
y[1] (numeric) = 0.5099406252090632422160361904872
absolute error = 0.5099406252090632422160361904872
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.818
y[1] (analytic) = 0
y[1] (numeric) = 0.51080458833749745388205353323591
absolute error = 0.51080458833749745388205353323591
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.819
y[1] (analytic) = 0
y[1] (numeric) = 0.51166887232674948402066298456676
absolute error = 0.51166887232674948402066298456676
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.82
y[1] (analytic) = 0
y[1] (numeric) = 0.51253347686757243148285025421825
absolute error = 0.51253347686757243148285025421825
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=370.0MB, alloc=4.4MB, time=35.93
x[1] = 0.821
y[1] (analytic) = 0
y[1] (numeric) = 0.51339840165072021582796091266616
absolute error = 0.51339840165072021582796091266616
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.822
y[1] (analytic) = 0
y[1] (numeric) = 0.51426364636694550254498306357326
absolute error = 0.51426364636694550254498306357326
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.823
y[1] (analytic) = 0
y[1] (numeric) = 0.5151292107069976362868930534167
absolute error = 0.5151292107069976362868930534167
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.824
y[1] (analytic) = 0
y[1] (numeric) = 0.51599509436162058207140288765344
absolute error = 0.51599509436162058207140288765344
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.825
y[1] (analytic) = 0
y[1] (numeric) = 0.51686129702155087440178792913831
absolute error = 0.51686129702155087440178792913831
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.826
y[1] (analytic) = 0
y[1] (numeric) = 0.51772781837751557426181057365276
absolute error = 0.51772781837751557426181057365276
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.827
y[1] (analytic) = 0
y[1] (numeric) = 0.51859465812023023393908995562369
absolute error = 0.51859465812023023393908995562369
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=373.8MB, alloc=4.5MB, time=36.30
x[1] = 0.828
y[1] (analytic) = 0
y[1] (numeric) = 0.51946181594039686963159936041928
absolute error = 0.51946181594039686963159936041928
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.829
y[1] (analytic) = 0
y[1] (numeric) = 0.5203292915287019417923019337377
absolute error = 0.5203292915287019417923019337377
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.83
y[1] (analytic) = 0
y[1] (numeric) = 0.52119708457581434316726150901518
absolute error = 0.52119708457581434316726150901518
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.831
y[1] (analytic) = 0
y[1] (numeric) = 0.52206519477238339448288894566585
absolute error = 0.52206519477238339448288894566585
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.832
y[1] (analytic) = 0
y[1] (numeric) = 0.52293362180903684773830530925285
absolute error = 0.52293362180903684773830530925285
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.833
y[1] (analytic) = 0
y[1] (numeric) = 0.52380236537637889705912155404264
absolute error = 0.52380236537637889705912155404264
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.834
y[1] (analytic) = 0
y[1] (numeric) = 0.5246714251649881970692501132162
absolute error = 0.5246714251649881970692501132162
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.835
y[1] (analytic) = 0
y[1] (numeric) = 0.52554080086541588873767698644967
absolute error = 0.52554080086541588873767698644967
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=377.6MB, alloc=4.5MB, time=36.67
x[1] = 0.836
y[1] (analytic) = 0
y[1] (numeric) = 0.52641049216818363265743356252596
absolute error = 0.52641049216818363265743356252596
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.837
y[1] (analytic) = 0
y[1] (numeric) = 0.52728049876378164971431554974197
absolute error = 0.52728049876378164971431554974197
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.838
y[1] (analytic) = 0
y[1] (numeric) = 0.52815082034266676910320203252781
absolute error = 0.52815082034266676910320203252781
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.839
y[1] (analytic) = 0
y[1] (numeric) = 0.52902145659526048365013085204567
absolute error = 0.52902145659526048365013085204567
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.84
y[1] (analytic) = 0
y[1] (numeric) = 0.52989240721194701239858724449447
absolute error = 0.52989240721194701239858724449447
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.841
y[1] (analytic) = 0
y[1] (numeric) = 0.53076367188307137041876098608219
absolute error = 0.53076367188307137041876098608219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.842
y[1] (analytic) = 0
y[1] (numeric) = 0.53163525029893744579882321057209
absolute error = 0.53163525029893744579882321057209
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=381.4MB, alloc=4.5MB, time=37.04
x[1] = 0.843
y[1] (analytic) = 0
y[1] (numeric) = 0.53250714214980608377756760616205
absolute error = 0.53250714214980608377756760616205
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.844
y[1] (analytic) = 0
y[1] (numeric) = 0.53337934712589317797805188518489
absolute error = 0.53337934712589317797805188518489
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.845
y[1] (analytic) = 0
y[1] (numeric) = 0.53425186491736776870216427446189
absolute error = 0.53425186491736776870216427446189
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.846
y[1] (analytic) = 0
y[1] (numeric) = 0.53512469521435014824632631761494
absolute error = 0.53512469521435014824632631761494
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.847
y[1] (analytic) = 0
y[1] (numeric) = 0.53599783770690997319882753453647
absolute error = 0.53599783770690997319882753453647
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.848
y[1] (analytic) = 0
y[1] (numeric) = 0.53687129208506438367956946859933
absolute error = 0.53687129208506438367956946859933
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.849
y[1] (analytic) = 0
y[1] (numeric) = 0.5377450580387761294832763899147
absolute error = 0.5377450580387761294832763899147
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.85
y[1] (analytic) = 0
y[1] (numeric) = 0.53861913525795170308750743365024
absolute error = 0.53861913525795170308750743365024
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=385.3MB, alloc=4.5MB, time=37.42
x[1] = 0.851
y[1] (analytic) = 0
y[1] (numeric) = 0.53949352343243947948708025652749
absolute error = 0.53949352343243947948708025652749
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.852
y[1] (analytic) = 0
y[1] (numeric) = 0.54036822225202786281678941233981
absolute error = 0.54036822225202786281678941233981
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.853
y[1] (analytic) = 0
y[1] (numeric) = 0.54124323140644343972457359867446
absolute error = 0.54124323140644343972457359867446
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.854
y[1] (analytic) = 0
y[1] (numeric) = 0.54211855058534913945755473178432
absolute error = 0.54211855058534913945755473178432
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.855
y[1] (analytic) = 0
y[1] (numeric) = 0.54299417947834240062363848433158
absolute error = 0.54299417947834240062363848433158
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.856
y[1] (analytic) = 0
y[1] (numeric) = 0.543870117774953344591630490912
absolute error = 0.543870117774953344591630490912
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.857
y[1] (analytic) = 0
y[1] (numeric) = 0.54474636516464295549308490805998
absolute error = 0.54474636516464295549308490805998
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=389.1MB, alloc=4.5MB, time=37.79
x[1] = 0.858
y[1] (analytic) = 0
y[1] (numeric) = 0.54562292133680126678936242783055
absolute error = 0.54562292133680126678936242783055
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.859
y[1] (analytic) = 0
y[1] (numeric) = 0.54649978598074555436763320585977
absolute error = 0.54649978598074555436763320585977
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.86
y[1] (analytic) = 0
y[1] (numeric) = 0.54737695878571853612981649463187
absolute error = 0.54737695878571853612981649463187
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.861
y[1] (analytic) = 0
y[1] (numeric) = 0.54825443944088657803870308895364
absolute error = 0.54825443944088657803870308895364
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.862
y[1] (analytic) = 0
y[1] (numeric) = 0.54913222763533790658575901158801
absolute error = 0.54913222763533790658575901158801
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.863
y[1] (analytic) = 0
y[1] (numeric) = 0.55001032305808082764535921067958
absolute error = 0.55001032305808082764535921067958
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.864
y[1] (analytic) = 0
y[1] (numeric) = 0.5508887253980419516804484248806
absolute error = 0.5508887253980419516804484248806
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.865
y[1] (analytic) = 0
y[1] (numeric) = 0.55176743434406442526487281464073
absolute error = 0.55176743434406442526487281464073
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=392.9MB, alloc=4.5MB, time=38.16
x[1] = 0.866
y[1] (analytic) = 0
y[1] (numeric) = 0.55264644958490616888787047646315
absolute error = 0.55264644958490616888787047646315
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.867
y[1] (analytic) = 0
y[1] (numeric) = 0.55352577080923812100645156838029
absolute error = 0.55352577080923812100645156838029
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.868
y[1] (analytic) = 0
y[1] (numeric) = 0.55440539770564248831163949661704
absolute error = 0.55440539770564248831163949661704
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.869
y[1] (analytic) = 0
y[1] (numeric) = 0.55528532996261100217478346236608
absolute error = 0.55528532996261100217478346236608
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.87
y[1] (analytic) = 0
y[1] (numeric) = 0.55616556726854318124038966060658
absolute error = 0.55616556726854318124038966060658
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.871
y[1] (analytic) = 0
y[1] (numeric) = 0.55704610931174460013215357659097
absolute error = 0.55704610931174460013215357659097
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.872
y[1] (analytic) = 0
y[1] (numeric) = 0.5579269557804251642391091564751
absolute error = 0.5579269557804251642391091564751
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.873
y[1] (analytic) = 0
y[1] (numeric) = 0.55880810636269739054904215287901
absolute error = 0.55880810636269739054904215287901
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=396.7MB, alloc=4.5MB, time=38.53
TOP MAIN SOLVE Loop
x[1] = 0.874
y[1] (analytic) = 0
y[1] (numeric) = 0.55968956074657469449654468007851
absolute error = 0.55968956074657469449654468007851
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.875
y[1] (analytic) = 0
y[1] (numeric) = 0.56057131861996968279331597302054
absolute error = 0.56057131861996968279331597302054
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.876
y[1] (analytic) = 0
y[1] (numeric) = 0.56145337967069245220854054524505
absolute error = 0.56145337967069245220854054524505
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.877
y[1] (analytic) = 0
y[1] (numeric) = 0.56233574358644889426739939874265
absolute error = 0.56233574358644889426739939874265
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.878
y[1] (analytic) = 0
y[1] (numeric) = 0.56321841005483900583599266928261
absolute error = 0.56321841005483900583599266928261
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.879
y[1] (analytic) = 0
y[1] (numeric) = 0.56410137876335520556117310915804
absolute error = 0.56410137876335520556117310915804
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.88
y[1] (analytic) = 0
y[1] (numeric) = 0.56498464939938065613400913080793
absolute error = 0.56498464939938065613400913080793
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=400.5MB, alloc=4.5MB, time=38.91
x[1] = 0.881
y[1] (analytic) = 0
y[1] (numeric) = 0.56586822165018759234581377443219
absolute error = 0.56586822165018759234581377443219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.882
y[1] (analytic) = 0
y[1] (numeric) = 0.56675209520293565490589193540875
absolute error = 0.56675209520293565490589193540875
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.883
y[1] (analytic) = 0
y[1] (numeric) = 0.56763626974467022999037250779527
absolute error = 0.56763626974467022999037250779527
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.884
y[1] (analytic) = 0
y[1] (numeric) = 0.56852074496232079449170478305035
absolute error = 0.56852074496232079449170478305035
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.885
y[1] (analytic) = 0
y[1] (numeric) = 0.56940552054269926693860950279342
absolute error = 0.56940552054269926693860950279342
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.886
y[1] (analytic) = 0
y[1] (numeric) = 0.57029059617249836405648441524748
absolute error = 0.57029059617249836405648441524748
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.887
y[1] (analytic) = 0
y[1] (numeric) = 0.57117597153828996293847204114344
absolute error = 0.57117597153828996293847204114344
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.888
y[1] (analytic) = 0
y[1] (numeric) = 0.57206164632652346879760363033545
absolute error = 0.57206164632652346879760363033545
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=404.3MB, alloc=4.5MB, time=39.27
x[1] = 0.889
y[1] (analytic) = 0
y[1] (numeric) = 0.57294762022352418827063799907282
absolute error = 0.57294762022352418827063799907282
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.89
y[1] (analytic) = 0
y[1] (numeric) = 0.57383389291549170824441709354704
absolute error = 0.57383389291549170824441709354704
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.891
y[1] (analytic) = 0
y[1] (numeric) = 0.57472046408849828017576174159848
absolute error = 0.57472046408849828017576174159848
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.892
y[1] (analytic) = 0
y[1] (numeric) = 0.5756073334284872098761311448077
absolute error = 0.5756073334284872098761311448077
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.893
y[1] (analytic) = 0
y[1] (numeric) = 0.57649450062127125273246824096059
absolute error = 0.57649450062127125273246824096059
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.894
y[1] (analytic) = 0
y[1] (numeric) = 0.57738196535253101433585014528225
absolute error = 0.57738196535253101433585014528225
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.895
y[1] (analytic) = 0
y[1] (numeric) = 0.57826972730781335648975847096935
absolute error = 0.57826972730781335648975847096935
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=408.1MB, alloc=4.5MB, time=39.65
x[1] = 0.896
y[1] (analytic) = 0
y[1] (numeric) = 0.57915778617252980856997844837486
absolute error = 0.57915778617252980856997844837486
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.897
y[1] (analytic) = 0
y[1] (numeric) = 0.58004614163195498420832842054404
absolute error = 0.58004614163195498420832842054404
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.898
y[1] (analytic) = 0
y[1] (numeric) = 0.5809347933712250032726125033745
absolute error = 0.5809347933712250032726125033745
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.899
y[1] (analytic) = 0
y[1] (numeric) = 0.58182374107533591911537897405713
absolute error = 0.58182374107533591911537897405713
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.9
y[1] (analytic) = 0
y[1] (numeric) = 0.58271298442914215106425530411002
absolute error = 0.58271298442914215106425530411002
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.901
y[1] (analytic) = 0
y[1] (numeric) = 0.58360252311735492212681769558066
absolute error = 0.58360252311735492212681769558066
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.902
y[1] (analytic) = 0
y[1] (numeric) = 0.58449235682454070188313852308188
absolute error = 0.58449235682454070188313852308188
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.903
y[1] (analytic) = 0
y[1] (numeric) = 0.58538248523511965453933924234212
absolute error = 0.58538248523511965453933924234212
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=412.0MB, alloc=4.5MB, time=40.02
x[1] = 0.904
y[1] (analytic) = 0
y[1] (numeric) = 0.58627290803336409211565910987224
absolute error = 0.58627290803336409211565910987224
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.905
y[1] (analytic) = 0
y[1] (numeric) = 0.58716362490339693274273148004386
absolute error = 0.58716362490339693274273148004386
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.906
y[1] (analytic) = 0
y[1] (numeric) = 0.58805463552919016403993951708787
absolute error = 0.58805463552919016403993951708787
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.907
y[1] (analytic) = 0
y[1] (numeric) = 0.58894593959456331154990189189185
absolute error = 0.58894593959456331154990189189185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.908
y[1] (analytic) = 0
y[1] (numeric) = 0.58983753678318191220331643852458
absolute error = 0.58983753678318191220331643852458
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.909
y[1] (analytic) = 0
y[1] (numeric) = 0.59072942677855599278856583455642
absolute error = 0.59072942677855599278856583455642
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.91
y[1] (analytic) = 0
y[1] (numeric) = 0.59162160926403855340066415377717
absolute error = 0.59162160926403855340066415377717
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=415.8MB, alloc=4.5MB, time=40.40
x[1] = 0.911
y[1] (analytic) = 0
y[1] (numeric) = 0.59251408392282405584429663103011
absolute error = 0.59251408392282405584429663103011
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.912
y[1] (analytic) = 0
y[1] (numeric) = 0.59340685043794691696587718766686
absolute error = 0.59340685043794691696587718766686
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.913
y[1] (analytic) = 0
y[1] (numeric) = 0.59429990849228000688971920355948
absolute error = 0.59429990849228000688971920355948
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.914
y[1] (analytic) = 0
y[1] (numeric) = 0.59519325776853315213358469855625
absolute error = 0.59519325776853315213358469855625
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.915
y[1] (analytic) = 0
y[1] (numeric) = 0.59608689794925164357904551350246
absolute error = 0.59608689794925164357904551350246
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.916
y[1] (analytic) = 0
y[1] (numeric) = 0.59698082871681474927225726913211
absolute error = 0.59698082871681474927225726913211
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.917
y[1] (analytic) = 0
y[1] (numeric) = 0.5978750497534342320309128408313
absolute error = 0.5978750497534342320309128408313
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.918
y[1] (analytic) = 0
y[1] (numeric) = 0.59876956074115287183330682894104
absolute error = 0.59876956074115287183330682894104
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=419.6MB, alloc=4.5MB, time=40.77
x[1] = 0.919
y[1] (analytic) = 0
y[1] (numeric) = 0.5996643613618429929656060382651
absolute error = 0.5996643613618429929656060382651
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.92
y[1] (analytic) = 0
y[1] (numeric) = 0.60055945129720499590358331704022
absolute error = 0.60055945129720499590358331704022
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.921
y[1] (analytic) = 0
y[1] (numeric) = 0.6014548302287658939052332549733
absolute error = 0.6014548302287658939052332549733
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.922
y[1] (analytic) = 0
y[1] (numeric) = 0.60235049783787785429084821212096
absolute error = 0.60235049783787785429084821212096
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.923
y[1] (analytic) = 0
y[1] (numeric) = 0.60324645380571674438729195534992
absolute error = 0.60324645380571674438729195534992
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.924
y[1] (analytic) = 0
y[1] (numeric) = 0.60414269781328068211336582674918
absolute error = 0.60414269781328068211336582674918
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.925
y[1] (analytic) = 0
y[1] (numeric) = 0.60503922954138859118331886844688
absolute error = 0.60503922954138859118331886844688
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=423.4MB, alloc=4.5MB, time=41.14
x[1] = 0.926
y[1] (analytic) = 0
y[1] (numeric) = 0.60593604867067876090570869050617
absolute error = 0.60593604867067876090570869050617
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.927
y[1] (analytic) = 0
y[1] (numeric) = 0.60683315488160741055497410253094
absolute error = 0.60683315488160741055497410253094
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.928
y[1] (analytic) = 0
y[1] (numeric) = 0.60773054785444725829323364481038
absolute error = 0.60773054785444725829323364481038
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.929
y[1] (analytic) = 0
y[1] (numeric) = 0.60862822726928609461997616068627
absolute error = 0.60862822726928609461997616068627
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.93
y[1] (analytic) = 0
y[1] (numeric) = 0.6095261928060253603274604576658
absolute error = 0.6095261928060253603274604576658
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.931
y[1] (analytic) = 0
y[1] (numeric) = 0.61042444414437872893979091986339
absolute error = 0.61042444414437872893979091986339
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.932
y[1] (analytic) = 0
y[1] (numeric) = 0.61132298096387069361378466778956
absolute error = 0.61132298096387069361378466778956
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.933
y[1] (analytic) = 0
y[1] (numeric) = 0.61222180294383515847989352237768
absolute error = 0.61222180294383515847989352237768
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=427.2MB, alloc=4.5MB, time=41.50
x[1] = 0.934
y[1] (analytic) = 0
y[1] (numeric) = 0.61312090976341403440159062743043
absolute error = 0.61312090976341403440159062743043
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.935
y[1] (analytic) = 0
y[1] (numeric) = 0.61402030110155583913177712727201
absolute error = 0.61402030110155583913177712727201
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.936
y[1] (analytic) = 0
y[1] (numeric) = 0.61491997663701430184490879312109
absolute error = 0.61491997663701430184490879312109
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.937
y[1] (analytic) = 0
y[1] (numeric) = 0.61581993604834697202368595128168
absolute error = 0.61581993604834697202368595128168
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.938
y[1] (analytic) = 0
y[1] (numeric) = 0.61672017901391383267929249733191
absolute error = 0.61672017901391383267929249733191
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.939
y[1] (analytic) = 0
y[1] (numeric) = 0.61762070521187591788431119163942
absolute error = 0.61762070521187591788431119163942
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.94
y[1] (analytic) = 0
y[1] (numeric) = 0.61852151432019393459758283123268
absolute error = 0.61852151432019393459758283123268
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.941
y[1] (analytic) = 0
y[1] (numeric) = 0.61942260601662688876041628971608
absolute error = 0.61942260601662688876041628971608
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=431.0MB, alloc=4.5MB, time=41.88
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.942
y[1] (analytic) = 0
y[1] (numeric) = 0.62032397997873071564369481886121
absolute error = 0.62032397997873071564369481886121
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.943
y[1] (analytic) = 0
y[1] (numeric) = 0.62122563588385691442556142098715
absolute error = 0.62122563588385691442556142098715
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.944
y[1] (analytic) = 0
y[1] (numeric) = 0.6221275734091511869795025384316
absolute error = 0.6221275734091511869795025384316
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.945
y[1] (analytic) = 0
y[1] (numeric) = 0.62302979223155208085278477341048
absolute error = 0.62302979223155208085278477341048
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.946
y[1] (analytic) = 0
y[1] (numeric) = 0.62393229202778963641533385638623
absolute error = 0.62393229202778963641533385638623
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.947
y[1] (analytic) = 0
y[1] (numeric) = 0.6248350724743840381592786316632
absolute error = 0.6248350724743840381592786316632
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.948
y[1] (analytic) = 0
y[1] (numeric) = 0.62573813324764427012951543317446
absolute error = 0.62573813324764427012951543317446
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=434.8MB, alloc=4.5MB, time=42.25
x[1] = 0.949
y[1] (analytic) = 0
y[1] (numeric) = 0.62664147402366677546577988911893
absolute error = 0.62664147402366677546577988911893
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.95
y[1] (analytic) = 0
y[1] (numeric) = 0.62754509447833412003684392897888
absolute error = 0.62754509447833412003684392897888
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.951
y[1] (analytic) = 0
y[1] (numeric) = 0.62844899428731366014758557815207
absolute error = 0.62844899428731366014758557815207
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.952
y[1] (analytic) = 0
y[1] (numeric) = 0.62935317312605621429980802155597
absolute error = 0.62935317312605621429980802155597
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.953
y[1] (analytic) = 0
y[1] (numeric) = 0.63025763066979473898781240561901
absolute error = 0.63025763066979473898781240561901
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.954
y[1] (analytic) = 0
y[1] (numeric) = 0.63116236659354300850985593551238
absolute error = 0.63116236659354300850985593551238
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.955
y[1] (analytic) = 0
y[1] (numeric) = 0.63206738057209429877675301867285
absolute error = 0.63206738057209429877675301867285
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.956
y[1] (analytic) = 0
y[1] (numeric) = 0.63297267228002007509900251393245
absolute error = 0.63297267228002007509900251393245
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=438.7MB, alloc=4.5MB, time=42.63
x[1] = 0.957
y[1] (analytic) = 0
y[1] (numeric) = 0.63387824139166868393394857514688
absolute error = 0.63387824139166868393394857514688
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.958
y[1] (analytic) = 0
y[1] (numeric) = 0.63478408758116404857460613627752
absolute error = 0.63478408758116404857460613627752
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.959
y[1] (analytic) = 0
y[1] (numeric) = 0.63569021052240436876190477854165
absolute error = 0.63569021052240436876190477854165
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.96
y[1] (analytic) = 0
y[1] (numeric) = 0.63659660988906082420222655654678
absolute error = 0.63659660988906082420222655654678
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.961
y[1] (analytic) = 0
y[1] (numeric) = 0.63750328535457628197223434624888
absolute error = 0.63750328535457628197223434624888
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.962
y[1] (analytic) = 0
y[1] (numeric) = 0.63841023659216400779310742003607
absolute error = 0.63841023659216400779310742003607
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.963
y[1] (analytic) = 0
y[1] (numeric) = 0.63931746327480638115642026009324
absolute error = 0.63931746327480638115642026009324
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=442.5MB, alloc=4.5MB, time=43.00
x[1] = 0.964
y[1] (analytic) = 0
y[1] (numeric) = 0.64022496507525361428401909723932
absolute error = 0.64022496507525361428401909723932
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.965
y[1] (analytic) = 0
y[1] (numeric) = 0.64113274166602247490436831537591
absolute error = 0.64113274166602247490436831537591
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.966
y[1] (analytic) = 0
y[1] (numeric) = 0.64204079271939501282795569821171
absolute error = 0.64204079271939501282795569821171
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.967
y[1] (analytic) = 0
y[1] (numeric) = 0.64294911790741729030446152163745
absolute error = 0.64294911790741729030446152163745
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.968
y[1] (analytic) = 0
y[1] (numeric) = 0.64385771690189811614451171856817
absolute error = 0.64385771690189811614451171856817
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.969
y[1] (analytic) = 0
y[1] (numeric) = 0.64476658937440778358894976973
absolute error = 0.64476658937440778358894976973
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.97
y[1] (analytic) = 0
y[1] (numeric) = 0.64567573499627681190867561017559
absolute error = 0.64567573499627681190867561017559
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.971
y[1] (analytic) = 0
y[1] (numeric) = 0.64658515343859469171821269363609
absolute error = 0.64658515343859469171821269363609
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=446.3MB, alloc=4.5MB, time=43.38
x[1] = 0.972
y[1] (analytic) = 0
y[1] (numeric) = 0.64749484437220863398627643146933
absolute error = 0.64749484437220863398627643146933
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.973
y[1] (analytic) = 0
y[1] (numeric) = 0.64840480746772232272672852619966
absolute error = 0.64840480746772232272672852619966
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.974
y[1] (analytic) = 0
y[1] (numeric) = 0.64931504239549467135341225766239
absolute error = 0.64931504239549467135341225766239
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.975
y[1] (analytic) = 0
y[1] (numeric) = 0.65022554882563858268247355870774
absolute error = 0.65022554882563858268247355870774
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.976
y[1] (analytic) = 0
y[1] (numeric) = 0.65113632642801971256588174337259
absolute error = 0.65113632642801971256588174337259
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.977
y[1] (analytic) = 0
y[1] (numeric) = 0.65204737487225523713997202942516
absolute error = 0.65204737487225523713997202942516
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.978
y[1] (analytic) = 0
y[1] (numeric) = 0.65295869382771262367293953520597
absolute error = 0.65295869382771262367293953520597
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=450.1MB, alloc=4.5MB, time=43.75
x[1] = 0.979
y[1] (analytic) = 0
y[1] (numeric) = 0.6538702829635084049953212336519
absolute error = 0.6538702829635084049953212336519
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.98
y[1] (analytic) = 0
y[1] (numeric) = 0.65478214194850695749760842016975
absolute error = 0.65478214194850695749760842016975
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.981
y[1] (analytic) = 0
y[1] (numeric) = 0.65569427045131928267923760143961
absolute error = 0.65569427045131928267923760143961
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.982
y[1] (analytic) = 0
y[1] (numeric) = 0.65660666814030179223331234504174
absolute error = 0.65660666814030179223331234504174
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.983
y[1] (analytic) = 0
y[1] (numeric) = 0.65751933468355509665151255072896
absolute error = 0.65751933468355509665151255072896
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.984
y[1] (analytic) = 0
y[1] (numeric) = 0.65843226974892279733375081887132
absolute error = 0.65843226974892279733375081887132
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.985
y[1] (analytic) = 0
y[1] (numeric) = 0.65934547300399028218723810569468
absolute error = 0.65934547300399028218723810569468
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.986
y[1] (analytic) = 0
y[1] (numeric) = 0.66025894411608352469972267398128
absolute error = 0.66025894411608352469972267398128
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=453.9MB, alloc=4.5MB, time=44.13
x[1] = 0.987
y[1] (analytic) = 0
y[1] (numeric) = 0.66117268275226788647176747741117
absolute error = 0.66117268275226788647176747741117
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.988
y[1] (analytic) = 0
y[1] (numeric) = 0.66208668857934692319303156216202
absolute error = 0.66208668857934692319303156216202
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.989
y[1] (analytic) = 0
y[1] (numeric) = 0.66300096126386119404762083616615
absolute error = 0.66300096126386119404762083616615
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.99
y[1] (analytic) = 0
y[1] (numeric) = 0.66391550047208707453367264991355
absolute error = 0.66391550047208707453367264991355
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.991
y[1] (analytic) = 0
y[1] (numeric) = 0.6648303058700355726824370582082
absolute error = 0.6648303058700355726824370582082
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.992
y[1] (analytic) = 0
y[1] (numeric) = 0.66574537712345114866221539510236
absolute error = 0.66574537712345114866221539510236
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.993
y[1] (analytic) = 0
y[1] (numeric) = 0.6666607138978105377526138995756
absolute error = 0.6666607138978105377526138995756
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=457.7MB, alloc=4.5MB, time=44.50
x[1] = 0.994
y[1] (analytic) = 0
y[1] (numeric) = 0.66757631585832157667466658257011
absolute error = 0.66757631585832157667466658257011
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.995
y[1] (analytic) = 0
y[1] (numeric) = 0.66849218266992203326247733187387
absolute error = 0.66849218266992203326247733187387
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.996
y[1] (analytic) = 0
y[1] (numeric) = 0.66940831399727843946212641514616
absolute error = 0.66940831399727843946212641514616
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.997
y[1] (analytic) = 0
y[1] (numeric) = 0.67032470950478492764368106814741
absolute error = 0.67032470950478492764368106814741
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.998
y[1] (analytic) = 0
y[1] (numeric) = 0.6712413688565620702122437499656
absolute error = 0.6712413688565620702122437499656
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 0.999
y[1] (analytic) = 0
y[1] (numeric) = 0.67215829171645572250406491467777
absolute error = 0.67215829171645572250406491467777
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1
y[1] (analytic) = 0
y[1] (numeric) = 0.67307547774803586895383979435764
absolute error = 0.67307547774803586895383979435764
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.001
y[1] (analytic) = 0
y[1] (numeric) = 0.67399292661459547251940071650566
absolute error = 0.67399292661459547251940071650566
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=461.5MB, alloc=4.5MB, time=44.87
x[1] = 1.002
y[1] (analytic) = 0
y[1] (numeric) = 0.67491063797914932735010789465984
absolute error = 0.67491063797914932735010789465984
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.003
y[1] (analytic) = 0
y[1] (numeric) = 0.67582861150443291468533243892612
absolute error = 0.67582861150443291468533243892612
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.004
y[1] (analytic) = 0
y[1] (numeric) = 0.67674684685290126196951553818502
absolute error = 0.67674684685290126196951553818502
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.005
y[1] (analytic) = 0
y[1] (numeric) = 0.67766534368672780517037737248536
absolute error = 0.67766534368672780517037737248536
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.006
y[1] (analytic) = 0
y[1] (numeric) = 0.6785841016678032542869383272821
absolute error = 0.6785841016678032542869383272821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.007
y[1] (analytic) = 0
y[1] (numeric) = 0.67950312045773446203410350533043
absolute error = 0.67950312045773446203410350533043
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.008
y[1] (analytic) = 0
y[1] (numeric) = 0.68042239971784329569064937178742
absolute error = 0.68042239971784329569064937178742
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=465.4MB, alloc=4.5MB, time=45.24
x[1] = 1.009
y[1] (analytic) = 0
y[1] (numeric) = 0.68134193910916551209753862793165
absolute error = 0.68134193910916551209753862793165
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.01
y[1] (analytic) = 0
y[1] (numeric) = 0.68226173829244963579357609338617
absolute error = 0.68226173829244963579357609338617
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.011
y[1] (analytic) = 0
y[1] (numeric) = 0.68318179692815584027550449027821
absolute error = 0.68318179692815584027550449027821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.012
y[1] (analytic) = 0
y[1] (numeric) = 0.68410211467645483236972456980748
absolute error = 0.68410211467645483236972456980748
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.013
y[1] (analytic) = 0
y[1] (numeric) = 0.6850226911972267397029090066043
absolute error = 0.6850226911972267397029090066043
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.014
y[1] (analytic) = 0
y[1] (numeric) = 0.68594352615006000125886391337957
absolute error = 0.68594352615006000125886391337957
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.015
y[1] (analytic) = 0
y[1] (numeric) = 0.68686461919425026100907570200549
absolute error = 0.68686461919425026100907570200549
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.016
y[1] (analytic) = 0
y[1] (numeric) = 0.68778596998879926460446434158452
absolute error = 0.68778596998879926460446434158452
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=469.2MB, alloc=4.5MB, time=45.62
x[1] = 1.017
y[1] (analytic) = 0
y[1] (numeric) = 0.68870757819241375911594684349455
absolute error = 0.68870757819241375911594684349455
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.018
y[1] (analytic) = 0
y[1] (numeric) = 0.68962944346350439581149704203257
absolute error = 0.68962944346350439581149704203257
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.019
y[1] (analytic) = 0
y[1] (numeric) = 0.69055156546018463595746944127458
absolute error = 0.69055156546018463595746944127458
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.02
y[1] (analytic) = 0
y[1] (numeric) = 0.69147394384026965963203606824603
absolute error = 0.69147394384026965963203606824603
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.021
y[1] (analytic) = 0
y[1] (numeric) = 0.69239657826127527753866591353993
absolute error = 0.69239657826127527753866591353993
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.022
y[1] (analytic) = 0
y[1] (numeric) = 0.6933194683804168458076566571785
absolute error = 0.6933194683804168458076566571785
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.023
y[1] (analytic) = 0
y[1] (numeric) = 0.69424261385460818377380797380382
absolute error = 0.69424261385460818377380797380382
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=473.0MB, alloc=4.5MB, time=45.99
x[1] = 1.024
y[1] (analytic) = 0
y[1] (numeric) = 0.6951660143404604947184047911833
absolute error = 0.6951660143404604947184047911833
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.025
y[1] (analytic) = 0
y[1] (numeric) = 0.69608966949428128956375744347294
absolute error = 0.69608966949428128956375744347294
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.026
y[1] (analytic) = 0
y[1] (numeric) = 0.69701357897207331350862371960759
absolute error = 0.69701357897207331350862371960759
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.027
y[1] (analytic) = 0
y[1] (numeric) = 0.69793774242953347559291536146054
absolute error = 0.69793774242953347559291536146054
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.028
y[1] (analytic) = 0
y[1] (numeric) = 0.69886215952205178118016861988061
absolute error = 0.69886215952205178118016861988061
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.029
y[1] (analytic) = 0
y[1] (numeric) = 0.69978682990471026734633503318494
absolute error = 0.69978682990471026734633503318494
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.03
y[1] (analytic) = 0
y[1] (numeric) = 0.70071175323228194116352465593987
absolute error = 0.70071175323228194116352465593987
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.031
y[1] (analytic) = 0
y[1] (numeric) = 0.70163692915922972086740953964765
absolute error = 0.70163692915922972086740953964765
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=476.8MB, alloc=4.5MB, time=46.36
x[1] = 1.032
y[1] (analytic) = 0
y[1] (numeric) = 0.70256235733970537989707035498816
absolute error = 0.70256235733970537989707035498816
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.033
y[1] (analytic) = 0
y[1] (numeric) = 0.70348803742754849379614365122605
absolute error = 0.70348803742754849379614365122605
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.034
y[1] (analytic) = 0
y[1] (numeric) = 0.70441396907628538996420137593626
absolute error = 0.70441396907628538996420137593626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.035
y[1] (analytic) = 0
y[1] (numeric) = 0.70534015193912810024736793094613
absolute error = 0.70534015193912810024736793094613
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.036
y[1] (analytic) = 0
y[1] (numeric) = 0.70626658566897331635725322192938
absolute error = 0.70626658566897331635725322192938
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.037
y[1] (analytic) = 0
y[1] (numeric) = 0.70719326991840134810735287297649
absolute error = 0.70719326991840134810735287297649
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.038
y[1] (analytic) = 0
y[1] (numeric) = 0.70812020433967508445613902723573
absolute error = 0.70812020433967508445613902723573
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=480.6MB, alloc=4.5MB, time=46.74
x[1] = 1.039
y[1] (analytic) = 0
y[1] (numeric) = 0.70904738858473895734613694386901
absolute error = 0.70904738858473895734613694386901
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.04
y[1] (analytic) = 0
y[1] (numeric) = 0.70997482230521790832835393356588
absolute error = 0.70997482230521790832835393356588
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.041
y[1] (analytic) = 0
y[1] (numeric) = 0.71090250515241635796149805314806
absolute error = 0.71090250515241635796149805314806
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.042
y[1] (analytic) = 0
y[1] (numeric) = 0.71183043677731717797549440778567
absolute error = 0.71183043677731717797549440778567
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.043
y[1] (analytic) = 0
y[1] (numeric) = 0.7127586168305806661888768904182
absolute error = 0.7127586168305806661888768904182
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.044
y[1] (analytic) = 0
y[1] (numeric) = 0.71368704496254352416970272548046
absolute error = 0.71368704496254352416970272548046
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.045
y[1] (analytic) = 0
y[1] (numeric) = 0.71461572082321783762970628130219
absolute error = 0.71461572082321783762970628130219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.046
y[1] (analytic) = 0
y[1] (numeric) = 0.71554464406229005954147727587624
absolute error = 0.71554464406229005954147727587624
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=484.4MB, alloc=4.5MB, time=47.12
x[1] = 1.047
y[1] (analytic) = 0
y[1] (numeric) = 0.7164738143291199959685167273437
absolute error = 0.7164738143291199959685167273437
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.048
y[1] (analytic) = 0
y[1] (numeric) = 0.71740323127273979459809179676686
absolute error = 0.71740323127273979459809179676686
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.049
y[1] (analytic) = 0
y[1] (numeric) = 0.71833289454185293596687803976629
absolute error = 0.71833289454185293596687803976629
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.05
y[1] (analytic) = 0
y[1] (numeric) = 0.71926280378483322736944452857479
absolute error = 0.71926280378483322736944452857479
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.051
y[1] (analytic) = 0
y[1] (numeric) = 0.72019295864972379943970383016847
absolute error = 0.72019295864972379943970383016847
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.052
y[1] (analytic) = 0
y[1] (numeric) = 0.72112335878423610539551493250779
absolute error = 0.72112335878423610539551493250779
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.053
y[1] (analytic) = 0
y[1] (numeric) = 0.72205400383574892293669290266749
absolute error = 0.72205400383574892293669290266749
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=488.3MB, alloc=4.5MB, time=47.49
x[1] = 1.054
y[1] (analytic) = 0
y[1] (numeric) = 0.72298489345130735878674434083474
absolute error = 0.72298489345130735878674434083474
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.055
y[1] (analytic) = 0
y[1] (numeric) = 0.72391602727762185586871256586616
absolute error = 0.72391602727762185586871256586616
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.056
y[1] (analytic) = 0
y[1] (numeric) = 0.72484740496106720310558093434677
absolute error = 0.72484740496106720310558093434677
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.057
y[1] (analytic) = 0
y[1] (numeric) = 0.72577902614768154783574675889227
absolute error = 0.72577902614768154783574675889227
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.058
y[1] (analytic) = 0
y[1] (numeric) = 0.72671089048316541083414195576069
absolute error = 0.72671089048316541083414195576069
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.059
y[1] (analytic) = 0
y[1] (numeric) = 0.72764299761288070392963981964487
absolute error = 0.72764299761288070392963981964487
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.06
y[1] (analytic) = 0
y[1] (numeric) = 0.72857534718184975020945019773466
absolute error = 0.72857534718184975020945019773466
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.061
y[1] (analytic) = 0
y[1] (numeric) = 0.72950793883475430680126781867263
absolute error = 0.72950793883475430680126781867263
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=492.1MB, alloc=4.5MB, time=47.86
x[1] = 1.062
y[1] (analytic) = 0
y[1] (numeric) = 0.73044077221593459022400062776138
absolute error = 0.73044077221593459022400062776138
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.063
y[1] (analytic) = 0
y[1] (numeric) = 0.73137384696938830429796669057275
absolute error = 0.73137384696938830429796669057275
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.064
y[1] (analytic) = 0
y[1] (numeric) = 0.73230716273876967060550955579261
absolute error = 0.73230716273876967060550955579261
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.065
y[1] (analytic) = 0
y[1] (numeric) = 0.73324071916738846149304291752116
absolute error = 0.73324071916738846149304291752116
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.066
y[1] (analytic) = 0
y[1] (numeric) = 0.73417451589820903560559599012431
absolute error = 0.73417451589820903560559599012431
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.067
y[1] (analytic) = 0
y[1] (numeric) = 0.73510855257384937594499120786151
absolute error = 0.73510855257384937594499120786151
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.068
y[1] (analytic) = 0
y[1] (numeric) = 0.73604282883658013044284568964081
absolute error = 0.73604282883658013044284568964081
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=495.9MB, alloc=4.5MB, time=48.24
x[1] = 1.069
y[1] (analytic) = 0
y[1] (numeric) = 0.73697734432832365503964736909127
absolute error = 0.73697734432832365503964736909127
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.07
y[1] (analytic) = 0
y[1] (numeric) = 0.73791209869065305926121578439307
absolute error = 0.73791209869065305926121578439307
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.071
y[1] (analytic) = 0
y[1] (numeric) = 0.73884709156479125428391625364014
absolute error = 0.73884709156479125428391625364014
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.072
y[1] (analytic) = 0
y[1] (numeric) = 0.73978232259161000348005453258141
absolute error = 0.73978232259161000348005453258141
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.073
y[1] (analytic) = 0
y[1] (numeric) = 0.74071779141162897543493706502461
absolute error = 0.74071779141162897543493706502461
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.074
y[1] (analytic) = 0
y[1] (numeric) = 0.74165349766501479942713959459977
absolute error = 0.74165349766501479942713959459977
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.075
y[1] (analytic) = 0
y[1] (numeric) = 0.74258944099158012336358421255481
absolute error = 0.74258944099158012336358421255481
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.076
y[1] (analytic) = 0
y[1] (numeric) = 0.74352562103078267416108187235922
absolute error = 0.74352562103078267416108187235922
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=499.7MB, alloc=4.5MB, time=48.62
x[1] = 1.077
y[1] (analytic) = 0
y[1] (numeric) = 0.74446203742172432056605401066787
absolute error = 0.74446203742172432056605401066787
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.078
y[1] (analytic) = 0
y[1] (numeric) = 0.74539868980315013840420317816995
absolute error = 0.74539868980315013840420317816995
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.079
y[1] (analytic) = 0
y[1] (numeric) = 0.74633557781344747825195850552063
absolute error = 0.74633557781344747825195850552063
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.08
y[1] (analytic) = 0
y[1] (numeric) = 0.74727270109064503552157741140811
absolute error = 0.74727270109064503552157741140811
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.081
y[1] (analytic) = 0
y[1] (numeric) = 0.74821005927241192295184020430873
absolute error = 0.74821005927241192295184020430873
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.082
y[1] (analytic) = 0
y[1] (numeric) = 0.74914765199605674549632913906968
absolute error = 0.74914765199605674549632913906968
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.083
y[1] (analytic) = 0
y[1] (numeric) = 0.75008547889852667760133806655535
absolute error = 0.75008547889852667760133806655535
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=503.5MB, alloc=4.5MB, time=48.99
x[1] = 1.084
y[1] (analytic) = 0
y[1] (numeric) = 0.75102353961640654286551306160146
absolute error = 0.75102353961640654286551306160146
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.085
y[1] (analytic) = 0
y[1] (numeric) = 0.75196183378591789607337833382417
absolute error = 0.75196183378591789607337833382417
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.086
y[1] (analytic) = 0
y[1] (numeric) = 0.75290036104291810759495531979283
absolute error = 0.75290036104291810759495531979283
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.087
y[1] (analytic) = 0
y[1] (numeric) = 0.75383912102289945014373612603886
absolute error = 0.75383912102289945014373612603886
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.088
y[1] (analytic) = 0
y[1] (numeric) = 0.75477811336098818788532544266532
absolute error = 0.75477811336098818788532544266532
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.089
y[1] (analytic) = 0
y[1] (numeric) = 0.75571733769194366788911767924757
absolute error = 0.75571733769194366788911767924757
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.09
y[1] (analytic) = 0
y[1] (numeric) = 0.75665679365015741391542839056349
absolute error = 0.75665679365015741391542839056349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.091
y[1] (analytic) = 0
y[1] (numeric) = 0.75759648086965222253055106173038
absolute error = 0.75759648086965222253055106173038
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=507.3MB, alloc=4.5MB, time=49.36
x[1] = 1.092
y[1] (analytic) = 0
y[1] (numeric) = 0.75853639898408126154226201280584
absolute error = 0.75853639898408126154226201280584
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.093
y[1] (analytic) = 0
y[1] (numeric) = 0.75947654762672717074834756406455
absolute error = 0.75947654762672717074834756406455
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.094
y[1] (analytic) = 0
y[1] (numeric) = 0.76041692643050116499077867720508
absolute error = 0.76041692643050116499077867720508
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.095
y[1] (analytic) = 0
y[1] (numeric) = 0.76135753502794213950820905686893
absolute error = 0.76135753502794213950820905686893
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.096
y[1] (analytic) = 0
y[1] (numeric) = 0.76229837305121577757952316324477
absolute error = 0.76229837305121577757952316324477
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.097
y[1] (analytic) = 0
y[1] (numeric) = 0.76323944013211366045121075234714
absolute error = 0.76323944013211366045121075234714
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.098
y[1] (analytic) = 0
y[1] (numeric) = 0.76418073590205237954139442794334
absolute error = 0.76418073590205237954139442794334
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=511.1MB, alloc=4.5MB, time=49.74
x[1] = 1.099
y[1] (analytic) = 0
y[1] (numeric) = 0.76512225999207265091338626018185
absolute error = 0.76512225999207265091338626018185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.1
y[1] (analytic) = 0
y[1] (numeric) = 0.76606401203283843201169880285975
absolute error = 0.76606401203283843201169880285975
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.101
y[1] (analytic) = 0
y[1] (numeric) = 0.76700599165463604065348482604729
absolute error = 0.76700599165463604065348482604729
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.102
y[1] (analytic) = 0
y[1] (numeric) = 0.76794819848737327626842877554116
absolute error = 0.76794819848737327626842877554116
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.103
y[1] (analytic) = 0
y[1] (numeric) = 0.76889063216057854338016137740256
absolute error = 0.76889063216057854338016137740256
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.104
y[1] (analytic) = 0
y[1] (numeric) = 0.76983329230339997732231692669439
absolute error = 0.76983329230339997732231692669439
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.105
y[1] (analytic) = 0
y[1] (numeric) = 0.77077617854460457218240063649023
absolute error = 0.77077617854460457218240063649023
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.106
y[1] (analytic) = 0
y[1] (numeric) = 0.77171929051257731096668097829523
absolute error = 0.77171929051257731096668097829523
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=515.0MB, alloc=4.5MB, time=50.11
x[1] = 1.107
y[1] (analytic) = 0
y[1] (numeric) = 0.77266262783532029797936922019039
absolute error = 0.77266262783532029797936922019039
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.108
y[1] (analytic) = 0
y[1] (numeric) = 0.77360619014045189340939536626372
absolute error = 0.77360619014045189340939536626372
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.109
y[1] (analytic) = 0
y[1] (numeric) = 0.7745499770552058501181364221873
absolute error = 0.7745499770552058501181364221873
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.11
y[1] (analytic) = 0
y[1] (numeric) = 0.77549398820643045262149935908409
absolute error = 0.77549398820643045262149935908409
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.111
y[1] (analytic) = 0
y[1] (numeric) = 0.77643822322058765825980732303344
absolute error = 0.77643822322058765825980732303344
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.112
y[1] (analytic) = 0
y[1] (numeric) = 0.77738268172375224054898354260546
absolute error = 0.77738268172375224054898354260546
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.113
y[1] (analytic) = 0
y[1] (numeric) = 0.7783273633416109347065730235909
absolute error = 0.7783273633416109347065730235909
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=518.8MB, alloc=4.5MB, time=50.49
x[1] = 1.114
y[1] (analytic) = 0
y[1] (numeric) = 0.77927226769946158534618749049154
absolute error = 0.77927226769946158534618749049154
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.115
y[1] (analytic) = 0
y[1] (numeric) = 0.78021739442221229633400414022467
absolute error = 0.78021739442221229633400414022467
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.116
y[1] (analytic) = 0
y[1] (numeric) = 0.78116274313438058280099361673098
absolute error = 0.78116274313438058280099361673098
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.117
y[1] (analytic) = 0
y[1] (numeric) = 0.78210831346009252530459719759704
absolute error = 0.78210831346009252530459719759704
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.118
y[1] (analytic) = 0
y[1] (numeric) = 0.78305410502308192613361750723887
absolute error = 0.78305410502308192613361750723887
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.119
y[1] (analytic) = 0
y[1] (numeric) = 0.78400011744668946775013113745207
absolute error = 0.78400011744668946775013113745207
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.12
y[1] (analytic) = 0
y[1] (numeric) = 0.78494635035386187336227536701488
absolute error = 0.78494635035386187336227536701488
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.121
y[1] (analytic) = 0
y[1] (numeric) = 0.78589280336715106962180472931514
absolute error = 0.78589280336715106962180472931514
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=522.6MB, alloc=4.5MB, time=50.87
x[1] = 1.122
y[1] (analytic) = 0
y[1] (numeric) = 0.78683947610871335144035648243049
absolute error = 0.78683947610871335144035648243049
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.123
y[1] (analytic) = 0
y[1] (numeric) = 0.78778636820030854891840709147675
absolute error = 0.78778636820030854891840709147675
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.124
y[1] (analytic) = 0
y[1] (numeric) = 0.78873347926329919638094464009469
absolute error = 0.78873347926329919638094464009469
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.125
y[1] (analytic) = 0
y[1] (numeric) = 0.78968080891864970351392464839633
absolute error = 0.78968080891864970351392464839633
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.126
y[1] (analytic) = 0
y[1] (numeric) = 0.79062835678692552859561909025321
absolute error = 0.79062835678692552859561909025321
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.127
y[1] (analytic) = 0
y[1] (numeric) = 0.79157612248829235381701047518027
absolute error = 0.79157612248829235381701047518027
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.128
y[1] (analytic) = 0
y[1] (numeric) = 0.79252410564251526268542469093716
absolute error = 0.79252410564251526268542469093716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=526.4MB, alloc=4.5MB, time=51.24
x[1] = 1.129
y[1] (analytic) = 0
y[1] (numeric) = 0.79347230586895791950563789400756
absolute error = 0.79347230586895791950563789400756
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.13
y[1] (analytic) = 0
y[1] (numeric) = 0.79442072278658175093273408798673
absolute error = 0.79442072278658175093273408798673
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.131
y[1] (analytic) = 0
y[1] (numeric) = 0.79536935601394512959103114625565
absolute error = 0.79536935601394512959103114625565
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.132
y[1] (analytic) = 0
y[1] (numeric) = 0.79631820516920255975343391678083
absolute error = 0.79631820516920255975343391678083
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.133
y[1] (analytic) = 0
y[1] (numeric) = 0.7972672698701038650756136950744
absolute error = 0.7972672698701038650756136950744
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.134
y[1] (analytic) = 0
y[1] (numeric) = 0.79821654973399337837945376788802
absolute error = 0.79821654973399337837945376788802
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.135
y[1] (analytic) = 0
y[1] (numeric) = 0.79916604437780913348024091669303
absolute error = 0.79916604437780913348024091669303
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.136
y[1] (analytic) = 0
y[1] (numeric) = 0.80011575341808205905212272800213
absolute error = 0.80011575341808205905212272800213
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=530.2MB, alloc=4.5MB, time=51.62
x[1] = 1.137
y[1] (analytic) = 0
y[1] (numeric) = 0.80106567647093517452639028868601
absolute error = 0.80106567647093517452639028868601
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.138
y[1] (analytic) = 0
y[1] (numeric) = 0.80201581315208278801718535019164
absolute error = 0.80201581315208278801718535019164
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.139
y[1] (analytic) = 0
y[1] (numeric) = 0.80296616307682969626927032752378
absolute error = 0.80296616307682969626927032752378
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.14
y[1] (analytic) = 0
y[1] (numeric) = 0.80391672586007038662253855854338
absolute error = 0.80391672586007038662253855854338
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.141
y[1] (analytic) = 0
y[1] (numeric) = 0.80486750111628824098798108808907
absolute error = 0.80486750111628824098798108808907
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.142
y[1] (analytic) = 0
y[1] (numeric) = 0.8058184884595547418298648611516
absolute error = 0.8058184884595547418298648611516
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.143
y[1] (analytic) = 0
y[1] (numeric) = 0.80676968750352868014891561132626
absolute error = 0.80676968750352868014891561132626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=534.0MB, alloc=4.5MB, time=51.99
x[1] = 1.144
y[1] (analytic) = 0
y[1] (numeric) = 0.80772109786145536546133691652252
absolute error = 0.80772109786145536546133691652252
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.145
y[1] (analytic) = 0
y[1] (numeric) = 0.8086727191461658377685348648995
absolute error = 0.8086727191461658377685348648995
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.146
y[1] (analytic) = 0
y[1] (numeric) = 0.80962455097007608151245553168622
absolute error = 0.80962455097007608151245553168622
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.147
y[1] (analytic) = 0
y[1] (numeric) = 0.81057659294518624151148001338939
absolute error = 0.81057659294518624151148001338939
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.148
y[1] (analytic) = 0
y[1] (numeric) = 0.81152884468307984087185910133209
absolute error = 0.81152884468307984087185910133209
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.149
y[1] (analytic) = 0
y[1] (numeric) = 0.81248130579492300086970680293468
absolute error = 0.81248130579492300086970680293468
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.15
y[1] (analytic) = 0
y[1] (numeric) = 0.81343397589146366279860883806508
absolute error = 0.81343397589146366279860883806508
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.151
y[1] (analytic) = 0
y[1] (numeric) = 0.81438685458303081177793895055818
absolute error = 0.81438685458303081177793895055818
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=537.8MB, alloc=4.5MB, time=52.37
x[1] = 1.152
y[1] (analytic) = 0
y[1] (numeric) = 0.81533994147953370251701238303203
absolute error = 0.81533994147953370251701238303203
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.153
y[1] (analytic) = 0
y[1] (numeric) = 0.81629323619046108703024216779909
absolute error = 0.81629323619046108703024216779909
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.154
y[1] (analytic) = 0
y[1] (numeric) = 0.81724673832488044429849998936085
absolute error = 0.81724673832488044429849998936085
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.155
y[1] (analytic) = 0
y[1] (numeric) = 0.81820044749143721187191927605026
absolute error = 0.81820044749143721187191927605026
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.156
y[1] (analytic) = 0
y[1] (numeric) = 0.81915436329835401940941388120376
absolute error = 0.81915436329835401940941388120376
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.157
y[1] (analytic) = 0
y[1] (numeric) = 0.82010848535342992415022121914896
absolute error = 0.82010848535342992415022121914896
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.158
y[1] (analytic) = 0
y[1] (numeric) = 0.82106281326403964831281402962031
absolute error = 0.82106281326403964831281402962031
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.159
y[1] (analytic) = 0
y[1] (numeric) = 0.82201734663713281841656005728758
absolute error = 0.82201734663713281841656005728758
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=541.7MB, alloc=4.5MB, time=52.74
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.16
y[1] (analytic) = 0
y[1] (numeric) = 0.82297208507923320652154385221587
absolute error = 0.82297208507923320652154385221587
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.161
y[1] (analytic) = 0
y[1] (numeric) = 0.82392702819643797338199962357514
absolute error = 0.82392702819643797338199962357514
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.162
y[1] (analytic) = 0
y[1] (numeric) = 0.82488217559441691350883861407688
absolute error = 0.82488217559441691350883861407688
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.163
y[1] (analytic) = 0
y[1] (numeric) = 0.82583752687841170213678880771975
absolute error = 0.82583752687841170213678880771975
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.164
y[1] (analytic) = 0
y[1] (numeric) = 0.82679308165323514409169893974988
absolute error = 0.82679308165323514409169893974988
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.165
y[1] (analytic) = 0
y[1] (numeric) = 0.82774883952327042455359274654982
absolute error = 0.82774883952327042455359274654982
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.166
y[1] (analytic) = 0
y[1] (numeric) = 0.82870480009247036171109317571858
absolute error = 0.82870480009247036171109317571858
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=545.5MB, alloc=4.5MB, time=53.12
x[1] = 1.167
y[1] (analytic) = 0
y[1] (numeric) = 0.82966096296435666130286987413951
absolute error = 0.82966096296435666130286987413951
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.168
y[1] (analytic) = 0
y[1] (numeric) = 0.8306173277420191730417966855888
absolute error = 0.8306173277420191730417966855888
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.169
y[1] (analytic) = 0
y[1] (numeric) = 0.83157389402811514891753912064309
absolute error = 0.83157389402811514891753912064309
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.17
y[1] (analytic) = 0
y[1] (numeric) = 0.83253066142486850337332481151652
absolute error = 0.83253066142486850337332481151652
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.171
y[1] (analytic) = 0
y[1] (numeric) = 0.83348762953406907535268283420454
absolute error = 0.83348762953406907535268283420454
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.172
y[1] (analytic) = 0
y[1] (numeric) = 0.83444479795707189221197047113281
absolute error = 0.83444479795707189221197047113281
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.173
y[1] (analytic) = 0
y[1] (numeric) = 0.83540216629479643549453850059472
absolute error = 0.83540216629479643549453850059472
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.174
y[1] (analytic) = 0
y[1] (numeric) = 0.8363597341477259085624184357913
absolute error = 0.8363597341477259085624184357913
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=549.3MB, alloc=4.5MB, time=53.49
TOP MAIN SOLVE Loop
x[1] = 1.175
y[1] (analytic) = 0
y[1] (numeric) = 0.83731750111590650608144729743464
absolute error = 0.83731750111590650608144729743464
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.176
y[1] (analytic) = 0
y[1] (numeric) = 0.83827546679894668535577749080378
absolute error = 0.83827546679894668535577749080378
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.177
y[1] (analytic) = 0
y[1] (numeric) = 0.83923363079601643950775117200441
absolute error = 0.83923363079601643950775117200441
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.178
y[1] (analytic) = 0
y[1] (numeric) = 0.84019199270584657249915013012643
absolute error = 0.84019199270584657249915013012643
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.179
y[1] (analytic) = 0
y[1] (numeric) = 0.84115055212672797598986368315358
absolute error = 0.84115055212672797598986368315358
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.18
y[1] (analytic) = 0
y[1] (numeric) = 0.84210930865651090803004838698494
absolute error = 0.84210930865651090803004838698494
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.181
y[1] (analytic) = 0
y[1] (numeric) = 0.84306826189260427358188448989947
absolute error = 0.84306826189260427358188448989947
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=553.1MB, alloc=4.5MB, time=53.86
x[1] = 1.182
y[1] (analytic) = 0
y[1] (numeric) = 0.84402741143197490686706503034287
absolute error = 0.84402741143197490686706503034287
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.183
y[1] (analytic) = 0
y[1] (numeric) = 0.84498675687114685553618427514429
absolute error = 0.84498675687114685553618427514429
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.184
y[1] (analytic) = 0
y[1] (numeric) = 0.84594629780620066665622282927349
absolute error = 0.84594629780620066665622282927349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.185
y[1] (analytic) = 0
y[1] (numeric) = 0.84690603383277267451235721811297
absolute error = 0.84690603383277267451235721811297
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.186
y[1] (analytic) = 0
y[1] (numeric) = 0.84786596454605429022035205002352
absolute error = 0.84786596454605429022035205002352
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.187
y[1] (analytic) = 0
y[1] (numeric) = 0.84882608954079129314582301179513
absolute error = 0.84882608954079129314582301179513
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.188
y[1] (analytic) = 0
y[1] (numeric) = 0.84978640841128312412668893346054
absolute error = 0.84978640841128312412668893346054
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.189
y[1] (analytic) = 0
y[1] (numeric) = 0.85074692075138218049516098296047
absolute error = 0.85074692075138218049516098296047
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=556.9MB, alloc=4.5MB, time=54.24
x[1] = 1.19
y[1] (analytic) = 0
y[1] (numeric) = 0.85170762615449311289564671633353
absolute error = 0.85170762615449311289564671633353
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.191
y[1] (analytic) = 0
y[1] (numeric) = 0.85266852421357212389497621649909
absolute error = 0.85266852421357212389497621649909
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.192
y[1] (analytic) = 0
y[1] (numeric) = 0.85362961452112626838138690433781
absolute error = 0.85362961452112626838138690433781
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.193
y[1] (analytic) = 0
y[1] (numeric) = 0.854590896669212755748732800676
absolute error = 0.854590896669212755748732800676
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.194
y[1] (analytic) = 0
y[1] (numeric) = 0.85555237024943825386241305796122
absolute error = 0.85555237024943825386241305796122
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.195
y[1] (analytic) = 0
y[1] (numeric) = 0.85651403485295819480354346688534
absolute error = 0.85651403485295819480354346688534
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.196
y[1] (analytic) = 0
y[1] (numeric) = 0.85747589007047608238792337696821
absolute error = 0.85747589007047608238792337696821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=560.7MB, alloc=4.5MB, time=54.61
x[1] = 1.197
y[1] (analytic) = 0
y[1] (numeric) = 0.85843793549224280145637905215263
absolute error = 0.85843793549224280145637905215263
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.198
y[1] (analytic) = 0
y[1] (numeric) = 0.85940017070805592893309291376463
absolute error = 0.85940017070805592893309291376463
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.199
y[1] (analytic) = 0
y[1] (numeric) = 0.86036259530725904664855640474071
absolute error = 0.86036259530725904664855640474071
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.2
y[1] (analytic) = 0
y[1] (numeric) = 0.86132520887874105592381234178604
absolute error = 0.86132520887874105592381234178604
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.201
y[1] (analytic) = 0
y[1] (numeric) = 0.86228801101093549391268060706798
absolute error = 0.86228801101093549391268060706798
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.202
y[1] (analytic) = 0
y[1] (numeric) = 0.86325100129181985169868886912446
absolute error = 0.86325100129181985169868886912446
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.203
y[1] (analytic) = 0
y[1] (numeric) = 0.86421417930891489414345771482583
absolute error = 0.86421417930891489414345771482583
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.204
y[1] (analytic) = 0
y[1] (numeric) = 0.86517754464928398148331712141365
absolute error = 0.86517754464928398148331712141365
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=564.5MB, alloc=4.5MB, time=54.98
x[1] = 1.205
y[1] (analytic) = 0
y[1] (numeric) = 0.86614109689953239267095860078618
absolute error = 0.86614109689953239267095860078618
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.206
y[1] (analytic) = 0
y[1] (numeric) = 0.86710483564580665045895460823593
absolute error = 0.86710483564580665045895460823593
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.207
y[1] (analytic) = 0
y[1] (numeric) = 0.8680687604737938482220039256914
absolute error = 0.8680687604737938482220039256914
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.208
y[1] (analytic) = 0
y[1] (numeric) = 0.86903287096872097851478870608683
absolute error = 0.86903287096872097851478870608683
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.209
y[1] (analytic) = 0
y[1] (numeric) = 0.8699971667153542633623557016894
absolute error = 0.8699971667153542633623557016894
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.21
y[1] (analytic) = 0
y[1] (numeric) = 0.87096164729799848627996089595249
absolute error = 0.87096164729799848627996089595249
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.211
y[1] (analytic) = 0
y[1] (numeric) = 0.87192631230049632601934331663221
absolute error = 0.87192631230049632601934331663221
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=568.4MB, alloc=4.5MB, time=55.36
x[1] = 1.212
y[1] (analytic) = 0
y[1] (numeric) = 0.87289116130622769203842022838909
absolute error = 0.87289116130622769203842022838909
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.213
y[1] (analytic) = 0
y[1] (numeric) = 0.87385619389810906169142218677958
absolute error = 0.87385619389810906169142218677958
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.214
y[1] (analytic) = 0
y[1] (numeric) = 0.87482140965859281913651258329724
absolute error = 0.87482140965859281913651258329724
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.215
y[1] (analytic) = 0
y[1] (numeric) = 0.87578680816966659595796232381987
absolute error = 0.87578680816966659595796232381987
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.216
y[1] (analytic) = 0
y[1] (numeric) = 0.87675238901285261349997616131768
absolute error = 0.87675238901285261349997616131768
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.217
y[1] (analytic) = 0
y[1] (numeric) = 0.87771815176920702690929294883539
absolute error = 0.87771815176920702690929294883539
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.218
y[1] (analytic) = 0
y[1] (numeric) = 0.87868409601931927088370769142623
absolute error = 0.87868409601931927088370769142623
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.219
y[1] (analytic) = 0
y[1] (numeric) = 0.87965022134331140712368875673195
absolute error = 0.87965022134331140712368875673195
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=572.2MB, alloc=4.5MB, time=55.73
x[1] = 1.22
y[1] (analytic) = 0
y[1] (numeric) = 0.88061652732083747348428895410671
absolute error = 0.88061652732083747348428895410671
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.221
y[1] (analytic) = 0
y[1] (numeric) = 0.88158301353108283482457441240483
absolute error = 0.88158301353108283482457441240483
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.222
y[1] (analytic) = 0
y[1] (numeric) = 0.88254967955276353555182027761743
absolute error = 0.88254967955276353555182027761743
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.223
y[1] (analytic) = 0
y[1] (numeric) = 0.88351652496412565385774721426976
absolute error = 0.88351652496412565385774721426976
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.224
y[1] (analytic) = 0
y[1] (numeric) = 0.88448354934294465764409752969193
absolute error = 0.88448354934294465764409752969193
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.225
y[1] (analytic) = 0
y[1] (numeric) = 0.8854507522665247621348744487574
absolute error = 0.8854507522665247621348744487574
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.226
y[1] (analytic) = 0
y[1] (numeric) = 0.88641813331169828917259264924685
absolute error = 0.88641813331169828917259264924685
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=576.0MB, alloc=4.5MB, time=56.10
x[1] = 1.227
y[1] (analytic) = 0
y[1] (numeric) = 0.88738569205482502819591262543482
absolute error = 0.88738569205482502819591262543482
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.228
y[1] (analytic) = 0
y[1] (numeric) = 0.88835342807179159889605578060161
absolute error = 0.88835342807179159889605578060161
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.229
y[1] (analytic) = 0
y[1] (numeric) = 0.88932134093801081554942135872706
absolute error = 0.88932134093801081554942135872706
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.23
y[1] (analytic) = 0
y[1] (numeric) = 0.89028943022842105302385041240332
absolute error = 0.89028943022842105302385041240332
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.231
y[1] (analytic) = 0
y[1] (numeric) = 0.89125769551748561445600596878245
absolute error = 0.89125769551748561445600596878245
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.232
y[1] (analytic) = 0
y[1] (numeric) = 0.89222613637919210059736239891834
absolute error = 0.89222613637919210059736239891834
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.233
y[1] (analytic) = 0
y[1] (numeric) = 0.89319475238705178082632071893131
absolute error = 0.89319475238705178082632071893131
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.234
y[1] (analytic) = 0
y[1] (numeric) = 0.89416354311409896582399015477313
absolute error = 0.89416354311409896582399015477313
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=579.8MB, alloc=4.5MB, time=56.48
x[1] = 1.235
y[1] (analytic) = 0
y[1] (numeric) = 0.89513250813289038191119978675024
absolute error = 0.89513250813289038191119978675024
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.236
y[1] (analytic) = 0
y[1] (numeric) = 0.89610164701550454704432745611698
absolute error = 0.89610164701550454704432745611698
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.237
y[1] (analytic) = 0
y[1] (numeric) = 0.8970709593335411484675563647186
absolute error = 0.8970709593335411484675563647186
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.238
y[1] (analytic) = 0
y[1] (numeric) = 0.89804044465812042201919293057814
absolute error = 0.89804044465812042201919293057814
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.239
y[1] (analytic) = 0
y[1] (numeric) = 0.89901010255988253308970247821105
absolute error = 0.89901010255988253308970247821105
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.24
y[1] (analytic) = 0
y[1] (numeric) = 0.8999799326089869592291422430388
absolute error = 0.8999799326089869592291422430388
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.241
y[1] (analytic) = 0
y[1] (numeric) = 0.90094993437511187440169395527567
absolute error = 0.90094993437511187440169395527567
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.242
y[1] (analytic) = 0
y[1] (numeric) = 0.90192010742745353488502094079416
absolute error = 0.90192010742745353488502094079416
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=583.6MB, alloc=4.5MB, time=56.85
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.243
y[1] (analytic) = 0
y[1] (numeric) = 0.9028904513347256668121972354404
absolute error = 0.9028904513347256668121972354404
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.244
y[1] (analytic) = 0
y[1] (numeric) = 0.90386096566515885535397865577502
absolute error = 0.90386096566515885535397865577502
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.245
y[1] (analytic) = 0
y[1] (numeric) = 0.90483164998649993553920810395303
absolute error = 0.90483164998649993553920810395303
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.246
y[1] (analytic) = 0
y[1] (numeric) = 0.90580250386601138471116960812124
absolute error = 0.90580250386601138471116960812124
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.247
y[1] (analytic) = 0
y[1] (numeric) = 0.9067735268704707166177277129905
absolute error = 0.9067735268704707166177277129905
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.248
y[1] (analytic) = 0
y[1] (numeric) = 0.90774471856616987713311083881429
absolute error = 0.90774471856616987713311083881429
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.249
y[1] (analytic) = 0
y[1] (numeric) = 0.90871607851891464160921912155282
absolute error = 0.90871607851891464160921912155282
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=587.4MB, alloc=4.6MB, time=57.23
x[1] = 1.25
y[1] (analytic) = 0
y[1] (numeric) = 0.90968760629402401385435903319452
absolute error = 0.90968760629402401385435903319452
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.251
y[1] (analytic) = 0
y[1] (numeric) = 0.91065930145632962673732875971247
absolute error = 0.91065930145632962673732875971247
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.252
y[1] (analytic) = 0
y[1] (numeric) = 0.91163116357017514441479988561428
absolute error = 0.91163116357017514441479988561428
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.253
y[1] (analytic) = 0
y[1] (numeric) = 0.91260319219941566617996239915867
absolute error = 0.91260319219941566617996239915867
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.254
y[1] (analytic) = 0
y[1] (numeric) = 0.91357538690741713193042139171278
absolute error = 0.91357538690741713193042139171278
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.255
y[1] (analytic) = 0
y[1] (numeric) = 0.91454774725705572925335507906062
absolute error = 0.91454774725705572925335507906062
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.256
y[1] (analytic) = 0
y[1] (numeric) = 0.9155202728107173021259649223879
absolute error = 0.9155202728107173021259649223879
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.257
y[1] (analytic) = 0
y[1] (numeric) = 0.91649296313029676122926967280189
absolute error = 0.91649296313029676122926967280189
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=591.3MB, alloc=4.6MB, time=57.60
TOP MAIN SOLVE Loop
x[1] = 1.258
y[1] (analytic) = 0
y[1] (numeric) = 0.91746581777719749587331610623047
absolute error = 0.91746581777719749587331610623047
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.259
y[1] (analytic) = 0
y[1] (numeric) = 0.91843883631233078753190005601365
absolute error = 0.91843883631233078753190005601365
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.26
y[1] (analytic) = 0
y[1] (numeric) = 0.91941201829611522498491208907768
absolute error = 0.91941201829611522498491208907768
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.261
y[1] (analytic) = 0
y[1] (numeric) = 0.92038536328847612106644280888853
absolute error = 0.92038536328847612106644280888853
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.262
y[1] (analytic) = 0
y[1] (numeric) = 0.92135887084884493101680330503429
absolute error = 0.92135887084884493101680330503429
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.263
y[1] (analytic) = 0
y[1] (numeric) = 0.92233254053615867243663670589721
absolute error = 0.92233254053615867243663670589721
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.264
y[1] (analytic) = 0
y[1] (numeric) = 0.92330637190885934684131712805329
absolute error = 0.92330637190885934684131712805329
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=595.1MB, alloc=4.6MB, time=57.97
x[1] = 1.265
y[1] (analytic) = 0
y[1] (numeric) = 0.92428036452489336281385255438463
absolute error = 0.92428036452489336281385255438463
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.266
y[1] (analytic) = 0
y[1] (numeric) = 0.92525451794171096075452831300583
absolute error = 0.92525451794171096075452831300583
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.267
y[1] (analytic) = 0
y[1] (numeric) = 0.92622883171626563922554787158568
absolute error = 0.92622883171626563922554787158568
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.268
y[1] (analytic) = 0
y[1] (numeric) = 0.92720330540501358288894760708027
absolute error = 0.92720330540501358288894760708027
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.269
y[1] (analytic) = 0
y[1] (numeric) = 0.92817793856391309203608205986928
absolute error = 0.92817793856391309203608205986928
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.27
y[1] (analytic) = 0
y[1] (numeric) = 0.92915273074842401370699593438664
absolute error = 0.92915273074842401370699593438664
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.271
y[1] (analytic) = 0
y[1] (numeric) = 0.93012768151350717439801876613755
absolute error = 0.93012768151350717439801876613755
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.272
y[1] (analytic) = 0
y[1] (numeric) = 0.93110279041362381435593773807046
absolute error = 0.93110279041362381435593773807046
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=598.9MB, alloc=4.6MB, time=58.35
x[1] = 1.273
y[1] (analytic) = 0
y[1] (numeric) = 0.93207805700273502345712359819493
absolute error = 0.93207805700273502345712359819493
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.274
y[1] (analytic) = 0
y[1] (numeric) = 0.93305348083430117867000400566996
absolute error = 0.93305348083430117867000400566996
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.275
y[1] (analytic) = 0
y[1] (numeric) = 0.93402906146128138309929791489504
absolute error = 0.93402906146128138309929791489504
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.276
y[1] (analytic) = 0
y[1] (numeric) = 0.93500479843613290661044379697462
absolute error = 0.93500479843613290661044379697462
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.277
y[1] (analytic) = 0
y[1] (numeric) = 0.93598069131081062803267359585117
absolute error = 0.93598069131081062803267359585117
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.278
y[1] (analytic) = 0
y[1] (numeric) = 0.93695673963676647893920332296154
absolute error = 0.93695673963676647893920332296154
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.279
y[1] (analytic) = 0
y[1] (numeric) = 0.93793294296494888900303011001252
absolute error = 0.93793294296494888900303011001252
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=602.7MB, alloc=4.6MB, time=58.72
x[1] = 1.28
y[1] (analytic) = 0
y[1] (numeric) = 0.93890930084580223292684436493673
absolute error = 0.93890930084580223292684436493673
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.281
y[1] (analytic) = 0
y[1] (numeric) = 0.93988581282926627894558441181718
absolute error = 0.93988581282926627894558441181718
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.282
y[1] (analytic) = 0
y[1] (numeric) = 0.94086247846477563890017964209339
absolute error = 0.94086247846477563890017964209339
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.283
y[1] (analytic) = 0
y[1] (numeric) = 0.94183929730125921988104676221393
absolute error = 0.94183929730125921988104676221393
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.284
y[1] (analytic) = 0
y[1] (numeric) = 0.94281626888713967743992219260718
absolute error = 0.94281626888713967743992219260718
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.285
y[1] (analytic) = 0
y[1] (numeric) = 0.9437933927703328703686320549276
absolute error = 0.9437933927703328703686320549276
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.286
y[1] (analytic) = 0
y[1] (numeric) = 0.94477066849824731704341947951772
absolute error = 0.94477066849824731704341947951772
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.287
y[1] (analytic) = 0
y[1] (numeric) = 0.94574809561778365333346717342333
absolute error = 0.94574809561778365333346717342333
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=606.5MB, alloc=4.6MB, time=59.09
x[1] = 1.288
y[1] (analytic) = 0
y[1] (numeric) = 0.94672567367533409207227131162284
absolute error = 0.94672567367533409207227131162284
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.289
y[1] (analytic) = 0
y[1] (numeric) = 0.94770340221678188409054085089026
absolute error = 0.94770340221678188409054085089026
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.29
y[1] (analytic) = 0
y[1] (numeric) = 0.9486812807875007808093143174102
absolute error = 0.9486812807875007808093143174102
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.291
y[1] (analytic) = 0
y[1] (numeric) = 0.94965930893235449839200398640391
absolute error = 0.94965930893235449839200398640391
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.292
y[1] (analytic) = 0
y[1] (numeric) = 0.95063748619569618345409515510627
absolute error = 0.95063748619569618345409515510627
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.293
y[1] (analytic) = 0
y[1] (numeric) = 0.95161581212136788032924590994881
absolute error = 0.95161581212136788032924590994881
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.294
y[1] (analytic) = 0
y[1] (numeric) = 0.95259428625269999989055040524509
absolute error = 0.95259428625269999989055040524509
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=610.3MB, alloc=4.6MB, time=59.47
x[1] = 1.295
y[1] (analytic) = 0
y[1] (numeric) = 0.953572908132510789925746204529
absolute error = 0.953572908132510789925746204529
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.296
y[1] (analytic) = 0
y[1] (numeric) = 0.95455167730310580706516368744871
absolute error = 0.95455167730310580706516368744871
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.297
y[1] (analytic) = 0
y[1] (numeric) = 0.95553059330627739026123289524938
absolute error = 0.95553059330627739026123289524938
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.298
y[1] (analytic) = 0
y[1] (numeric) = 0.95650965568330413581838047686426
absolute error = 0.95650965568330413581838047686426
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.299
y[1] (analytic) = 0
y[1] (numeric) = 0.95748886397495037397216660595025
absolute error = 0.95748886397495037397216660595025
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.3
y[1] (analytic) = 0
y[1] (numeric) = 0.9584682177214656470165288673212
absolute error = 0.9584682177214656470165288673212
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.301
y[1] (analytic) = 0
y[1] (numeric) = 0.95944771646258418897801715961799
absolute error = 0.95944771646258418897801715961799
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.302
y[1] (analytic) = 0
y[1] (numeric) = 0.96042735973752440683592063017266
absolute error = 0.96042735973752440683592063017266
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=614.1MB, alloc=4.6MB, time=59.84
x[1] = 1.303
y[1] (analytic) = 0
y[1] (numeric) = 0.96140714708498836328720454833549
absolute error = 0.96140714708498836328720454833549
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.304
y[1] (analytic) = 0
y[1] (numeric) = 0.9623870780431612610551918354972
absolute error = 0.9623870780431612610551918354972
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.305
y[1] (analytic) = 0
y[1] (numeric) = 0.96336715214971092874094070410716
absolute error = 0.96336715214971092874094070410716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.306
y[1] (analytic) = 0
y[1] (numeric) = 0.96434736894178730821628651461485
absolute error = 0.96434736894178730821628651461485
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.307
y[1] (analytic) = 0
y[1] (numeric) = 0.96532772795602194355753253889332
absolute error = 0.96532772795602194355753253889332
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.308
y[1] (analytic) = 0
y[1] (numeric) = 0.96630822872852747151879082178554
absolute error = 0.96630822872852747151879082178554
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.309
y[1] (analytic) = 0
y[1] (numeric) = 0.96728887079489711354399075938934
absolute error = 0.96728887079489711354399075938934
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.31
y[1] (analytic) = 0
y[1] (numeric) = 0.96826965369020416931658936400274
absolute error = 0.96826965369020416931658936400274
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=618.0MB, alloc=4.6MB, time=60.21
TOP MAIN SOLVE Loop
x[1] = 1.311
y[1] (analytic) = 0
y[1] (numeric) = 0.96925057694900151184603346172485
absolute error = 0.96925057694900151184603346172485
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.312
y[1] (analytic) = 0
y[1] (numeric) = 0.97023164010532108409004026998121
absolute error = 0.97023164010532108409004026998121
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.313
y[1] (analytic) = 0
y[1] (numeric) = 0.97121284269267339711177892914572
absolute error = 0.97121284269267339711177892914572
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.314
y[1] (analytic) = 0
y[1] (numeric) = 0.9721941842440470297710516153916
absolute error = 0.9721941842440470297710516153916
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.315
y[1] (analytic) = 0
y[1] (numeric) = 0.97317566429190812994858884134428
absolute error = 0.97317566429190812994858884134428
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.316
y[1] (analytic) = 0
y[1] (numeric) = 0.97415728236819991730258945745148
absolute error = 0.97415728236819991730258945745148
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.317
y[1] (analytic) = 0
y[1] (numeric) = 0.97513903800434218755665170064684
absolute error = 0.97513903800434218755665170064684
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=621.8MB, alloc=4.6MB, time=60.59
x[1] = 1.318
y[1] (analytic) = 0
y[1] (numeric) = 0.97612093073123081831825739827961
absolute error = 0.97612093073123081831825739827961
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.319
y[1] (analytic) = 0
y[1] (numeric) = 0.97710296007923727642698712482519
absolute error = 0.97710296007923727642698712482519
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.32
y[1] (analytic) = 0
y[1] (numeric) = 0.97808512557820812683165972698976
absolute error = 0.97808512557820812683165972698976
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.321
y[1] (analytic) = 0
y[1] (numeric) = 0.97906742675746454299560517988279
absolute error = 0.97906742675746454299560517988279
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.322
y[1] (analytic) = 0
y[1] (numeric) = 0.98004986314580181882929521335817
absolute error = 0.98004986314580181882929521335817
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.323
y[1] (analytic) = 0
y[1] (numeric) = 0.98103243427148888214957155381805
absolute error = 0.98103243427148888214957155381805
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.324
y[1] (analytic) = 0
y[1] (numeric) = 0.98201513966226780966472696313214
absolute error = 0.98201513966226780966472696313214
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.325
y[1] (analytic) = 0
y[1] (numeric) = 0.98299797884535334348470952324384
absolute error = 0.98299797884535334348470952324384
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=625.6MB, alloc=4.6MB, time=60.97
x[1] = 1.326
y[1] (analytic) = 0
y[1] (numeric) = 0.98398095134743240915573581290619
absolute error = 0.98398095134743240915573581290619
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.327
y[1] (analytic) = 0
y[1] (numeric) = 0.98496405669466363521861375220477
absolute error = 0.98496405669466363521861375220477
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.328
y[1] (analytic) = 0
y[1] (numeric) = 0.98594729441267687429009095146879
absolute error = 0.98594729441267687429009095146879
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.329
y[1] (analytic) = 0
y[1] (numeric) = 0.98693066402657272566655939422984
absolute error = 0.98693066402657272566655939422984
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.33
y[1] (analytic) = 0
y[1] (numeric) = 0.98791416506092205944946220944221
absolute error = 0.98791416506092205944946220944221
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.331
y[1] (analytic) = 0
y[1] (numeric) = 0.98889779703976554219176314660858
absolute error = 0.98889779703976554219176314660858
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.332
y[1] (analytic) = 0
y[1] (numeric) = 0.98988155948661316406485415913628
absolute error = 0.98988155948661316406485415913628
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=629.4MB, alloc=4.6MB, time=61.34
x[1] = 1.333
y[1] (analytic) = 0
y[1] (numeric) = 0.99086545192444376754529122655685
absolute error = 0.99086545192444376754529122655685
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.334
y[1] (analytic) = 0
y[1] (numeric) = 0.99184947387570457762076320554628
absolute error = 0.99184947387570457762076320554628
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.335
y[1] (analytic) = 0
y[1] (numeric) = 0.99283362486231073351471309335387
absolute error = 0.99283362486231073351471309335387
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.336
y[1] (analytic) = 0
y[1] (numeric) = 0.99381790440564482192904561565072
absolute error = 0.99381790440564482192904561565072
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.337
y[1] (analytic) = 0
y[1] (numeric) = 0.99480231202655641180436951430761
absolute error = 0.99480231202655641180436951430761
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.338
y[1] (analytic) = 0
y[1] (numeric) = 0.99578684724536159059723730956856
absolute error = 0.99578684724536159059723730956856
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.339
y[1] (analytic) = 0
y[1] (numeric) = 0.99677150958184250207385964585844
absolute error = 0.99677150958184250207385964585844
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.34
y[1] (analytic) = 0
y[1] (numeric) = 0.99775629855524688561978560140757
absolute error = 0.99775629855524688561978560140757
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=633.2MB, alloc=4.6MB, time=61.72
x[1] = 1.341
y[1] (analytic) = 0
y[1] (numeric) = 0.99874121368428761706505454934722
absolute error = 0.99874121368428761706505454934722
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.342
y[1] (analytic) = 0
y[1] (numeric) = 0.99972625448714225102433930227777
absolute error = 0.99972625448714225102433930227777
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.343
y[1] (analytic) = 0
y[1] (numeric) = 1.0007114204814525647516143538864
absolute error = 1.0007114204814525647516143538864
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.344
y[1] (analytic) = 0
y[1] (numeric) = 1.0016967111843241035088970503389
absolute error = 1.0016967111843241035088970503389
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.345
y[1] (analytic) = 0
y[1] (numeric) = 1.0026821261123257274486234812347
absolute error = 1.0026821261123257274486234812347
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.346
y[1] (analytic) = 0
y[1] (numeric) = 1.00366766478148916000923477524
absolute error = 1.00366766478148916000923477524
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.347
y[1] (analytic) = 0
y[1] (numeric) = 1.0046533267073085378235633194339
absolute error = 1.0046533267073085378235633194339
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=637.0MB, alloc=4.6MB, time=62.10
x[1] = 1.348
y[1] (analytic) = 0
y[1] (numeric) = 1.0056391114047399621396221942644
absolute error = 1.0056391114047399621396221942644
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.349
y[1] (analytic) = 0
y[1] (numeric) = 1.0066250183882010517534148281362
absolute error = 1.0066250183882010517534148281362
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.35
y[1] (analytic) = 0
y[1] (numeric) = 1.0076110471715704974533955273879
absolute error = 1.0076110471715704974533955273879
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.351
y[1] (analytic) = 0
y[1] (numeric) = 1.008597197268187617976225129079
absolute error = 1.008597197268187617976225129079
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.352
y[1] (analytic) = 0
y[1] (numeric) = 1.0095834681908519174734795559355
absolute error = 1.0095834681908519174734795559355
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.353
y[1] (analytic) = 0
y[1] (numeric) = 1.0105698594518226444889825253152
absolute error = 1.0105698594518226444889825253152
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.354
y[1] (analytic) = 0
y[1] (numeric) = 1.0115563705628183524464470774792
absolute error = 1.0115563705628183524464470774792
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.355
y[1] (analytic) = 0
y[1] (numeric) = 1.012543001035016461647123943112
absolute error = 1.012543001035016461647123943112
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=640.8MB, alloc=4.6MB, time=62.47
x[1] = 1.356
y[1] (analytic) = 0
y[1] (numeric) = 1.0135297503790528227771680662393
absolute error = 1.0135297503790528227771680662393
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.357
y[1] (analytic) = 0
y[1] (numeric) = 1.0145166181050212819244478367678
absolute error = 1.0145166181050212819244478367678
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.358
y[1] (analytic) = 0
y[1] (numeric) = 1.0155036037224732471045347671289
absolute error = 1.0155036037224732471045347671289
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.359
y[1] (analytic) = 0
y[1] (numeric) = 1.0164907067404172562956244702605
absolute error = 1.0164907067404172562956244702605
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.36
y[1] (analytic) = 0
y[1] (numeric) = 1.0174779266673185469821528617196
absolute error = 1.0174779266673185469821528617196
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.361
y[1] (analytic) = 0
y[1] (numeric) = 1.0184652630110986272068845173905
absolute error = 1.0184652630110986272068845173905
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.362
y[1] (analytic) = 0
y[1] (numeric) = 1.0194527152791348481312630703451
absolute error = 1.0194527152791348481312630703451
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.363
y[1] (analytic) = 0
y[1] (numeric) = 1.0204402829782599781038264262294
absolute error = 1.0204402829782599781038264262294
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=644.7MB, alloc=4.6MB, time=62.85
TOP MAIN SOLVE Loop
x[1] = 1.364
y[1] (analytic) = 0
y[1] (numeric) = 1.021427965614761778236502416392
absolute error = 1.021427965614761778236502416392
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.365
y[1] (analytic) = 0
y[1] (numeric) = 1.0224157626943825794886132921399
absolute error = 1.0224157626943825794886132921399
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.366
y[1] (analytic) = 0
y[1] (numeric) = 1.0234036737223188612584301922997
absolute error = 1.0234036737223188612584301922997
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.367
y[1] (analytic) = 0
y[1] (numeric) = 1.0243916982032208314821313899762
absolute error = 1.0243916982032208314821313899762
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.368
y[1] (analytic) = 0
y[1] (numeric) = 1.0253798356411920082400307433275
absolute error = 1.0253798356411920082400307433275
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.369
y[1] (analytic) = 0
y[1] (numeric) = 1.0263680855397888028699553396072
absolute error = 1.0263680855397888028699553396072
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.37
y[1] (analytic) = 0
y[1] (numeric) = 1.027356447402020104587663831956
absolute error = 1.027356447402020104587663831956
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=648.5MB, alloc=4.6MB, time=63.23
x[1] = 1.371
y[1] (analytic) = 0
y[1] (numeric) = 1.0283449207303468666142094247339
absolute error = 1.0283449207303468666142094247339
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.372
y[1] (analytic) = 0
y[1] (numeric) = 1.0293335050266816938101638658689
absolute error = 1.0293335050266816938101638658689
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.373
y[1] (analytic) = 0
y[1] (numeric) = 1.0303221997923884318166311540313
absolute error = 1.0303221997923884318166311540313
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.374
y[1] (analytic) = 0
y[1] (numeric) = 1.0313110045282817577029919647156
absolute error = 1.0313110045282817577029919647156
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.375
y[1] (analytic) = 0
y[1] (numeric) = 1.0322999187346267721213320427964
absolute error = 1.0322999187346267721213320427964
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.376
y[1] (analytic) = 0
y[1] (numeric) = 1.0332889419111385929675200001074
absolute error = 1.0332889419111385929675200001074
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.377
y[1] (analytic) = 0
y[1] (numeric) = 1.0342780735569819505489120953419
absolute error = 1.0342780735569819505489120953419
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.378
y[1] (analytic) = 0
y[1] (numeric) = 1.0352673131707707842586736603697
absolute error = 1.0352673131707707842586736603697
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=652.3MB, alloc=4.6MB, time=63.60
x[1] = 1.379
y[1] (analytic) = 0
y[1] (numeric) = 1.0362566602505678407567188721772
absolute error = 1.0362566602505678407567188721772
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.38
y[1] (analytic) = 0
y[1] (numeric) = 1.0372461142938842736572825533397
absolute error = 1.0372461142938842736572825533397
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.381
y[1] (analytic) = 0
y[1] (numeric) = 1.0382356747976792447231496164907
absolute error = 1.0382356747976792447231496164907
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.382
y[1] (analytic) = 0
y[1] (numeric) = 1.0392253412583595265665796499364
absolute error = 1.0392253412583595265665796499364
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.383
y[1] (analytic) = 0
y[1] (numeric) = 1.0402151131717791068569759726342
absolute error = 1.0402151131717791068569759726342
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.384
y[1] (analytic) = 0
y[1] (numeric) = 1.041204990033238794035360267476
absolute error = 1.041204990033238794035360267476
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.385
y[1] (analytic) = 0
y[1] (numeric) = 1.0421949713374858245357256324568
absolute error = 1.0421949713374858245357256324568
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=656.1MB, alloc=4.6MB, time=63.97
x[1] = 1.386
y[1] (analytic) = 0
y[1] (numeric) = 1.0431850565787134715133525701204
absolute error = 1.0431850565787134715133525701204
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.387
y[1] (analytic) = 0
y[1] (numeric) = 1.0441752452505606550801840669169
absolute error = 1.0441752452505606550801840669169
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.388
y[1] (analytic) = 0
y[1] (numeric) = 1.0451655368461115540473674960415
absolute error = 1.0451655368461115540473674960415
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.389
y[1] (analytic) = 0
y[1] (numeric) = 1.0461559308578952191750826101984
absolute error = 1.0461559308578952191750826101984
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.39
y[1] (analytic) = 0
y[1] (numeric) = 1.0471464267778851879297863748062
absolute error = 1.0471464267778851879297863748062
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.391
y[1] (analytic) = 0
y[1] (numeric) = 1.0481370240974991007490168276805
absolute error = 1.0481370240974991007490168276805
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.392
y[1] (analytic) = 0
y[1] (numeric) = 1.0491277223075983188139095384448
absolute error = 1.0491277223075983188139095384448
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.393
y[1] (analytic) = 0
y[1] (numeric) = 1.0501185208984875433295915800823
absolute error = 1.0501185208984875433295915800823
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=659.9MB, alloc=4.6MB, time=64.35
x[1] = 1.394
y[1] (analytic) = 0
y[1] (numeric) = 1.0511094193599144363136292163898
absolute error = 1.0511094193599144363136292163898
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.395
y[1] (analytic) = 0
y[1] (numeric) = 1.0521004171810692428927167528837
absolute error = 1.0521004171810692428927167528837
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.396
y[1] (analytic) = 0
y[1] (numeric) = 1.0530915138505844151078051951691
absolute error = 1.0530915138505844151078051951691
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.397
y[1] (analytic) = 0
y[1] (numeric) = 1.0540827088565342372278805081661
absolute error = 1.0540827088565342372278805081661
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.398
y[1] (analytic) = 0
y[1] (numeric) = 1.0550740016864344525726123721286
absolute error = 1.0550740016864344525726123721286
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.399
y[1] (analytic) = 0
y[1] (numeric) = 1.0560653918272418918441053873269
absolute error = 1.0560653918272418918441053873269
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.4
y[1] (analytic) = 0
y[1] (numeric) = 1.057056878765354102967995688834
absolute error = 1.057056878765354102967995688834
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=663.7MB, alloc=4.6MB, time=64.72
x[1] = 1.401
y[1] (analytic) = 0
y[1] (numeric) = 1.0580484619866089824441468962928
absolute error = 1.0580484619866089824441468962928
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.402
y[1] (analytic) = 0
y[1] (numeric) = 1.0590401409762844082072102410758
absolute error = 1.0590401409762844082072102410758
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.403
y[1] (analytic) = 0
y[1] (numeric) = 1.0600319152190978739973245851181
absolute error = 1.0600319152190978739973245851181
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.404
y[1] (analytic) = 0
y[1] (numeric) = 1.061023784199206125241242872132
absolute error = 1.061023784199206125241242872132
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.405
y[1] (analytic) = 0
y[1] (numeric) = 1.0620157474002047964441823331306
absolute error = 1.0620157474002047964441823331306
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.406
y[1] (analytic) = 0
y[1] (numeric) = 1.0630078043051280500927065044232
absolute error = 1.0630078043051280500927065044232
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.407
y[1] (analytic) = 0
y[1] (numeric) = 1.0639999543964482170689578077222
absolute error = 1.0639999543964482170689578077222
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.408
y[1] (analytic) = 0
y[1] (numeric) = 1.0649921971560754385765700889426
absolute error = 1.0649921971560754385765700889426
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=667.5MB, alloc=4.6MB, time=65.10
x[1] = 1.409
y[1] (analytic) = 0
y[1] (numeric) = 1.065984532065357309578601114907
absolute error = 1.065984532065357309578601114907
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.41
y[1] (analytic) = 0
y[1] (numeric) = 1.0669769586050785237478355857053
absolute error = 1.0669769586050785237478355857053
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.411
y[1] (analytic) = 0
y[1] (numeric) = 1.0679694762554605199298197351271
absolute error = 1.0679694762554605199298197351271
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.412
y[1] (analytic) = 0
y[1] (numeric) = 1.0689620844961611301189990625935
absolute error = 1.0689620844961611301189990625935
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.413
y[1] (analytic) = 0
y[1] (numeric) = 1.0699547828062742289483411675908
absolute error = 1.0699547828062742289483411675908
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.414
y[1] (analytic) = 0
y[1] (numeric) = 1.0709475706643293846928360419549
absolute error = 1.0709475706643293846928360419549
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.415
y[1] (analytic) = 0
y[1] (numeric) = 1.0719404475482915117872765166986
absolute error = 1.0719404475482915117872765166986
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.416
y[1] (analytic) = 0
y[1] (numeric) = 1.0729334129355605248587318586105
absolute error = 1.0729334129355605248587318586105
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=671.4MB, alloc=4.6MB, time=65.47
TOP MAIN SOLVE Loop
x[1] = 1.417
y[1] (analytic) = 0
y[1] (numeric) = 1.0739264663029709942741377678103
absolute error = 1.0739264663029709942741377678103
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.418
y[1] (analytic) = 0
y[1] (numeric) = 1.0749196071267918032034362410181
absolute error = 1.0749196071267918032034362410181
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.419
y[1] (analytic) = 0
y[1] (numeric) = 1.0759128348827258061987089366985
absolute error = 1.0759128348827258061987089366985
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.42
y[1] (analytic) = 0
y[1] (numeric) = 1.0769061490459094892897578076774
absolute error = 1.0769061490459094892897578076774
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.421
y[1] (analytic) = 0
y[1] (numeric) = 1.077899549090912631596596854508
absolute error = 1.077899549090912631596596854508
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.422
y[1] (analytic) = 0
y[1] (numeric) = 1.0788930344917379684593288989828
absolute error = 1.0788930344917379684593288989828
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.423
y[1] (analytic) = 0
y[1] (numeric) = 1.0798866047218208560858912819541
absolute error = 1.0798866047218208560858912819541
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=675.2MB, alloc=4.6MB, time=65.85
x[1] = 1.424
y[1] (analytic) = 0
y[1] (numeric) = 1.0808802592540289377181643532381
absolute error = 1.0808802592540289377181643532381
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.425
y[1] (analytic) = 0
y[1] (numeric) = 1.0818739975606618113169465440347
absolute error = 1.0818739975606618113169465440347
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.426
y[1] (analytic) = 0
y[1] (numeric) = 1.0828678191134506987663096941952
absolute error = 1.0828678191134506987663096941952
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.427
y[1] (analytic) = 0
y[1] (numeric) = 1.083861723383558116597858148012
absolute error = 1.083861723383558116597858148012
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.428
y[1] (analytic) = 0
y[1] (numeric) = 1.0848557098415775482354249331782
absolute error = 1.0848557098415775482354249331782
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.429
y[1] (analytic) = 0
y[1] (numeric) = 1.0858497779575331177607480983711
absolute error = 1.0858497779575331177607480983711
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.43
y[1] (analytic) = 0
y[1] (numeric) = 1.08684392720087926520068000574
absolute error = 1.08684392720087926520068000574
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.431
y[1] (analytic) = 0
y[1] (numeric) = 1.0878381570405004233364920556194
absolute error = 1.0878381570405004233364920556194
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=679.0MB, alloc=4.6MB, time=66.23
x[1] = 1.432
y[1] (analytic) = 0
y[1] (numeric) = 1.0888324669447106960358469622302
absolute error = 1.0888324669447106960358469622302
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.433
y[1] (analytic) = 0
y[1] (numeric) = 1.0898268563812535381080203011695
absolute error = 1.0898268563812535381080203011695
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.434
y[1] (analytic) = 0
y[1] (numeric) = 1.090821324817301436682962612303
absolute error = 1.090821324817301436682962612303
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.435
y[1] (analytic) = 0
y[1] (numeric) = 1.0918158717194555941148028654551
absolute error = 1.0918158717194555941148028654551
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.436
y[1] (analytic) = 0
y[1] (numeric) = 1.0928104965537456124104035812253
absolute error = 1.0928104965537456124104035812253
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.437
y[1] (analytic) = 0
y[1] (numeric) = 1.0938051987856291791835873455235
absolute error = 1.0938051987856291791835873455235
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.438
y[1] (analytic) = 0
y[1] (numeric) = 1.0947999778799917551356638642027
absolute error = 1.0947999778799917551356638642027
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=682.8MB, alloc=4.6MB, time=66.60
x[1] = 1.439
y[1] (analytic) = 0
y[1] (numeric) = 1.095794833301146263062896073648
absolute error = 1.095794833301146263062896073648
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.44
y[1] (analytic) = 0
y[1] (numeric) = 1.0967897645128327783915531545421
absolute error = 1.0967897645128327783915531545421
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.441
y[1] (analytic) = 0
y[1] (numeric) = 1.0977847709782182212412075894442
absolute error = 1.0977847709782182212412075894442
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.442
y[1] (analytic) = 0
y[1] (numeric) = 1.0987798521598960500169426604723
absolute error = 1.0987798521598960500169426604723
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.443
y[1] (analytic) = 0
y[1] (numeric) = 1.0997750075198859565311460014411
absolute error = 1.0997750075198859565311460014411
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.444
y[1] (analytic) = 0
y[1] (numeric) = 1.1007702365196335626555739994595
absolute error = 1.1007702365196335626555739994595
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.445
y[1] (analytic) = 0
y[1] (numeric) = 1.1017655386200101185043809843992
absolute error = 1.1017655386200101185043809843992
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.446
y[1] (analytic) = 0
y[1] (numeric) = 1.102760913281312202148816250992
absolute error = 1.102760913281312202148816250992
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=686.6MB, alloc=4.6MB, time=66.97
x[1] = 1.447
y[1] (analytic) = 0
y[1] (numeric) = 1.1037563599632614208643010277599
absolute error = 1.1037563599632614208643010277599
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.448
y[1] (analytic) = 0
y[1] (numeric) = 1.1047518781250041139106065397061
absolute error = 1.1047518781250041139106065397061
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.449
y[1] (analytic) = 0
y[1] (numeric) = 1.105747467225111056845863307864
absolute error = 1.105747467225111056845863307864
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.45
y[1] (analytic) = 0
y[1] (numeric) = 1.106743126721577167375140788582
absolute error = 1.106743126721577167375140788582
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.451
y[1] (analytic) = 0
y[1] (numeric) = 1.1077388560718212127343453789833
absolute error = 1.1077388560718212127343453789833
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.452
y[1] (analytic) = 0
y[1] (numeric) = 1.108734654732685518610193702547
absolute error = 1.108734654732685518610193702547
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.453
y[1] (analytic) = 0
y[1] (numeric) = 1.1097305221604356795970269403754
absolute error = 1.1097305221604356795970269403754
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=690.4MB, alloc=4.6MB, time=67.35
x[1] = 1.454
y[1] (analytic) = 0
y[1] (numeric) = 1.1107264578107602711912407896031
absolute error = 1.1107264578107602711912407896031
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.455
y[1] (analytic) = 0
y[1] (numeric) = 1.1117224611387705633241144107347
absolute error = 1.1117224611387705633241144107347
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.456
y[1] (analytic) = 0
y[1] (numeric) = 1.1127185315990002354338304706235
absolute error = 1.1127185315990002354338304706235
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.457
y[1] (analytic) = 0
y[1] (numeric) = 1.1137146686454050930774870974922
absolute error = 1.1137146686454050930774870974922
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.458
y[1] (analytic) = 0
y[1] (numeric) = 1.114710871731362786083911238999
absolute error = 1.114710871731362786083911238999
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.459
y[1] (analytic) = 0
y[1] (numeric) = 1.1157071403096725282480915540348
absolute error = 1.1157071403096725282480915540348
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.46
y[1] (analytic) = 0
y[1] (numeric) = 1.1167034738325548185680575738509
absolute error = 1.1167034738325548185680575738509
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.461
y[1] (analytic) = 0
y[1] (numeric) = 1.1176998717516511640250404384203
absolute error = 1.1176998717516511640250404384203
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=694.3MB, alloc=4.6MB, time=67.72
x[1] = 1.462
y[1] (analytic) = 0
y[1] (numeric) = 1.1186963335180238039077590497842
absolute error = 1.1186963335180238039077590497842
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.463
y[1] (analytic) = 0
y[1] (numeric) = 1.1196928585821554356816839856809
absolute error = 1.1196928585821554356816839856809
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.464
y[1] (analytic) = 0
y[1] (numeric) = 1.1206894463939489424041399841546
absolute error = 1.1206894463939489424041399841546
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.465
y[1] (analytic) = 0
y[1] (numeric) = 1.1216860964027271216861162432396
absolute error = 1.1216860964027271216861162432396
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.466
y[1] (analytic) = 0
y[1] (numeric) = 1.1226828080572324162016621793737
absolute error = 1.1226828080572324162016621793737
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.467
y[1] (analytic) = 0
y[1] (numeric) = 1.1236795808056266457457546540516
absolute error = 1.1236795808056266457457546540516
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.468
y[1] (analytic) = 0
y[1] (numeric) = 1.1246764140954907408415310105417
absolute error = 1.1246764140954907408415310105417
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.469
y[1] (analytic) = 0
y[1] (numeric) = 1.1256733073738244778977905614021
absolute error = 1.1256733073738244778977905614021
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=698.1MB, alloc=4.6MB, time=68.10
TOP MAIN SOLVE Loop
x[1] = 1.47
y[1] (analytic) = 0
y[1] (numeric) = 1.1266702600870462159176754331898
absolute error = 1.1266702600870462159176754331898
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.471
y[1] (analytic) = 0
y[1] (numeric) = 1.127667271680992634759449907311
absolute error = 1.127667271680992634759449907311
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.472
y[1] (analytic) = 0
y[1] (numeric) = 1.1286643416009184749503055955493
absolute error = 1.1286643416009184749503055955493
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.473
y[1] (analytic) = 0
y[1] (numeric) = 1.1296614692914962790541279555802
absolute error = 1.1296614692914962790541279555802
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.474
y[1] (analytic) = 0
y[1] (numeric) = 1.1306586541968161345941677858769
absolute error = 1.1306586541968161345941677858769
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.475
y[1] (analytic) = 0
y[1] (numeric) = 1.1316558957603854185315694409741
absolute error = 1.1316558957603854185315694409741
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.476
y[1] (analytic) = 0
y[1] (numeric) = 1.1326531934251285433007155772258
absolute error = 1.1326531934251285433007155772258
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=701.9MB, alloc=4.6MB, time=68.47
x[1] = 1.477
y[1] (analytic) = 0
y[1] (numeric) = 1.1336505466333867044023562761093
absolute error = 1.1336505466333867044023562761093
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.478
y[1] (analytic) = 0
y[1] (numeric) = 1.1346479548269176295554983969294
absolute error = 1.1346479548269176295554983969294
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.479
y[1] (analytic) = 0
y[1] (numeric) = 1.1356454174468953294090389836036
absolute error = 1.1356454174468953294090389836036
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.48
y[1] (analytic) = 0
y[1] (numeric) = 1.1366429339339098498141344911954
absolute error = 1.1366429339339098498141344911954
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.481
y[1] (analytic) = 0
y[1] (numeric) = 1.1376405037279670256583055071479
absolute error = 1.1376405037279670256583055071479
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.482
y[1] (analytic) = 0
y[1] (numeric) = 1.1386381262684882362622845198856
absolute error = 1.1386381262684882362622845198856
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.483
y[1] (analytic) = 0
y[1] (numeric) = 1.1396358009943101623406221337365
absolute error = 1.1396358009943101623406221337365
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.484
y[1] (analytic) = 0
y[1] (numeric) = 1.1406335273436845445270749441091
absolute error = 1.1406335273436845445270749441091
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=705.7MB, alloc=4.6MB, time=68.85
x[1] = 1.485
y[1] (analytic) = 0
y[1] (numeric) = 1.1416313047542779434658060706756
absolute error = 1.1416313047542779434658060706756
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.486
y[1] (analytic) = 0
y[1] (numeric) = 1.1426291326631715014694370990907
absolute error = 1.1426291326631715014694370990907
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.487
y[1] (analytic) = 0
y[1] (numeric) = 1.143627010506860705744997903652
absolute error = 1.143627010506860705744997903652
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.488
y[1] (analytic) = 0
y[1] (numeric) = 1.144624937721255153188828514405
absolute error = 1.144624937721255153188828514405
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.489
y[1] (analytic) = 0
y[1] (numeric) = 1.1456229137416783167514948526487
absolute error = 1.1456229137416783167514948526487
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.49
y[1] (analytic) = 0
y[1] (numeric) = 1.14662093800286731337378778873
absolute error = 1.14662093800286731337378778873
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.491
y[1] (analytic) = 0
y[1] (numeric) = 1.1476190099389726734948825755592
absolute error = 1.1476190099389726734948825755592
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=709.5MB, alloc=4.6MB, time=69.22
x[1] = 1.492
y[1] (analytic) = 0
y[1] (numeric) = 1.1486171289835581121337432805515
absolute error = 1.1486171289835581121337432805515
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.493
y[1] (analytic) = 0
y[1] (numeric) = 1.1496152945696003015448643778385
absolute error = 1.1496152945696003015448643778385
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.494
y[1] (analytic) = 0
y[1] (numeric) = 1.1506135061294886454494491717135
absolute error = 1.1506135061294886454494491717135
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.495
y[1] (analytic) = 0
y[1] (numeric) = 1.1516117630950250548431322015021
absolute error = 1.1516117630950250548431322015021
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.496
y[1] (analytic) = 0
y[1] (numeric) = 1.1526100648974237253813602275097
absolute error = 1.1526100648974237253813602275097
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.497
y[1] (analytic) = 0
y[1] (numeric) = 1.1536084109673109163435538175111
absolute error = 1.1536084109673109163435538175111
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.498
y[1] (analytic) = 0
y[1] (numeric) = 1.1546068007347247311771789435315
absolute error = 1.1546068007347247311771789435315
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.499
y[1] (analytic) = 0
y[1] (numeric) = 1.1556052336291148996228653595502
absolute error = 1.1556052336291148996228653595502
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=713.3MB, alloc=4.6MB, time=69.61
x[1] = 1.5
y[1] (analytic) = 0
y[1] (numeric) = 1.1566037090793425614217158623528
absolute error = 1.1566037090793425614217158623528
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.501
y[1] (analytic) = 0
y[1] (numeric) = 1.1576022265136800516059578401834
absolute error = 1.1576022265136800516059578401834
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.502
y[1] (analytic) = 0
y[1] (numeric) = 1.1586007853598106873740957872249
absolute error = 1.1586007853598106873740957872249
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.503
y[1] (analytic) = 0
y[1] (numeric) = 1.1595993850448285565517307063809
absolute error = 1.1595993850448285565517307063809
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.504
y[1] (analytic) = 0
y[1] (numeric) = 1.1605980249952383076392195384582
absolute error = 1.1605980249952383076392195384582
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.505
y[1] (analytic) = 0
y[1] (numeric) = 1.1615967046369549414473549427752
absolute error = 1.1615967046369549414473549427752
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.506
y[1] (analytic) = 0
y[1] (numeric) = 1.1625954233953036043222529125624
absolute error = 1.1625954233953036043222529125624
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=717.1MB, alloc=4.6MB, time=69.98
x[1] = 1.507
y[1] (analytic) = 0
y[1] (numeric) = 1.1635941806950193829606428383846
absolute error = 1.1635941806950193829606428383846
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.508
y[1] (analytic) = 0
y[1] (numeric) = 1.1645929759602471008167617343238
absolute error = 1.1645929759602471008167617343238
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.509
y[1] (analytic) = 0
y[1] (numeric) = 1.165591808614541116102061414919
absolute error = 1.165591808614541116102061414919
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.51
y[1] (analytic) = 0
y[1] (numeric) = 1.1665906780808651213789444559827
absolute error = 1.1665906780808651213789444559827
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.511
y[1] (analytic) = 0
y[1] (numeric) = 1.1675895837815919447497517895107
absolute error = 1.1675895837815919447497517895107
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.512
y[1] (analytic) = 0
y[1] (numeric) = 1.1685885251385033526422317720836
absolute error = 1.1685885251385033526422317720836
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.513
y[1] (analytic) = 0
y[1] (numeric) = 1.1695875015727898541927275275344
absolute error = 1.1695875015727898541927275275344
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.514
y[1] (analytic) = 0
y[1] (numeric) = 1.1705865125050505072283262983327
absolute error = 1.1705865125050505072283262983327
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=721.0MB, alloc=4.6MB, time=70.35
x[1] = 1.515
y[1] (analytic) = 0
y[1] (numeric) = 1.1715855573552927258492214462244
absolute error = 1.1715855573552927258492214462244
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.516
y[1] (analytic) = 0
y[1] (numeric) = 1.1725846355429320896125446212684
absolute error = 1.1725846355429320896125446212684
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.517
y[1] (analytic) = 0
y[1] (numeric) = 1.173583746486792154318932469638
absolute error = 1.173583746486792154318932469638
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.518
y[1] (analytic) = 0
y[1] (numeric) = 1.1745828896051042644030990745102
absolute error = 1.1745828896051042644030990745102
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.519
y[1] (analytic) = 0
y[1] (numeric) = 1.1755820643155073669296921211517
absolute error = 1.1755820643155073669296921211517
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.52
y[1] (analytic) = 0
y[1] (numeric) = 1.1765812700350478271957175470356
absolute error = 1.1765812700350478271957175470356
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.521
y[1] (analytic) = 0
y[1] (numeric) = 1.1775805061801792459408241805859
absolute error = 1.1775805061801792459408241805859
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.522
y[1] (analytic) = 0
y[1] (numeric) = 1.178579772166762278166746588054
absolute error = 1.178579772166762278166746588054
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=724.8MB, alloc=4.6MB, time=70.73
TOP MAIN SOLVE Loop
x[1] = 1.523
y[1] (analytic) = 0
y[1] (numeric) = 1.1795790674100644535672110371813
absolute error = 1.1795790674100644535672110371813
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.524
y[1] (analytic) = 0
y[1] (numeric) = 1.1805783913247599985696161487989
absolute error = 1.1805783913247599985696161487989
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.525
y[1] (analytic) = 0
y[1] (numeric) = 1.1815777433249296599898064434568
absolute error = 1.1815777433249296599898064434568
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.526
y[1] (analytic) = 0
y[1] (numeric) = 1.1825771228240605303012635996618
absolute error = 1.1825771228240605303012635996618
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.527
y[1] (analytic) = 0
y[1] (numeric) = 1.1835765292350458745200468234355
absolute error = 1.1835765292350458745200468234355
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.528
y[1] (analytic) = 0
y[1] (numeric) = 1.1845759619701849587068202857785
absolute error = 1.1845759619701849587068202857785
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.529
y[1] (analytic) = 0
y[1] (numeric) = 1.1855754204411828800873121153393
absolute error = 1.1855754204411828800873121153393
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=728.6MB, alloc=4.6MB, time=71.11
x[1] = 1.53
y[1] (analytic) = 0
y[1] (numeric) = 1.1865749040591503987925559382412
absolute error = 1.1865749040591503987925559382412
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.531
y[1] (analytic) = 0
y[1] (numeric) = 1.1875744122346037712202724357027
absolute error = 1.1875744122346037712202724357027
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.532
y[1] (analytic) = 0
y[1] (numeric) = 1.1885739443774645850187548429025
absolute error = 1.1885739443774645850187548429025
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.533
y[1] (analytic) = 0
y[1] (numeric) = 1.1895734998970595956946287395776
absolute error = 1.1895734998970595956946287395776
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.534
y[1] (analytic) = 0
y[1] (numeric) = 1.1905730782021205648458628841985
absolute error = 1.1905730782021205648458628841985
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.535
y[1] (analytic) = 0
y[1] (numeric) = 1.1915726787007841000214142193331
absolute error = 1.1915726787007841000214142193331
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.536
y[1] (analytic) = 0
y[1] (numeric) = 1.1925723008005914962088965260827
absolute error = 1.1925723008005914962088965260827
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.537
y[1] (analytic) = 0
y[1] (numeric) = 1.1935719439084885789516685303414
absolute error = 1.1935719439084885789516685303414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=732.4MB, alloc=4.6MB, time=71.48
x[1] = 1.538
y[1] (analytic) = 0
y[1] (numeric) = 1.1945716074308255490967435631883
absolute error = 1.1945716074308255490967435631883
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.539
y[1] (analytic) = 0
y[1] (numeric) = 1.1955712907733568291749291520549
absolute error = 1.1955712907733568291749291520549
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.54
y[1] (analytic) = 0
y[1] (numeric) = 1.1965709933412409114146111685191
absolute error = 1.1965709933412409114146111685191
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.541
y[1] (analytic) = 0
y[1] (numeric) = 1.1975707145390402073906033827377
absolute error = 1.1975707145390402073906033827377
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.542
y[1] (analytic) = 0
y[1] (numeric) = 1.1985704537707208993094894737449
absolute error = 1.1985704537707208993094894737449
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.543
y[1] (analytic) = 0
y[1] (numeric) = 1.1995702104396527929328907191908
absolute error = 1.1995702104396527929328907191908
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.544
y[1] (analytic) = 0
y[1] (numeric) = 1.2005699839486091721400987376682
absolute error = 1.2005699839486091721400987376682
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=736.2MB, alloc=4.6MB, time=71.86
x[1] = 1.545
y[1] (analytic) = 0
y[1] (numeric) = 1.2015697736997666551315187816602
absolute error = 1.2015697736997666551315187816602
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.546
y[1] (analytic) = 0
y[1] (numeric) = 1.202569579094705052274375179423
absolute error = 1.202569579094705052274375179423
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.547
y[1] (analytic) = 0
y[1] (numeric) = 1.203569399534407225592136599884
absolute error = 1.203569399534407225592136599884
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.548
y[1] (analytic) = 0
y[1] (numeric) = 1.2045692344192589498991248659709
absolute error = 1.2045692344192589498991248659709
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.549
y[1] (analytic) = 0
y[1] (numeric) = 1.2055690831490487755817770687756
absolute error = 1.2055690831490487755817770687756
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.55
y[1] (analytic) = 0
y[1] (numeric) = 1.2065689451229678930280367376822
absolute error = 1.2065689451229678930280367376822
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.551
y[1] (analytic) = 0
y[1] (numeric) = 1.2075688197396099987063558001369
absolute error = 1.2075688197396099987063558001369
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.552
y[1] (analytic) = 0
y[1] (numeric) = 1.2085687063969711628957950191881
absolute error = 1.2085687063969711628957950191881
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=740.0MB, alloc=4.6MB, time=72.24
x[1] = 1.553
y[1] (analytic) = 0
y[1] (numeric) = 1.2095686044924496990687165273628
absolute error = 1.2095686044924496990687165273628
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.554
y[1] (analytic) = 0
y[1] (numeric) = 1.2105685134228460349275679819506
absolute error = 1.2105685134228460349275679819506
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.555
y[1] (analytic) = 0
y[1] (numeric) = 1.2115684325843625850972637494214
absolute error = 1.2115684325843625850972637494214
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.556
y[1] (analytic) = 0
y[1] (numeric) = 1.2125683613726036254746743855867
absolute error = 1.2125683613726036254746743855867
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.557
y[1] (analytic) = 0
y[1] (numeric) = 1.213568299182575169236741513308
absolute error = 1.213568299182575169236741513308
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.558
y[1] (analytic) = 0
y[1] (numeric) = 1.214568245408684844508741011137
absolute error = 1.214568245408684844508741011137
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.559
y[1] (analytic) = 0
y[1] (numeric) = 1.2155681994447417736942232143236
absolute error = 1.2155681994447417736942232143236
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=743.8MB, alloc=4.6MB, time=72.61
x[1] = 1.56
y[1] (analytic) = 0
y[1] (numeric) = 1.2165681606839564544681645942209
absolute error = 1.2165681606839564544681645942209
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.561
y[1] (analytic) = 0
y[1] (numeric) = 1.2175681285189406424348711233375
absolute error = 1.2175681285189406424348711233375
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.562
y[1] (analytic) = 0
y[1] (numeric) = 1.2185681023417072354521792512039
absolute error = 1.2185681023417072354521792512039
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.563
y[1] (analytic) = 0
y[1] (numeric) = 1.2195680815436701596235061109185
absolute error = 1.2195680815436701596235061109185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.564
y[1] (analytic) = 0
y[1] (numeric) = 1.220568065515644256959306247785
absolute error = 1.220568065515644256959306247785
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.565
y[1] (analytic) = 0
y[1] (numeric) = 1.2215680536478451747094978099323
absolute error = 1.2215680536478451747094978099323
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.566
y[1] (analytic) = 0
y[1] (numeric) = 1.222568045329889256368426766287
absolute error = 1.222568045329889256368426766287
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.567
y[1] (analytic) = 0
y[1] (numeric) = 1.2235680399507934343539433198262
absolute error = 1.2235680399507934343539433198262
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=747.7MB, alloc=4.6MB, time=72.99
x[1] = 1.568
y[1] (analytic) = 0
y[1] (numeric) = 1.2245680368989751243621702637484
absolute error = 1.2245680368989751243621702637484
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.569
y[1] (analytic) = 0
y[1] (numeric) = 1.2255680355622521213995485851321
absolute error = 1.2255680355622521213995485851321
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.57
y[1] (analytic) = 0
y[1] (numeric) = 1.2265680353278424974937511548827
absolute error = 1.2265680353278424974937511548827
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.571
y[1] (analytic) = 0
y[1] (numeric) = 1.2275680355823645010850608543681
absolute error = 1.2275680355823645010850608543681
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.572
y[1] (analytic) = 0
y[1] (numeric) = 1.2285680357118364580998149781829
absolute error = 1.2285680357118364580998149781829
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.573
y[1] (analytic) = 0
y[1] (numeric) = 1.2295680351016766747075232190349
absolute error = 1.2295680351016766747075232190349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.574
y[1] (analytic) = 0
y[1] (numeric) = 1.2305680331367033417632719848804
absolute error = 1.2305680331367033417632719848804
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.575
y[1] (analytic) = 0
y[1] (numeric) = 1.2315680292011344409370332202242
absolute error = 1.2315680292011344409370332202242
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=751.5MB, alloc=4.6MB, time=73.37
TOP MAIN SOLVE Loop
x[1] = 1.576
y[1] (analytic) = 0
y[1] (numeric) = 1.2325680226785876525315013030086
absolute error = 1.2325680226785876525315013030086
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.577
y[1] (analytic) = 0
y[1] (numeric) = 1.2335680129520802649900869658159
absolute error = 1.2335680129520802649900869658159
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.578
y[1] (analytic) = 0
y[1] (numeric) = 1.2345679994040290860967025452703
absolute error = 1.2345679994040290860967025452703
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.579
y[1] (analytic) = 0
y[1] (numeric) = 1.2355679814162503558689781966116
absolute error = 1.2355679814162503558689781966116
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.58
y[1] (analytic) = 0
y[1] (numeric) = 1.2365679583699596611465540214972
absolute error = 1.2365679583699596611465540214972
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.581
y[1] (analytic) = 0
y[1] (numeric) = 1.237567929645771851876098346232
absolute error = 1.237567929645771851876098346232
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.582
y[1] (analytic) = 0
y[1] (numeric) = 1.2385678946237009590947076549015
absolute error = 1.2385678946237009590947076549015
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=755.3MB, alloc=4.6MB, time=73.74
x[1] = 1.583
y[1] (analytic) = 0
y[1] (numeric) = 1.2395678526831601146133489273494
absolute error = 1.2395678526831601146133489273494
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.584
y[1] (analytic) = 0
y[1] (numeric) = 1.2405678032029614724020103556707
absolute error = 1.2405678032029614724020103556707
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.585
y[1] (analytic) = 0
y[1] (numeric) = 1.2415677455613161316782316149429
absolute error = 1.2415677455613161316782316149429
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.586
y[1] (analytic) = 0
y[1] (numeric) = 1.2425676791358340617006900443621
absolute error = 1.2425676791358340617006900443621
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.587
y[1] (analytic) = 0
y[1] (numeric) = 1.2435676033035240282695242538455
absolute error = 1.2435676033035240282695242538455
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.588
y[1] (analytic) = 0
y[1] (numeric) = 1.2445675174407935219350818085771
absolute error = 1.2445675174407935219350818085771
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.589
y[1] (analytic) = 0
y[1] (numeric) = 1.2455674209234486879167827599651
absolute error = 1.2455674209234486879167827599651
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.59
y[1] (analytic) = 0
y[1] (numeric) = 1.2465673131266942577337958861176
absolute error = 1.2465673131266942577337958861176
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=759.1MB, alloc=4.6MB, time=74.11
x[1] = 1.591
y[1] (analytic) = 0
y[1] (numeric) = 1.2475671934251334825492295782839
absolute error = 1.2475671934251334825492295782839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.592
y[1] (analytic) = 0
y[1] (numeric) = 1.2485670611927680682295443618166
absolute error = 1.2485670611927680682295443618166
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.593
y[1] (analytic) = 0
y[1] (numeric) = 1.2495669158029981121208990711461
absolute error = 1.2495669158029981121208990711461
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.594
y[1] (analytic) = 0
y[1] (numeric) = 1.2505667566286220415441477080833
absolute error = 1.2505667566286220415441477080833
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.595
y[1] (analytic) = 0
y[1] (numeric) = 1.2515665830418365540102090015385
absolute error = 1.2515665830418365540102090015385
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.596
y[1] (analytic) = 0
y[1] (numeric) = 1.2525663944142365591575356545274
absolute error = 1.2525663944142365591575356545274
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.597
y[1] (analytic) = 0
y[1] (numeric) = 1.2535661901168151224134152111843
absolute error = 1.2535661901168151224134152111843
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=762.9MB, alloc=4.6MB, time=74.49
x[1] = 1.598
y[1] (analytic) = 0
y[1] (numeric) = 1.2545659695199634103808394024776
absolute error = 1.2545659695199634103808394024776
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.599
y[1] (analytic) = 0
y[1] (numeric) = 1.2555657319934706379526837344864
absolute error = 1.2555657319934706379526837344864
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.6
y[1] (analytic) = 0
y[1] (numeric) = 1.2565654769065240171549439674996
absolute error = 1.2565654769065240171549439674996
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.601
y[1] (analytic) = 0
y[1] (numeric) = 1.2575652036277087077207809979055
absolute error = 1.2575652036277087077207809979055
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.602
y[1] (analytic) = 0
y[1] (numeric) = 1.2585649115250077693971304979023
absolute error = 1.2585649115250077693971304979023
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.603
y[1] (analytic) = 0
y[1] (numeric) = 1.2595645999658021159856384905386
absolute error = 1.2595645999658021159856384905386
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.604
y[1] (analytic) = 0
y[1] (numeric) = 1.2605642683168704711196888395399
absolute error = 1.2605642683168704711196888395399
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.605
y[1] (analytic) = 0
y[1] (numeric) = 1.2615639159443893257792934148528
absolute error = 1.2615639159443893257792934148528
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=766.7MB, alloc=4.6MB, time=74.87
x[1] = 1.606
y[1] (analytic) = 0
y[1] (numeric) = 1.2625635422139328975456204558947
absolute error = 1.2625635422139328975456204558947
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.607
y[1] (analytic) = 0
y[1] (numeric) = 1.26356314649047309159694139519
absolute error = 1.26356314649047309159694139519
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.608
y[1] (analytic) = 0
y[1] (numeric) = 1.2645627281383794634477811254581
absolute error = 1.2645627281383794634477811254581
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.609
y[1] (analytic) = 0
y[1] (numeric) = 1.2655622865214191834330613933483
absolute error = 1.2655622865214191834330613933483
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.61
y[1] (analytic) = 0
y[1] (numeric) = 1.2665618210027570029390316829447
absolute error = 1.2665618210027570029390316829447
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.611
y[1] (analytic) = 0
y[1] (numeric) = 1.2675613309449552223827866119442
absolute error = 1.2675613309449552223827866119442
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.612
y[1] (analytic) = 0
y[1] (numeric) = 1.2685608157099736609421735030972
absolute error = 1.2685608157099736609421735030972
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.613
y[1] (analytic) = 0
y[1] (numeric) = 1.2695602746591696280378984131416
absolute error = 1.2695602746591696280378984131416
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=770.5MB, alloc=4.6MB, time=75.24
TOP MAIN SOLVE Loop
x[1] = 1.614
y[1] (analytic) = 0
y[1] (numeric) = 1.2705597071532978965696435011132
absolute error = 1.2705597071532978965696435011132
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.615
y[1] (analytic) = 0
y[1] (numeric) = 1.2715591125525106779080131976275
absolute error = 1.2715591125525106779080131976275
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.616
y[1] (analytic) = 0
y[1] (numeric) = 1.2725584902163575986441311965513
absolute error = 1.2725584902163575986441311965513
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.617
y[1] (analytic) = 0
y[1] (numeric) = 1.2735578395037856790987148304705
absolute error = 1.2735578395037856790987148304705
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.618
y[1] (analytic) = 0
y[1] (numeric) = 1.2745571597731393135924579115591
absolute error = 1.2745571597731393135924579115591
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.619
y[1] (analytic) = 0
y[1] (numeric) = 1.275556450382160252479557619916
absolute error = 1.275556450382160252479557619916
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.62
y[1] (analytic) = 0
y[1] (numeric) = 1.2765557106879875859462255022123
absolute error = 1.2765557106879875859462255022123
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=774.4MB, alloc=4.6MB, time=75.62
x[1] = 1.621
y[1] (analytic) = 0
y[1] (numeric) = 1.2775549400471577295760271046265
absolute error = 1.2775549400471577295760271046265
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.622
y[1] (analytic) = 0
y[1] (numeric) = 1.2785541378156044116838992055915
absolute error = 1.2785541378156044116838992055915
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.623
y[1] (analytic) = 0
y[1] (numeric) = 1.2795533033486586624206980358814
absolute error = 1.2795533033486586624206980358814
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.624
y[1] (analytic) = 0
y[1] (numeric) = 1.2805524360010488046501362760784
absolute error = 1.2805524360010488046501362760784
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.625
y[1] (analytic) = 0
y[1] (numeric) = 1.2815515351269004465999710045227
absolute error = 1.2815515351269004465999710045227
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.626
y[1] (analytic) = 0
y[1] (numeric) = 1.2825506000797364762893091325167
absolute error = 1.2825506000797364762893091325167
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.627
y[1] (analytic) = 0
y[1] (numeric) = 1.2835496302124770577339012078664
absolute error = 1.2835496302124770577339012078664
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.628
y[1] (analytic) = 0
y[1] (numeric) = 1.2845486248774396289312987928528
absolute error = 1.2845486248774396289312987928528
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=778.2MB, alloc=4.6MB, time=76.00
x[1] = 1.629
y[1] (analytic) = 0
y[1] (numeric) = 1.2855475834263389016277549284736
absolute error = 1.2855475834263389016277549284736
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.63
y[1] (analytic) = 0
y[1] (numeric) = 1.2865465052102868628687514833293
absolute error = 1.2865465052102868628687514833293
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.631
y[1] (analytic) = 0
y[1] (numeric) = 1.2875453895797927783350414528943
absolute error = 1.2875453895797927783350414528943
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.632
y[1] (analytic) = 0
y[1] (numeric) = 1.2885442358847631974660985231545
absolute error = 1.2885442358847631974660985231545
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.633
y[1] (analytic) = 0
y[1] (numeric) = 1.2895430434745019603728704417547
absolute error = 1.2895430434745019603728704417547
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.634
y[1] (analytic) = 0
y[1] (numeric) = 1.2905418116977102065417369499263
absolute error = 1.2905418116977102065417369499263
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.635
y[1] (analytic) = 0
y[1] (numeric) = 1.2915405399024863853315772196
absolute error = 1.2915405399024863853315772196
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.636
y[1] (analytic) = 0
y[1] (numeric) = 1.2925392274363262682658559122965
absolute error = 1.2925392274363262682658559122965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=782.0MB, alloc=4.6MB, time=76.38
TOP MAIN SOLVE Loop
x[1] = 1.637
y[1] (analytic) = 0
y[1] (numeric) = 1.2935378736461229631216411296693
absolute error = 1.2935378736461229631216411296693
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.638
y[1] (analytic) = 0
y[1] (numeric) = 1.2945364778781669298174716599922
absolute error = 1.2945364778781669298174716599922
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.639
y[1] (analytic) = 0
y[1] (numeric) = 1.295535039478145998101995040486
absolute error = 1.295535039478145998101995040486
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.64
y[1] (analytic) = 0
y[1] (numeric) = 1.2965335577911453870453020521967
absolute error = 1.2965335577911453870453020521967
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.641
y[1] (analytic) = 0
y[1] (numeric) = 1.2975320321616477263348873422254
absolute error = 1.2975320321616477263348873422254
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.642
y[1] (analytic) = 0
y[1] (numeric) = 1.2985304619335330793781699274965
absolute error = 1.2985304619335330793781699274965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.643
y[1] (analytic) = 0
y[1] (numeric) = 1.299528846450078968213511374988
absolute error = 1.299528846450078968213511374988
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=785.8MB, alloc=4.6MB, time=76.76
x[1] = 1.644
y[1] (analytic) = 0
y[1] (numeric) = 1.3005271850539604002316734754665
absolute error = 1.3005271850539604002316734754665
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.645
y[1] (analytic) = 0
y[1] (numeric) = 1.3015254770872498967096612313192
absolute error = 1.3015254770872498967096612313192
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.646
y[1] (analytic) = 0
y[1] (numeric) = 1.3025237218914175231589009640864
absolute error = 1.3025237218914175231589009640864
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.647
y[1] (analytic) = 0
y[1] (numeric) = 1.3035219188073309214897073138188
absolute error = 1.3035219188073309214897073138188
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.648
y[1] (analytic) = 0
y[1] (numeric) = 1.3045200671752553439939968504468
absolute error = 1.3045200671752553439939968504468
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.649
y[1] (analytic) = 0
y[1] (numeric) = 1.3055181663348536891482099469973
absolute error = 1.3055181663348536891482099469973
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.65
y[1] (analytic) = 0
y[1] (numeric) = 1.3065162156251865392384064757637
absolute error = 1.3065162156251865392384064757637
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.651
y[1] (analytic) = 0
y[1] (numeric) = 1.3075142143847121998095047814629
absolute error = 1.3075142143847121998095047814629
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=789.6MB, alloc=4.6MB, time=77.14
x[1] = 1.652
y[1] (analytic) = 0
y[1] (numeric) = 1.3085121619512867409406372600444
absolute error = 1.3085121619512867409406372600444
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.653
y[1] (analytic) = 0
y[1] (numeric) = 1.3095100576621640403485997281773
absolute error = 1.3095100576621640403485997281773
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.654
y[1] (analytic) = 0
y[1] (numeric) = 1.3105079008539958283213756065793
absolute error = 1.3105079008539958283213756065793
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.655
y[1] (analytic) = 0
y[1] (numeric) = 1.3115056908628317344837197602976
absolute error = 1.3115056908628317344837197602976
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.656
y[1] (analytic) = 0
y[1] (numeric) = 1.3125034270241193363967906408427
absolute error = 1.3125034270241193363967906408427
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.657
y[1] (analytic) = 0
y[1] (numeric) = 1.3135011086727042099938231587515
absolute error = 1.3135011086727042099938231587515
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.658
y[1] (analytic) = 0
y[1] (numeric) = 1.3144987351428299818538384807473
absolute error = 1.3144987351428299818538384807473
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.659
y[1] (analytic) = 0
y[1] (numeric) = 1.3154963057681383833153906932107
absolute error = 1.3154963057681383833153906932107
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
memory used=793.4MB, alloc=4.6MB, time=77.52
TOP MAIN SOLVE Loop
x[1] = 1.66
y[1] (analytic) = 0
y[1] (numeric) = 1.3164938198816693064323540032093
absolute error = 1.3164938198816693064323540032093
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.661
y[1] (analytic) = 0
y[1] (numeric) = 1.317491276815860861773757859893
absolute error = 1.317491276815860861773757859893
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.662
y[1] (analytic) = 0
y[1] (numeric) = 1.3184886759025494380696810726761
absolute error = 1.3184886759025494380696810726761
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.663
y[1] (analytic) = 0
y[1] (numeric) = 1.3194860164729697637052196783383
absolute error = 1.3194860164729697637052196783383
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.664
y[1] (analytic) = 0
y[1] (numeric) = 1.3204832978577549700645469670098
absolute error = 1.3204832978577549700645469670098
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.665
y[1] (analytic) = 0
y[1] (numeric) = 1.3214805193869366567270877170004
absolute error = 1.3214805193869366567270877170004
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.666
y[1] (analytic) = 0
y[1] (numeric) = 1.3224776803899449585178323106218
absolute error = 1.3224776803899449585178323106218
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=797.3MB, alloc=4.6MB, time=77.90
x[1] = 1.667
y[1] (analytic) = 0
y[1] (numeric) = 1.323474780195608614413820007565
absolute error = 1.323474780195608614413820007565
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.668
y[1] (analytic) = 0
y[1] (numeric) = 1.3244718181321550383088242390685
absolute error = 1.3244718181321550383088242390685
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.669
y[1] (analytic) = 0
y[1] (numeric) = 1.3254687935272103916382763550769
absolute error = 1.3254687935272103916382763550769
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.67
y[1] (analytic) = 0
y[1] (numeric) = 1.326465705707799657866467807877
absolute error = 1.326465705707799657866467807877
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.671
y[1] (analytic) = 0
y[1] (numeric) = 1.3274625540003467188380742893417
absolute error = 1.3274625540003467188380742893417
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.672
y[1] (analytic) = 0
y[1] (numeric) = 1.3284593377306744329960488549403
absolute error = 1.3284593377306744329960488549403
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.673
y[1] (analytic) = 0
y[1] (numeric) = 1.3294560562240047154679345661216
absolute error = 1.3294560562240047154679345661216
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.674
y[1] (analytic) = 0
y[1] (numeric) = 1.3304527088049586200226506635715
absolute error = 1.3304527088049586200226506635715
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=801.1MB, alloc=4.6MB, time=78.28
x[1] = 1.675
y[1] (analytic) = 0
y[1] (numeric) = 1.3314492947975564228998097472202
absolute error = 1.3314492947975564228998097472202
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.676
y[1] (analytic) = 0
y[1] (numeric) = 1.3324458135252177085136268847607
absolute error = 1.3324458135252177085136268847607
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.677
y[1] (analytic) = 0
y[1] (numeric) = 1.3334422643107614570334849988613
absolute error = 1.3334422643107614570334849988613
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.678
y[1] (analytic) = 0
y[1] (numeric) = 1.3344386464764061338432242942491
absolute error = 1.3344386464764061338432242942491
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.679
y[1] (analytic) = 0
y[1] (numeric) = 1.3354349593437697808812268794314
absolute error = 1.3354349593437697808812268794314
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.68
y[1] (analytic) = 0
y[1] (numeric) = 1.3364312022338701098633711140417
absolute error = 1.3364312022338701098633711140417
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.681
y[1] (analytic) = 0
y[1] (numeric) = 1.3374273744671245973909335716716
absolute error = 1.3374273744671245973909335716716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.682
y[1] (analytic) = 0
y[1] (numeric) = 1.3384234753633505819455198496098
absolute error = 1.3384234753633505819455198496098
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=804.9MB, alloc=4.6MB, time=78.66
x[1] = 1.683
y[1] (analytic) = 0
y[1] (numeric) = 1.3394195042417653627731087811831
absolute error = 1.3394195042417653627731087811831
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.684
y[1] (analytic) = 0
y[1] (numeric) = 1.3404154604209863006592979134094
absolute error = 1.3404154604209863006592979134094
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.685
y[1] (analytic) = 0
y[1] (numeric) = 1.3414113432190309205978414024546
absolute error = 1.3414113432190309205978414024546
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.686
y[1] (analytic) = 0
y[1] (numeric) = 1.3424071519533170163545747519668
absolute error = 1.3424071519533170163545747519668
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.687
y[1] (analytic) = 0
y[1] (numeric) = 1.3434028859406627569288240747625
absolute error = 1.3434028859406627569288240747625
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.688
y[1] (analytic) = 0
y[1] (numeric) = 1.3443985444972867949144007965951
absolute error = 1.3443985444972867949144007965951
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.689
y[1] (analytic) = 0
y[1] (numeric) = 1.3453941269388083767622859418637
absolute error = 1.3453941269388083767622859418637
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
memory used=808.7MB, alloc=4.6MB, time=79.04
x[1] = 1.69
y[1] (analytic) = 0
y[1] (numeric) = 1.3463896325802474549471113451558
absolute error = 1.3463896325802474549471113451558
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE for equation 1
TOP MAIN SOLVE Loop
x[1] = 1.691
y[1] (analytic) = 0
y[1] (numeric) = 1.3473850607360248020395483194785
absolute error = 1.3473850607360248020395483194785
relative error = -1 %
Correct digits = -1
h = 0.001
Real estimate of pole used for equation 1
Radius of convergence = 0.01244
Order of pole = 0.05608
memory used=812.5MB, alloc=4.6MB, time=79.40
TOP MAIN SOLVE Loop
x[1] = 1.6921037697763802058872421912506
y[1] (analytic) = 0
y[1] (numeric) = 1.3484836889281257362435018415926
absolute error = 1.3484836889281257362435018415926
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.01291
Order of pole = 0.1281
memory used=816.3MB, alloc=4.6MB, time=79.76
TOP MAIN SOLVE Loop
x[1] = 1.6930778470305882434754255421434
y[1] (analytic) = 0
y[1] (numeric) = 1.3494531525809885955533709364925
absolute error = 1.3494531525809885955533709364925
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.0139
Order of pole = 0.2862
memory used=820.1MB, alloc=4.6MB, time=80.13
TOP MAIN SOLVE Loop
x[1] = 1.6940519242847962810636088930362
y[1] (analytic) = 0
y[1] (numeric) = 1.3504225407076424572759333008648
absolute error = 1.3504225407076424572759333008648
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.0149
Order of pole = 0.4561
memory used=824.0MB, alloc=4.6MB, time=80.49
TOP MAIN SOLVE Loop
x[1] = 1.695026001539004318651792243929
y[1] (analytic) = 0
y[1] (numeric) = 1.3513918526722045026623666673687
absolute error = 1.3513918526722045026623666673687
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.01591
Order of pole = 0.6381
memory used=827.8MB, alloc=4.6MB, time=80.86
TOP MAIN SOLVE Loop
x[1] = 1.6960000787932123562399755948218
y[1] (analytic) = 0
y[1] (numeric) = 1.3523610878382530336896054803045
absolute error = 1.3523610878382530336896054803045
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.01693
Order of pole = 0.8323
memory used=831.6MB, alloc=4.6MB, time=81.23
TOP MAIN SOLVE Loop
x[1] = 1.6970959157041963985266818645762
y[1] (analytic) = 0
y[1] (numeric) = 1.3534513848087230607034480817144
absolute error = 1.3534513848087230607034480817144
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.01809
Order of pole = 1.065
memory used=835.4MB, alloc=4.6MB, time=81.59
TOP MAIN SOLVE Loop
memory used=839.2MB, alloc=4.6MB, time=81.96
x[1] = 1.698069992958404436114865215469
y[1] (analytic) = 0
y[1] (numeric) = 1.3544204546623518856394963841774
absolute error = 1.3544204546623518856394963841774
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.01914
Order of pole = 1.286
memory used=843.0MB, alloc=4.6MB, time=82.32
TOP MAIN SOLVE Loop
x[1] = 1.6990440702126124737030485663618
y[1] (analytic) = 0
y[1] (numeric) = 1.3553894457251773671910687598181
absolute error = 1.3553894457251773671910687598181
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.0202
Order of pole = 1.519
memory used=846.8MB, alloc=4.6MB, time=82.68
TOP MAIN SOLVE Loop
x[1] = 1.7000181474668205112912319172546
y[1] (analytic) = 0
y[1] (numeric) = 1.3563583573585561129036959819634
absolute error = 1.3563583573585561129036959819634
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.02127
Order of pole = 1.766
memory used=850.7MB, alloc=4.6MB, time=83.05
TOP MAIN SOLVE Loop
x[1] = 1.701113984377804553577938187009
y[1] (analytic) = 0
y[1] (numeric) = 1.3574482872072196012403125255559
absolute error = 1.3574482872072196012403125255559
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.0225
Order of pole = 2.058
memory used=854.5MB, alloc=4.6MB, time=83.41
TOP MAIN SOLVE Loop
x[1] = 1.7020880616320125911661215379018
y[1] (analytic) = 0
y[1] (numeric) = 1.3584170279300709881166270694144
absolute error = 1.3584170279300709881166270694144
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.02361
Order of pole = 2.333
memory used=858.3MB, alloc=4.6MB, time=83.77
TOP MAIN SOLVE Loop
x[1] = 1.7030621388862206287543048887946
y[1] (analytic) = 0
y[1] (numeric) = 1.3593856872242460869331245867228
absolute error = 1.3593856872242460869331245867228
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.02474
Order of pole = 2.621
memory used=862.1MB, alloc=4.6MB, time=84.14
TOP MAIN SOLVE Loop
x[1] = 1.7040362161404286663424882396874
y[1] (analytic) = 0
y[1] (numeric) = 1.3603542644488818007626388781637
absolute error = 1.3603542644488818007626388781637
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.02588
Order of pole = 2.922
memory used=865.9MB, alloc=4.6MB, time=84.50
TOP MAIN SOLVE Loop
x[1] = 1.7050102933946367039306715905802
y[1] (analytic) = 0
y[1] (numeric) = 1.3613227589625772352172576685769
absolute error = 1.3613227589625772352172576685769
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.02705
Order of pole = 3.238
memory used=869.7MB, alloc=4.6MB, time=84.86
TOP MAIN SOLVE Loop
memory used=873.5MB, alloc=4.6MB, time=85.23
x[1] = 1.7061061303056207462173778603346
y[1] (analytic) = 0
y[1] (numeric) = 1.3624122156257541371981329410116
absolute error = 1.3624122156257541371981329410116
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.02838
Order of pole = 3.611
memory used=877.4MB, alloc=4.6MB, time=85.59
TOP MAIN SOLVE Loop
x[1] = 1.7070802075598287838055612112274
y[1] (analytic) = 0
y[1] (numeric) = 1.363380532246595530114110382588
absolute error = 1.363380532246595530114110382588
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.02959
Order of pole = 3.957
memory used=881.2MB, alloc=4.6MB, time=85.96
TOP MAIN SOLVE Loop
x[1] = 1.7080542848140368213937445621202
y[1] (analytic) = 0
y[1] (numeric) = 1.3643487641486539665729709758144
absolute error = 1.3643487641486539665729709758144
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.03082
Order of pole = 4.318
memory used=885.0MB, alloc=4.6MB, time=86.33
TOP MAIN SOLVE Loop
x[1] = 1.709028362068244858981927913013
y[1] (analytic) = 0
y[1] (numeric) = 1.3653169106883114815642145149126
absolute error = 1.3653169106883114815642145149126
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.03208
Order of pole = 4.695
memory used=888.8MB, alloc=4.6MB, time=86.69
TOP MAIN SOLVE Loop
x[1] = 1.7100024393224528965701112639058
y[1] (analytic) = 0
y[1] (numeric) = 1.3662849712214129728912508495658
absolute error = 1.3662849712214129728912508495658
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.03336
Order of pole = 5.087
memory used=892.6MB, alloc=4.6MB, time=87.06
TOP MAIN SOLVE Loop
x[1] = 1.7110982762334369388568175336602
y[1] (analytic) = 0
y[1] (numeric) = 1.3673739357137025420418525731762
absolute error = 1.3673739357137025420418525731762
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.03482
Order of pole = 5.547
memory used=896.4MB, alloc=4.6MB, time=87.43
TOP MAIN SOLVE Loop
x[1] = 1.712072353487644976445000884553
y[1] (analytic) = 0
y[1] (numeric) = 1.3683418113416247688450653567465
absolute error = 1.3683418113416247688450653567465
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.03616
Order of pole = 5.973
memory used=900.3MB, alloc=4.6MB, time=87.79
TOP MAIN SOLVE Loop
x[1] = 1.7130464307418530140331842354458
y[1] (analytic) = 0
y[1] (numeric) = 1.3693095989465457449614642656795
absolute error = 1.3693095989465457449614642656795
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.03752
Order of pole = 6.415
memory used=904.1MB, alloc=4.6MB, time=88.16
TOP MAIN SOLVE Loop
x[1] = 1.7140205079960610516213675863386
y[1] (analytic) = 0
y[1] (numeric) = 1.3702772978820961112885888591966
absolute error = 1.3702772978820961112885888591966
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.03891
Order of pole = 6.874
memory used=907.9MB, alloc=4.6MB, time=88.52
memory used=911.7MB, alloc=4.6MB, time=88.89
TOP MAIN SOLVE Loop
x[1] = 1.715116344907045093908073856093
y[1] (analytic) = 0
y[1] (numeric) = 1.3713658523914888277191006732341
absolute error = 1.3713658523914888277191006732341
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.0405
Order of pole = 7.411
memory used=915.5MB, alloc=4.6MB, time=89.25
TOP MAIN SOLVE Loop
x[1] = 1.7160904221612531314962572069858
y[1] (analytic) = 0
y[1] (numeric) = 1.3723333607560295206147304633243
absolute error = 1.3723333607560295206147304633243
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.04196
Order of pole = 7.907
memory used=919.3MB, alloc=4.6MB, time=89.62
TOP MAIN SOLVE Loop
x[1] = 1.7170644994154611690844405578786
y[1] (analytic) = 0
y[1] (numeric) = 1.3733007784278385296636345127862
absolute error = 1.3733007784278385296636345127862
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.04344
Order of pole = 8.422
memory used=923.1MB, alloc=4.6MB, time=89.98
TOP MAIN SOLVE Loop
x[1] = 1.7180385766696692066726239087714
y[1] (analytic) = 0
y[1] (numeric) = 1.3742681047583346348843685454921
absolute error = 1.3742681047583346348843685454921
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.04496
Order of pole = 8.954
memory used=927.0MB, alloc=4.6MB, time=90.35
TOP MAIN SOLVE Loop
x[1] = 1.7190126539238772442608072596642
y[1] (analytic) = 0
y[1] (numeric) = 1.3752353390984007816695446640188
absolute error = 1.3752353390984007816695446640188
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.04651
Order of pole = 9.505
memory used=930.8MB, alloc=4.6MB, time=90.71
TOP MAIN SOLVE Loop
x[1] = 1.7201084908348612865475135294186
y[1] (analytic) = 0
y[1] (numeric) = 1.3763233669647497562269424247149
absolute error = 1.3763233669647497562269424247149
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.04829
Order of pole = 10.15
memory used=934.6MB, alloc=4.6MB, time=91.08
TOP MAIN SOLVE Loop
x[1] = 1.7210825680890693241356968803114
y[1] (analytic) = 0
y[1] (numeric) = 1.3772904036674353318319941849151
absolute error = 1.3772904036674353318319941849151
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.04992
Order of pole = 10.74
memory used=938.4MB, alloc=4.6MB, time=91.39
TOP MAIN SOLVE Loop
x[1] = 1.7220566453432773617238802312042
y[1] (analytic) = 0
y[1] (numeric) = 1.3782573463477481867003716008008
absolute error = 1.3782573463477481867003716008008
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.05159
Order of pole = 11.35
memory used=942.2MB, alloc=4.6MB, time=91.54
TOP MAIN SOLVE Loop
memory used=946.0MB, alloc=4.6MB, time=91.70
x[1] = 1.723030722597485399312063582097
y[1] (analytic) = 0
y[1] (numeric) = 1.3792241943543625462444686570618
absolute error = 1.3792241943543625462444686570618
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.05329
Order of pole = 11.99
memory used=949.8MB, alloc=4.6MB, time=91.85
TOP MAIN SOLVE Loop
x[1] = 1.7240047998516934369002469329898
y[1] (analytic) = 0
y[1] (numeric) = 1.3801909470354175847888010032221
absolute error = 1.3801909470354175847888010032221
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.05503
Order of pole = 12.64
memory used=953.7MB, alloc=4.6MB, time=92.00
TOP MAIN SOLVE Loop
x[1] = 1.7251006367626774791869532027442
y[1] (analytic) = 0
y[1] (numeric) = 1.3812784290454419473343053661191
absolute error = 1.3812784290454419473343053661191
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.05704
Order of pole = 13.4
memory used=957.5MB, alloc=4.6MB, time=92.15
TOP MAIN SOLVE Loop
x[1] = 1.726074714016885516775136553637
y[1] (analytic) = 0
y[1] (numeric) = 1.3822449769928599696538917838781
absolute error = 1.3822449769928599696538917838781
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.05887
Order of pole = 14.1
memory used=961.3MB, alloc=4.6MB, time=92.31
TOP MAIN SOLVE Loop
x[1] = 1.7270487912710935543633199045298
y[1] (analytic) = 0
y[1] (numeric) = 1.3832114275742067694941744300804
absolute error = 1.3832114275742067694941744300804
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.06075
Order of pole = 14.83
memory used=965.1MB, alloc=4.6MB, time=92.46
TOP MAIN SOLVE Loop
x[1] = 1.7280228685253015919515032554226
y[1] (analytic) = 0
y[1] (numeric) = 1.3841777801354161247960062157141
absolute error = 1.3841777801354161247960062157141
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.06267
Order of pole = 15.57
memory used=968.9MB, alloc=4.6MB, time=92.62
TOP MAIN SOLVE Loop
x[1] = 1.729118705436285634238209525177
y[1] (analytic) = 0
y[1] (numeric) = 1.3852648087870060638478227413135
absolute error = 1.3852648087870060638478227413135
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.06489
Order of pole = 16.44
memory used=972.7MB, alloc=4.6MB, time=92.77
TOP MAIN SOLVE Loop
x[1] = 1.7300927826904936718263928760698
y[1] (analytic) = 0
y[1] (numeric) = 1.386230950881280352578237326
absolute error = 1.386230950881280352578237326
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.06691
Order of pole = 17.24
memory used=976.5MB, alloc=4.6MB, time=92.92
TOP MAIN SOLVE Loop
memory used=980.4MB, alloc=4.6MB, time=93.08
x[1] = 1.7310668599447017094145762269626
y[1] (analytic) = 0
y[1] (numeric) = 1.3871969929080177812570901542011
absolute error = 1.3871969929080177812570901542011
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.06898
Order of pole = 18.06
memory used=984.2MB, alloc=4.6MB, time=93.23
TOP MAIN SOLVE Loop
x[1] = 1.7320409371989097470027595778554
y[1] (analytic) = 0
y[1] (numeric) = 1.3881629342109495399279425287563
absolute error = 1.3881629342109495399279425287563
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.0711
Order of pole = 18.91
memory used=988.0MB, alloc=4.6MB, time=93.38
TOP MAIN SOLVE Loop
x[1] = 1.7330150144531177845909429287482
y[1] (analytic) = 0
y[1] (numeric) = 1.3891287741332732943276467745424
absolute error = 1.3891287741332732943276467745424
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.07328
Order of pole = 19.78
memory used=991.8MB, alloc=4.6MB, time=93.53
TOP MAIN SOLVE Loop
x[1] = 1.7341108513641018268776491985026
y[1] (analytic) = 0
y[1] (numeric) = 1.3902152220458988068428913807276
absolute error = 1.3902152220458988068428913807276
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.07579
Order of pole = 20.79
memory used=995.6MB, alloc=4.6MB, time=93.69
TOP MAIN SOLVE Loop
x[1] = 1.7350849286183098644658325493954
y[1] (analytic) = 0
y[1] (numeric) = 1.3911808443512068027731144169185
absolute error = 1.3911808443512068027731144169185
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.07808
Order of pole = 21.72
memory used=999.4MB, alloc=4.6MB, time=93.84
TOP MAIN SOLVE Loop
x[1] = 1.7360590058725179020540159002882
y[1] (analytic) = 0
y[1] (numeric) = 1.3921463632199626924836688723057
absolute error = 1.3921463632199626924836688723057
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.08043
Order of pole = 22.68
memory used=1003.3MB, alloc=4.6MB, time=93.99
TOP MAIN SOLVE Loop
x[1] = 1.737033083126725939642199251181
y[1] (analytic) = 0
y[1] (numeric) = 1.3931117779931652097468006287299
absolute error = 1.3931117779931652097468006287299
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.08283
Order of pole = 23.67
memory used=1007.1MB, alloc=4.6MB, time=94.15
TOP MAIN SOLVE Loop
x[1] = 1.7380071603809339772303826020738
y[1] (analytic) = 0
y[1] (numeric) = 1.394077088011280472771211842043
absolute error = 1.394077088011280472771211842043
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.08529
Order of pole = 24.68
memory used=1010.9MB, alloc=4.6MB, time=94.30
TOP MAIN SOLVE Loop
memory used=1014.7MB, alloc=4.6MB, time=94.46
x[1] = 1.7391029972919180195170888718282
y[1] (analytic) = 0
y[1] (numeric) = 1.3951629357447142856472427595857
absolute error = 1.3951629357447142856472427595857
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.08814
Order of pole = 25.86
memory used=1018.5MB, alloc=4.6MB, time=94.61
TOP MAIN SOLVE Loop
x[1] = 1.740077074546126057105272222721
y[1] (analytic) = 0
y[1] (numeric) = 1.3961280209659799928102479713376
absolute error = 1.3961280209659799928102479713376
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.09073
Order of pole = 26.94
memory used=1022.3MB, alloc=4.6MB, time=94.76
TOP MAIN SOLVE Loop
x[1] = 1.7410511518003340946934555736138
y[1] (analytic) = 0
y[1] (numeric) = 1.3970929993676842116572044942821
absolute error = 1.3970929993676842116572044942821
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.09339
Order of pole = 28.05
memory used=1026.1MB, alloc=4.6MB, time=94.92
TOP MAIN SOLVE Loop
x[1] = 1.7420252290545421322816389245066
y[1] (analytic) = 0
y[1] (numeric) = 1.3980578702880979699418417762966
absolute error = 1.3980578702880979699418417762966
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.09612
Order of pole = 29.19
memory used=1030.0MB, alloc=4.6MB, time=95.07
TOP MAIN SOLVE Loop
x[1] = 1.743121065965526174568345194261
y[1] (analytic) = 0
y[1] (numeric) = 1.399143220775220665657637342127
absolute error = 1.399143220775220665657637342127
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.09927
Order of pole = 30.51
memory used=1033.8MB, alloc=4.6MB, time=95.22
TOP MAIN SOLVE Loop
x[1] = 1.7440951432197342121565285451538
y[1] (analytic) = 0
y[1] (numeric) = 1.4001078610983181987657674700865
absolute error = 1.4001078610983181987657674700865
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1021
Order of pole = 31.72
memory used=1037.6MB, alloc=4.6MB, time=95.37
TOP MAIN SOLVE Loop
x[1] = 1.7450692204739422497447118960466
y[1] (analytic) = 0
y[1] (numeric) = 1.4010723918687963832432491327015
absolute error = 1.4010723918687963832432491327015
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1051
Order of pole = 32.97
memory used=1041.4MB, alloc=4.6MB, time=95.53
TOP MAIN SOLVE Loop
x[1] = 1.7460432977281502873328952469394
y[1] (analytic) = 0
y[1] (numeric) = 1.4020368124227343838343187248869
absolute error = 1.4020368124227343838343187248869
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1081
Order of pole = 34.25
memory used=1045.2MB, alloc=4.6MB, time=95.68
TOP MAIN SOLVE Loop
memory used=1049.0MB, alloc=4.6MB, time=95.83
x[1] = 1.7470173749823583249210785978322
y[1] (analytic) = 0
y[1] (numeric) = 1.4030011220956805042551201649756
absolute error = 1.4030011220956805042551201649756
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1112
Order of pole = 35.57
memory used=1052.8MB, alloc=4.6MB, time=95.99
TOP MAIN SOLVE Loop
x[1] = 1.7481132118933423672077848675866
y[1] (analytic) = 0
y[1] (numeric) = 1.4040858371123076770674992388883
absolute error = 1.4040858371123076770674992388883
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1147
Order of pole = 37.09
memory used=1056.7MB, alloc=4.6MB, time=96.14
TOP MAIN SOLVE Loop
x[1] = 1.7490872891475504047959682184794
y[1] (analytic) = 0
y[1] (numeric) = 1.4050499089545363342757650186399
absolute error = 1.4050499089545363342757650186399
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.118
Order of pole = 38.48
memory used=1060.5MB, alloc=4.6MB, time=96.30
TOP MAIN SOLVE Loop
x[1] = 1.7500613664017584423841515693722
y[1] (analytic) = 0
y[1] (numeric) = 1.4060138678359421914927238289183
absolute error = 1.4060138678359421914927238289183
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1213
Order of pole = 39.91
memory used=1064.3MB, alloc=4.6MB, time=96.45
TOP MAIN SOLVE Loop
x[1] = 1.751035443655966479972334920265
y[1] (analytic) = 0
y[1] (numeric) = 1.4069777130898858685077295544566
absolute error = 1.4069777130898858685077295544566
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1247
Order of pole = 41.38
memory used=1068.1MB, alloc=4.6MB, time=96.60
TOP MAIN SOLVE Loop
x[1] = 1.7520095209101745175605182711578
y[1] (analytic) = 0
y[1] (numeric) = 1.4079414440491981600032163277814
absolute error = 1.4079414440491981600032163277814
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1282
Order of pole = 42.89
memory used=1071.9MB, alloc=4.6MB, time=96.76
TOP MAIN SOLVE Loop
x[1] = 1.7531053578211585598472245409122
y[1] (analytic) = 0
y[1] (numeric) = 1.4090255039292390287244880320259
absolute error = 1.4090255039292390287244880320259
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1323
Order of pole = 44.64
memory used=1075.7MB, alloc=4.6MB, time=96.91
TOP MAIN SOLVE Loop
x[1] = 1.754079435075366597435407891805
y[1] (analytic) = 0
y[1] (numeric) = 1.4099889897948317105496364768847
absolute error = 1.4099889897948317105496364768847
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1359
Order of pole = 46.23
memory used=1079.5MB, alloc=4.6MB, time=97.07
TOP MAIN SOLVE Loop
memory used=1083.4MB, alloc=4.6MB, time=97.22
x[1] = 1.7550535123295746350235912426978
y[1] (analytic) = 0
y[1] (numeric) = 1.4109523592774766464265193245338
absolute error = 1.4109523592774766464265193245338
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1397
Order of pole = 47.87
memory used=1087.2MB, alloc=4.6MB, time=97.38
TOP MAIN SOLVE Loop
x[1] = 1.7560275895837826726117745935906
y[1] (analytic) = 0
y[1] (numeric) = 1.4119156117078213146934415958604
absolute error = 1.4119156117078213146934415958604
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1435
Order of pole = 49.54
memory used=1091.0MB, alloc=4.6MB, time=97.53
TOP MAIN SOLVE Loop
x[1] = 1.7570016668379907101999579444834
y[1] (analytic) = 0
y[1] (numeric) = 1.4128787464159844503272482188911
absolute error = 1.4128787464159844503272482188911
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1475
Order of pole = 51.27
memory used=1094.8MB, alloc=4.6MB, time=97.68
TOP MAIN SOLVE Loop
x[1] = 1.7580975037489747524866642142378
y[1] (analytic) = 0
y[1] (numeric) = 1.4139621314131135521273079843668
absolute error = 1.4139621314131135521273079843668
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.152
Order of pole = 53.25
memory used=1098.6MB, alloc=4.6MB, time=97.83
TOP MAIN SOLVE Loop
x[1] = 1.7590715810031827900748475651306
y[1] (analytic) = 0
y[1] (numeric) = 1.4149250137350131208548362156254
absolute error = 1.4149250137350131208548362156254
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1562
Order of pole = 55.07
memory used=1102.4MB, alloc=4.6MB, time=97.99
TOP MAIN SOLVE Loop
x[1] = 1.7600456582573908276630309160234
y[1] (analytic) = 0
y[1] (numeric) = 1.4158877762379466809634318935354
absolute error = 1.4158877762379466809634318935354
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1604
Order of pole = 56.93
memory used=1106.3MB, alloc=4.6MB, time=98.15
TOP MAIN SOLVE Loop
x[1] = 1.7610197355115988652512142669162
y[1] (analytic) = 0
y[1] (numeric) = 1.4168504182498542082203741444156
absolute error = 1.4168504182498542082203741444156
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1647
Order of pole = 58.83
memory used=1110.1MB, alloc=4.6MB, time=98.30
TOP MAIN SOLVE Loop
memory used=1113.9MB, alloc=4.6MB, time=98.45
x[1] = 1.7621155724225829075379205366706
y[1] (analytic) = 0
y[1] (numeric) = 1.4179332456513496688701829094215
absolute error = 1.4179332456513496688701829094215
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1697
Order of pole = 61.04
TOP MAIN SOLVE Loop
memory used=1117.7MB, alloc=4.6MB, time=98.61
x[1] = 1.7630896496767909451261038875634
y[1] (analytic) = 0
y[1] (numeric) = 1.4188956293859690750261344708328
absolute error = 1.4188956293859690750261344708328
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1743
Order of pole = 63.04
memory used=1121.5MB, alloc=4.6MB, time=98.76
TOP MAIN SOLVE Loop
x[1] = 1.7640637269309989827142872384562
y[1] (analytic) = 0
y[1] (numeric) = 1.419857890525975257174290178353
absolute error = 1.419857890525975257174290178353
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1789
Order of pole = 65.1
memory used=1125.3MB, alloc=4.6MB, time=98.91
TOP MAIN SOLVE Loop
x[1] = 1.765037804185207020302470589349
y[1] (analytic) = 0
y[1] (numeric) = 1.4208200283971332382091388255847
absolute error = 1.4208200283971332382091388255847
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1836
Order of pole = 67.2
memory used=1129.1MB, alloc=4.6MB, time=99.07
TOP MAIN SOLVE Loop
x[1] = 1.7660118814394150578906539402418
y[1] (analytic) = 0
y[1] (numeric) = 1.4217820423246813668955763971864
absolute error = 1.4217820423246813668955763971864
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1885
Order of pole = 69.35
memory used=1133.0MB, alloc=4.6MB, time=99.22
TOP MAIN SOLVE Loop
x[1] = 1.7671077183503991001773602099962
y[1] (analytic) = 0
y[1] (numeric) = 1.4228641590009935731434897429875
absolute error = 1.4228641590009935731434897429875
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1941
Order of pole = 71.84
memory used=1136.8MB, alloc=4.6MB, time=99.38
TOP MAIN SOLVE Loop
x[1] = 1.768081795604607137765543560889
y[1] (analytic) = 0
y[1] (numeric) = 1.4238259073055480905943451001687
absolute error = 1.4238259073055480905943451001687
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.1992
Order of pole = 74.1
memory used=1140.6MB, alloc=4.6MB, time=99.53
TOP MAIN SOLVE Loop
x[1] = 1.7690558728588151753537269117818
y[1] (analytic) = 0
y[1] (numeric) = 1.4247875295544705894266079457513
absolute error = 1.4247875295544705894266079457513
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2043
Order of pole = 76.41
memory used=1144.4MB, alloc=4.6MB, time=99.68
TOP MAIN SOLVE Loop
x[1] = 1.7700299501130232129419102626746
y[1] (analytic) = 0
y[1] (numeric) = 1.4257490250708293674632523564847
absolute error = 1.4257490250708293674632523564847
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2096
Order of pole = 78.78
memory used=1148.2MB, alloc=4.6MB, time=99.83
TOP MAIN SOLVE Loop
memory used=1152.0MB, alloc=4.6MB, time=99.99
x[1] = 1.7710040273672312505300936135674
y[1] (analytic) = 0
y[1] (numeric) = 1.4267103931771672600423322461968
absolute error = 1.4267103931771672600423322461968
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.215
Order of pole = 81.19
memory used=1155.8MB, alloc=4.6MB, time=100.14
TOP MAIN SOLVE Loop
x[1] = 1.7720998642782152928167998833218
y[1] (analytic) = 0
y[1] (numeric) = 1.4277917791578188503366058559535
absolute error = 1.4277917791578188503366058559535
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2213
Order of pole = 83.98
memory used=1159.7MB, alloc=4.6MB, time=100.30
TOP MAIN SOLVE Loop
x[1] = 1.7730739415324233304049832342146
y[1] (analytic) = 0
y[1] (numeric) = 1.4287528742660953243894292826844
absolute error = 1.4287528742660953243894292826844
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2269
Order of pole = 86.51
memory used=1163.5MB, alloc=4.6MB, time=100.45
TOP MAIN SOLVE Loop
x[1] = 1.7740480187866313679931665851074
y[1] (analytic) = 0
y[1] (numeric) = 1.4297138398439131770709020405046
absolute error = 1.4297138398439131770709020405046
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2327
Order of pole = 89.1
memory used=1167.3MB, alloc=4.6MB, time=100.60
TOP MAIN SOLVE Loop
x[1] = 1.7750220960408394055813499360002
y[1] (analytic) = 0
y[1] (numeric) = 1.4306746752116502872359137191769
absolute error = 1.4306746752116502872359137191769
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2385
Order of pole = 91.74
memory used=1171.1MB, alloc=4.6MB, time=100.76
TOP MAIN SOLVE Loop
x[1] = 1.7761179329518234478680562057546
y[1] (analytic) = 0
y[1] (numeric) = 1.4317554585117351304495313993411
absolute error = 1.4317554585117351304495313993411
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2453
Order of pole = 94.78
memory used=1174.9MB, alloc=4.6MB, time=100.91
TOP MAIN SOLVE Loop
x[1] = 1.7770920102060314854562395566474
y[1] (analytic) = 0
y[1] (numeric) = 1.4327160149240999443649426863123
absolute error = 1.4327160149240999443649426863123
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2514
Order of pole = 97.54
memory used=1178.7MB, alloc=4.6MB, time=101.07
TOP MAIN SOLVE Loop
x[1] = 1.7780660874602395230444229075402
y[1] (analytic) = 0
y[1] (numeric) = 1.4336764389991873767140237195581
absolute error = 1.4336764389991873767140237195581
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2576
Order of pole = 100.4
memory used=1182.5MB, alloc=4.6MB, time=101.22
TOP MAIN SOLVE Loop
memory used=1186.4MB, alloc=4.6MB, time=101.37
x[1] = 1.779040164714447560632606258433
y[1] (analytic) = 0
y[1] (numeric) = 1.434636730055214590855978248078
absolute error = 1.434636730055214590855978248078
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.264
Order of pole = 103.2
memory used=1190.2MB, alloc=4.6MB, time=101.53
TOP MAIN SOLVE Loop
x[1] = 1.7800142419686555982207896093258
y[1] (analytic) = 0
y[1] (numeric) = 1.4355968874098755931813481986412
absolute error = 1.4355968874098755931813481986412
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2705
Order of pole = 106.2
memory used=1194.0MB, alloc=4.6MB, time=101.68
TOP MAIN SOLVE Loop
x[1] = 1.7811100788796396405074958790802
y[1] (analytic) = 0
y[1] (numeric) = 1.4366769037687325934244330949252
absolute error = 1.4366769037687325934244330949252
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2779
Order of pole = 109.5
memory used=1197.8MB, alloc=4.6MB, time=101.83
TOP MAIN SOLVE Loop
x[1] = 1.782084156133847678095679229973
y[1] (analytic) = 0
y[1] (numeric) = 1.4376367747401343539915454838889
absolute error = 1.4376367747401343539915454838889
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2846
Order of pole = 112.6
memory used=1201.6MB, alloc=4.6MB, time=101.99
TOP MAIN SOLVE Loop
x[1] = 1.7830582333880557156838625808658
y[1] (analytic) = 0
y[1] (numeric) = 1.4385965098745946187384584779585
absolute error = 1.4385965098745946187384584779585
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2914
Order of pole = 115.7
memory used=1205.4MB, alloc=4.6MB, time=102.14
TOP MAIN SOLVE Loop
x[1] = 1.7840323106422637532720459317586
y[1] (analytic) = 0
y[1] (numeric) = 1.4395561084876521232181633938237
absolute error = 1.4395561084876521232181633938237
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.2984
Order of pole = 118.9
memory used=1209.3MB, alloc=4.6MB, time=102.29
TOP MAIN SOLVE Loop
x[1] = 1.7850063878964717908602292826514
y[1] (analytic) = 0
y[1] (numeric) = 1.4405155698943237895943732171476
absolute error = 1.4405155698943237895943732171476
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3055
Order of pole = 122.1
memory used=1213.1MB, alloc=4.6MB, time=102.45
TOP MAIN SOLVE Loop
memory used=1216.9MB, alloc=4.6MB, time=102.60
x[1] = 1.7861022248074558331469355524058
y[1] (analytic) = 0
y[1] (numeric) = 1.4415947991187674686379185252176
absolute error = 1.4415947991187674686379185252176
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3136
Order of pole = 125.8
TOP MAIN SOLVE Loop
memory used=1220.7MB, alloc=4.6MB, time=102.76
x[1] = 1.7870763020616638707351189032986
y[1] (analytic) = 0
y[1] (numeric) = 1.4425539666851306193376620893808
absolute error = 1.4425539666851306193376620893808
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3209
Order of pole = 129.1
memory used=1224.5MB, alloc=4.6MB, time=102.91
TOP MAIN SOLVE Loop
x[1] = 1.7880503793158719083233022541914
y[1] (analytic) = 0
y[1] (numeric) = 1.4435129949011755214662520520295
absolute error = 1.4435129949011755214662520520295
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3283
Order of pole = 132.5
memory used=1228.3MB, alloc=4.6MB, time=103.06
TOP MAIN SOLVE Loop
x[1] = 1.7890244565700799459114856050842
y[1] (analytic) = 0
y[1] (numeric) = 1.4444718830797694665461708935956
absolute error = 1.4444718830797694665461708935956
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3359
Order of pole = 136
memory used=1232.1MB, alloc=4.6MB, time=103.22
TOP MAIN SOLVE Loop
x[1] = 1.7901202934810639881981918748386
y[1] (analytic) = 0
y[1] (numeric) = 1.4455504640359430848230558992695
absolute error = 1.4455504640359430848230558992695
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3445
Order of pole = 139.9
memory used=1236.0MB, alloc=4.6MB, time=103.37
TOP MAIN SOLVE Loop
x[1] = 1.7910943707352720257863752257314
y[1] (analytic) = 0
y[1] (numeric) = 1.4465090523510828294855523306567
absolute error = 1.4465090523510828294855523306567
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3523
Order of pole = 143.5
memory used=1239.8MB, alloc=4.6MB, time=103.53
TOP MAIN SOLVE Loop
x[1] = 1.7920684479894800633745585766242
y[1] (analytic) = 0
y[1] (numeric) = 1.4474674984781288858774055351643
absolute error = 1.4474674984781288858774055351643
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3603
Order of pole = 147.2
memory used=1243.6MB, alloc=4.6MB, time=103.68
TOP MAIN SOLVE Loop
x[1] = 1.793042525243688100962741927517
y[1] (analytic) = 0
y[1] (numeric) = 1.4484258017278035973137355758708
absolute error = 1.4484258017278035973137355758708
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3683
Order of pole = 150.9
memory used=1247.4MB, alloc=4.6MB, time=103.83
TOP MAIN SOLVE Loop
x[1] = 1.7940166024978961385509252784098
y[1] (analytic) = 0
y[1] (numeric) = 1.4493839614103100392152391916624
absolute error = 1.4493839614103100392152391916624
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3764
Order of pole = 154.6
memory used=1251.2MB, alloc=4.6MB, time=103.99
memory used=1255.0MB, alloc=4.6MB, time=104.14
TOP MAIN SOLVE Loop
x[1] = 1.7951124394088801808376315481642
y[1] (analytic) = 0
y[1] (numeric) = 1.4504617185859545779754537388937
absolute error = 1.4504617185859545779754537388937
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3857
Order of pole = 158.9
memory used=1258.8MB, alloc=4.6MB, time=104.30
TOP MAIN SOLVE Loop
x[1] = 1.796086516663088218425814899057
y[1] (analytic) = 0
y[1] (numeric) = 1.4514195708955180816580051625496
absolute error = 1.4514195708955180816580051625496
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.3941
Order of pole = 162.8
memory used=1262.7MB, alloc=4.6MB, time=104.45
TOP MAIN SOLVE Loop
x[1] = 1.7970605939172962560139982499498
y[1] (analytic) = 0
y[1] (numeric) = 1.4523772774789542262208741442542
absolute error = 1.4523772774789542262208741442542
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4025
Order of pole = 166.7
memory used=1266.5MB, alloc=4.6MB, time=104.61
TOP MAIN SOLVE Loop
x[1] = 1.7980346711715042936021816008426
y[1] (analytic) = 0
y[1] (numeric) = 1.4533348376443271347344785989888
absolute error = 1.4533348376443271347344785989888
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4111
Order of pole = 170.6
memory used=1270.3MB, alloc=4.6MB, time=104.76
TOP MAIN SOLVE Loop
x[1] = 1.7990087484257123311903649517354
y[1] (analytic) = 0
y[1] (numeric) = 1.4542922506991831399463746193439
absolute error = 1.4542922506991831399463746193439
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4198
Order of pole = 174.7
memory used=1274.1MB, alloc=4.6MB, time=104.92
TOP MAIN SOLVE Loop
x[1] = 1.8001045853366963734770712214898
y[1] (analytic) = 0
y[1] (numeric) = 1.4553691636800059772777097254914
absolute error = 1.4553691636800059772777097254914
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4297
Order of pole = 179.2
memory used=1277.9MB, alloc=4.6MB, time=105.07
TOP MAIN SOLVE Loop
x[1] = 1.8010786625909044110652545723826
y[1] (analytic) = 0
y[1] (numeric) = 1.4563262618234887823460704348465
absolute error = 1.4563262618234887823460704348465
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4385
Order of pole = 183.4
memory used=1281.7MB, alloc=4.6MB, time=105.22
TOP MAIN SOLVE Loop
x[1] = 1.8020527398451124486534379232754
y[1] (analytic) = 0
y[1] (numeric) = 1.457283210689202900625277195101
absolute error = 1.457283210689202900625277195101
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4475
Order of pole = 187.5
memory used=1285.5MB, alloc=4.6MB, time=105.38
TOP MAIN SOLVE Loop
memory used=1289.4MB, alloc=4.6MB, time=105.53
x[1] = 1.8030268170993204862416212741682
y[1] (analytic) = 0
y[1] (numeric) = 1.4582400095825619069484851239517
absolute error = 1.4582400095825619069484851239517
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4566
Order of pole = 191.8
memory used=1293.2MB, alloc=4.6MB, time=105.69
TOP MAIN SOLVE Loop
x[1] = 1.804000894353528523829804625061
y[1] (analytic) = 0
y[1] (numeric) = 1.4591966578084631116699401014445
absolute error = 1.4591966578084631116699401014445
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4657
Order of pole = 196
memory used=1297.0MB, alloc=4.6MB, time=105.84
TOP MAIN SOLVE Loop
x[1] = 1.8050967312645125661165108948154
y[1] (analytic) = 0
y[1] (numeric) = 1.4602727061017595093007484573127
absolute error = 1.4602727061017595093007484573127
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4761
Order of pole = 200.9
memory used=1300.8MB, alloc=4.6MB, time=106.00
TOP MAIN SOLVE Loop
x[1] = 1.8060708085187206037046942457082
y[1] (analytic) = 0
y[1] (numeric) = 1.4612290318489995442488425970487
absolute error = 1.4612290318489995442488425970487
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4854
Order of pole = 205.2
memory used=1304.6MB, alloc=4.6MB, time=106.15
TOP MAIN SOLVE Loop
x[1] = 1.807044885772928641292877596601
y[1] (analytic) = 0
y[1] (numeric) = 1.4621852047532617377786394191559
absolute error = 1.4621852047532617377786394191559
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.4948
Order of pole = 209.6
memory used=1308.4MB, alloc=4.6MB, time=106.30
TOP MAIN SOLVE Loop
x[1] = 1.8080189630271366788810609474938
y[1] (analytic) = 0
y[1] (numeric) = 1.4631412241173170364352737713524
absolute error = 1.4631412241173170364352737713524
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.5043
Order of pole = 214
memory used=1312.3MB, alloc=4.6MB, time=106.46
TOP MAIN SOLVE Loop
x[1] = 1.8091147999381207211677672172482
y[1] (analytic) = 0
y[1] (numeric) = 1.4642165615045579493163469743634
absolute error = 1.4642165615045579493163469743634
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.515
Order of pole = 219.1
memory used=1316.1MB, alloc=4.6MB, time=106.61
TOP MAIN SOLVE Loop
x[1] = 1.810088877192328758755950568141
y[1] (analytic) = 0
y[1] (numeric) = 1.4651722522783058751697376672056
absolute error = 1.4651722522783058751697376672056
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
memory used=1319.9MB, alloc=4.6MB, time=106.77
Real estimate of pole used for equation 1
Radius of convergence = 0.5246
Order of pole = 223.6
TOP MAIN SOLVE Loop
memory used=1323.7MB, alloc=4.6MB, time=106.92
x[1] = 1.8110629544465367963441339190338
y[1] (analytic) = 0
y[1] (numeric) = 1.4661277873296902063947214870053
absolute error = 1.4661277873296902063947214870053
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.5343
Order of pole = 228.1
memory used=1327.5MB, alloc=4.6MB, time=107.08
TOP MAIN SOLVE Loop
x[1] = 1.8120370317007448339323172699266
y[1] (analytic) = 0
y[1] (numeric) = 1.4670831659593608179755615050501
absolute error = 1.4670831659593608179755615050501
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.544
Order of pole = 232.7
memory used=1331.3MB, alloc=4.6MB, time=107.23
TOP MAIN SOLVE Loop
x[1] = 1.8130111089549528715205006208194
y[1] (analytic) = 0
y[1] (numeric) = 1.4680383874674541974189862109075
absolute error = 1.4680383874674541974189862109075
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.5537
Order of pole = 237.3
memory used=1335.1MB, alloc=4.6MB, time=107.39
TOP MAIN SOLVE Loop
x[1] = 1.8141069458659369138072068905738
y[1] (analytic) = 0
y[1] (numeric) = 1.4691128229826030942141873018993
absolute error = 1.4691128229826030942141873018993
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.5648
Order of pole = 242.5
memory used=1339.0MB, alloc=4.6MB, time=107.54
TOP MAIN SOLVE Loop
x[1] = 1.8150810231201449513953902414666
y[1] (analytic) = 0
y[1] (numeric) = 1.4700677082812373296907911234447
absolute error = 1.4700677082812373296907911234447
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.5746
Order of pole = 247.2
memory used=1342.8MB, alloc=4.6MB, time=107.69
TOP MAIN SOLVE Loop
x[1] = 1.8160551003743529889835735923594
y[1] (analytic) = 0
y[1] (numeric) = 1.4710224342679154543355890178495
absolute error = 1.4710224342679154543355890178495
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.5845
Order of pole = 251.9
memory used=1346.6MB, alloc=4.6MB, time=107.85
TOP MAIN SOLVE Loop
x[1] = 1.8170291776285610265717569432522
y[1] (analytic) = 0
y[1] (numeric) = 1.4719770002406596413493258026931
absolute error = 1.4719770002406596413493258026931
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.5945
Order of pole = 256.6
memory used=1350.4MB, alloc=4.6MB, time=108.01
TOP MAIN SOLVE Loop
x[1] = 1.818003254882769064159940294145
y[1] (analytic) = 0
y[1] (numeric) = 1.4729314054969803391126111412896
absolute error = 1.4729314054969803391126111412896
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.6044
Order of pole = 261.3
memory used=1354.2MB, alloc=4.6MB, time=108.16
memory used=1358.0MB, alloc=4.6MB, time=108.31
TOP MAIN SOLVE Loop
x[1] = 1.8190990917937531064466465638994
y[1] (analytic) = 0
y[1] (numeric) = 1.4740049184286527233874128581672
absolute error = 1.4740049184286527233874128581672
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.6157
Order of pole = 266.7
memory used=1361.8MB, alloc=4.6MB, time=108.47
TOP MAIN SOLVE Loop
x[1] = 1.8200731690479611440348299147922
y[1] (analytic) = 0
y[1] (numeric) = 1.4749589798277543571692243123611
absolute error = 1.4749589798277543571692243123611
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.6257
Order of pole = 271.4
memory used=1365.7MB, alloc=4.6MB, time=108.62
TOP MAIN SOLVE Loop
x[1] = 1.821047246302169181623013265685
y[1] (analytic) = 0
y[1] (numeric) = 1.4759128783118580727951118407794
absolute error = 1.4759128783118580727951118407794
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.6357
Order of pole = 276.2
memory used=1369.5MB, alloc=4.6MB, time=108.78
TOP MAIN SOLVE Loop
x[1] = 1.8220213235563772192111966165778
y[1] (analytic) = 0
y[1] (numeric) = 1.4768666131763669643393775834826
absolute error = 1.4768666131763669643393775834826
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.6457
Order of pole = 281
memory used=1373.3MB, alloc=4.6MB, time=108.93
TOP MAIN SOLVE Loop
x[1] = 1.8231171604673612614979028863322
y[1] (analytic) = 0
y[1] (numeric) = 1.4779393684444319518805508897972
absolute error = 1.4779393684444319518805508897972
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.6569
Order of pole = 286.4
memory used=1377.1MB, alloc=4.6MB, time=109.08
TOP MAIN SOLVE Loop
x[1] = 1.824091237721569299086086237225
y[1] (analytic) = 0
y[1] (numeric) = 1.4788927532754919364872714451994
absolute error = 1.4788927532754919364872714451994
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.667
Order of pole = 291.2
memory used=1380.9MB, alloc=4.6MB, time=109.24
TOP MAIN SOLVE Loop
x[1] = 1.8250653149757773366742695881178
y[1] (analytic) = 0
y[1] (numeric) = 1.4798459722818061273975074606084
absolute error = 1.4798459722818061273975074606084
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.677
Order of pole = 296
memory used=1384.7MB, alloc=4.6MB, time=109.39
TOP MAIN SOLVE Loop
x[1] = 1.8260393922299853742624529390106
y[1] (analytic) = 0
y[1] (numeric) = 1.4807990247566760143426710779835
absolute error = 1.4807990247566760143426710779835
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.687
Order of pole = 300.8
memory used=1388.5MB, alloc=4.6MB, time=109.55
TOP MAIN SOLVE Loop
memory used=1392.4MB, alloc=4.6MB, time=109.70
x[1] = 1.8270134694841934118506362899034
y[1] (analytic) = 0
y[1] (numeric) = 1.4817519099928944880578952887957
absolute error = 1.4817519099928944880578952887957
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.6969
Order of pole = 305.6
memory used=1396.2MB, alloc=4.6MB, time=109.86
TOP MAIN SOLVE Loop
x[1] = 1.8281093063951774541373425596578
y[1] (analytic) = 0
y[1] (numeric) = 1.4828237050999814293996014931139
absolute error = 1.4828237050999814293996014931139
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.7081
Order of pole = 311
memory used=1400.0MB, alloc=4.6MB, time=110.01
TOP MAIN SOLVE Loop
x[1] = 1.8290833836493854917255259105506
y[1] (analytic) = 0
y[1] (numeric) = 1.4837762326035971078862859588016
absolute error = 1.4837762326035971078862859588016
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.718
Order of pole = 315.8
memory used=1403.8MB, alloc=4.6MB, time=110.17
TOP MAIN SOLVE Loop
x[1] = 1.8300574609035935293137092614434
y[1] (analytic) = 0
y[1] (numeric) = 1.484728590655264915757418209288
absolute error = 1.484728590655264915757418209288
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.7279
Order of pole = 320.6
memory used=1407.6MB, alloc=4.6MB, time=110.32
TOP MAIN SOLVE Loop
x[1] = 1.8310315381578015669018926123362
y[1] (analytic) = 0
y[1] (numeric) = 1.4856807785456834681249139337314
absolute error = 1.4856807785456834681249139337314
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.7377
Order of pole = 325.3
memory used=1411.4MB, alloc=4.6MB, time=110.47
TOP MAIN SOLVE Loop
x[1] = 1.832005615412009604490075963229
y[1] (analytic) = 0
y[1] (numeric) = 1.4866327955650445826737927999793
absolute error = 1.4866327955650445826737927999793
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.7475
Order of pole = 330.1
memory used=1415.3MB, alloc=4.6MB, time=110.62
TOP MAIN SOLVE Loop
x[1] = 1.8331014523229936467767822329834
y[1] (analytic) = 0
y[1] (numeric) = 1.4877036095830703540122902369447
absolute error = 1.4877036095830703540122902369447
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.7585
Order of pole = 335.4
memory used=1419.1MB, alloc=4.6MB, time=110.78
TOP MAIN SOLVE Loop
memory used=1422.9MB, alloc=4.6MB, time=110.93
x[1] = 1.8340755295772016843649655838762
y[1] (analytic) = 0
y[1] (numeric) = 1.4886552611423377776563741416377
absolute error = 1.4886552611423377776563741416377
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.7682
Order of pole = 340.1
memory used=1426.7MB, alloc=4.6MB, time=111.09
TOP MAIN SOLVE Loop
x[1] = 1.835049606831409721953148934769
y[1] (analytic) = 0
y[1] (numeric) = 1.489606739609134671817199381277
absolute error = 1.489606739609134671817199381277
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.7778
Order of pole = 344.8
memory used=1430.5MB, alloc=4.6MB, time=111.24
TOP MAIN SOLVE Loop
x[1] = 1.8360236840856177595413322856618
y[1] (analytic) = 0
y[1] (numeric) = 1.4905580442715661131173600822316
absolute error = 1.4905580442715661131173600822316
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.7873
Order of pole = 349.5
memory used=1434.3MB, alloc=4.6MB, time=111.40
TOP MAIN SOLVE Loop
x[1] = 1.8371195209966018018280385554162
y[1] (analytic) = 0
y[1] (numeric) = 1.4916280533792299470732017648876
absolute error = 1.4916280533792299470732017648876
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.798
Order of pole = 354.7
memory used=1438.1MB, alloc=4.6MB, time=111.55
TOP MAIN SOLVE Loop
x[1] = 1.838093598250809839416221906309
y[1] (analytic) = 0
y[1] (numeric) = 1.4925789863413663651062374384159
absolute error = 1.4925789863413663651062374384159
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8074
Order of pole = 359.4
memory used=1442.0MB, alloc=4.6MB, time=111.70
TOP MAIN SOLVE Loop
x[1] = 1.8390676755050178770044052572018
y[1] (analytic) = 0
y[1] (numeric) = 1.4935297432712128397425309907239
absolute error = 1.4935297432712128397425309907239
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8167
Order of pole = 363.9
memory used=1445.8MB, alloc=4.6MB, time=111.85
TOP MAIN SOLVE Loop
x[1] = 1.8400417527592259145925886080946
y[1] (analytic) = 0
y[1] (numeric) = 1.4944803234547939212107674633279
absolute error = 1.4944803234547939212107674633279
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.826
Order of pole = 368.5
memory used=1449.6MB, alloc=4.6MB, time=112.01
TOP MAIN SOLVE Loop
x[1] = 1.8410158300134339521807719589874
y[1] (analytic) = 0
y[1] (numeric) = 1.495430726177630740758868321657
absolute error = 1.495430726177630740758868321657
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8351
Order of pole = 373
memory used=1453.4MB, alloc=4.6MB, time=112.16
TOP MAIN SOLVE Loop
memory used=1457.2MB, alloc=4.6MB, time=112.32
x[1] = 1.8421116669244179944674782287418
y[1] (analytic) = 0
y[1] (numeric) = 1.4964997162295204576603428825005
absolute error = 1.4964997162295204576603428825005
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8453
Order of pole = 378.1
memory used=1461.0MB, alloc=4.6MB, time=112.47
TOP MAIN SOLVE Loop
x[1] = 1.8430857441786260320556615796346
y[1] (analytic) = 0
y[1] (numeric) = 1.4974497394736864742367810824052
absolute error = 1.4974497394736864742367810824052
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8543
Order of pole = 382.5
memory used=1464.8MB, alloc=4.6MB, time=112.62
TOP MAIN SOLVE Loop
x[1] = 1.8440598214328340696438449305274
y[1] (analytic) = 0
y[1] (numeric) = 1.4983995830211212124242461447257
absolute error = 1.4983995830211212124242461447257
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8631
Order of pole = 386.9
memory used=1468.7MB, alloc=4.6MB, time=112.78
TOP MAIN SOLVE Loop
x[1] = 1.8450338986870421072320282814202
y[1] (analytic) = 0
y[1] (numeric) = 1.4993492461552731859621784043552
absolute error = 1.4993492461552731859621784043552
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8719
Order of pole = 391.3
memory used=1472.5MB, alloc=4.6MB, time=112.93
TOP MAIN SOLVE Loop
x[1] = 1.846007975941250144820211632313
y[1] (analytic) = 0
y[1] (numeric) = 1.5002987281590894322020582850964
absolute error = 1.5002987281590894322020582850964
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8805
Order of pole = 395.6
memory used=1476.3MB, alloc=4.6MB, time=113.09
TOP MAIN SOLVE Loop
x[1] = 1.8471038128522341871069179020674
y[1] (analytic) = 0
y[1] (numeric) = 1.501366678012569914477019567983
absolute error = 1.501366678012569914477019567983
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8901
Order of pole = 400.5
memory used=1480.1MB, alloc=4.6MB, time=113.24
TOP MAIN SOLVE Loop
x[1] = 1.8480778901064422246951012529602
y[1] (analytic) = 0
y[1] (numeric) = 1.5023157727312956243071851354793
absolute error = 1.5023157727312956243071851354793
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.8986
Order of pole = 404.7
memory used=1483.9MB, alloc=4.6MB, time=113.39
TOP MAIN SOLVE Loop
x[1] = 1.849051967360650262283284603853
y[1] (analytic) = 0
y[1] (numeric) = 1.5032646840756671765087623268206
absolute error = 1.5032646840756671765087623268206
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9069
Order of pole = 408.9
memory used=1487.7MB, alloc=4.6MB, time=113.55
TOP MAIN SOLVE Loop
memory used=1491.6MB, alloc=4.6MB, time=113.70
x[1] = 1.8500260446148582998714679547458
y[1] (analytic) = 0
y[1] (numeric) = 1.5042134113265671087646150036066
absolute error = 1.5042134113265671087646150036066
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9151
Order of pole = 413
memory used=1495.4MB, alloc=4.6MB, time=113.85
TOP MAIN SOLVE Loop
x[1] = 1.8510001218690663374596513056386
y[1] (analytic) = 0
y[1] (numeric) = 1.5051619537643784757529623787035
absolute error = 1.5051619537643784757529623787035
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9232
Order of pole = 417.1
memory used=1499.2MB, alloc=4.6MB, time=114.01
TOP MAIN SOLVE Loop
x[1] = 1.852095958780050379746357575393
y[1] (analytic) = 0
y[1] (numeric) = 1.5062288422008730809828466151139
absolute error = 1.5062288422008730809828466151139
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9321
Order of pole = 421.7
memory used=1503.0MB, alloc=4.6MB, time=114.16
TOP MAIN SOLVE Loop
x[1] = 1.8530700360342584173345409262858
y[1] (analytic) = 0
y[1] (numeric) = 1.5071769895192400659757481300265
absolute error = 1.5071769895192400659757481300265
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9399
Order of pole = 425.6
memory used=1506.8MB, alloc=4.6MB, time=114.31
TOP MAIN SOLVE Loop
x[1] = 1.8540441132884664549227242771786
y[1] (analytic) = 0
y[1] (numeric) = 1.5081249497725005670220862954147
absolute error = 1.5081249497725005670220862954147
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9476
Order of pole = 429.6
memory used=1510.6MB, alloc=4.6MB, time=114.47
TOP MAIN SOLVE Loop
x[1] = 1.8550181905426744925109076280714
y[1] (analytic) = 0
y[1] (numeric) = 1.5090727222389814670390826272532
absolute error = 1.5090727222389814670390826272532
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9552
Order of pole = 433.5
memory used=1514.4MB, alloc=4.6MB, time=114.62
TOP MAIN SOLVE Loop
x[1] = 1.8561140274536585347976138978258
y[1] (analytic) = 0
y[1] (numeric) = 1.5101387409006811742621404716356
absolute error = 1.5101387409006811742621404716356
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9636
Order of pole = 437.7
memory used=1518.3MB, alloc=4.6MB, time=114.78
TOP MAIN SOLVE Loop
memory used=1522.1MB, alloc=4.6MB, time=114.93
x[1] = 1.8570881047078665723857972487186
y[1] (analytic) = 0
y[1] (numeric) = 1.5110861119218046497106740092226
absolute error = 1.5110861119218046497106740092226
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9709
Order of pole = 441.5
memory used=1525.9MB, alloc=4.6MB, time=115.08
TOP MAIN SOLVE Loop
x[1] = 1.8580621819620746099739805996114
y[1] (analytic) = 0
y[1] (numeric) = 1.5120332928977157372928280681885
absolute error = 1.5120332928977157372928280681885
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.978
Order of pole = 445.2
memory used=1529.7MB, alloc=4.6MB, time=115.24
TOP MAIN SOLVE Loop
x[1] = 1.8590362592162826475621639505042
y[1] (analytic) = 0
y[1] (numeric) = 1.5129802831046920044553026253466
absolute error = 1.5129802831046920044553026253466
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9851
Order of pole = 448.9
memory used=1533.5MB, alloc=4.6MB, time=115.40
TOP MAIN SOLVE Loop
x[1] = 1.860010336470490685150347301397
y[1] (analytic) = 0
y[1] (numeric) = 1.513927081818515262883747610841
absolute error = 1.513927081818515262883747610841
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.992
Order of pole = 452.5
memory used=1537.3MB, alloc=4.6MB, time=115.55
TOP MAIN SOLVE Loop
x[1] = 1.8611061733814747274370535711514
y[1] (analytic) = 0
y[1] (numeric) = 1.5149920005750344388430977733598
absolute error = 1.5149920005750344388430977733598
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9996
Order of pole = 456.4
memory used=1541.1MB, alloc=4.6MB, time=115.70
TOP MAIN SOLVE Loop
x[1] = 1.8620802506356827650252369220442
y[1] (analytic) = 0
y[1] (numeric) = 1.5159383899590159305214692940535
absolute error = 1.5159383899590159305214692940535
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.006
Order of pole = 459.9
memory used=1545.0MB, alloc=4.6MB, time=115.86
TOP MAIN SOLVE Loop
x[1] = 1.863054327889890802613420272937
y[1] (analytic) = 0
y[1] (numeric) = 1.5168845855834718328381252777265
absolute error = 1.5168845855834718328381252777265
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.013
Order of pole = 463.3
memory used=1548.8MB, alloc=4.6MB, time=116.01
TOP MAIN SOLVE Loop
x[1] = 1.8640284051440988402016036238298
y[1] (analytic) = 0
y[1] (numeric) = 1.5178305867221433518851671723171
absolute error = 1.5178305867221433518851671723171
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.019
Order of pole = 466.7
memory used=1552.6MB, alloc=4.6MB, time=116.17
TOP MAIN SOLVE Loop
x[1] = 1.8650024823983068777897869747226
y[1] (analytic) = 0
y[1] (numeric) = 1.518776392648278075280378145792
absolute error = 1.518776392648278075280378145792
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.025
Order of pole = 470
memory used=1556.4MB, alloc=4.6MB, time=116.32
memory used=1560.2MB, alloc=4.6MB, time=116.47
TOP MAIN SOLVE Loop
x[1] = 1.866098319309290920076493244477
y[1] (analytic) = 0
y[1] (numeric) = 1.5198401900696690681972377129542
absolute error = 1.5198401900696690681972377129542
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.032
Order of pole = 473.6
memory used=1564.0MB, alloc=4.6MB, time=116.63
TOP MAIN SOLVE Loop
x[1] = 1.8670723965634989576646765953698
y[1] (analytic) = 0
y[1] (numeric) = 1.5207855787538668784579953968179
absolute error = 1.5207855787538668784579953968179
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.038
Order of pole = 476.8
memory used=1567.8MB, alloc=4.6MB, time=116.78
TOP MAIN SOLVE Loop
x[1] = 1.8680464738177069952528599462626
y[1] (analytic) = 0
y[1] (numeric) = 1.5217307699512497488656356347899
absolute error = 1.5217307699512497488656356347899
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.044
Order of pole = 479.9
memory used=1571.7MB, alloc=4.6MB, time=116.94
TOP MAIN SOLVE Loop
x[1] = 1.8690205510719150328410432971554
y[1] (analytic) = 0
y[1] (numeric) = 1.5226757629330335845191177645294
absolute error = 1.5226757629330335845191177645294
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.05
Order of pole = 483
memory used=1575.5MB, alloc=4.6MB, time=117.09
TOP MAIN SOLVE Loop
x[1] = 1.8701163879828990751277495669098
y[1] (analytic) = 0
y[1] (numeric) = 1.5237386421999045811329588378059
absolute error = 1.5237386421999045811329588378059
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.056
Order of pole = 486.4
memory used=1579.3MB, alloc=4.6MB, time=117.24
TOP MAIN SOLVE Loop
x[1] = 1.8710904652371071127159329178026
y[1] (analytic) = 0
y[1] (numeric) = 1.5246832115515064979220652644932
absolute error = 1.5246832115515064979220652644932
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.061
Order of pole = 489.3
memory used=1583.1MB, alloc=4.6MB, time=117.40
TOP MAIN SOLVE Loop
x[1] = 1.8720645424913151503041162686954
y[1] (analytic) = 0
y[1] (numeric) = 1.5256275804068936478734934657867
absolute error = 1.5256275804068936478734934657867
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.066
Order of pole = 492.2
memory used=1586.9MB, alloc=4.6MB, time=117.55
TOP MAIN SOLVE Loop
memory used=1590.7MB, alloc=4.6MB, time=117.70
x[1] = 1.8730386197455231878922996195882
y[1] (analytic) = 0
y[1] (numeric) = 1.5265717480352575911704429047895
absolute error = 1.5265717480352575911704429047895
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.072
Order of pole = 495
TOP MAIN SOLVE Loop
memory used=1594.5MB, alloc=4.6MB, time=117.86
x[1] = 1.874012696999731225480482970481
y[1] (analytic) = 0
y[1] (numeric) = 1.52751571370530025841567338268
absolute error = 1.52751571370530025841567338268
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.077
Order of pole = 497.7
memory used=1598.4MB, alloc=4.6MB, time=118.01
TOP MAIN SOLVE Loop
x[1] = 1.8751085339107152677671892402354
y[1] (analytic) = 0
y[1] (numeric) = 1.5285774327696124467505422569121
absolute error = 1.5285774327696124467505422569121
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.082
Order of pole = 500.8
memory used=1602.2MB, alloc=4.6MB, time=118.17
TOP MAIN SOLVE Loop
x[1] = 1.8760826111649233053553725911282
y[1] (analytic) = 0
y[1] (numeric) = 1.5295209668478514965507722467242
absolute error = 1.5295209668478514965507722467242
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.087
Order of pole = 503.4
memory used=1606.0MB, alloc=4.6MB, time=118.32
TOP MAIN SOLVE Loop
x[1] = 1.877056688419131342943555942021
y[1] (analytic) = 0
y[1] (numeric) = 1.5304642966793118596938886775875
absolute error = 1.5304642966793118596938886775875
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.091
Order of pole = 506
memory used=1609.8MB, alloc=4.6MB, time=118.47
TOP MAIN SOLVE Loop
x[1] = 1.8780307656733393805317392929138
y[1] (analytic) = 0
y[1] (numeric) = 1.5314074215306804325678935741027
absolute error = 1.5314074215306804325678935741027
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.096
Order of pole = 508.5
memory used=1613.6MB, alloc=4.6MB, time=118.63
TOP MAIN SOLVE Loop
x[1] = 1.8790048429275474181199226438066
y[1] (analytic) = 0
y[1] (numeric) = 1.5323503406681567653016310788336
absolute error = 1.5323503406681567653016310788336
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.1
Order of pole = 511
memory used=1617.4MB, alloc=4.6MB, time=118.78
TOP MAIN SOLVE Loop
x[1] = 1.880100679838531460406628913561
y[1] (analytic) = 0
y[1] (numeric) = 1.5334108778911380976828663964598
absolute error = 1.5334108778911380976828663964598
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.105
Order of pole = 513.7
memory used=1621.3MB, alloc=4.6MB, time=118.94
TOP MAIN SOLVE Loop
memory used=1625.1MB, alloc=4.6MB, time=119.09
x[1] = 1.8810747570927394979948122644538
y[1] (analytic) = 0
y[1] (numeric) = 1.5343533574479243133611264905929
absolute error = 1.5343533574479243133611264905929
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.109
Order of pole = 516.1
memory used=1628.9MB, alloc=4.6MB, time=119.24
TOP MAIN SOLVE Loop
x[1] = 1.8820488343469475355829956153466
y[1] (analytic) = 0
y[1] (numeric) = 1.5352956289945557688239039883986
absolute error = 1.5352956289945557688239039883986
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.113
Order of pole = 518.4
memory used=1632.7MB, alloc=4.6MB, time=119.40
TOP MAIN SOLVE Loop
x[1] = 1.8830229116011555731711789662394
y[1] (analytic) = 0
y[1] (numeric) = 1.5362376917952265070216155730055
absolute error = 1.5362376917952265070216155730055
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.117
Order of pole = 520.7
memory used=1636.5MB, alloc=4.6MB, time=119.55
TOP MAIN SOLVE Loop
x[1] = 1.8841187485121396154578852359938
y[1] (analytic) = 0
y[1] (numeric) = 1.5372972620125375222276780669349
absolute error = 1.5372972620125375222276780669349
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.121
Order of pole = 523.1
memory used=1640.3MB, alloc=4.6MB, time=119.70
TOP MAIN SOLVE Loop
x[1] = 1.8850928257663476530460685868866
y[1] (analytic) = 0
y[1] (numeric) = 1.5382388787827223319949194692371
absolute error = 1.5382388787827223319949194692371
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.125
Order of pole = 525.3
memory used=1644.1MB, alloc=4.6MB, time=119.86
TOP MAIN SOLVE Loop
x[1] = 1.8860669030205556906342519377794
y[1] (analytic) = 0
y[1] (numeric) = 1.5391802845044288769384066172063
absolute error = 1.5391802845044288769384066172063
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.128
Order of pole = 527.4
memory used=1648.0MB, alloc=4.6MB, time=120.01
TOP MAIN SOLVE Loop
x[1] = 1.8870409802747637282224352886722
y[1] (analytic) = 0
y[1] (numeric) = 1.5401214784398535188288114300252
absolute error = 1.5401214784398535188288114300252
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.132
Order of pole = 529.4
memory used=1651.8MB, alloc=4.6MB, time=120.17
TOP MAIN SOLVE Loop
x[1] = 1.888015057528971765810618639565
y[1] (analytic) = 0
y[1] (numeric) = 1.5410624598507095275722212340949
absolute error = 1.5410624598507095275722212340949
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.135
Order of pole = 531.4
memory used=1655.6MB, alloc=4.6MB, time=120.32
TOP MAIN SOLVE Loop
memory used=1659.4MB, alloc=4.6MB, time=120.48
x[1] = 1.8891108944399558080973249093194
y[1] (analytic) = 0
y[1] (numeric) = 1.5421208089847759120907088510363
absolute error = 1.5421208089847759120907088510363
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.138
Order of pole = 533.6
memory used=1663.2MB, alloc=4.6MB, time=120.63
TOP MAIN SOLVE Loop
x[1] = 1.8900849716941638456855082602122
y[1] (analytic) = 0
y[1] (numeric) = 1.5430613363273781483769975375327
absolute error = 1.5430613363273781483769975375327
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.142
Order of pole = 535.5
memory used=1667.0MB, alloc=4.6MB, time=120.78
TOP MAIN SOLVE Loop
x[1] = 1.891059048948371883273691611105
y[1] (analytic) = 0
y[1] (numeric) = 1.5440016488351572316995496811673
absolute error = 1.5440016488351572316995496811673
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.145
Order of pole = 537.3
memory used=1670.8MB, alloc=4.6MB, time=120.94
TOP MAIN SOLVE Loop
x[1] = 1.8920331262025799208618749619978
y[1] (analytic) = 0
y[1] (numeric) = 1.54494174576783867111428416585
absolute error = 1.54494174576783867111428416585
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.147
Order of pole = 539.1
memory used=1674.7MB, alloc=4.6MB, time=121.09
TOP MAIN SOLVE Loop
x[1] = 1.8930072034567879584500583128906
y[1] (analytic) = 0
y[1] (numeric) = 1.5458816263846673153032845797075
absolute error = 1.5458816263846673153032845797075
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.15
Order of pole = 540.9
memory used=1678.5MB, alloc=4.6MB, time=121.25
TOP MAIN SOLVE Loop
x[1] = 1.894103040367772000736764582645
y[1] (analytic) = 0
y[1] (numeric) = 1.5469387325906132267921180448499
absolute error = 1.5469387325906132267921180448499
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.153
Order of pole = 542.8
memory used=1682.3MB, alloc=4.6MB, time=121.40
TOP MAIN SOLVE Loop
x[1] = 1.8950771176219800383249479335378
y[1] (analytic) = 0
y[1] (numeric) = 1.5478781510745244858327781826668
absolute error = 1.5478781510745244858327781826668
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.156
Order of pole = 544.5
memory used=1686.1MB, alloc=4.6MB, time=121.56
TOP MAIN SOLVE Loop
x[1] = 1.8960511948761880759131312844306
y[1] (analytic) = 0
y[1] (numeric) = 1.548817350924630399651704859465
absolute error = 1.548817350924630399651704859465
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.158
Order of pole = 546.1
memory used=1689.9MB, alloc=4.6MB, time=121.71
TOP MAIN SOLVE Loop
x[1] = 1.8970252721303961135013146353234
y[1] (analytic) = 0
y[1] (numeric) = 1.5497563313981981958868388636933
absolute error = 1.5497563313981981958868388636933
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.161
Order of pole = 547.7
memory used=1693.7MB, alloc=4.6MB, time=121.87
memory used=1697.6MB, alloc=4.6MB, time=122.02
TOP MAIN SOLVE Loop
x[1] = 1.8981211090413801557880209050778
y[1] (analytic) = 0
y[1] (numeric) = 1.5508124212820404327912572878625
absolute error = 1.5508124212820404327912572878625
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.163
Order of pole = 549.4
memory used=1701.4MB, alloc=4.6MB, time=122.17
TOP MAIN SOLVE Loop
x[1] = 1.8990951862955881933762042559706
y[1] (analytic) = 0
y[1] (numeric) = 1.5517509331121773747531891548225
absolute error = 1.5517509331121773747531891548225
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.165
Order of pole = 550.9
memory used=1705.2MB, alloc=4.6MB, time=122.33
TOP MAIN SOLVE Loop
x[1] = 1.9000692635497962309643876068634
y[1] (analytic) = 0
y[1] (numeric) = 1.5526892232416565393609342377433
absolute error = 1.5526892232416565393609342377433
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.167
Order of pole = 552.4
memory used=1709.0MB, alloc=4.6MB, time=122.48
TOP MAIN SOLVE Loop
x[1] = 1.9010433408040042685525709577562
y[1] (analytic) = 0
y[1] (numeric) = 1.5536272909257758546936219759455
absolute error = 1.5536272909257758546936219759455
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.169
Order of pole = 553.8
memory used=1712.8MB, alloc=4.6MB, time=122.64
TOP MAIN SOLVE Loop
x[1] = 1.902017418058212306140754308649
y[1] (analytic) = 0
y[1] (numeric) = 1.5545651354193571122065730874137
absolute error = 1.5545651354193571122065730874137
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.171
Order of pole = 555.1
memory used=1716.6MB, alloc=4.6MB, time=122.79
TOP MAIN SOLVE Loop
x[1] = 1.9031132549691963484274605784034
y[1] (analytic) = 0
y[1] (numeric) = 1.5556199427637510946343146184653
absolute error = 1.5556199427637510946343146184653
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.173
Order of pole = 556.7
memory used=1720.4MB, alloc=4.6MB, time=122.95
TOP MAIN SOLVE Loop
x[1] = 1.9040873322234043860156439292962
y[1] (analytic) = 0
y[1] (numeric) = 1.5565573105010436151203563804101
absolute error = 1.5565573105010436151203563804101
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.175
Order of pole = 558
memory used=1724.3MB, alloc=4.6MB, time=123.10
TOP MAIN SOLVE Loop
x[1] = 1.905061409477612423603827280189
y[1] (analytic) = 0
y[1] (numeric) = 1.5574944527160528389446375630363
absolute error = 1.5574944527160528389446375630363
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.177
Order of pole = 559.2
memory used=1728.1MB, alloc=4.6MB, time=123.26
TOP MAIN SOLVE Loop
memory used=1731.9MB, alloc=4.6MB, time=123.41
x[1] = 1.9060354867318204611920106310818
y[1] (analytic) = 0
y[1] (numeric) = 1.5584313686616417967726388215155
absolute error = 1.5584313686616417967726388215155
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.178
Order of pole = 560.4
memory used=1735.7MB, alloc=4.6MB, time=123.56
TOP MAIN SOLVE Loop
x[1] = 1.9070095639860284987801939819746
y[1] (analytic) = 0
y[1] (numeric) = 1.5593680575901999644421947249661
absolute error = 1.5593680575901999644421947249661
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.18
Order of pole = 561.6
memory used=1739.5MB, alloc=4.6MB, time=123.72
TOP MAIN SOLVE Loop
x[1] = 1.908105400897012541066900251729
y[1] (analytic) = 0
y[1] (numeric) = 1.5604215603470631876542836747395
absolute error = 1.5604215603470631876542836747395
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.182
Order of pole = 562.9
memory used=1743.3MB, alloc=4.6MB, time=123.88
TOP MAIN SOLVE Loop
x[1] = 1.9090794781512205786550836026218
y[1] (analytic) = 0
y[1] (numeric) = 1.5613577643799713627776631385356
absolute error = 1.5613577643799713627776631385356
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.183
Order of pole = 564.1
memory used=1747.1MB, alloc=4.6MB, time=124.03
TOP MAIN SOLVE Loop
x[1] = 1.9100535554054286162432669535146
y[1] (analytic) = 0
y[1] (numeric) = 1.5622937390565192791426816794755
absolute error = 1.5622937390565192791426816794755
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.184
Order of pole = 565.2
memory used=1751.0MB, alloc=4.6MB, time=124.18
TOP MAIN SOLVE Loop
x[1] = 1.9110276326596366538314503044074
y[1] (analytic) = 0
y[1] (numeric) = 1.5632294836271484131833480890845
absolute error = 1.5632294836271484131833480890845
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.186
Order of pole = 566.2
memory used=1754.8MB, alloc=4.6MB, time=124.34
TOP MAIN SOLVE Loop
x[1] = 1.9120017099138446914196336553002
y[1] (analytic) = 0
y[1] (numeric) = 1.5641649973418293224055905675244
absolute error = 1.5641649973418293224055905675244
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.187
Order of pole = 567.3
memory used=1758.6MB, alloc=4.6MB, time=124.49
TOP MAIN SOLVE Loop
x[1] = 1.9130975468248287337063399250546
y[1] (analytic) = 0
y[1] (numeric) = 1.5652171733913661954596498662696
absolute error = 1.5652171733913661954596498662696
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.188
Order of pole = 568.4
memory used=1762.4MB, alloc=4.6MB, time=124.65
TOP MAIN SOLVE Loop
memory used=1766.2MB, alloc=4.6MB, time=124.80
x[1] = 1.9140716240790367712945232759474
y[1] (analytic) = 0
y[1] (numeric) = 1.5661521940446780946733433523
absolute error = 1.5661521940446780946733433523
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.189
Order of pole = 569.3
memory used=1770.0MB, alloc=4.6MB, time=124.96
TOP MAIN SOLVE Loop
x[1] = 1.9150457013332448088827066268402
y[1] (analytic) = 0
y[1] (numeric) = 1.5670869814951702865242120595962
absolute error = 1.5670869814951702865242120595962
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.19
Order of pole = 570.3
memory used=1773.8MB, alloc=4.6MB, time=125.11
TOP MAIN SOLVE Loop
x[1] = 1.916019778587452846470889977733
y[1] (analytic) = 0
y[1] (numeric) = 1.5680215349908763142361976095078
absolute error = 1.5680215349908763142361976095078
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.191
Order of pole = 571.2
memory used=1777.7MB, alloc=4.6MB, time=125.26
TOP MAIN SOLVE Loop
x[1] = 1.9171156154984368887575962474874
y[1] (analytic) = 0
y[1] (numeric) = 1.5690726270875776975992220488037
absolute error = 1.5690726270875776975992220488037
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.192
Order of pole = 572.2
memory used=1781.5MB, alloc=4.6MB, time=125.42
TOP MAIN SOLVE Loop
x[1] = 1.9180896927526449263457795983802
y[1] (analytic) = 0
y[1] (numeric) = 1.5700066809304625177678753028975
absolute error = 1.5700066809304625177678753028975
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.193
Order of pole = 573.1
memory used=1785.3MB, alloc=4.6MB, time=125.58
TOP MAIN SOLVE Loop
x[1] = 1.919063770006852963933962949273
y[1] (analytic) = 0
y[1] (numeric) = 1.5709404984656505446381772250277
absolute error = 1.5709404984656505446381772250277
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.194
Order of pole = 573.9
memory used=1789.1MB, alloc=4.6MB, time=125.73
TOP MAIN SOLVE Loop
x[1] = 1.9200378472610610015221463001658
y[1] (analytic) = 0
y[1] (numeric) = 1.5718740789392473121060619890439
absolute error = 1.5718740789392473121060619890439
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.194
Order of pole = 574.7
memory used=1792.9MB, alloc=4.6MB, time=125.89
TOP MAIN SOLVE Loop
x[1] = 1.9210119245152690391103296510586
y[1] (analytic) = 0
y[1] (numeric) = 1.5728074215968923304351728880913
absolute error = 1.5728074215968923304351728880913
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.195
Order of pole = 575.5
memory used=1796.7MB, alloc=4.6MB, time=126.04
memory used=1800.6MB, alloc=4.6MB, time=126.20
TOP MAIN SOLVE Loop
x[1] = 1.922107761426253081397035920813
y[1] (analytic) = 0
y[1] (numeric) = 1.5738571468824982632303094904298
absolute error = 1.5738571468824982632303094904298
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.196
Order of pole = 576.4
memory used=1804.4MB, alloc=4.6MB, time=126.36
TOP MAIN SOLVE Loop
x[1] = 1.9230818386804611189852192717058
y[1] (analytic) = 0
y[1] (numeric) = 1.5747899816744088137969044854812
absolute error = 1.5747899816744088137969044854812
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.196
Order of pole = 577.1
memory used=1808.2MB, alloc=4.6MB, time=126.51
TOP MAIN SOLVE Loop
x[1] = 1.9240559159346691565734026225986
y[1] (analytic) = 0
y[1] (numeric) = 1.5757225762899933737650279072013
absolute error = 1.5757225762899933737650279072013
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.197
Order of pole = 577.8
memory used=1812.0MB, alloc=4.6MB, time=126.67
TOP MAIN SOLVE Loop
x[1] = 1.9250299931888771941615859734914
y[1] (analytic) = 0
y[1] (numeric) = 1.5766549299729748358373101868559
absolute error = 1.5766549299729748358373101868559
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.197
Order of pole = 578.5
memory used=1815.8MB, alloc=4.6MB, time=126.82
TOP MAIN SOLVE Loop
x[1] = 1.9260040704430852317497693243842
y[1] (analytic) = 0
y[1] (numeric) = 1.5775870419666128581831871700422
absolute error = 1.5775870419666128581831871700422
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.198
Order of pole = 579.2
memory used=1819.6MB, alloc=4.6MB, time=126.98
TOP MAIN SOLVE Loop
x[1] = 1.9270999073540692740364755941386
y[1] (analytic) = 0
y[1] (numeric) = 1.5786353781223378160052691078344
absolute error = 1.5786353781223378160052691078344
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.198
Order of pole = 579.9
memory used=1823.4MB, alloc=4.6MB, time=127.13
TOP MAIN SOLVE Loop
x[1] = 1.9280739846082773116246589450314
y[1] (analytic) = 0
y[1] (numeric) = 1.5795669740113949716858920812529
absolute error = 1.5795669740113949716858920812529
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.198
Order of pole = 580.5
memory used=1827.3MB, alloc=4.6MB, time=127.29
TOP MAIN SOLVE Loop
x[1] = 1.9290480618624853492128422959242
y[1] (analytic) = 0
y[1] (numeric) = 1.5804983258433155032792108144661
absolute error = 1.5804983258433155032792108144661
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 581.1
memory used=1831.1MB, alloc=4.6MB, time=127.44
TOP MAIN SOLVE Loop
memory used=1834.9MB, alloc=4.6MB, time=127.60
x[1] = 1.930022139116693386801025646817
y[1] (analytic) = 0
y[1] (numeric) = 1.5814294328594540700297557941866
absolute error = 1.5814294328594540700297557941866
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 581.7
memory used=1838.7MB, alloc=4.6MB, time=127.75
TOP MAIN SOLVE Loop
x[1] = 1.9311179760276774290877319165714
y[1] (analytic) = 0
y[1] (numeric) = 1.5824766346760520891717217719306
absolute error = 1.5824766346760520891717217719306
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 582.4
memory used=1842.5MB, alloc=4.6MB, time=127.91
TOP MAIN SOLVE Loop
x[1] = 1.9320920532818854666759152674642
y[1] (analytic) = 0
y[1] (numeric) = 1.5834072189376132140602769270254
absolute error = 1.5834072189376132140602769270254
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 582.9
memory used=1846.3MB, alloc=4.6MB, time=128.06
TOP MAIN SOLVE Loop
x[1] = 1.933066130536093504264098618357
y[1] (analytic) = 0
y[1] (numeric) = 1.5843375560096608907393274821795
absolute error = 1.5843375560096608907393274821795
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 583.5
memory used=1850.1MB, alloc=4.6MB, time=128.22
TOP MAIN SOLVE Loop
x[1] = 1.9340402077903015418522819692498
y[1] (analytic) = 0
y[1] (numeric) = 1.5852676451316542966579287988598
absolute error = 1.5852676451316542966579287988598
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 584
memory used=1854.0MB, alloc=4.6MB, time=128.37
TOP MAIN SOLVE Loop
x[1] = 1.9350142850445095794404653201426
y[1] (analytic) = 0
y[1] (numeric) = 1.5861974855425945484553907372966
absolute error = 1.5861974855425945484553907372966
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.2
Order of pole = 584.5
memory used=1857.8MB, alloc=4.6MB, time=128.53
TOP MAIN SOLVE Loop
x[1] = 1.936110121955493621727171589897
y[1] (analytic) = 0
y[1] (numeric) = 1.587243257769351407051634887876
absolute error = 1.587243257769351407051634887876
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.2
Order of pole = 585
memory used=1861.6MB, alloc=4.6MB, time=128.68
TOP MAIN SOLVE Loop
memory used=1865.4MB, alloc=4.6MB, time=128.84
x[1] = 1.9370841992097016593153549407898
y[1] (analytic) = 0
y[1] (numeric) = 1.5881725671404616948482841711448
absolute error = 1.5881725671404616948482841711448
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.2
Order of pole = 585.5
memory used=1869.2MB, alloc=4.6MB, time=128.99
TOP MAIN SOLVE Loop
x[1] = 1.9380582764639096969035382916826
y[1] (analytic) = 0
y[1] (numeric) = 1.5891016254194512630917088306736
absolute error = 1.5891016254194512630917088306736
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.2
Order of pole = 586
memory used=1873.0MB, alloc=4.6MB, time=129.15
TOP MAIN SOLVE Loop
x[1] = 1.9390323537181177344917216425754
y[1] (analytic) = 0
y[1] (numeric) = 1.5900304318434377775537610870682
absolute error = 1.5900304318434377775537610870682
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 586.4
memory used=1876.8MB, alloc=4.6MB, time=129.30
TOP MAIN SOLVE Loop
x[1] = 1.9400064309723257720799049934682
y[1] (analytic) = 0
y[1] (numeric) = 1.5909589856490837876224743898229
absolute error = 1.5909589856490837876224743898229
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 586.8
memory used=1880.7MB, alloc=4.6MB, time=129.45
TOP MAIN SOLVE Loop
x[1] = 1.9411022678833098143666112632226
y[1] (analytic) = 0
y[1] (numeric) = 1.5920033057715472181710229857597
absolute error = 1.5920033057715472181710229857597
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 587.3
memory used=1884.5MB, alloc=4.6MB, time=129.61
TOP MAIN SOLVE Loop
x[1] = 1.9420763451375178519547946141154
y[1] (analytic) = 0
y[1] (numeric) = 1.5929313202266263770841834732024
absolute error = 1.5929313202266263770841834732024
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 587.7
memory used=1888.3MB, alloc=4.6MB, time=129.76
TOP MAIN SOLVE Loop
x[1] = 1.9430504223917258895429779650082
y[1] (analytic) = 0
y[1] (numeric) = 1.5938590796750085411609333085493
absolute error = 1.5938590796750085411609333085493
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 588.1
memory used=1892.1MB, alloc=4.6MB, time=129.92
TOP MAIN SOLVE Loop
x[1] = 1.944024499645933927131161315901
y[1] (analytic) = 0
y[1] (numeric) = 1.5947865833514850698419506631337
absolute error = 1.5947865833514850698419506631337
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.199
Order of pole = 588.4
memory used=1895.9MB, alloc=4.6MB, time=130.07
TOP MAIN SOLVE Loop
memory used=1899.7MB, alloc=4.6MB, time=130.22
x[1] = 1.9451203365569179694178675856554
y[1] (analytic) = 0
y[1] (numeric) = 1.5958297183068102691247685804114
absolute error = 1.5958297183068102691247685804114
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.198
Order of pole = 588.8
memory used=1903.6MB, alloc=4.6MB, time=130.38
TOP MAIN SOLVE Loop
x[1] = 1.9460944138111260070060509365482
y[1] (analytic) = 0
y[1] (numeric) = 1.5967566759251921642860488249919
absolute error = 1.5967566759251921642860488249919
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.198
Order of pole = 589.2
memory used=1907.4MB, alloc=4.6MB, time=130.53
TOP MAIN SOLVE Loop
x[1] = 1.947068491065334044594234287441
y[1] (analytic) = 0
y[1] (numeric) = 1.5976833753774800982941912963837
absolute error = 1.5976833753774800982941912963837
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.198
Order of pole = 589.5
memory used=1911.2MB, alloc=4.6MB, time=130.69
TOP MAIN SOLVE Loop
x[1] = 1.9480425683195420821824176383338
y[1] (analytic) = 0
y[1] (numeric) = 1.5986098158966042769974426453591
absolute error = 1.5986098158966042769974426453591
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.197
Order of pole = 589.9
memory used=1915.0MB, alloc=4.6MB, time=130.84
TOP MAIN SOLVE Loop
x[1] = 1.9490166455737501197706009892266
y[1] (analytic) = 0
y[1] (numeric) = 1.5995359967150452458438138328515
absolute error = 1.5995359967150452458438138328515
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.197
Order of pole = 590.2
memory used=1918.8MB, alloc=4.6MB, time=130.99
TOP MAIN SOLVE Loop
x[1] = 1.950112482484734162057307258981
y[1] (analytic) = 0
y[1] (numeric) = 1.6005776387560901865701025748453
absolute error = 1.6005776387560901865701025748453
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.197
Order of pole = 590.5
memory used=1922.6MB, alloc=4.6MB, time=131.15
TOP MAIN SOLVE Loop
x[1] = 1.9510865597389421996454906098738
y[1] (analytic) = 0
y[1] (numeric) = 1.6015032651601255198159353557092
absolute error = 1.6015032651601255198159353557092
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.196
Order of pole = 590.8
memory used=1926.4MB, alloc=4.6MB, time=131.31
TOP MAIN SOLVE Loop
x[1] = 1.9520606369931502372336739607666
y[1] (analytic) = 0
y[1] (numeric) = 1.6024286294620877738428365060168
absolute error = 1.6024286294620877738428365060168
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.196
Order of pole = 591.1
memory used=1930.3MB, alloc=4.6MB, time=131.46
TOP MAIN SOLVE Loop
memory used=1934.1MB, alloc=4.6MB, time=131.61
x[1] = 1.9530347142473582748218573116594
y[1] (analytic) = 0
y[1] (numeric) = 1.6033537308926090193427062622315
absolute error = 1.6033537308926090193427062622315
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.196
Order of pole = 591.4
memory used=1937.9MB, alloc=4.6MB, time=131.77
TOP MAIN SOLVE Loop
x[1] = 1.9540087915015663124100406625522
y[1] (analytic) = 0
y[1] (numeric) = 1.6042785686818747684788086017296
absolute error = 1.6042785686818747684788086017296
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.195
Order of pole = 591.6
memory used=1941.7MB, alloc=4.6MB, time=131.92
TOP MAIN SOLVE Loop
x[1] = 1.9551046284125503546967469323066
y[1] (analytic) = 0
y[1] (numeric) = 1.6053186951020286878331231548455
absolute error = 1.6053186951020286878331231548455
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.195
Order of pole = 591.9
memory used=1945.5MB, alloc=4.6MB, time=132.08
TOP MAIN SOLVE Loop
x[1] = 1.9560787056667583922849302831994
y[1] (analytic) = 0
y[1] (numeric) = 1.6062429700955666907554721850622
absolute error = 1.6062429700955666907554721850622
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.194
Order of pole = 592.1
memory used=1949.3MB, alloc=4.6MB, time=132.23
TOP MAIN SOLVE Loop
x[1] = 1.9570527829209664298731136340922
y[1] (analytic) = 0
y[1] (numeric) = 1.6071669790393074629913261861189
absolute error = 1.6071669790393074629913261861189
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.194
Order of pole = 592.4
memory used=1953.1MB, alloc=4.6MB, time=132.38
TOP MAIN SOLVE Loop
x[1] = 1.958026860175174467461296984985
y[1] (analytic) = 0
y[1] (numeric) = 1.6080907211616009538846436274745
absolute error = 1.6080907211616009538846436274745
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.193
Order of pole = 592.6
memory used=1957.0MB, alloc=4.6MB, time=132.54
TOP MAIN SOLVE Loop
x[1] = 1.9590009374293825050494803358778
y[1] (analytic) = 0
y[1] (numeric) = 1.6090141956903537127654478791392
absolute error = 1.6090141956903537127654478791392
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.193
Order of pole = 592.8
memory used=1960.8MB, alloc=4.6MB, time=132.69
TOP MAIN SOLVE Loop
memory used=1964.6MB, alloc=4.6MB, time=132.85
x[1] = 1.9600967743403665473361866056322
y[1] (analytic) = 0
y[1] (numeric) = 1.6100527837153810667588688647003
absolute error = 1.6100527837153810667588688647003
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.192
Order of pole = 593.1
memory used=1968.4MB, alloc=4.6MB, time=133.00
TOP MAIN SOLVE Loop
x[1] = 1.961070851594574584924369956525
y[1] (analytic) = 0
y[1] (numeric) = 1.6109756870422475697127082582236
absolute error = 1.6109756870422475697127082582236
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.191
Order of pole = 593.3
memory used=1972.2MB, alloc=4.6MB, time=133.16
TOP MAIN SOLVE Loop
x[1] = 1.9620449288487826225125533074178
y[1] (analytic) = 0
y[1] (numeric) = 1.6118983203599303271887526481602
absolute error = 1.6118983203599303271887526481602
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.191
Order of pole = 593.5
memory used=1976.0MB, alloc=4.6MB, time=133.31
TOP MAIN SOLVE Loop
x[1] = 1.9630190061029906601007366583106
y[1] (analytic) = 0
y[1] (numeric) = 1.6128206828945134718388776153786
absolute error = 1.6128206828945134718388776153786
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.19
Order of pole = 593.7
memory used=1979.9MB, alloc=4.6MB, time=133.47
TOP MAIN SOLVE Loop
x[1] = 1.964114843013974702387442928065
y[1] (analytic) = 0
y[1] (numeric) = 1.6138580161113146169027770123354
absolute error = 1.6138580161113146169027770123354
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.19
Order of pole = 593.9
memory used=1983.7MB, alloc=4.6MB, time=133.62
TOP MAIN SOLVE Loop
x[1] = 1.9650889202681827399756262789578
y[1] (analytic) = 0
y[1] (numeric) = 1.6147798006601597384217245311065
absolute error = 1.6147798006601597384217245311065
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.189
Order of pole = 594
memory used=1987.5MB, alloc=4.6MB, time=133.78
TOP MAIN SOLVE Loop
x[1] = 1.9660629975223907775638096298506
y[1] (analytic) = 0
y[1] (numeric) = 1.6157013120045839319658434471769
absolute error = 1.6157013120045839319658434471769
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.188
Order of pole = 594.2
memory used=1991.3MB, alloc=4.6MB, time=133.94
TOP MAIN SOLVE Loop
x[1] = 1.9670370747765988151519929807434
y[1] (analytic) = 0
y[1] (numeric) = 1.6166225493688596654123980607303
absolute error = 1.6166225493688596654123980607303
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.188
Order of pole = 594.4
memory used=1995.1MB, alloc=4.6MB, time=134.09
TOP MAIN SOLVE Loop
memory used=1998.9MB, alloc=4.6MB, time=134.25
x[1] = 1.9680111520308068527401763316362
y[1] (analytic) = 0
y[1] (numeric) = 1.617543511976821851593058026205
absolute error = 1.617543511976821851593058026205
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.187
Order of pole = 594.5
memory used=2002.7MB, alloc=4.6MB, time=134.40
TOP MAIN SOLVE Loop
x[1] = 1.9691069889417908950268826013906
y[1] (analytic) = 0
y[1] (numeric) = 1.6185792655241457975808351387431
absolute error = 1.6185792655241457975808351387431
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.186
Order of pole = 594.7
memory used=2006.6MB, alloc=4.6MB, time=134.56
TOP MAIN SOLVE Loop
x[1] = 1.9700810661959989326150659522834
y[1] (analytic) = 0
y[1] (numeric) = 1.6194996416958371924614661856855
absolute error = 1.6194996416958371924614661856855
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.186
Order of pole = 594.8
memory used=2010.4MB, alloc=4.6MB, time=134.71
TOP MAIN SOLVE Loop
x[1] = 1.9710551434502069702032493031762
y[1] (analytic) = 0
y[1] (numeric) = 1.6204197406828860570214829836036
absolute error = 1.6204197406828860570214829836036
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.185
Order of pole = 595
memory used=2014.2MB, alloc=4.6MB, time=134.87
TOP MAIN SOLVE Loop
x[1] = 1.972029220704415007791432654069
y[1] (analytic) = 0
y[1] (numeric) = 1.6213395617073292109550637140808
absolute error = 1.6213395617073292109550637140808
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.184
Order of pole = 595.1
memory used=2018.0MB, alloc=4.6MB, time=135.02
TOP MAIN SOLVE Loop
x[1] = 1.9730032979586230453796160049618
y[1] (analytic) = 0
y[1] (numeric) = 1.6222591039907692377266755506761
absolute error = 1.6222591039907692377266755506761
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.183
Order of pole = 595.2
memory used=2021.8MB, alloc=4.6MB, time=135.17
TOP MAIN SOLVE Loop
x[1] = 1.9740991348696070876663222747162
y[1] (analytic) = 0
y[1] (numeric) = 1.6232932549072812554753991642434
absolute error = 1.6232932549072812554753991642434
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.183
Order of pole = 595.4
memory used=2025.6MB, alloc=4.6MB, time=135.33
TOP MAIN SOLVE Loop
memory used=2029.4MB, alloc=4.6MB, time=135.48
x[1] = 1.975073212123815125254505625609
y[1] (analytic) = 0
y[1] (numeric) = 1.6242122022795883200845537965557
absolute error = 1.6242122022795883200845537965557
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.182
Order of pole = 595.5
memory used=2033.3MB, alloc=4.6MB, time=135.64
TOP MAIN SOLVE Loop
x[1] = 1.9760472893780231628426889765018
y[1] (analytic) = 0
y[1] (numeric) = 1.6251308684756087597112626962013
absolute error = 1.6251308684756087597112626962013
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.181
Order of pole = 595.6
memory used=2037.1MB, alloc=4.6MB, time=135.79
TOP MAIN SOLVE Loop
x[1] = 1.9770213666322312004308723273946
y[1] (analytic) = 0
y[1] (numeric) = 1.6260492527151608736056684121579
absolute error = 1.6260492527151608736056684121579
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.18
Order of pole = 595.7
memory used=2040.9MB, alloc=4.6MB, time=135.94
TOP MAIN SOLVE Loop
x[1] = 1.978117203543215242717578597149
y[1] (analytic) = 0
y[1] (numeric) = 1.62708209698659509690867688537
absolute error = 1.62708209698659509690867688537
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.179
Order of pole = 595.8
memory used=2044.7MB, alloc=4.6MB, time=136.10
TOP MAIN SOLVE Loop
x[1] = 1.9790912807974232803057619480418
y[1] (analytic) = 0
y[1] (numeric) = 1.627999879476238760103130818449
absolute error = 1.627999879476238760103130818449
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.179
Order of pole = 595.9
memory used=2048.5MB, alloc=4.6MB, time=136.26
TOP MAIN SOLVE Loop
x[1] = 1.9800653580516313178939452989346
y[1] (analytic) = 0
y[1] (numeric) = 1.6289173775685722983850285761475
absolute error = 1.6289173775685722983850285761475
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.178
Order of pole = 596
memory used=2052.3MB, alloc=4.6MB, time=136.41
TOP MAIN SOLVE Loop
x[1] = 1.9810394353058393554821286498274
y[1] (analytic) = 0
y[1] (numeric) = 1.6298345904816410143851506163
absolute error = 1.6298345904816410143851506163
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.177
Order of pole = 596.1
memory used=2056.1MB, alloc=4.6MB, time=136.56
TOP MAIN SOLVE Loop
x[1] = 1.9820135125600473930703120007202
y[1] (analytic) = 0
y[1] (numeric) = 1.6307515174330621106840836913078
absolute error = 1.6307515174330621106840836913078
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.176
Order of pole = 596.2
memory used=2060.0MB, alloc=4.6MB, time=136.72
memory used=2063.8MB, alloc=4.6MB, time=136.87
TOP MAIN SOLVE Loop
x[1] = 1.9831093494710314353570182704746
y[1] (analytic) = 0
y[1] (numeric) = 1.6317827174651718512933071207998
absolute error = 1.6317827174651718512933071207998
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.175
Order of pole = 596.3
memory used=2067.6MB, alloc=4.6MB, time=137.02
TOP MAIN SOLVE Loop
x[1] = 1.9840834267252394729452016213674
y[1] (analytic) = 0
y[1] (numeric) = 1.6326990341483858624558029220792
absolute error = 1.6326990341483858624558029220792
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.175
Order of pole = 596.4
memory used=2071.4MB, alloc=4.6MB, time=137.18
TOP MAIN SOLVE Loop
x[1] = 1.9850575039794475105333849722602
y[1] (analytic) = 0
y[1] (numeric) = 1.6336150624222542151334878080229
absolute error = 1.6336150624222542151334878080229
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.174
Order of pole = 596.5
memory used=2075.2MB, alloc=4.6MB, time=137.33
TOP MAIN SOLVE Loop
x[1] = 1.986031581233655548121568323153
y[1] (analytic) = 0
y[1] (numeric) = 1.6345308015026353552472323139037
absolute error = 1.6345308015026353552472323139037
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.173
Order of pole = 596.5
memory used=2079.0MB, alloc=4.6MB, time=137.49
TOP MAIN SOLVE Loop
x[1] = 1.9870056584878635857097516740458
y[1] (analytic) = 0
y[1] (numeric) = 1.6354462506049631098720510927781
absolute error = 1.6354462506049631098720510927781
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.172
Order of pole = 596.6
memory used=2082.9MB, alloc=4.6MB, time=137.64
TOP MAIN SOLVE Loop
x[1] = 1.9881014953988476279964579438002
y[1] (analytic) = 0
y[1] (numeric) = 1.6364757832532687507413234758265
absolute error = 1.6364757832532687507413234758265
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.171
Order of pole = 596.7
memory used=2086.7MB, alloc=4.6MB, time=137.80
TOP MAIN SOLVE Loop
x[1] = 1.989075572653055665584641294693
y[1] (analytic) = 0
y[1] (numeric) = 1.6373906135452936386846763759799
absolute error = 1.6373906135452936386846763759799
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.17
Order of pole = 596.7
memory used=2090.5MB, alloc=4.6MB, time=137.95
TOP MAIN SOLVE Loop
memory used=2094.3MB, alloc=4.6MB, time=138.10
x[1] = 1.9900496499072637031728246455858
y[1] (analytic) = 0
y[1] (numeric) = 1.638305151404766616642722178943
absolute error = 1.638305151404766616642722178943
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.169
Order of pole = 596.8
memory used=2098.1MB, alloc=4.6MB, time=138.25
TOP MAIN SOLVE Loop
x[1] = 1.9910237271614717407610079964786
y[1] (analytic) = 0
y[1] (numeric) = 1.6392193960453772353332334470516
absolute error = 1.6392193960453772353332334470516
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.169
Order of pole = 596.8
memory used=2101.9MB, alloc=4.6MB, time=138.41
TOP MAIN SOLVE Loop
x[1] = 1.992119564072455783047714266233
y[1] (analytic) = 0
y[1] (numeric) = 1.640247569798303457653313397117
absolute error = 1.640247569798303457653313397117
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.168
Order of pole = 596.9
memory used=2105.7MB, alloc=4.6MB, time=138.56
TOP MAIN SOLVE Loop
x[1] = 1.9930936413266638206358976171258
y[1] (analytic) = 0
y[1] (numeric) = 1.641161188736113637242559752312
absolute error = 1.641161188736113637242559752312
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.167
Order of pole = 597
memory used=2109.6MB, alloc=4.6MB, time=138.72
TOP MAIN SOLVE Loop
x[1] = 1.9940677185808718582240809680186
y[1] (analytic) = 0
y[1] (numeric) = 1.6420745119951305034237660216297
absolute error = 1.6420745119951305034237660216297
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.166
Order of pole = 597
memory used=2113.4MB, alloc=4.6MB, time=138.87
TOP MAIN SOLVE Loop
x[1] = 1.9950417958350798958122643189114
y[1] (analytic) = 0
y[1] (numeric) = 1.6429875387873111607444399644243
absolute error = 1.6429875387873111607444399644243
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.165
Order of pole = 597.1
memory used=2117.2MB, alloc=4.6MB, time=139.03
TOP MAIN SOLVE Loop
x[1] = 1.9960158730892879334004476698042
y[1] (analytic) = 0
y[1] (numeric) = 1.6439002683241945260481527645094
absolute error = 1.6439002683241945260481527645094
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.164
Order of pole = 597.1
memory used=2121.0MB, alloc=4.6MB, time=139.18
TOP MAIN SOLVE Loop
memory used=2124.8MB, alloc=4.6MB, time=139.34
x[1] = 1.9971117100002719756871539395586
y[1] (analytic) = 0
y[1] (numeric) = 1.64492673275795328718572990608
absolute error = 1.64492673275795328718572990608
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.163
Order of pole = 597.1
memory used=2128.6MB, alloc=4.6MB, time=139.49
TOP MAIN SOLVE Loop
x[1] = 1.9980857872544800132753372904514
y[1] (analytic) = 0
y[1] (numeric) = 1.6458388280074876470947638198994
absolute error = 1.6458388280074876470947638198994
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.162
Order of pole = 597.2
memory used=2132.4MB, alloc=4.6MB, time=139.64
TOP MAIN SOLVE Loop
x[1] = 1.9990598645086880508635206413442
y[1] (analytic) = 0
y[1] (numeric) = 1.6467506235350962742992068179863
absolute error = 1.6467506235350962742992068179863
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.161
Order of pole = 597.2
memory used=2136.3MB, alloc=4.6MB, time=139.80
TOP MAIN SOLVE Loop
x[1] = 2.000033941762896088451703992237
y[1] (analytic) = 0
y[1] (numeric) = 1.6476621185506005563027894533957
absolute error = 1.6476621185506005563027894533957
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.16
Order of pole = 597.3
memory used=2140.1MB, alloc=4.6MB, time=139.95
TOP MAIN SOLVE Loop
x[1] = 2.0010080190171041260398873431298
y[1] (analytic) = 0
y[1] (numeric) = 1.6485733122634073385668903451502
absolute error = 1.6485733122634073385668903451502
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.16
Order of pole = 597.3
memory used=2143.9MB, alloc=4.6MB, time=140.11
TOP MAIN SOLVE Loop
x[1] = 2.0021038559280881683265936128842
y[1] (analytic) = 0
y[1] (numeric) = 1.6495980440545219005549305845674
absolute error = 1.6495980440545219005549305845674
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.159
Order of pole = 597.3
memory used=2147.7MB, alloc=4.6MB, time=140.26
TOP MAIN SOLVE Loop
x[1] = 2.003077933182296205914776963777
y[1] (analytic) = 0
y[1] (numeric) = 1.6505085948721918041452672663694
absolute error = 1.6505085948721918041452672663694
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.158
Order of pole = 597.4
memory used=2151.5MB, alloc=4.6MB, time=140.41
TOP MAIN SOLVE Loop
x[1] = 2.0040520104365042435029603146698
y[1] (analytic) = 0
y[1] (numeric) = 1.6514188419138966685351975172818
absolute error = 1.6514188419138966685351975172818
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.157
Order of pole = 597.4
memory used=2155.3MB, alloc=4.6MB, time=140.57
TOP MAIN SOLVE Loop
memory used=2159.1MB, alloc=4.6MB, time=140.72
x[1] = 2.0050260876907122810911436655626
y[1] (analytic) = 0
y[1] (numeric) = 1.6523287843873409700468346034204
absolute error = 1.6523287843873409700468346034204
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.156
Order of pole = 597.4
memory used=2163.0MB, alloc=4.6MB, time=140.88
TOP MAIN SOLVE Loop
x[1] = 2.0060001649449203186793270164554
y[1] (analytic) = 0
y[1] (numeric) = 1.6532384214998183477503657979213
absolute error = 1.6532384214998183477503657979213
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.155
Order of pole = 597.4
memory used=2166.8MB, alloc=4.6MB, time=141.03
TOP MAIN SOLVE Loop
x[1] = 2.0070960018559043609660332862098
y[1] (analytic) = 0
y[1] (numeric) = 1.6542613972620357413283295218364
absolute error = 1.6542613972620357413283295218364
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.154
Order of pole = 597.4
memory used=2170.6MB, alloc=4.6MB, time=141.19
TOP MAIN SOLVE Loop
x[1] = 2.0080700791101123985542166371026
y[1] (analytic) = 0
y[1] (numeric) = 1.6551703828485541902537931090926
absolute error = 1.6551703828485541902537931090926
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.153
Order of pole = 597.5
memory used=2174.4MB, alloc=4.6MB, time=141.34
TOP MAIN SOLVE Loop
x[1] = 2.0090441563643204361423999879954
y[1] (analytic) = 0
y[1] (numeric) = 1.6560790605942584118951784284729
absolute error = 1.6560790605942584118951784284729
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.152
Order of pole = 597.5
memory used=2178.2MB, alloc=4.6MB, time=141.50
TOP MAIN SOLVE Loop
x[1] = 2.0100182336185284737305833388882
y[1] (analytic) = 0
y[1] (numeric) = 1.6569874297047550808254361258974
absolute error = 1.6569874297047550808254361258974
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.151
Order of pole = 597.5
memory used=2182.0MB, alloc=4.6MB, time=141.65
TOP MAIN SOLVE Loop
x[1] = 2.0111140705295125160172896086426
y[1] (analytic) = 0
y[1] (numeric) = 1.6580089750489068533290288056286
absolute error = 1.6580089750489068533290288056286
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.15
Order of pole = 597.5
memory used=2185.9MB, alloc=4.6MB, time=141.80
TOP MAIN SOLVE Loop
memory used=2189.7MB, alloc=4.6MB, time=141.96
x[1] = 2.0120881477837205536054729595354
y[1] (analytic) = 0
y[1] (numeric) = 1.6589166856700958729982113551923
absolute error = 1.6589166856700958729982113551923
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.149
Order of pole = 597.5
memory used=2193.5MB, alloc=4.6MB, time=142.11
TOP MAIN SOLVE Loop
x[1] = 2.0130622250379285911936563104282
y[1] (analytic) = 0
y[1] (numeric) = 1.6598240851709778726486274098505
absolute error = 1.6598240851709778726486274098505
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.148
Order of pole = 597.5
memory used=2197.3MB, alloc=4.6MB, time=142.27
TOP MAIN SOLVE Loop
x[1] = 2.014036302292136628781839661321
y[1] (analytic) = 0
y[1] (numeric) = 1.6607311727554851394896801137566
absolute error = 1.6607311727554851394896801137566
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.147
Order of pole = 597.6
memory used=2201.1MB, alloc=4.6MB, time=142.42
TOP MAIN SOLVE Loop
x[1] = 2.0150103795463446663700230122138
y[1] (analytic) = 0
y[1] (numeric) = 1.6616379476271459606738257618847
absolute error = 1.6616379476271459606738257618847
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.146
Order of pole = 597.6
memory used=2204.9MB, alloc=4.6MB, time=142.58
TOP MAIN SOLVE Loop
x[1] = 2.0161062164573287086567292819682
y[1] (analytic) = 0
y[1] (numeric) = 1.6626576945759717396080151362378
absolute error = 1.6626576945759717396080151362378
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.145
Order of pole = 597.6
memory used=2208.7MB, alloc=4.6MB, time=142.73
TOP MAIN SOLVE Loop
x[1] = 2.017080293711536746244912632861
y[1] (analytic) = 0
y[1] (numeric) = 1.6635638022864588406736328774985
absolute error = 1.6635638022864588406736328774985
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.144
Order of pole = 597.6
memory used=2212.6MB, alloc=4.6MB, time=142.89
TOP MAIN SOLVE Loop
x[1] = 2.0180543709657447838330959837538
y[1] (analytic) = 0
y[1] (numeric) = 1.6644695947925297671124331067312
absolute error = 1.6644695947925297671124331067312
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.143
Order of pole = 597.6
memory used=2216.4MB, alloc=4.6MB, time=143.04
TOP MAIN SOLVE Loop
x[1] = 2.0190284482199528214212793346466
y[1] (analytic) = 0
y[1] (numeric) = 1.6653750712960542672393355097309
absolute error = 1.6653750712960542672393355097309
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.142
Order of pole = 597.6
memory used=2220.2MB, alloc=4.6MB, time=143.20
TOP MAIN SOLVE Loop
memory used=2224.0MB, alloc=4.6MB, time=143.35
x[1] = 2.0200025254741608590094626855394
y[1] (analytic) = 0
y[1] (numeric) = 1.6662802309985019613312074409989
absolute error = 1.6662802309985019613312074409989
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.141
Order of pole = 597.6
memory used=2227.8MB, alloc=4.6MB, time=143.51
TOP MAIN SOLVE Loop
x[1] = 2.0210983623851449012961689552938
y[1] (analytic) = 0
y[1] (numeric) = 1.6672981559926918253242971858369
absolute error = 1.6672981559926918253242971858369
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.14
Order of pole = 597.6
memory used=2231.6MB, alloc=4.6MB, time=143.66
TOP MAIN SOLVE Loop
x[1] = 2.0220724396393529388843523061866
y[1] (analytic) = 0
y[1] (numeric) = 1.6682026398396586120648575904208
absolute error = 1.6682026398396586120648575904208
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.139
Order of pole = 597.6
memory used=2235.4MB, alloc=4.6MB, time=143.81
TOP MAIN SOLVE Loop
x[1] = 2.0230465168935609764725356570794
y[1] (analytic) = 0
y[1] (numeric) = 1.6691068043875706151620407756275
absolute error = 1.6691068043875706151620407756275
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.138
Order of pole = 597.6
memory used=2239.3MB, alloc=4.6MB, time=143.97
TOP MAIN SOLVE Loop
x[1] = 2.0240205941477690140607190079722
y[1] (analytic) = 0
y[1] (numeric) = 1.6700106488362550120025404202637
absolute error = 1.6700106488362550120025404202637
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.137
Order of pole = 597.6
memory used=2243.1MB, alloc=4.6MB, time=144.12
TOP MAIN SOLVE Loop
x[1] = 2.0251164310587530563474252777266
y[1] (analytic) = 0
y[1] (numeric) = 1.6710270902255993244964419576306
absolute error = 1.6710270902255993244964419576306
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.136
Order of pole = 597.6
memory used=2246.9MB, alloc=4.6MB, time=144.28
TOP MAIN SOLVE Loop
x[1] = 2.0260905083129610939356086286194
y[1] (analytic) = 0
y[1] (numeric) = 1.6719302518047934226502552365454
absolute error = 1.6719302518047934226502552365454
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.135
Order of pole = 597.6
memory used=2250.7MB, alloc=4.6MB, time=144.44
TOP MAIN SOLVE Loop
memory used=2254.5MB, alloc=4.6MB, time=144.59
x[1] = 2.0270645855671691315237919795122
y[1] (analytic) = 0
y[1] (numeric) = 1.6728330907816697752769546962078
absolute error = 1.6728330907816697752769546962078
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.134
Order of pole = 597.6
memory used=2258.3MB, alloc=4.6MB, time=144.74
TOP MAIN SOLVE Loop
x[1] = 2.028038662821377169111975330405
y[1] (analytic) = 0
y[1] (numeric) = 1.673735606354426252578261854245
absolute error = 1.673735606354426252578261854245
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.133
Order of pole = 597.6
memory used=2262.2MB, alloc=4.6MB, time=144.90
TOP MAIN SOLVE Loop
x[1] = 2.0290127400755852067001586812978
y[1] (analytic) = 0
y[1] (numeric) = 1.6746377977208677375618243871284
absolute error = 1.6746377977208677375618243871284
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.132
Order of pole = 597.6
memory used=2266.0MB, alloc=4.6MB, time=145.05
TOP MAIN SOLVE Loop
x[1] = 2.0301085769865692489868649510522
y[1] (analytic) = 0
y[1] (numeric) = 1.675652374480923016421610911338
absolute error = 1.675652374480923016421610911338
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.131
Order of pole = 597.6
memory used=2269.8MB, alloc=4.6MB, time=145.21
TOP MAIN SOLVE Loop
x[1] = 2.031082654240777286575048301945
y[1] (analytic) = 0
y[1] (numeric) = 1.6765538742436171006319037510111
absolute error = 1.6765538742436171006319037510111
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.13
Order of pole = 597.6
memory used=2273.6MB, alloc=4.6MB, time=145.36
TOP MAIN SOLVE Loop
x[1] = 2.0320567314949853241632316528378
y[1] (analytic) = 0
y[1] (numeric) = 1.6774550472906121700913876902266
absolute error = 1.6774550472906121700913876902266
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.129
Order of pole = 597.5
memory used=2277.4MB, alloc=4.6MB, time=145.52
TOP MAIN SOLVE Loop
x[1] = 2.0330308087491933617514150037306
y[1] (analytic) = 0
y[1] (numeric) = 1.6783558928181003457967715403028
absolute error = 1.6783558928181003457967715403028
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.128
Order of pole = 597.5
memory used=2281.2MB, alloc=4.6MB, time=145.67
TOP MAIN SOLVE Loop
x[1] = 2.0340048860034013993395983546234
y[1] (analytic) = 0
y[1] (numeric) = 1.6792564100218848028107892358384
absolute error = 1.6792564100218848028107892358384
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.127
Order of pole = 597.5
memory used=2285.0MB, alloc=4.6MB, time=145.83
memory used=2288.9MB, alloc=4.6MB, time=145.98
TOP MAIN SOLVE Loop
x[1] = 2.0351007229143854416263046243778
y[1] (analytic) = 0
y[1] (numeric) = 1.6802690984248975569253024916702
absolute error = 1.6802690984248975569253024916702
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.126
Order of pole = 597.5
memory used=2292.7MB, alloc=4.6MB, time=146.13
TOP MAIN SOLVE Loop
x[1] = 2.0360748001685934792144879752706
y[1] (analytic) = 0
y[1] (numeric) = 1.681168915268855793113842701757
absolute error = 1.681168915268855793113842701757
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.125
Order of pole = 597.5
memory used=2296.5MB, alloc=4.6MB, time=146.29
TOP MAIN SOLVE Loop
x[1] = 2.0370488774228015168026713261634
y[1] (analytic) = 0
y[1] (numeric) = 1.6820684012734971285395990254194
absolute error = 1.6820684012734971285395990254194
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.124
Order of pole = 597.5
memory used=2300.3MB, alloc=4.6MB, time=146.44
TOP MAIN SOLVE Loop
x[1] = 2.0380229546770095543908546770562
y[1] (analytic) = 0
y[1] (numeric) = 1.6829675556330287717890229247088
absolute error = 1.6829675556330287717890229247088
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.123
Order of pole = 597.5
memory used=2304.1MB, alloc=4.6MB, time=146.60
TOP MAIN SOLVE Loop
x[1] = 2.0391187915879935966775609468106
y[1] (analytic) = 0
y[1] (numeric) = 1.6839787068641561133352464791507
absolute error = 1.6839787068641561133352464791507
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.122
Order of pole = 597.5
memory used=2307.9MB, alloc=4.6MB, time=146.75
TOP MAIN SOLVE Loop
x[1] = 2.0400928688422016342657442977034
y[1] (analytic) = 0
y[1] (numeric) = 1.6848771538005898423618492604637
absolute error = 1.6848771538005898423618492604637
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.121
Order of pole = 597.5
memory used=2311.7MB, alloc=4.6MB, time=146.91
TOP MAIN SOLVE Loop
x[1] = 2.0410669460964096718539276485962
y[1] (analytic) = 0
y[1] (numeric) = 1.6857752665713346567961758801818
absolute error = 1.6857752665713346567961758801818
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.12
Order of pole = 597.4
memory used=2315.6MB, alloc=4.6MB, time=147.06
TOP MAIN SOLVE Loop
memory used=2319.4MB, alloc=4.6MB, time=147.22
x[1] = 2.042041023350617709442110999489
y[1] (analytic) = 0
y[1] (numeric) = 1.6866730443690154996603758724086
absolute error = 1.6866730443690154996603758724086
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.119
Order of pole = 597.4
memory used=2323.2MB, alloc=4.6MB, time=147.37
TOP MAIN SOLVE Loop
x[1] = 2.0430151006048257470302943503818
y[1] (analytic) = 0
y[1] (numeric) = 1.6875704863858758161425875234548
absolute error = 1.6875704863858758161425875234548
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.118
Order of pole = 597.4
memory used=2327.0MB, alloc=4.6MB, time=147.53
TOP MAIN SOLVE Loop
x[1] = 2.0441109375158097893170006201362
y[1] (analytic) = 0
y[1] (numeric) = 1.6885797062855912889851862387756
absolute error = 1.6885797062855912889851862387756
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.117
Order of pole = 597.4
memory used=2330.8MB, alloc=4.6MB, time=147.68
TOP MAIN SOLVE Loop
x[1] = 2.045085014770017826905183971029
y[1] (analytic) = 0
y[1] (numeric) = 1.6894764320844668823043463940222
absolute error = 1.6894764320844668823043463940222
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.116
Order of pole = 597.4
memory used=2334.6MB, alloc=4.6MB, time=147.83
TOP MAIN SOLVE Loop
x[1] = 2.0460590920242258644933673219218
y[1] (analytic) = 0
y[1] (numeric) = 1.6903728195758328535535112981473
absolute error = 1.6903728195758328535535112981473
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.115
Order of pole = 597.4
memory used=2338.4MB, alloc=4.6MB, time=147.99
TOP MAIN SOLVE Loop
x[1] = 2.0470331692784339020815506728146
y[1] (analytic) = 0
y[1] (numeric) = 1.6912688679503676323827516573706
absolute error = 1.6912688679503676323827516573706
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.114
Order of pole = 597.3
memory used=2342.3MB, alloc=4.6MB, time=148.14
TOP MAIN SOLVE Loop
x[1] = 2.0480072465326419396697340237074
y[1] (analytic) = 0
y[1] (numeric) = 1.6921645763983723630928609421027
absolute error = 1.6921645763983723630928609421027
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.113
Order of pole = 597.3
memory used=2346.1MB, alloc=4.6MB, time=148.30
TOP MAIN SOLVE Loop
memory used=2349.9MB, alloc=4.6MB, time=148.45
x[1] = 2.0491030834436259819564402934618
y[1] (analytic) = 0
y[1] (numeric) = 1.6931718410752939217399017253987
absolute error = 1.6931718410752939217399017253987
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.112
Order of pole = 597.3
memory used=2353.7MB, alloc=4.6MB, time=148.61
TOP MAIN SOLVE Loop
x[1] = 2.0500771606978340195446236443546
y[1] (analytic) = 0
y[1] (numeric) = 1.6940668244892514515971320874477
absolute error = 1.6940668244892514515971320874477
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.111
Order of pole = 597.3
memory used=2357.5MB, alloc=4.6MB, time=148.77
TOP MAIN SOLVE Loop
x[1] = 2.0510512379520420571328069952474
y[1] (analytic) = 0
y[1] (numeric) = 1.6949614654439474301653907801126
absolute error = 1.6949614654439474301653907801126
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.11
Order of pole = 597.3
memory used=2361.3MB, alloc=4.6MB, time=148.93
TOP MAIN SOLVE Loop
x[1] = 2.0520253152062500947209903461402
y[1] (analytic) = 0
y[1] (numeric) = 1.6958557631281354894879362703252
absolute error = 1.6958557631281354894879362703252
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.109
Order of pole = 597.3
memory used=2365.2MB, alloc=4.6MB, time=149.08
TOP MAIN SOLVE Loop
x[1] = 2.0531211521172341370076966158946
y[1] (analytic) = 0
y[1] (numeric) = 1.6968614366967423332764831974311
absolute error = 1.6968614366967423332764831974311
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.107
Order of pole = 597.2
memory used=2369.0MB, alloc=4.6MB, time=149.24
TOP MAIN SOLVE Loop
x[1] = 2.0540952293714421745958799667874
y[1] (analytic) = 0
y[1] (numeric) = 1.6977550022358077311536137248602
absolute error = 1.6977550022358077311536137248602
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.106
Order of pole = 597.2
memory used=2372.8MB, alloc=4.6MB, time=149.39
TOP MAIN SOLVE Loop
x[1] = 2.0550693066256502121840633176802
y[1] (analytic) = 0
y[1] (numeric) = 1.6986482219668199784452337546124
absolute error = 1.6986482219668199784452337546124
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.105
Order of pole = 597.2
memory used=2376.6MB, alloc=4.6MB, time=149.54
TOP MAIN SOLVE Loop
x[1] = 2.056043383879858249772246668573
y[1] (analytic) = 0
y[1] (numeric) = 1.6995410950769994675881438682984
absolute error = 1.6995410950769994675881438682984
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.104
Order of pole = 597.2
memory used=2380.4MB, alloc=4.6MB, time=149.70
TOP MAIN SOLVE Loop
memory used=2384.2MB, alloc=4.6MB, time=149.85
x[1] = 2.0570174611340662873604300194658
y[1] (analytic) = 0
y[1] (numeric) = 1.7004336207531970645768349136821
absolute error = 1.7004336207531970645768349136821
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.103
Order of pole = 597.2
memory used=2388.0MB, alloc=4.6MB, time=150.01
TOP MAIN SOLVE Loop
x[1] = 2.0581132980450503296471362892202
y[1] (analytic) = 0
y[1] (numeric) = 1.7014372958337985559188093693813
absolute error = 1.7014372958337985559188093693813
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.102
Order of pole = 597.1
memory used=2391.9MB, alloc=4.6MB, time=150.16
TOP MAIN SOLVE Loop
x[1] = 2.059087375299258367235319640113
y[1] (analytic) = 0
y[1] (numeric) = 1.7023290805111933312943880528548
absolute error = 1.7023290805111933312943880528548
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.101
Order of pole = 597.1
memory used=2395.7MB, alloc=4.6MB, time=150.32
TOP MAIN SOLVE Loop
x[1] = 2.0600614525534664048235029910058
y[1] (analytic) = 0
y[1] (numeric) = 1.7032205152111428398219878023612
absolute error = 1.7032205152111428398219878023612
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.1
Order of pole = 597.1
memory used=2399.5MB, alloc=4.6MB, time=150.47
TOP MAIN SOLVE Loop
x[1] = 2.0610355298076744424116863418986
y[1] (analytic) = 0
y[1] (numeric) = 1.7041115991189826708397712028364
absolute error = 1.7041115991189826708397712028364
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.099
Order of pole = 597.1
memory used=2403.3MB, alloc=4.6MB, time=150.63
TOP MAIN SOLVE Loop
x[1] = 2.0620096070618824799998696927914
y[1] (analytic) = 0
y[1] (numeric) = 1.7050023314196832729036539271796
absolute error = 1.7050023314196832729036539271796
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.098
Order of pole = 597
memory used=2407.1MB, alloc=4.6MB, time=150.78
TOP MAIN SOLVE Loop
memory used=2410.9MB, alloc=4.6MB, time=150.94
x[1] = 2.0631054439728665222865759625458
y[1] (analytic) = 0
y[1] (numeric) = 1.706003983962287822995707837867
absolute error = 1.706003983962287822995707837867
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.097
Order of pole = 597
TOP MAIN SOLVE Loop
memory used=2414.7MB, alloc=4.6MB, time=151.09
x[1] = 2.0640795212270745598747593134386
y[1] (analytic) = 0
y[1] (numeric) = 1.706893966390002782542925001571
absolute error = 1.706893966390002782542925001571
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.096
Order of pole = 597
memory used=2418.6MB, alloc=4.6MB, time=151.25
TOP MAIN SOLVE Loop
x[1] = 2.0650535984812825974629426643314
y[1] (analytic) = 0
y[1] (numeric) = 1.7077835946612672343858876358891
absolute error = 1.7077835946612672343858876358891
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.095
Order of pole = 597
memory used=2422.4MB, alloc=4.6MB, time=151.40
TOP MAIN SOLVE Loop
x[1] = 2.0660276757354906350511260152242
y[1] (analytic) = 0
y[1] (numeric) = 1.7086728679595545694715620308565
absolute error = 1.7086728679595545694715620308565
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.094
Order of pole = 597
memory used=2426.2MB, alloc=4.6MB, time=151.56
TOP MAIN SOLVE Loop
x[1] = 2.067001752989698672639309366117
y[1] (analytic) = 0
y[1] (numeric) = 1.7095617854679774858304253040639
absolute error = 1.7095617854679774858304253040639
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.093
Order of pole = 596.9
memory used=2430.0MB, alloc=4.6MB, time=151.71
TOP MAIN SOLVE Loop
x[1] = 2.0680975899006827149260156358714
y[1] (analytic) = 0
y[1] (numeric) = 1.7105613913672985461869205514628
absolute error = 1.7105613913672985461869205514628
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.092
Order of pole = 596.9
memory used=2433.8MB, alloc=4.6MB, time=151.86
TOP MAIN SOLVE Loop
x[1] = 2.0690716671548907525141989867642
y[1] (analytic) = 0
y[1] (numeric) = 1.7114495501082968570647014181923
absolute error = 1.7114495501082968570647014181923
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.091
Order of pole = 596.9
memory used=2437.6MB, alloc=4.6MB, time=152.02
TOP MAIN SOLVE Loop
x[1] = 2.070045744409098790102382337657
y[1] (analytic) = 0
y[1] (numeric) = 1.7123373505043428019676564897463
absolute error = 1.7123373505043428019676564897463
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.09
Order of pole = 596.9
memory used=2441.4MB, alloc=4.6MB, time=152.17
TOP MAIN SOLVE Loop
memory used=2445.3MB, alloc=4.6MB, time=152.33
x[1] = 2.0710198216633068276905656885498
y[1] (analytic) = 0
y[1] (numeric) = 1.7132247917370704974622474961531
absolute error = 1.7132247917370704974622474961531
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.089
Order of pole = 596.8
memory used=2449.1MB, alloc=4.6MB, time=152.48
TOP MAIN SOLVE Loop
x[1] = 2.0721156585742908699772719583042
y[1] (analytic) = 0
y[1] (numeric) = 1.7142227327920665631295708772395
absolute error = 1.7142227327920665631295708772395
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.088
Order of pole = 596.8
memory used=2452.9MB, alloc=4.6MB, time=152.64
TOP MAIN SOLVE Loop
x[1] = 2.073089735828498907565455309197
y[1] (analytic) = 0
y[1] (numeric) = 1.7151094080838875191361301183142
absolute error = 1.7151094080838875191361301183142
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.087
Order of pole = 596.8
memory used=2456.7MB, alloc=4.6MB, time=152.79
TOP MAIN SOLVE Loop
x[1] = 2.0740638130827069451536386600898
y[1] (analytic) = 0
y[1] (numeric) = 1.7159957216527051860775735595019
absolute error = 1.7159957216527051860775735595019
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.086
Order of pole = 596.8
memory used=2460.5MB, alloc=4.6MB, time=152.95
TOP MAIN SOLVE Loop
x[1] = 2.0750378903369149827418220109826
y[1] (analytic) = 0
y[1] (numeric) = 1.716881672678690157518070476709
absolute error = 1.716881672678690157518070476709
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.085
Order of pole = 596.7
memory used=2464.3MB, alloc=4.6MB, time=153.10
TOP MAIN SOLVE Loop
x[1] = 2.0760119675911230203300053618754
y[1] (analytic) = 0
y[1] (numeric) = 1.7177672603416605201920736349077
absolute error = 1.7177672603416605201920736349077
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.084
Order of pole = 596.7
memory used=2468.2MB, alloc=4.6MB, time=153.26
TOP MAIN SOLVE Loop
x[1] = 2.0771078045021070626167116316298
y[1] (analytic) = 0
y[1] (numeric) = 1.718763111108474734183769304369
absolute error = 1.718763111108474734183769304369
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.083
Order of pole = 596.7
memory used=2472.0MB, alloc=4.6MB, time=153.41
TOP MAIN SOLVE Loop
memory used=2475.8MB, alloc=4.6MB, time=153.57
x[1] = 2.0780818817563151002048949825226
y[1] (analytic) = 0
y[1] (numeric) = 1.7196479239001747006346162117072
absolute error = 1.7196479239001747006346162117072
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.082
Order of pole = 596.7
memory used=2479.6MB, alloc=4.6MB, time=153.72
TOP MAIN SOLVE Loop
x[1] = 2.0790559590105231377930783334154
y[1] (analytic) = 0
y[1] (numeric) = 1.7205323707635294558335666242957
absolute error = 1.7205323707635294558335666242957
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.081
Order of pole = 596.6
memory used=2483.4MB, alloc=4.6MB, time=153.88
TOP MAIN SOLVE Loop
x[1] = 2.0800300362647311753812616843082
y[1] (analytic) = 0
y[1] (numeric) = 1.7214164508769125061956436608432
absolute error = 1.7214164508769125061956436608432
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.08
Order of pole = 596.6
memory used=2487.2MB, alloc=4.6MB, time=154.03
TOP MAIN SOLVE Loop
x[1] = 2.081004113518939212969445035201
y[1] (analytic) = 0
y[1] (numeric) = 1.7223001634183494749347120879356
absolute error = 1.7223001634183494749347120879356
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.078
Order of pole = 596.6
memory used=2491.0MB, alloc=4.6MB, time=154.18
TOP MAIN SOLVE Loop
x[1] = 2.0820999504299232552561513049554
y[1] (analytic) = 0
y[1] (numeric) = 1.7232938996402243455119241010575
absolute error = 1.7232938996402243455119241010575
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.077
Order of pole = 596.6
memory used=2494.9MB, alloc=4.6MB, time=154.34
TOP MAIN SOLVE Loop
x[1] = 2.0830740276841312928443346558482
y[1] (analytic) = 0
y[1] (numeric) = 1.7241768283604811799661504711378
absolute error = 1.7241768283604811799661504711378
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.076
Order of pole = 596.5
memory used=2498.7MB, alloc=4.6MB, time=154.49
TOP MAIN SOLVE Loop
x[1] = 2.084048104938339330432518006741
y[1] (analytic) = 0
y[1] (numeric) = 1.7250593869378898179888102995406
absolute error = 1.7250593869378898179888102995406
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.075
Order of pole = 596.5
memory used=2502.5MB, alloc=4.6MB, time=154.65
TOP MAIN SOLVE Loop
x[1] = 2.0850221821925473680207013576338
y[1] (analytic) = 0
y[1] (numeric) = 1.7259415745490505050203797033953
absolute error = 1.7259415745490505050203797033953
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.074
Order of pole = 596.5
memory used=2506.3MB, alloc=4.6MB, time=154.80
memory used=2510.1MB, alloc=4.6MB, time=154.95
TOP MAIN SOLVE Loop
x[1] = 2.0861180191035314103074076273882
y[1] (analytic) = 0
y[1] (numeric) = 1.726933591165343193455836249675
absolute error = 1.726933591165343193455836249675
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.073
Order of pole = 596.4
memory used=2513.9MB, alloc=4.6MB, time=155.11
TOP MAIN SOLVE Loop
x[1] = 2.087092096357739447895590978281
y[1] (analytic) = 0
y[1] (numeric) = 1.7278149877377168315527554202655
absolute error = 1.7278149877377168315527554202655
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.072
Order of pole = 596.4
memory used=2517.7MB, alloc=4.6MB, time=155.27
TOP MAIN SOLVE Loop
x[1] = 2.0880661736119474854837743291738
y[1] (analytic) = 0
y[1] (numeric) = 1.7286960107685104890547581384148
absolute error = 1.7286960107685104890547581384148
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.071
Order of pole = 596.4
memory used=2521.6MB, alloc=4.6MB, time=155.42
TOP MAIN SOLVE Loop
x[1] = 2.0890402508661555230719576800666
y[1] (analytic) = 0
y[1] (numeric) = 1.729576659432914678748858969975
absolute error = 1.729576659432914678748858969975
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.07
Order of pole = 596.4
memory used=2525.4MB, alloc=4.6MB, time=155.57
TOP MAIN SOLVE Loop
x[1] = 2.0900143281203635606601410309594
y[1] (analytic) = 0
y[1] (numeric) = 1.7304569329057805352248193092745
absolute error = 1.7304569329057805352248193092745
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.069
Order of pole = 596.3
memory used=2529.2MB, alloc=4.6MB, time=155.73
TOP MAIN SOLVE Loop
x[1] = 2.0911101650313476029468473007138
y[1] (analytic) = 0
y[1] (numeric) = 1.731446791063777380942367784644
absolute error = 1.731446791063777380942367784644
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.068
Order of pole = 596.3
memory used=2533.0MB, alloc=4.6MB, time=155.88
TOP MAIN SOLVE Loop
x[1] = 2.0920842422855556405350306516066
y[1] (analytic) = 0
y[1] (numeric) = 1.7323262645133282337529529575729
absolute error = 1.7323262645133282337529529575729
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.067
Order of pole = 596.3
memory used=2536.8MB, alloc=4.6MB, time=156.04
TOP MAIN SOLVE Loop
memory used=2540.6MB, alloc=4.6MB, time=156.19
x[1] = 2.0930583195397636781232140024994
y[1] (analytic) = 0
y[1] (numeric) = 1.7332053601905734247360558955995
absolute error = 1.7332053601905734247360558955995
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.066
Order of pole = 596.3
memory used=2544.4MB, alloc=4.6MB, time=156.35
TOP MAIN SOLVE Loop
x[1] = 2.0940323967939717157113973533922
y[1] (analytic) = 0
y[1] (numeric) = 1.7340840772689740298473666346916
absolute error = 1.7340840772689740298473666346916
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.065
Order of pole = 596.2
memory used=2548.3MB, alloc=4.6MB, time=156.50
TOP MAIN SOLVE Loop
x[1] = 2.095006474048179753299580704285
y[1] (analytic) = 0
y[1] (numeric) = 1.7349624149216565480959707000091
absolute error = 1.7349624149216565480959707000091
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.064
Order of pole = 596.2
memory used=2552.1MB, alloc=4.6MB, time=156.66
TOP MAIN SOLVE Loop
x[1] = 2.0961023109591637955862869740394
y[1] (analytic) = 0
y[1] (numeric) = 1.7359500902186379594140212094189
absolute error = 1.7359500902186379594140212094189
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.063
Order of pole = 596.2
memory used=2555.9MB, alloc=4.6MB, time=156.82
TOP MAIN SOLVE Loop
x[1] = 2.0970763882133718331744703249322
y[1] (analytic) = 0
y[1] (numeric) = 1.7368276188446691608855861975319
absolute error = 1.7368276188446691608855861975319
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.062
Order of pole = 596.2
memory used=2559.7MB, alloc=4.6MB, time=156.97
TOP MAIN SOLVE Loop
x[1] = 2.098050465467579870762653675825
y[1] (analytic) = 0
y[1] (numeric) = 1.7377047654588565431089125117896
absolute error = 1.7377047654588565431089125117896
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.061
Order of pole = 596.1
memory used=2563.5MB, alloc=4.6MB, time=157.12
TOP MAIN SOLVE Loop
x[1] = 2.0990245427217879083508370267178
y[1] (analytic) = 0
y[1] (numeric) = 1.7385815292329564830436510696028
absolute error = 1.7385815292329564830436510696028
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.06
Order of pole = 596.1
memory used=2567.3MB, alloc=4.6MB, time=157.28
memory used=2571.2MB, alloc=4.6MB, time=157.43
TOP MAIN SOLVE Loop
x[1] = 2.1001203796327719506375432964722
y[1] (analytic) = 0
y[1] (numeric) = 1.7395674298335931957735154549659
absolute error = 1.7395674298335931957735154549659
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.059
Order of pole = 596.1
memory used=2575.0MB, alloc=4.6MB, time=157.59
TOP MAIN SOLVE Loop
x[1] = 2.101094456886979988225726647365
y[1] (analytic) = 0
y[1] (numeric) = 1.7404433773209756181322462824293
absolute error = 1.7404433773209756181322462824293
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.057
Order of pole = 596
memory used=2578.8MB, alloc=4.6MB, time=157.74
TOP MAIN SOLVE Loop
x[1] = 2.1020685341411880258139099982578
y[1] (analytic) = 0
y[1] (numeric) = 1.7413189393778885507839041111693
absolute error = 1.7413189393778885507839041111693
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.056
Order of pole = 596
memory used=2582.6MB, alloc=4.6MB, time=157.89
TOP MAIN SOLVE Loop
x[1] = 2.1030426113953960634020933491506
y[1] (analytic) = 0
y[1] (numeric) = 1.7421941151747344865165318113358
absolute error = 1.7421941151747344865165318113358
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.055
Order of pole = 596
memory used=2586.4MB, alloc=4.6MB, time=158.05
TOP MAIN SOLVE Loop
x[1] = 2.1040166886496041009902767000434
y[1] (analytic) = 0
y[1] (numeric) = 1.7430689038815901684084339660912
absolute error = 1.7430689038815901684084339660912
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.054
Order of pole = 596
memory used=2590.2MB, alloc=4.6MB, time=158.20
TOP MAIN SOLVE Loop
x[1] = 2.1051125255605881432769829697978
y[1] (analytic) = 0
y[1] (numeric) = 1.7440525774495301247810905860523
absolute error = 1.7440525774495301247810905860523
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.053
Order of pole = 595.9
memory used=2594.0MB, alloc=4.6MB, time=158.36
TOP MAIN SOLVE Loop
x[1] = 2.1060866028147961808651663206906
y[1] (analytic) = 0
y[1] (numeric) = 1.7449265408330704243101989381949
absolute error = 1.7449265408330704243101989381949
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.052
Order of pole = 595.9
memory used=2597.9MB, alloc=4.6MB, time=158.51
TOP MAIN SOLVE Loop
memory used=2601.7MB, alloc=4.6MB, time=158.67
x[1] = 2.1070606800690042184533496715834
y[1] (analytic) = 0
y[1] (numeric) = 1.7458001145310213928744569281085
absolute error = 1.7458001145310213928744569281085
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.051
Order of pole = 595.9
memory used=2605.5MB, alloc=4.6MB, time=158.82
TOP MAIN SOLVE Loop
x[1] = 2.1080347573232122560415330224762
y[1] (analytic) = 0
y[1] (numeric) = 1.7466732977121263022540585141027
absolute error = 1.7466732977121263022540585141027
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.05
Order of pole = 595.8
memory used=2609.3MB, alloc=4.6MB, time=158.98
TOP MAIN SOLVE Loop
x[1] = 2.109008834577420293629716373369
y[1] (analytic) = 0
y[1] (numeric) = 1.7475460895448076552063105086285
absolute error = 1.7475460895448076552063105086285
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.049
Order of pole = 595.8
memory used=2613.1MB, alloc=4.6MB, time=159.13
TOP MAIN SOLVE Loop
x[1] = 2.1101046714884043359164226431234
y[1] (analytic) = 0
y[1] (numeric) = 1.7485275115370896233207657001664
absolute error = 1.7485275115370896233207657001664
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.048
Order of pole = 595.8
memory used=2616.9MB, alloc=4.6MB, time=159.29
TOP MAIN SOLVE Loop
x[1] = 2.1110787487426123735046059940162
y[1] (analytic) = 0
y[1] (numeric) = 1.7493994689918150434881515003519
absolute error = 1.7493994689918150434881515003519
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.047
Order of pole = 595.8
memory used=2620.7MB, alloc=4.6MB, time=159.44
TOP MAIN SOLVE Loop
x[1] = 2.112052825996820411092789344909
y[1] (analytic) = 0
y[1] (numeric) = 1.7502710324973805694052713041559
absolute error = 1.7502710324973805694052713041559
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.046
Order of pole = 595.7
memory used=2624.6MB, alloc=4.6MB, time=159.60
TOP MAIN SOLVE Loop
x[1] = 2.1130269032510284486809726958018
y[1] (analytic) = 0
y[1] (numeric) = 1.7511422012208959106027601649382
absolute error = 1.7511422012208959106027601649382
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.045
Order of pole = 595.7
memory used=2628.4MB, alloc=4.6MB, time=159.75
TOP MAIN SOLVE Loop
x[1] = 2.1140009805052364862691560466946
y[1] (analytic) = 0
y[1] (numeric) = 1.752012974329155052677580821779
absolute error = 1.752012974329155052677580821779
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.044
Order of pole = 595.7
memory used=2632.2MB, alloc=4.6MB, time=159.90
memory used=2636.0MB, alloc=4.6MB, time=160.06
TOP MAIN SOLVE Loop
x[1] = 2.115096817416220528555862316449
y[1] (analytic) = 0
y[1] (numeric) = 1.7529921201542424402312416883835
absolute error = 1.7529921201542424402312416883835
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.043
Order of pole = 595.7
memory used=2639.8MB, alloc=4.6MB, time=160.21
TOP MAIN SOLVE Loop
x[1] = 2.1160708946704285661440456673418
y[1] (analytic) = 0
y[1] (numeric) = 1.7538620498121422045788406092939
absolute error = 1.7538620498121422045788406092939
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.042
Order of pole = 595.6
memory used=2643.6MB, alloc=4.6MB, time=160.37
TOP MAIN SOLVE Loop
x[1] = 2.1170449719246366037322290182346
y[1] (analytic) = 0
y[1] (numeric) = 1.7547315812489929717309779649815
absolute error = 1.7547315812489929717309779649815
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.041
Order of pole = 595.6
memory used=2647.4MB, alloc=4.6MB, time=160.52
TOP MAIN SOLVE Loop
x[1] = 2.1180190491788446413204123691274
y[1] (analytic) = 0
y[1] (numeric) = 1.755600713630296878248015820558
absolute error = 1.755600713630296878248015820558
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.04
Order of pole = 595.6
memory used=2651.3MB, alloc=4.6MB, time=160.68
TOP MAIN SOLVE Loop
x[1] = 2.1191148860898286836071186388818
y[1] (analytic) = 0
y[1] (numeric) = 1.7565780095237339786858100141618
absolute error = 1.7565780095237339786858100141618
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.039
Order of pole = 595.5
memory used=2655.1MB, alloc=4.6MB, time=160.83
TOP MAIN SOLVE Loop
x[1] = 2.1200889633440367211953019897746
y[1] (analytic) = 0
y[1] (numeric) = 1.7574462911397903217454091506782
absolute error = 1.7574462911397903217454091506782
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.038
Order of pole = 595.5
memory used=2658.9MB, alloc=4.6MB, time=160.98
TOP MAIN SOLVE Loop
x[1] = 2.1210630405982447587834853406674
y[1] (analytic) = 0
y[1] (numeric) = 1.7583141710904965646764499901387
absolute error = 1.7583141710904965646764499901387
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.037
Order of pole = 595.5
memory used=2662.7MB, alloc=4.6MB, time=161.14
TOP MAIN SOLVE Loop
memory used=2666.5MB, alloc=4.6MB, time=161.29
x[1] = 2.1220371178524527963716686915602
y[1] (analytic) = 0
y[1] (numeric) = 1.7591816485400800464365753385169
absolute error = 1.7591816485400800464365753385169
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.036
Order of pole = 595.5
memory used=2670.3MB, alloc=4.6MB, time=161.45
TOP MAIN SOLVE Loop
x[1] = 2.123011195106660833959852042453
y[1] (analytic) = 0
y[1] (numeric) = 1.7600487226524616515489856571511
absolute error = 1.7600487226524616515489856571511
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.035
Order of pole = 595.4
memory used=2674.2MB, alloc=4.6MB, time=161.60
TOP MAIN SOLVE Loop
x[1] = 2.1241070320176448762465583122074
y[1] (analytic) = 0
y[1] (numeric) = 1.7610236978734832021688054459878
absolute error = 1.7610236978734832021688054459878
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.033
Order of pole = 595.4
memory used=2678.0MB, alloc=4.6MB, time=161.75
TOP MAIN SOLVE Loop
x[1] = 2.1250811092718529138347416631002
y[1] (analytic) = 0
y[1] (numeric) = 1.7618899121168737242499766540656
absolute error = 1.7618899121168737242499766540656
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.032
Order of pole = 595.4
memory used=2681.8MB, alloc=4.6MB, time=161.91
TOP MAIN SOLVE Loop
x[1] = 2.126055186526060951422925013993
y[1] (analytic) = 0
y[1] (numeric) = 1.7627557204083511271048076938067
absolute error = 1.7627557204083511271048076938067
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.031
Order of pole = 595.3
memory used=2685.6MB, alloc=4.6MB, time=162.06
TOP MAIN SOLVE Loop
x[1] = 2.1270292637802689890111083648858
y[1] (analytic) = 0
y[1] (numeric) = 1.7636211219105829244541281859379
absolute error = 1.7636211219105829244541281859379
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.03
Order of pole = 595.3
memory used=2689.4MB, alloc=4.6MB, time=162.22
TOP MAIN SOLVE Loop
x[1] = 2.1280033410344770265992917157786
y[1] (analytic) = 0
y[1] (numeric) = 1.7644861157859354024911529144561
absolute error = 1.7644861157859354024911529144561
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.029
Order of pole = 595.3
memory used=2693.2MB, alloc=4.6MB, time=162.38
memory used=2697.0MB, alloc=4.6MB, time=162.53
TOP MAIN SOLVE Loop
x[1] = 2.129099177945461068885997985533
y[1] (analytic) = 0
y[1] (numeric) = 1.7654587456108651880863761321877
absolute error = 1.7654587456108651880863761321877
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.028
Order of pole = 595.3
memory used=2700.9MB, alloc=4.6MB, time=162.69
TOP MAIN SOLVE Loop
x[1] = 2.1300732551996691064741813364258
y[1] (analytic) = 0
y[1] (numeric) = 1.7663228704965242026056617851676
absolute error = 1.7663228704965242026056617851676
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.027
Order of pole = 595.2
memory used=2704.7MB, alloc=4.6MB, time=162.84
TOP MAIN SOLVE Loop
x[1] = 2.1310473324538771440623646873186
y[1] (analytic) = 0
y[1] (numeric) = 1.7671865851357683645144334007939
absolute error = 1.7671865851357683645144334007939
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.026
Order of pole = 595.2
memory used=2708.5MB, alloc=4.6MB, time=163.00
TOP MAIN SOLVE Loop
x[1] = 2.1320214097080851816505480382114
y[1] (analytic) = 0
y[1] (numeric) = 1.7680498886897322846513262511478
absolute error = 1.7680498886897322846513262511478
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.025
Order of pole = 595.2
memory used=2712.3MB, alloc=4.6MB, time=163.15
TOP MAIN SOLVE Loop
x[1] = 2.1331172466190692239372543079658
y[1] (analytic) = 0
y[1] (numeric) = 1.7690206127677019860928450736159
absolute error = 1.7690206127677019860928450736159
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.024
Order of pole = 595.1
memory used=2716.1MB, alloc=4.6MB, time=163.31
TOP MAIN SOLVE Loop
x[1] = 2.1340913238732772615254376588586
y[1] (analytic) = 0
y[1] (numeric) = 1.7698830399788004185864341855029
absolute error = 1.7698830399788004185864341855029
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.023
Order of pole = 595.1
memory used=2719.9MB, alloc=4.6MB, time=163.46
TOP MAIN SOLVE Loop
x[1] = 2.1350654011274852991136210097514
y[1] (analytic) = 0
y[1] (numeric) = 1.7707450534812616244613838269474
absolute error = 1.7707450534812616244613838269474
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.022
Order of pole = 595.1
memory used=2723.7MB, alloc=4.6MB, time=163.61
TOP MAIN SOLVE Loop
memory used=2727.6MB, alloc=4.6MB, time=163.77
x[1] = 2.1360394783816933367018043606442
y[1] (analytic) = 0
y[1] (numeric) = 1.7716066524350061971234507789681
absolute error = 1.7716066524350061971234507789681
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.021
Order of pole = 595.1
memory used=2731.4MB, alloc=4.6MB, time=163.92
TOP MAIN SOLVE Loop
x[1] = 2.137013555635901374289987711537
y[1] (analytic) = 0
y[1] (numeric) = 1.7724678359996631016466071417351
absolute error = 1.7724678359996631016466071417351
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.02
Order of pole = 595
memory used=2735.2MB, alloc=4.6MB, time=164.08
TOP MAIN SOLVE Loop
x[1] = 2.1381093925468854165766939812914
y[1] (analytic) = 0
y[1] (numeric) = 1.7734361699433997704710686285814
absolute error = 1.7734361699433997704710686285814
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.019
Order of pole = 595
memory used=2739.0MB, alloc=4.6MB, time=164.23
TOP MAIN SOLVE Loop
x[1] = 2.1390834698010934541648773321842
y[1] (analytic) = 0
y[1] (numeric) = 1.7742964680146256679836589332647
absolute error = 1.7742964680146256679836589332647
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.018
Order of pole = 595
memory used=2742.8MB, alloc=4.6MB, time=164.39
TOP MAIN SOLVE Loop
x[1] = 2.140057547055301491753060683077
y[1] (analytic) = 0
y[1] (numeric) = 1.7751563480687363592414542317709
absolute error = 1.7751563480687363592414542317709
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.017
Order of pole = 594.9
memory used=2746.6MB, alloc=4.6MB, time=164.54
TOP MAIN SOLVE Loop
x[1] = 2.1410316243095095293412440339698
y[1] (analytic) = 0
y[1] (numeric) = 1.7760158092641689744331943971796
absolute error = 1.7760158092641689744331943971796
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.016
Order of pole = 594.9
memory used=2750.5MB, alloc=4.6MB, time=164.70
TOP MAIN SOLVE Loop
x[1] = 2.1420057015637175669294273848626
y[1] (analytic) = 0
y[1] (numeric) = 1.776874850759074425831583981387
absolute error = 1.776874850759074425831583981387
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.015
Order of pole = 594.9
memory used=2754.3MB, alloc=4.6MB, time=164.85
TOP MAIN SOLVE Loop
memory used=2758.1MB, alloc=4.6MB, time=165.01
x[1] = 2.143101538474701609216133654617
y[1] (analytic) = 0
y[1] (numeric) = 1.7778407697189898027973135052593
absolute error = 1.7778407697189898027973135052593
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.014
Order of pole = 594.9
memory used=2761.9MB, alloc=4.6MB, time=165.16
TOP MAIN SOLVE Loop
x[1] = 2.1440756157289096468043170055098
y[1] (analytic) = 0
y[1] (numeric) = 1.778698916553772497643287111964
absolute error = 1.778698916553772497643287111964
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.013
Order of pole = 594.8
memory used=2765.7MB, alloc=4.6MB, time=165.31
TOP MAIN SOLVE Loop
x[1] = 2.1450496929831176843925003564026
y[1] (analytic) = 0
y[1] (numeric) = 1.7795566410554165886800092918436
absolute error = 1.7795566410554165886800092918436
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.012
Order of pole = 594.8
memory used=2769.5MB, alloc=4.6MB, time=165.47
TOP MAIN SOLVE Loop
x[1] = 2.1460237702373257219806837072954
y[1] (analytic) = 0
y[1] (numeric) = 1.7804139423809036069346616133614
absolute error = 1.7804139423809036069346616133614
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.011
Order of pole = 594.8
memory used=2773.3MB, alloc=4.6MB, time=165.62
TOP MAIN SOLVE Loop
x[1] = 2.1471196071483097642673899770498
y[1] (analytic) = 0
y[1] (numeric) = 1.7813778994943090209272005943809
absolute error = 1.7813778994943090209272005943809
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.009
Order of pole = 594.7
memory used=2777.2MB, alloc=4.6MB, time=165.78
TOP MAIN SOLVE Loop
x[1] = 2.1480936844025178018555733279426
y[1] (analytic) = 0
y[1] (numeric) = 1.7822342987700971748542860119459
absolute error = 1.7822342987700971748542860119459
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.008
Order of pole = 594.7
memory used=2781.0MB, alloc=4.6MB, time=165.93
TOP MAIN SOLVE Loop
x[1] = 2.1490677616567258394437566788354
y[1] (analytic) = 0
y[1] (numeric) = 1.7830902722334909892823267121237
absolute error = 1.7830902722334909892823267121237
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.007
Order of pole = 594.7
memory used=2784.8MB, alloc=4.6MB, time=166.08
TOP MAIN SOLVE Loop
x[1] = 2.1500418389109338770319400297282
y[1] (analytic) = 0
y[1] (numeric) = 1.7839458190403208839209057706355
absolute error = 1.7839458190403208839209057706355
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.006
Order of pole = 594.7
memory used=2788.6MB, alloc=4.6MB, time=166.24
TOP MAIN SOLVE Loop
memory used=2792.4MB, alloc=4.6MB, time=166.39
x[1] = 2.151015916165141914620123380621
y[1] (analytic) = 0
y[1] (numeric) = 1.7848009383461409924558159537271
absolute error = 1.7848009383461409924558159537271
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.005
Order of pole = 594.6
memory used=2796.2MB, alloc=4.6MB, time=166.55
TOP MAIN SOLVE Loop
x[1] = 2.1521117530761259569068296503754
y[1] (analytic) = 0
y[1] (numeric) = 1.7857624355161004639920726038024
absolute error = 1.7857624355161004639920726038024
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.004
Order of pole = 594.6
memory used=2800.0MB, alloc=4.6MB, time=166.70
TOP MAIN SOLVE Loop
x[1] = 2.1530858303303339944950130012682
y[1] (analytic) = 0
y[1] (numeric) = 1.7866166435771956065540698896032
absolute error = 1.7866166435771956065540698896032
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.003
Order of pole = 594.6
memory used=2803.9MB, alloc=4.6MB, time=166.86
TOP MAIN SOLVE Loop
x[1] = 2.154059907584542032083196352161
y[1] (analytic) = 0
y[1] (numeric) = 1.7874704214966188601746186536311
absolute error = 1.7874704214966188601746186536311
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.002
Order of pole = 594.6
memory used=2807.7MB, alloc=4.6MB, time=167.01
TOP MAIN SOLVE Loop
x[1] = 2.1550339848387500696713797030538
y[1] (analytic) = 0
y[1] (numeric) = 1.7883237684287961922929976497562
absolute error = 1.7883237684287961922929976497562
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1.001
Order of pole = 594.5
memory used=2811.5MB, alloc=4.6MB, time=167.17
TOP MAIN SOLVE Loop
x[1] = 2.1560080620929581072595630539466
y[1] (analytic) = 0
y[1] (numeric) = 1.7891766835278828798811237441482
absolute error = 1.7891766835278828798811237441482
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 1
Order of pole = 594.5
memory used=2815.3MB, alloc=4.6MB, time=167.32
TOP MAIN SOLVE Loop
memory used=2819.1MB, alloc=4.6MB, time=167.48
x[1] = 2.157103899003942149546269323701
y[1] (analytic) = 0
y[1] (numeric) = 1.7901356957853423131018581040861
absolute error = 1.7901356957853423131018581040861
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9989
Order of pole = 594.5
memory used=2822.9MB, alloc=4.6MB, time=167.63
TOP MAIN SOLVE Loop
x[1] = 2.1580779762581501871344526745938
y[1] (analytic) = 0
y[1] (numeric) = 1.7909876904294131909399975117845
absolute error = 1.7909876904294131909399975117845
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9979
Order of pole = 594.4
memory used=2826.7MB, alloc=4.6MB, time=167.79
TOP MAIN SOLVE Loop
x[1] = 2.1590520535123582247226360254866
y[1] (analytic) = 0
y[1] (numeric) = 1.7918392505953961017950264867497
absolute error = 1.7918392505953961017950264867497
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9969
Order of pole = 594.4
memory used=2830.6MB, alloc=4.6MB, time=167.94
TOP MAIN SOLVE Loop
x[1] = 2.1600261307665662623108193763794
y[1] (analytic) = 0
y[1] (numeric) = 1.7926903754363413749090767106695
absolute error = 1.7926903754363413749090767106695
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9959
Order of pole = 594.4
memory used=2834.4MB, alloc=4.6MB, time=168.10
TOP MAIN SOLVE Loop
x[1] = 2.1610002080207742998990027272722
y[1] (analytic) = 0
y[1] (numeric) = 1.7935410641050343110025368782659
absolute error = 1.7935410641050343110025368782659
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9949
Order of pole = 594.4
memory used=2838.2MB, alloc=4.6MB, time=168.25
TOP MAIN SOLVE Loop
x[1] = 2.1620960449317583421857089970266
y[1] (analytic) = 0
y[1] (numeric) = 1.7944975664399480694308286209707
absolute error = 1.7944975664399480694308286209707
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9937
Order of pole = 594.3
memory used=2842.0MB, alloc=4.6MB, time=168.41
TOP MAIN SOLVE Loop
x[1] = 2.1630701221859663797738923479194
y[1] (analytic) = 0
y[1] (numeric) = 1.7953473254283837750922876095485
absolute error = 1.7953473254283837750922876095485
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9927
Order of pole = 594.3
memory used=2845.8MB, alloc=4.6MB, time=168.56
TOP MAIN SOLVE Loop
x[1] = 2.1640441994401744173620756988122
y[1] (analytic) = 0
y[1] (numeric) = 1.796196645595325281432673602519
absolute error = 1.796196645595325281432673602519
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9917
Order of pole = 594.3
memory used=2849.6MB, alloc=4.6MB, time=168.72
TOP MAIN SOLVE Loop
memory used=2853.5MB, alloc=4.6MB, time=168.87
x[1] = 2.165018276694382454950259049705
y[1] (analytic) = 0
y[1] (numeric) = 1.7970455260924764342206882659828
absolute error = 1.7970455260924764342206882659828
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9907
Order of pole = 594.2
memory used=2857.3MB, alloc=4.6MB, time=169.03
TOP MAIN SOLVE Loop
x[1] = 2.1661141136053664972369653194594
y[1] (analytic) = 0
y[1] (numeric) = 1.7979999900524141653068415932567
absolute error = 1.7979999900524141653068415932567
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9895
Order of pole = 594.2
memory used=2861.1MB, alloc=4.6MB, time=169.18
TOP MAIN SOLVE Loop
x[1] = 2.1670881908595745348251486703522
y[1] (analytic) = 0
y[1] (numeric) = 1.7988479334334701216328695640587
absolute error = 1.7988479334334701216328695640587
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9885
Order of pole = 594.2
memory used=2864.9MB, alloc=4.6MB, time=169.34
TOP MAIN SOLVE Loop
x[1] = 2.168062268113782572413332021245
y[1] (analytic) = 0
y[1] (numeric) = 1.7996954344921441148131420394206
absolute error = 1.7996954344921441148131420394206
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9875
Order of pole = 594.2
memory used=2868.7MB, alloc=4.6MB, time=169.49
TOP MAIN SOLVE Loop
x[1] = 2.1690363453679906100015153721378
y[1] (analytic) = 0
y[1] (numeric) = 1.8005424923790776442424252335734
absolute error = 1.8005424923790776442424252335734
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9865
Order of pole = 594.1
memory used=2872.5MB, alloc=4.6MB, time=169.65
TOP MAIN SOLVE Loop
x[1] = 2.1700104226221986475896987230306
y[1] (analytic) = 0
y[1] (numeric) = 1.8013891062446575685893708541408
absolute error = 1.8013891062446575685893708541408
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9855
Order of pole = 594.1
memory used=2876.3MB, alloc=4.6MB, time=169.80
TOP MAIN SOLVE Loop
x[1] = 2.171106259533182689876404992785
y[1] (analytic) = 0
y[1] (numeric) = 1.8023410150409673570642859212387
absolute error = 1.8023410150409673570642859212387
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9843
Order of pole = 594.1
memory used=2880.2MB, alloc=4.6MB, time=169.96
TOP MAIN SOLVE Loop
memory used=2884.0MB, alloc=4.6MB, time=170.11
x[1] = 2.1720803367873907274645883436778
y[1] (analytic) = 0
y[1] (numeric) = 1.8031866825390338415549337082104
absolute error = 1.8031866825390338415549337082104
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9833
Order of pole = 594.1
memory used=2887.8MB, alloc=4.6MB, time=170.26
TOP MAIN SOLVE Loop
x[1] = 2.1730544140415987650527716945706
y[1] (analytic) = 0
y[1] (numeric) = 1.8040319033590769388608444003711
absolute error = 1.8040319033590769388608444003711
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9823
Order of pole = 594
memory used=2891.6MB, alloc=4.6MB, time=170.42
TOP MAIN SOLVE Loop
x[1] = 2.1740284912958068026409550454634
y[1] (analytic) = 0
y[1] (numeric) = 1.8048766766504451510865297990345
absolute error = 1.8048766766504451510865297990345
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9813
Order of pole = 594
memory used=2895.4MB, alloc=4.6MB, time=170.57
TOP MAIN SOLVE Loop
x[1] = 2.1750025685500148402291383963562
y[1] (analytic) = 0
y[1] (numeric) = 1.8057210015622381888064051478936
absolute error = 1.8057210015622381888064051478936
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9803
Order of pole = 594
memory used=2899.2MB, alloc=4.6MB, time=170.73
TOP MAIN SOLVE Loop
x[1] = 2.1760984054609988825158446661106
y[1] (analytic) = 0
y[1] (numeric) = 1.8066703300745058876530007160087
absolute error = 1.8066703300745058876530007160087
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9791
Order of pole = 593.9
memory used=2903.0MB, alloc=4.6MB, time=170.88
TOP MAIN SOLVE Loop
x[1] = 2.1770724827152069201040280170034
y[1] (analytic) = 0
y[1] (numeric) = 1.8075136993533176972085606228819
absolute error = 1.8075136993533176972085606228819
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9781
Order of pole = 593.9
memory used=2906.9MB, alloc=4.6MB, time=171.04
TOP MAIN SOLVE Loop
x[1] = 2.1780465599694149576922113678962
y[1] (analytic) = 0
y[1] (numeric) = 1.8083566175919000563386865468337
absolute error = 1.8083566175919000563386865468337
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9771
Order of pole = 593.9
memory used=2910.7MB, alloc=4.6MB, time=171.19
TOP MAIN SOLVE Loop
x[1] = 2.179020637223622995280394718789
y[1] (analytic) = 0
y[1] (numeric) = 1.809199083938338585343234597666
absolute error = 1.809199083938338585343234597666
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9761
Order of pole = 593.9
memory used=2914.5MB, alloc=4.6MB, time=171.35
memory used=2918.3MB, alloc=4.6MB, time=171.50
TOP MAIN SOLVE Loop
x[1] = 2.1801164741346070375671009885434
y[1] (analytic) = 0
y[1] (numeric) = 1.8101463173647087010217118780591
absolute error = 1.8101463173647087010217118780591
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9749
Order of pole = 593.8
memory used=2922.1MB, alloc=4.6MB, time=171.66
TOP MAIN SOLVE Loop
x[1] = 2.1810905513888150751552843394362
y[1] (analytic) = 0
y[1] (numeric) = 1.8109878206106122898780205743611
absolute error = 1.8109878206106122898780205743611
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9739
Order of pole = 593.8
memory used=2925.9MB, alloc=4.6MB, time=171.81
TOP MAIN SOLVE Loop
x[1] = 2.182064628643023112743467690329
y[1] (analytic) = 0
y[1] (numeric) = 1.8118288693005795148210619931043
absolute error = 1.8118288693005795148210619931043
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9729
Order of pole = 593.8
memory used=2929.7MB, alloc=4.6MB, time=171.97
TOP MAIN SOLVE Loop
x[1] = 2.1830387058972311503316510412218
y[1] (analytic) = 0
y[1] (numeric) = 1.81266946258170163862196055292
absolute error = 1.81266946258170163862196055292
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9719
Order of pole = 593.8
memory used=2933.6MB, alloc=4.6MB, time=172.12
TOP MAIN SOLVE Loop
x[1] = 2.1840127831514391879198343921146
y[1] (analytic) = 0
y[1] (numeric) = 1.813509599600831859624957744244
absolute error = 1.813509599600831859624957744244
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9709
Order of pole = 593.7
memory used=2937.4MB, alloc=4.6MB, time=172.27
TOP MAIN SOLVE Loop
x[1] = 2.185108620062423230206540661869
y[1] (analytic) = 0
y[1] (numeric) = 1.8144542073091192782250133390477
absolute error = 1.8144542073091192782250133390477
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9697
Order of pole = 593.7
memory used=2941.2MB, alloc=4.6MB, time=172.43
TOP MAIN SOLVE Loop
memory used=2945.0MB, alloc=4.6MB, time=172.58
x[1] = 2.1860826973166312677947240127618
y[1] (analytic) = 0
y[1] (numeric) = 1.8152933719377227132989320493167
absolute error = 1.8152933719377227132989320493167
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9687
Order of pole = 593.7
memory used=2948.8MB, alloc=4.6MB, time=172.73
TOP MAIN SOLVE Loop
x[1] = 2.1870567745708393053829073636546
y[1] (analytic) = 0
y[1] (numeric) = 1.8161320776367290195170092937978
absolute error = 1.8161320776367290195170092937978
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9677
Order of pole = 593.6
memory used=2952.6MB, alloc=4.6MB, time=172.89
TOP MAIN SOLVE Loop
x[1] = 2.1880308518250473429710907145474
y[1] (analytic) = 0
y[1] (numeric) = 1.8169703235520218049234256353161
absolute error = 1.8169703235520218049234256353161
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9667
Order of pole = 593.6
memory used=2956.5MB, alloc=4.6MB, time=173.04
TOP MAIN SOLVE Loop
x[1] = 2.1890049290792553805592740654402
y[1] (analytic) = 0
y[1] (numeric) = 1.8178081088292526510538510273077
absolute error = 1.8178081088292526510538510273077
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9657
Order of pole = 593.6
memory used=2960.3MB, alloc=4.6MB, time=173.20
TOP MAIN SOLVE Loop
x[1] = 2.1901007659902394228459803351946
y[1] (analytic) = 0
y[1] (numeric) = 1.8187500655956436739027250586858
absolute error = 1.8187500655956436739027250586858
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9645
Order of pole = 593.6
memory used=2964.1MB, alloc=4.6MB, time=173.35
TOP MAIN SOLVE Loop
x[1] = 2.1910748432444474604341636860874
y[1] (analytic) = 0
y[1] (numeric) = 1.8195868691792368060827046724085
absolute error = 1.8195868691792368060827046724085
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9635
Order of pole = 593.5
memory used=2967.9MB, alloc=4.6MB, time=173.51
TOP MAIN SOLVE Loop
x[1] = 2.1920489204986554980223470369802
y[1] (analytic) = 0
y[1] (numeric) = 1.8204232094534467818483080581509
absolute error = 1.8204232094534467818483080581509
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9625
Order of pole = 593.5
memory used=2971.7MB, alloc=4.6MB, time=173.66
TOP MAIN SOLVE Loop
x[1] = 2.193022997752863535610530387873
y[1] (analytic) = 0
y[1] (numeric) = 1.8212590855629806382531574451866
absolute error = 1.8212590855629806382531574451866
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9615
Order of pole = 593.5
memory used=2975.5MB, alloc=4.6MB, time=173.81
memory used=2979.3MB, alloc=4.6MB, time=173.97
TOP MAIN SOLVE Loop
x[1] = 2.1941188346638475778972366576274
y[1] (analytic) = 0
y[1] (numeric) = 1.8221988902991367841153095223609
absolute error = 1.8221988902991367841153095223609
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9604
Order of pole = 593.4
memory used=2983.2MB, alloc=4.6MB, time=174.12
TOP MAIN SOLVE Loop
x[1] = 2.1950929119180556154854200085202
y[1] (analytic) = 0
y[1] (numeric) = 1.8230337772178640844857915868213
absolute error = 1.8230337772178640844857915868213
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9594
Order of pole = 593.4
memory used=2987.0MB, alloc=4.6MB, time=174.28
TOP MAIN SOLVE Loop
x[1] = 2.196066989172263653073603359413
y[1] (analytic) = 0
y[1] (numeric) = 1.8238681972976741033635500826522
absolute error = 1.8238681972976741033635500826522
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9583
Order of pole = 593.4
memory used=2990.8MB, alloc=4.6MB, time=174.44
TOP MAIN SOLVE Loop
x[1] = 2.1970410664264716906617867103058
y[1] (analytic) = 0
y[1] (numeric) = 1.824702149682349694995911152205
absolute error = 1.824702149682349694995911152205
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9573
Order of pole = 593.4
memory used=2994.6MB, alloc=4.6MB, time=174.59
TOP MAIN SOLVE Loop
x[1] = 2.1980151436806797282499700611986
y[1] (analytic) = 0
y[1] (numeric) = 1.8255356335154527561210060784084
absolute error = 1.8255356335154527561210060784084
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9563
Order of pole = 593.3
memory used=2998.4MB, alloc=4.6MB, time=174.75
TOP MAIN SOLVE Loop
x[1] = 2.199110980591663770536676330953
y[1] (analytic) = 0
y[1] (numeric) = 1.8264727416954942341201342349378
absolute error = 1.8264727416954942341201342349378
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9552
Order of pole = 593.3
memory used=3002.2MB, alloc=4.6MB, time=174.90
TOP MAIN SOLVE Loop
x[1] = 2.2000850578458718081248596818458
y[1] (analytic) = 0
y[1] (numeric) = 1.8273052270118618427935780674554
absolute error = 1.8273052270118618427935780674554
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9542
Order of pole = 593.3
memory used=3006.0MB, alloc=4.6MB, time=175.06
TOP MAIN SOLVE Loop
memory used=3009.9MB, alloc=4.6MB, time=175.21
x[1] = 2.2010591351000798457130430327386
y[1] (analytic) = 0
y[1] (numeric) = 1.8281372410988770449582594306932
absolute error = 1.8281372410988770449582594306932
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9531
Order of pole = 593.3
memory used=3013.7MB, alloc=4.6MB, time=175.36
TOP MAIN SOLVE Loop
x[1] = 2.2020332123542878833012263836314
y[1] (analytic) = 0
y[1] (numeric) = 1.8289687830992031050065475579043
absolute error = 1.8289687830992031050065475579043
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9521
Order of pole = 593.2
memory used=3017.5MB, alloc=4.6MB, time=175.52
TOP MAIN SOLVE Loop
x[1] = 2.2030072896084959208894097345242
y[1] (analytic) = 0
y[1] (numeric) = 1.8297998521552885578574498139504
absolute error = 1.8297998521552885578574498139504
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9511
Order of pole = 593.2
memory used=3021.3MB, alloc=4.6MB, time=175.67
TOP MAIN SOLVE Loop
x[1] = 2.2041031265194799631761160042786
y[1] (analytic) = 0
y[1] (numeric) = 1.8307342384591959146316065519486
absolute error = 1.8307342384591959146316065519486
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.95
Order of pole = 593.2
memory used=3025.1MB, alloc=4.6MB, time=175.82
TOP MAIN SOLVE Loop
x[1] = 2.2050772037736880007642993551714
y[1] (analytic) = 0
y[1] (numeric) = 1.8315642996604580542210412973279
absolute error = 1.8315642996604580542210412973279
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.949
Order of pole = 593.2
memory used=3028.9MB, alloc=4.6MB, time=175.98
TOP MAIN SOLVE Loop
x[1] = 2.2060512810278960383524827060642
y[1] (analytic) = 0
y[1] (numeric) = 1.832393885236260742772734652925
absolute error = 1.832393885236260742772734652925
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.948
Order of pole = 593.1
memory used=3032.7MB, alloc=4.6MB, time=176.13
TOP MAIN SOLVE Loop
x[1] = 2.207025358282104075940666056957
y[1] (analytic) = 0
y[1] (numeric) = 1.833222994328179713902080921787
absolute error = 1.833222994328179713902080921787
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9469
Order of pole = 593.1
memory used=3036.6MB, alloc=4.6MB, time=176.28
TOP MAIN SOLVE Loop
memory used=3040.4MB, alloc=4.6MB, time=176.44
x[1] = 2.2081211951930881182273723267114
y[1] (analytic) = 0
y[1] (numeric) = 1.8341551714403398978277658047764
absolute error = 1.8341551714403398978277658047764
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9458
Order of pole = 593.1
memory used=3044.2MB, alloc=4.6MB, time=176.60
TOP MAIN SOLVE Loop
x[1] = 2.2090952724472961558155556776042
y[1] (analytic) = 0
y[1] (numeric) = 1.8349832651528191474641166296219
absolute error = 1.8349832651528191474641166296219
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9448
Order of pole = 593
memory used=3048.0MB, alloc=4.6MB, time=176.75
TOP MAIN SOLVE Loop
x[1] = 2.210069349701504193403739028497
y[1] (analytic) = 0
y[1] (numeric) = 1.8358108796975010776017781329347
absolute error = 1.8358108796975010776017781329347
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9438
Order of pole = 593
memory used=3051.8MB, alloc=4.6MB, time=176.90
TOP MAIN SOLVE Loop
x[1] = 2.2110434269557122309919223793898
y[1] (analytic) = 0
y[1] (numeric) = 1.8366380142151096156552269904004
absolute error = 1.8366380142151096156552269904004
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9428
Order of pole = 593
memory used=3055.6MB, alloc=4.6MB, time=177.06
TOP MAIN SOLVE Loop
x[1] = 2.2120175042099202685801057302826
y[1] (analytic) = 0
y[1] (numeric) = 1.8374646678461653729055390798629
absolute error = 1.8374646678461653729055390798629
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9417
Order of pole = 593
memory used=3059.5MB, alloc=4.6MB, time=177.21
TOP MAIN SOLVE Loop
x[1] = 2.213113341120904310866812000037
y[1] (analytic) = 0
y[1] (numeric) = 1.8383940773009834979374847170496
absolute error = 1.8383940773009834979374847170496
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9406
Order of pole = 592.9
memory used=3063.3MB, alloc=4.6MB, time=177.37
TOP MAIN SOLVE Loop
x[1] = 2.2140874183751123484549953509298
y[1] (analytic) = 0
y[1] (numeric) = 1.8392197061934535115033942983797
absolute error = 1.8392197061934535115033942983797
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9396
Order of pole = 592.9
memory used=3067.1MB, alloc=4.6MB, time=177.53
TOP MAIN SOLVE Loop
memory used=3070.9MB, alloc=4.6MB, time=177.68
x[1] = 2.2150614956293203860431787018226
y[1] (analytic) = 0
y[1] (numeric) = 1.8400448515122009663754957586247
absolute error = 1.8400448515122009663754957586247
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9386
Order of pole = 592.9
TOP MAIN SOLVE Loop
memory used=3074.7MB, alloc=4.6MB, time=177.84
x[1] = 2.2160355728835284236313620527154
y[1] (analytic) = 0
y[1] (numeric) = 1.8408695123969210068023322190085
absolute error = 1.8408695123969210068023322190085
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9376
Order of pole = 592.9
memory used=3078.5MB, alloc=4.6MB, time=177.99
TOP MAIN SOLVE Loop
x[1] = 2.2170096501377364612195454036082
y[1] (analytic) = 0
y[1] (numeric) = 1.8416936879871118803646605361761
absolute error = 1.8416936879871118803646605361761
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9366
Order of pole = 592.8
memory used=3082.3MB, alloc=4.6MB, time=178.14
TOP MAIN SOLVE Loop
x[1] = 2.2181054870487205035062516733626
y[1] (analytic) = 0
y[1] (numeric) = 1.8426203043757830350244513316212
absolute error = 1.8426203043757830350244513316212
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9354
Order of pole = 592.8
memory used=3086.2MB, alloc=4.6MB, time=178.30
TOP MAIN SOLVE Loop
x[1] = 2.2190795643029285410944350242554
y[1] (analytic) = 0
y[1] (numeric) = 1.8434434458570731633436828792658
absolute error = 1.8434434458570731633436828792658
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9344
Order of pole = 592.8
memory used=3090.0MB, alloc=4.6MB, time=178.45
TOP MAIN SOLVE Loop
x[1] = 2.2200536415571365786826183751482
y[1] (analytic) = 0
y[1] (numeric) = 1.8442660993535109829818725273783
absolute error = 1.8442660993535109829818725273783
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9334
Order of pole = 592.7
memory used=3093.8MB, alloc=4.6MB, time=178.61
TOP MAIN SOLVE Loop
x[1] = 2.221027718811344616270801726041
y[1] (analytic) = 0
y[1] (numeric) = 1.845088264003795896103181501351
absolute error = 1.845088264003795896103181501351
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9324
Order of pole = 592.7
memory used=3097.6MB, alloc=4.6MB, time=178.76
TOP MAIN SOLVE Loop
x[1] = 2.2220017960655526538589850769338
y[1] (analytic) = 0
y[1] (numeric) = 1.8459099389464368962190831520961
absolute error = 1.8459099389464368962190831520961
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9314
Order of pole = 592.7
memory used=3101.4MB, alloc=4.6MB, time=178.92
memory used=3105.2MB, alloc=4.6MB, time=179.07
TOP MAIN SOLVE Loop
x[1] = 2.2230976329765366961456913466882
y[1] (analytic) = 0
y[1] (numeric) = 1.8468337368303398344252698232775
absolute error = 1.8468337368303398344252698232775
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9302
Order of pole = 592.7
memory used=3109.0MB, alloc=4.6MB, time=179.23
TOP MAIN SOLVE Loop
x[1] = 2.224071710230744733733874697581
y[1] (analytic) = 0
y[1] (numeric) = 1.847654368282956320024460442995
absolute error = 1.847654368282956320024460442995
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9292
Order of pole = 592.6
memory used=3112.9MB, alloc=4.6MB, time=179.38
TOP MAIN SOLVE Loop
x[1] = 2.2250457874849527713220580484738
y[1] (analytic) = 0
y[1] (numeric) = 1.8484745073345562966234688846732
absolute error = 1.8484745073345562966234688846732
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9282
Order of pole = 592.6
memory used=3116.7MB, alloc=4.6MB, time=179.54
TOP MAIN SOLVE Loop
x[1] = 2.2260198647391608089102413993666
y[1] (analytic) = 0
y[1] (numeric) = 1.8492941531228768170135284443541
absolute error = 1.8492941531228768170135284443541
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9272
Order of pole = 592.6
memory used=3120.5MB, alloc=4.6MB, time=179.69
TOP MAIN SOLVE Loop
x[1] = 2.227115701650144851196947669121
y[1] (analytic) = 0
y[1] (numeric) = 1.8502156639571192321829185161383
absolute error = 1.8502156639571192321829185161383
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9261
Order of pole = 592.6
memory used=3124.3MB, alloc=4.6MB, time=179.85
TOP MAIN SOLVE Loop
x[1] = 2.2280897789043528887851310200138
y[1] (analytic) = 0
y[1] (numeric) = 1.8510342586971507562521071828963
absolute error = 1.8510342586971507562521071828963
relative error = -1 %
Correct digits = -1
h = 0.000121759656776004698522918861625
Real estimate of pole used for equation 1
Radius of convergence = 0.9251
Order of pole = 592.5
memory used=3128.1MB, alloc=4.6MB, time=180.00
Finished!
Maximum Time Reached before Solution Completed!
diff ( y , x , 1 ) = expt (sin(x) , (0.2 * x + 0.3));
Iterations = 6009
Total Elapsed Time = 3 Minutes 0 Seconds
Elapsed Time(since restart) = 2 Minutes 59 Seconds
Expected Time Remaining = 1 Minutes 5 Seconds
Optimized Time Remaining = 1 Minutes 5 Seconds
Expected Total Time = 4 Minutes 5 Seconds
Time to Timeout Unknown
Percent Done = 73.42 %
> quit
memory used=3130.8MB, alloc=4.6MB, time=180.11