Initializing... Initialized Initializing(2)... PI = 0.314159265358979323846264338327950271e1+/-0.313e-33 E = 0.271828182845904523536028747135266232e1+/-0.256e-32 LOG_E_10 = 0.230258509299404568401799145468436324e1+/-0.5e-32 Initialized(2) ##############ECHO OF PROBLEM################# ##############temp/tanh_sqrtpostode.ode################# diff ( y , x , 1 ) = tanh ( sqrt ( 2.0 * x + 3.0 ) ) ; ! #BEGIN FIRST INPUT BLOCK # Digits:=32; ELIMINATED in preodein.rb max_terms=30 ! #END FIRST INPUT BLOCK #BEGIN SECOND INPUT BLOCK x_start=c(0.1) x_end=c(5.0) $array_y_init[0 + 1] = exact_soln_y(x_start) $glob_look_poles=true $glob_max_h=0.1 # ELIMINATED in preodein.rb # ELIMINATED in preodein.rb # ELIMINATED in preodein.rb # ELIMINATED in preodein.rb # ELIMINATED in preodein.rb # ELIMINATED in preodein.rb # ELIMINATED in preodein.rb $glob_type_given_pole=1 # ELIMINATED in preodein.rb $array_given_rad_poles[1][1]=c(-1.5) # ELIMINATED in preodein.rb $array_given_rad_poles[1][2]=c(0.0) # ELIMINATED in preodein.rb $array_given_ord_poles[1][1]=c(0.5) # ELIMINATED in preodein.rb $array_given_ord_poles[1][2]=c(0.0) #END SECOND INPUT BLOCK #BEGIN OVERRIDE BLOCK $glob_desired_digits_correct=8 $glob_max_minutes=(3.0) $glob_subiter_method=3 $glob_max_iter=100000 $glob_upper_ratio_limit=c(1.000001) $glob_lower_ratio_limit=c(0.999999) $glob_look_poles=false $glob_h=c(0.001) $glob_display_interval=c(0.01) #END OVERRIDE BLOCK ! #BEGIN USER DEF BLOCK def exact_soln_y (x) x = c(x) return(c(0.0)) end #END USER DEF BLOCK #######END OF ECHO OF PROBLEM################# START of Soultion TOP MAIN SOLVE Loop x[1] 0.1e0+/-0.50e-33 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.0e0+/-0.5000000000000000000000000000000005e-33 absolute error 0.0e0+/-0.50e-33 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits -16 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.11e0+/-0.550e-32 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.945904439166639696459259413229024419e-2+/-0.113e-31 absolute error 0.945904439166639696459259413229024419e-2+/-0.113e-31 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.12e0+/-0.105e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.189239250703096972814514832823126207e-1+/-0.328e-31 absolute error 0.189239250703096972814514832823126207e-1+/-0.328e-31 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.13e0+/-0.155e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.283945630182301957672194671551062474e-1+/-0.652e-31 absolute error 0.283945630182301957672194671551062474e-1+/-0.652e-31 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.14e0+/-0.205e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.37870880543987960601016341354510417e-1+/-0.107e-30 absolute error 0.37870880543987960601016341354510417e-1+/-0.107e-30 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.15e0+/-0.255e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.473528012552582050726239895683946985e-1+/-0.155e-30 absolute error 0.473528012552582050726239895683946985e-1+/-0.155e-30 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.16e0+/-0.305e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.568402500323523815736860168784736327e-1+/-0.213e-30 absolute error 0.568402500323523815736860168784736327e-1+/-0.213e-30 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.17e0+/-0.355e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.663331530023857544101408870951585885e-1+/-0.282e-30 absolute error 0.663331530023857544101408870951585885e-1+/-0.282e-30 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.18e0+/-0.405e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.758314375140728539771895374132893949e-1+/-0.362e-30 absolute error 0.758314375140728539771895374132893949e-1+/-0.362e-30 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.19e0+/-0.455e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.85335032113132835949885061257649692e-1+/-0.451e-30 absolute error 0.85335032113132835949885061257649692e-1+/-0.451e-30 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 TOP MAIN SOLVE Loop x[1] 0.2e0+/-0.505e-31 y[1] (closed_form) 0.0e0+/-0.50e-33 y[1] (numeric) 0.94843866518287366485838622601264617e-1+/-0.551e-30 absolute error 0.94843866518287366485838622601264617e-1+/-0.551e-30 relative error -0.1e1+/-0.50e-33% Desired digits 8 Estimated correct digits 13 Correct digits -16 h 0.1e-2+/-0.5e-33 Finished! Maximum Time Reached before Solution Completed! diff ( y , x , 1 ) = tanh ( sqrt ( 2.0 * x + 3.0 ) ) ; Iterations 102 Total Elapsed Time 3 Minutes 4 Seconds Elapsed Time(since restart) 3 Minutes 4 Seconds Expected Time Remaining 2 Hours 22 Minutes 49 Seconds Optimized Time Remaining 2 Hours 22 Minutes 49 Seconds Expected Total Time 2 Hours 25 Minutes 53 Seconds Time to Timeout 0.0 Seconds Percent Done 0.210204081632653061224489795918367346e1+/-0.107e-29%