Record of Testing of Omnisode

Time	Language	Ode File	Equation	Start	End	Actual End	H	Digits	Terms	1st Relative Error Percent	Last Relative Error Percent	Iterations	Pole	Radius	Order	Execution Time	Time to Complete	Last Save	diffeq program	diffeq results	Comment
2012-06-17T03:38:27-05:00	Maxima	tan	diff ( y , x , 1 ) = tan ( x ) ;	0.0	5.	1.0000000000000007	1.000E-3	16	30	0.0	6.6215414854692240000000000000E-13	1000	Real	0.5726773689009024	2.0816640986134907	12 Minutes 52 Seconds	51 Minutes 26 Seconds	091	tan diffeq.max	tan maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T03:38:07-05:00	Maple	tan	diff ( y , x , 1 ) = tan ( x ) ;	0	5	1	0.001	32	30	3.88889e-17	7.33858e-13	1000	Real	0.572677	2.08166	17 Seconds	1 Minutes 8 Seconds	091	tan diffeq.mxt	tan maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T03:23:51-05:00	Maxima	tanh	diff ( y , x , 1 ) = tanh ( x ) ;	0.1	10.	1.0999999999999897	1.000E-3	16	30	0.0	4.5965816072612060000000000000E-13	1000	Complex	1.9237884176697422	2.1821032611869136	14 Minutes 11 Seconds	2 Hours 6 Minutes 10 Seconds	091	tanh diffeq.max	tanh maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T03:23:06-05:00	Maple	tanh	diff ( y , x , 1 ) = tanh ( x ) ;	0.1	10	1.1	0.001	32	30	3.55596e-17	2.65331e-15	1000	Complex	1.92379	2.1821	38 Seconds	5 Minutes 46 Seconds	091	tanh diffeq.mxt	tanh maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T03:08:03-05:00	Maxima	sub	diff ( y , x , 1 ) = sin ( x ) - cos ( x );	0.0	10.	0.8650000000000007	1.000E-3	16	30	0.0	7.52356137043951400000000000000E-14	865	No Pole	NA	NA	15 Minutes 0 Seconds	2 Hours 38 Minutes 19 Seconds	091	sub diffeq.max	sub maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T03:07:45-05:00	Maple	sub	diff ( y , x , 1 ) = sin ( x ) - cos ( x );	0	10	1	0.001	32	30	4.86693e-18	1.02302e-14	1000	No Pole	NA	NA	16 Seconds	2 Minutes 26 Seconds	091	sub diffeq.mxt	sub maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:56:37-05:00	Maxima	sin	diff ( y , x , 1 ) = sin(x);	0.0	5.	1.0000000000000007	1.000E-3	16	30	0.0	9.12701057832758700000000000000E-14	1000	No Pole	NA	NA	11 Minutes 6 Seconds	44 Minutes 21 Seconds	091	sin diffeq.max	sin maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:56:25-05:00	Maple	sin	diff ( y , x , 1 ) = sin(x);	0	5	1	0.001	16	30	0	0	1000	No Pole	NA	NA	9 Seconds	39 Seconds	091	sin diffeq.mxt	sin maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:45:28-05:00	Maxima	sinh	diff ( y , x , 1 ) = sinh ( x ) ;	0.0	10.	1.0000000000000007	1.000E-3	16	30	2.220445494138893700000000000000E-14	2.27014419008787550000000000000E-13	1000	No Pole	NA	NA	10 Minutes 55 Seconds	1 Hours 38 Minutes 12 Seconds	091	sinh diffeq.max	sinh maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:45:16-05:00	Maple	sinh	diff ( y , x , 1 ) = sinh ( x ) ;	0	10	1	0.001	32	30	2.43056e-18	2.24609e-15	1000	No Pole	NA	NA	10 Seconds	1 Minutes 31 Seconds	091	sinh diffeq.mxt	sinh maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:40:32-05:00	Maxima	sing5	diff ( y , x , 1 ) = m1 * 3.0 / x / x / x / x ;	-1.	-0.7	-0.6999999999999997	1.000E-3	16	30	8.85516548088105400000000000000E-14	6.8331917901787100000000000E-11	300	Real	0.7088909207102968	5.625705785345513	4 Minutes 42 Seconds	Done	091	sing5 diffeq.max	sing5 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:40:27-05:00	Maple	sing5	diff ( y , x , 1 ) = m1 * 3.0 / x / x / x / x ;	-1	-0.7	-0.699	0.001	32	30	9.78789e-14	6.89803e-11	301	Real	0.70788	5.62571	3 Seconds	Done	091	sing5 diffeq.mxt	sing5 maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:25:22-05:00	Maxima	sing4	diff ( y , x , 1 ) = m1 * 2.0 * x / (x * x + 1.0) /( x * x + 1.0);	-2.	1.	-1.1310000000000957	1.000E-3	16	30	2.773337670625154000000000000000E-14	5.946385994715652000000000000E-12	869	Complex	1.5272490475849907	3.5984320530829805	14 Minutes 59 Seconds	36 Minutes 42 Seconds	091	sing4 diffeq.max	sing4 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:24:40-05:00	Maple	sing4	diff ( y , x , 1 ) = m1 * 2.0 * x / (x * x + 1.0) /( x * x + 1.0);	-2	1	-1	0.001	50	30	6.51145e-18	1.48986e-13	1000	Complex	1.43038	3.59468	35 Seconds	1 Minutes 11 Seconds	091	sing4 diffeq.mxt	sing4 maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:21:56-05:00	Maxima	sing3	diff ( y , x , 1 ) = m1 * 2.0 / x / x / x ;	-1.	-0.7	-0.6999999999999997	1.000E-3	16	30	2.216007377597861400000000000000E-14	1.91056059861693800000000000E-11	300	Real	0.7066060198307029	4.4367431074464925	2 Minutes 42 Seconds	Done	091	sing3 diffeq.max	sing3 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:21:51-05:00	Maple	sing3	diff ( y , x , 1 ) = m1 * 2.0 / x / x / x ;	-1	-0.7	-0.699	0.001	100	30	2.44894e-14	1.92038e-11	301	Real	0.705598	4.43674	3 Seconds	Done	091	sing3 diffeq.mxt	sing3 maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:12:54-05:00	Maxima	sing2	diff ( y , x , 1 ) = 1.0/ (x * x + 1.0) ;	-2.	1.	-1.0000000000001101	1.000E-3	16	30	2.00591605924376220000000000000E-14	4.367961762542922300000000000E-12	1000	Complex	1.419495265777604	2.1749435223852025	8 Minutes 54 Seconds	17 Minutes 47 Seconds	091	sing2 diffeq.max	sing2 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:12:43-05:00	Maple	sing2	diff ( y , x , 1 ) = 1.0/ (x * x + 1.0) ;	-2	1	-1	0.001	32	30	1.48373e-18	2.04881e-14	1000	Complex	1.4195	2.17494	8 Seconds	16 Seconds	091	sing2 diffeq.mxt	sing2 maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:11:56-05:00	Maxima	nonlinear2	diff ( y , x , 1 ) = y * y;	0.0	0.2	0.20000000000000015	1.000E-3	16	30	2.4376056728669940000000000000E-13	3.23647775246626900000000000E-10	200	No Pole	NA	NA	45 Seconds	Done	091	nonlinear2 diffeq.max	nonlinear2 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:11:53-05:00	Maple	nonlinear2	diff ( y , x , 1 ) = y * y;	0	0.2	0.201	0.001	32	30	2.30670e-13	3.29699e-10	201	No Pole	NA	NA	1 Seconds	Done	091	nonlinear2 diffeq.mxt	nonlinear2 maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:09:20-05:00	Maxima	nonlinear1	diff ( y , x , 1 ) = y * y;	0.0	0.5	0.5000000000000003	1.000E-3	16	30	0.0	2.651212582804872000000000000E-11	500	No Pole	NA	NA	2 Minutes 27 Seconds	Done	091	nonlinear1 diffeq.max	nonlinear1 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:09:05-05:00	Maple	nonlinear1	diff ( y , x , 1 ) = y * y;	0	0.5	0.501	0.001	32	30	3.55119e-15	2.70210e-11	501	No Pole	NA	NA	12 Seconds	Done	091	nonlinear1 diffeq.mxt	nonlinear1 maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:03:31-05:00	Maxima	mult	diff ( y , x , 1 ) = x * x ;	0.1	10.	1.0999999999999897	1.000E-3	16	30	0.0	8.9207483853511380000000000000E-13	1000	No Pole	NA	NA	5 Minutes 28 Seconds	48 Minutes 43 Seconds	091	mult diffeq.max	mult maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T02:03:16-05:00	Maple	mult	diff ( y , x , 1 ) = x * x ;	0.1	10	1.1	0.001	32	30	9.99657e-30	2.31355e-27	1000	No Pole	NA	NA	10 Seconds	1 Minutes 30 Seconds	091	mult diffeq.mxt	mult maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T01:48:11-05:00	Maxima	mult2	diff ( y , x , 1 ) = sin(x) * cos(x) ;	0.1	10.	0.8040000000000006	1.000E-3	16	30	1.475297896157856700000000000000E-14	5.048479731814379000000000000000E-14	704	No Pole	NA	NA	15 Minutes 3 Seconds	3 Hours 16 Minutes 18 Seconds	091	mult2 diffeq.max	mult2 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-17T01:47:47-05:00	Maple	mult2	diff ( y , x , 1 ) = sin(x) * cos(x) ;	0.1	10	1.1	0.001	32	30	5.06426e-17	1.25203e-14	1000	No Pole	NA	NA	22 Seconds	3 Minutes 17 Seconds	091	mult2 diffeq.mxt	mult2 maple results	Test of revised logic - mostly for speeding factorials
2012-06-17T01:32:37-05:00	Maxima	mtest9_rev	diff(y2,x,1) = y1 - 2.0;	0.5	10.	0.7820000000000003	1.000E-3	16	30	0.0	0.154689900599905	282	No Pole	NA	NA	15 Minutes 2 Seconds	8 Hours 9 Minutes 53 Seconds	091	mtest9_rev diffeq.max	mtest9_rev maxima results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff(y1,x,1) = diff(y2,x,5);	ditto	ditto	ditto	ditto	ditto	ditto	3.537240187435731000E-2	8.328994476089798	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T01:30:38-05:00	Maple	mtest9_rev	diff(y2,x,1) = y1 - 2.0;	0.5	10	1.5	0.001	32	30	3.55904e-16	5.76022	1000	No Pole	NA	NA	1 Minutes 50 Seconds	15 Minutes 39 Seconds	091	mtest9_rev diffeq.mxt	mtest9_rev maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff(y1,x,1) = diff(y2,x,5);	ditto	ditto	ditto	ditto	ditto	ditto	0.0353724	17.2834	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T01:15:22-05:00	Maxima	mtest9	diff(y1,x,1) = diff(y2,x,5);	0.5	10.	0.7790000000000002	1.000E-3	16	30	3.537240187435731000E-2	8.256687817292377	279	No Pole	NA	NA	15 Minutes 8 Seconds	8 Hours 18 Minutes 37 Seconds	091	mtest9 diffeq.max	mtest9 maxima results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff(y2,x,1) = y1 - 2.0;	ditto	ditto	ditto	ditto	ditto	ditto	0.0	0.1498631585128757	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T01:13:22-05:00	Maple	mtest9	diff(y1,x,1) = diff(y2,x,5);	0.5	10	1.5	0.001	32	30	0.0353724	17.2834	1000	No Pole	NA	NA	1 Minutes 51 Seconds	15 Minutes 44 Seconds	091	mtest9 diffeq.mxt	mtest9 maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff(y2,x,1) = y1 - 2.0;	ditto	ditto	ditto	ditto	ditto	ditto	3.55904e-16	5.76022	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T00:57:48-05:00	Maxima	mtest8	diff ( y2 , x , 4 ) = y1 - 1.0;	0.1	5.1	0.1930000000000001	1.000E-3	16	30	5.2443776719023730000000000000E-13	1.074715367467889300E-2	93	No Pole	NA	NA	15 Minutes 30 Seconds	13 Hours 29 Minutes 46 Seconds	091	mtest8 diffeq.max	mtest8 maxima results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = m1 * diff ( y2 , x , 3 ) ;	ditto	ditto	ditto	ditto	ditto	ditto	3.182406658853870000E-4	7.7544056739237600E-2	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T00:53:17-05:00	Maple	mtest8	diff ( y2 , x , 4 ) = y1 - 1.0;	0.1	5.1	1.1	0.001	32	30	5.30323e-13	8.0616	1000	No Pole	NA	NA	4 Minutes 23 Seconds	17 Minutes 32 Seconds	091	mtest8 diffeq.mxt	mtest8 maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = m1 * diff ( y2 , x , 3 ) ;	ditto	ditto	ditto	ditto	ditto	ditto	0.000318241	3.2187	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T00:37:58-05:00	Maxima	mtest7	diff ( y2 , x , 5 ) = y1 ;	0.0	5.	9.70000000000000800E-2	1.000E-3	16	30	0.0	1.34336022708338420E-2	97	No Pole	NA	NA	15 Minutes 11 Seconds	12 Hours 39 Minutes 48 Seconds	091	mtest7 diffeq.max	mtest7 maxima results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = m1 * y2 + 1.0;	ditto	ditto	ditto	ditto	ditto	ditto	0.0	1.77245045619516070000E-4	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T00:33:04-05:00	Maple	mtest7	diff ( y2 , x , 5 ) = y1 ;	0	5	1	0.001	32	30	8.32501e-16	8.58148	1000	No Pole	NA	NA	4 Minutes 45 Seconds	19 Minutes 0 Seconds	091	mtest7 diffeq.mxt	mtest7 maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = m1 * y2 + 1.0;	ditto	ditto	ditto	ditto	ditto	ditto	4.93056e-18	2.60563	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T00:16:17-05:00	Maple	mtest6_rev	diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;	0.5	5	1.5	0.001	32	30	2.06898e+15	1.88553e+19898	1000	No Pole	NA	NA	9 Minutes 54 Seconds	34 Minutes 37 Seconds	091	mtest6_rev diffeq.mxt	mtest6_rev maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;	ditto	ditto	ditto	ditto	ditto	ditto	1.54400e+17	1.40978e+19900	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-17T00:01:16-05:00	Maple	mtest6	diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;	0.5	5	1.5	0.001	32	30	3.44182e+14	3.14299e+19897	1000	No Pole	NA	NA	8 Minutes 13 Seconds	28 Minutes 44 Seconds	091	mtest6 diffeq.mxt	mtest6 maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;	ditto	ditto	ditto	ditto	ditto	ditto	6.14833e+12	5.59381e+19895	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T23:45:12-05:00	Maxima	mtest5	diff ( y2 , x , 1 ) = diff ( y1, x , 1) ;	0.1	5.	0.15000000000000005	1.000E-3	16	30	9.932723417763424000E-3	0.6139346566465969	50	No Pole	NA	NA	15 Minutes 57 Seconds	1 Days 1 Hours 17 Minutes 41 Seconds	091	mtest5 diffeq.max	mtest5 maxima results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = sin ( x ) ;	ditto	ditto	ditto	ditto	ditto	ditto	0.0	0.0	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T23:39:56-05:00	Maple	mtest5	diff ( y2 , x , 1 ) = diff ( y1, x , 1) ;	0.1	5	1.1	0.001	32	30	0.00993272	34.9852	1000	No Pole	NA	NA	5 Minutes 8 Seconds	20 Minutes 2 Seconds	091	mtest5 diffeq.mxt	mtest5 maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = sin ( x ) ;	ditto	ditto	ditto	ditto	ditto	ditto	4.81221e-18	2.48820e-15	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T23:23:16-05:00	Maxima	mtest4	diff ( y2 , x , 3 ) = m1 * cos(x) ;	0.1	5.	0.13400000000000004	1.000E-3	16	30	9.148823417296956000000000E-9	3.6269285903450950000E-4	34	No Pole	NA	NA	16 Minutes 36 Seconds	1 Days 14 Hours 28 Minutes 48 Seconds	091	mtest4 diffeq.max	mtest4 maxima results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = m1 * y2 + 1.0;	ditto	ditto	ditto	ditto	ditto	ditto	5.062342107764748000000000000E-12	7.075002185514430000000E-6	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T23:14:17-05:00	Maple	mtest4	diff ( y2 , x , 3 ) = m1 * cos(x) ;	0.1	5	1.1	0.001	32	30	9.14882e-09	14.4222	1000	No Pole	NA	NA	8 Minutes 48 Seconds	34 Minutes 17 Seconds	091	mtest4 diffeq.mxt	mtest4 maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = m1 * y2 + 1.0;	ditto	ditto	ditto	ditto	ditto	ditto	5.07419e-12	47.2542	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T22:58:58-05:00	Maxima	mtest3	diff ( y2 , x , 1 ) = m1 * y1 + 1.0;	0.1	0.5	0.2210000000000001	1.000E-3	16	30	1.234717587259694700000000000000E-14	4.26574302880271100000000000000E-14	121	No Pole	NA	NA	15 Minutes 16 Seconds	34 Minutes 47 Seconds	091	mtest3 diffeq.max	mtest3 maxima results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = y2 - 1.0;	ditto	ditto	ditto	ditto	ditto	ditto	0.0	6.74334145582270300000000000000E-14	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T22:58:10-05:00	Maple	mtest3	diff ( y2 , x , 1 ) = m1 * y1 + 1.0;	0.1	0.5	0.501	0.001	32	30	5.78395e-19	1.82183e-15	401	No Pole	NA	NA	46 Seconds	Done	091	mtest3 diffeq.mxt	mtest3 maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y1 , x , 1 ) = y2 - 1.0;	ditto	ditto	ditto	ditto	ditto	ditto	2.42270e-18	9.07704e-16	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T22:42:55-05:00	Maxima	mtest2	diff ( y1 , x , 1 ) = m1 * y2 + 1.0;	0.1	10.	0.22800000000000012	1.000E-3	16	30	0.0	6.74866450860588400000000000000E-14	128	No Pole	NA	NA	15 Minutes 8 Seconds	19 Hours 6 Minutes 43 Seconds	091	mtest2 diffeq.max	mtest2 maxima results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y2 , x , 1 ) = y1 - 1.0;	ditto	ditto	ditto	ditto	ditto	ditto	0.0	9.05543309387572800000000000000E-14	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T22:39:38-05:00	Maple	mtest2	diff ( y1 , x , 1 ) = m1 * y2 + 1.0;	0.1	10	1.1	0.001	32	30	2.42270e-18	1.49837e-15	1000	No Pole	NA	NA	3 Minutes 9 Seconds	28 Minutes 8 Seconds	091	mtest2 diffeq.mxt	mtest2 maple results	Test of revised logic - mostly for speeding factorials
ditto	ditto	ditto	diff ( y2 , x , 1 ) = y1 - 1.0;	ditto	ditto	ditto	ditto	ditto	ditto	4.72441e-19	2.29784e-15	ditto	No Pole	NA	NA	ditto	ditto	ditto	ditto	ditto	ditto
2012-06-16T22:36:44-05:00	Maxima	log	diff ( y , x , 1 ) = log ( x ) ;	20.	30.	21.000000000001222	1.000E-3	16	30	4.056703151357740600E-2	38.89993431646115	1000	No Pole	NA	NA	2 Minutes 49 Seconds	25 Minutes 23 Seconds	091	log diffeq.max	log maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T22:36:32-05:00	Maple	log	diff ( y , x , 1 ) = log ( x ) ;	20	30	21	0.001	32	30	0.040567	38.8999	1000	No Pole	NA	NA	7 Seconds	1 Minutes 4 Seconds	091	log diffeq.mxt	log maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T22:21:28-05:00	Maxima	h3sin	diff ( y , x , 3 ) = sin(x);	0.1	5.	1.0819999999999916	1.000E-3	16	30	1.65874430107641900000000E-8	79.8829492176786	982	No Pole	NA	NA	15 Minutes 1 Seconds	59 Minutes 53 Seconds	091	h3sin diffeq.max	h3sin maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T22:21:11-05:00	Maple	h3sin	diff ( y , x , 3 ) = sin(x);	0.1	5	1.1	0.001	50	30	1.65874e-08	89.883	1000	No Pole	NA	NA	15 Seconds	1 Minutes 0 Seconds	091	h3sin diffeq.mxt	h3sin maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T22:08:10-05:00	Maxima	h2sin	diff ( y , x , 2 ) = sin(x);	0.1	5.	1.0999999999999897	1.000E-3	16	30	4.4513438553631100000E-5	15.386950889022907	1000	No Pole	NA	NA	12 Minutes 58 Seconds	50 Minutes 33 Seconds	091	h2sin diffeq.max	h2sin maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T22:07:56-05:00	Maple	h2sin	diff ( y , x , 2 ) = sin(x);	0.1	5	1.1	0.001	50	30	4.45134e-05	15.387	1000	No Pole	NA	NA	12 Seconds	49 Seconds	091	h2sin diffeq.mxt	h2sin maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T22:00:18-05:00	Maxima	exp	diff ( y , x , 1 ) = exp ( x ) ;	1.	10.	1.9999999999998899	1.000E-3	16	30	1.19346690251158600000000000000E-14	6.0771367707614590000000000000E-12	1000	No Pole	NA	NA	7 Minutes 33 Seconds	1 Hours 0 Minutes 21 Seconds	091	exp diffeq.max	exp maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:59:55-05:00	Maple	exp	diff ( y , x , 1 ) = exp ( x ) ;	1	10	2	0.001	32	30	3.55186e-18	2.70570e-15	1000	No Pole	NA	NA	17 Seconds	2 Minutes 22 Seconds	091	exp diffeq.mxt	exp maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:44:49-05:00	Maxima	div	diff ( y , x , 1 ) = sin ( x ) / cos ( x ) ;	0.1	1.	0.8390000000000006	1.000E-3	16	30	0.0	2.21752900901502430000000000000E-13	739	Real	0.7339254428649308	2.081664098768595	15 Minutes 3 Seconds	3 Minutes 15 Seconds	091	div diffeq.max	div maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:44:26-05:00	Maple	div	diff ( y , x , 1 ) = sin ( x ) / cos ( x ) ;	0.1	1	1.001	0.001	32	30	4.21819e-17	7.36824e-13	901	Real	0.571676	2.08166	20 Seconds	Done	091	div diffeq.mxt	div maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:39:24-05:00	Maxima	diff	diff ( y , x , 2 ) = diff ( y , x , 1 ) ;	-4.	1.	-3.00000000000011	1.000E-3	16	30	2.18046940240278400000000000000E-14	8.18531298361667500000E-5	1000	No Pole	NA	NA	4 Minutes 59 Seconds	19 Minutes 58 Seconds	091	diff diffeq.max	diff maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:39:16-05:00	Maple	diff	diff ( y , x , 2 ) = diff ( y , x , 1 ) ;	-4	1	-3	0.001	32	30	2.49904e-14	8.18531e-05	1000	No Pole	NA	NA	6 Seconds	24 Seconds	091	diff diffeq.mxt	diff maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:30:41-05:00	Maxima	diff2	diff ( y , x , 3 ) = m1 * diff ( y , x , 1 ) ;	0.1	5.	1.0999999999999897	1.000E-3	16	30	0.0	4.61907091053920300E-2	1000	No Pole	NA	NA	8 Minutes 30 Seconds	33 Minutes 7 Seconds	091	diff2 diffeq.max	diff2 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:30:06-05:00	Maple	diff2	diff ( y , x , 3 ) = m1 * diff ( y , x , 1 ) ;	0.1	5	1.1	0.001	32	30	2.76597e-17	0.0461907	1000	No Pole	NA	NA	27 Seconds	1 Minutes 46 Seconds	091	diff2 diffeq.mxt	diff2 maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:26:51-05:00	Maxima	diff0	diff ( y , x , 1 ) = y - 1.0;	1.1	5.	2.09999999999989	1.000E-3	16	30	2.216472085162868300000000000000E-14	9.57346729369101000000000000E-12	1000	Complex	5.5259266646203700000000E-8	0.49999999997726263	3 Minutes 12 Seconds	9 Minutes 17 Seconds	091	diff0 diffeq.max	diff0 maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:26:45-05:00	Maple	diff0	diff ( y , x , 1 ) = y - 1.0;	1.1	5	2.1	0.001	32	30	3.67080e-18	4.35783e-15	1000	No Pole	NA	NA	4 Seconds	12 Seconds	091	diff0 diffeq.mxt	diff0 maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:15:32-05:00	Maxima	cos	diff ( y , x , 1 ) = cos ( x ) ;	1.6	10.	2.59999999999989	1.000E-3	16	30	1.110476266662671600000000000000E-14	3.574980835324964000000000000E-12	1000	No Pole	NA	NA	11 Minutes 11 Seconds	1 Hours 22 Minutes 40 Seconds	091	cos diffeq.max	cos maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:15:19-05:00	Maple	cos	diff ( y , x , 1 ) = cos ( x ) ;	1.6	10	2.6	0.001	32	30	2.43006e-18	2.65536e-15	1000	No Pole	NA	NA	10 Seconds	1 Minutes 18 Seconds	091	cos diffeq.mxt	cos maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:03:50-05:00	Maxima	cosh	diff ( y , x , 1 ) = cosh ( x ) ;	0.1	2.	1.0999999999999897	1.000E-3	16	30	0.0	7.7955504145001290000000000000E-13	1000	No Pole	NA	NA	11 Minutes 27 Seconds	10 Minutes 17 Seconds	091	cosh diffeq.max	cosh maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T21:03:38-05:00	Maple	cosh	diff ( y , x , 1 ) = cosh ( x ) ;	0.1	2	1.1	0.001	32	30	4.43054e-19	1.38017e-15	1000	No Pole	NA	NA	10 Seconds	9 Seconds	091	cosh diffeq.mxt	cosh maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T20:48:33-05:00	Maxima	arctan	diff ( y , x , 1 ) = arctan ( x ) ;	-1.	5.	-0.25899999999999934	1.000E-3	16	30	0.0	1.7473721068561840000000000000E-13	741	Complex	1.0311549028952691	0.9042474507391667	14 Minutes 59 Seconds	1 Hours 46 Minutes 16 Seconds	091	arctan diffeq.max	arctan maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T20:46:55-05:00	Maple	arctan	diff ( y , x , 1 ) = arctan ( x ) ;	-1	5	0	0.001	32	30	5.98744e-18	1.99547e-17	1000	Complex	0.997958	0.903796	1 Minutes 32 Seconds	7 Minutes 41 Seconds	091	arctan diffeq.mxt	arctan maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T20:37:17-05:00	Maxima	arcsin	diff ( y , x , 1 ) = arcsin ( x ) ;	-0.8	0.8	0.20000000000000082	1.000E-3	16	30	0.0	6.7641215899266590000000000000E-13	1000	Real	0.8029468293909879	0.4872730627942836	9 Minutes 35 Seconds	5 Minutes 44 Seconds	091	arcsin diffeq.max	arcsin maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T20:36:58-05:00	Maple	arcsin	diff ( y , x , 1 ) = arcsin ( x ) ;	-0.8	0.8	0.2	0.001	32	30	9.33063e-15	5.97211e-13	1000	Real	0.802947	0.487273	16 Seconds	9 Seconds	091	arcsin diffeq.mxt	arcsin maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T20:25:58-05:00	Maxima	arccos	diff ( y , x , 1 ) = arccos ( x ) ;	-0.8	0.8	0.20000000000000082	1.000E-3	16	30	3.725730792693096600000000000000E-14	1.3383501384612354000000000000E-12	1000	Real	0.8029468293909879	0.4872730627942836	10 Minutes 55 Seconds	6 Minutes 32 Seconds	091	arccos diffeq.max	arccos maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T20:25:40-05:00	Maple	arccos	diff ( y , x , 1 ) = arccos ( x ) ;	-0.8	0.8	0.2	0.001	32	30	5.23055e-14	1.39373e-12	1000	Real	0.802947	0.487273	16 Seconds	9 Seconds	091	arccos diffeq.mxt	arccos maple results	Test of revised logic - mostly for speeding factorials
2012-06-16T20:12:04-05:00	Maxima	add	diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;	0.0	10.	1.0000000000000007	1.000E-3	16	30	2.218226713792960400000000000000E-14	2.89476308656351540000000000000E-13	1000	No Pole	NA	NA	13 Minutes 33 Seconds	2 Hours 1 Minutes 51 Seconds	091	add diffeq.max	add maxima results	Test of revised logic - mostly for speeding factorials
2012-06-16T20:11:45-05:00	Maple	add	diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;	0	10	1	0.001	32	30	4.85530e-18	8.07314e-16	1000	No Pole	NA	NA	16 Seconds	2 Minutes 27 Seconds	091	add diffeq.mxt	add maple results	Test of revised logic - mostly for speeding factorials