Time | Language | Ode
File | Equation | Start | End | Actual
End | H | H Reason | Machine Digits | Desired
Correct Digits | Estimated Correct Digits | Correct
Digits | Terms | Type Sing Given | Given Least Sing | Ratio Least
Sing | Three Term Least Sing | Six Term Least Sing | Iterations | Execution
Time | Estimated Total Time | Last Save | diffeq
program | diffeq results | Comment |
2014-09-23T00:14:34-05:00 | Maxima | add_c_lin | diff ( y , x , 1 ) = 0.3 + ( 0.1 * x + 0.2 ) ; | 0.1 | 1. | 1.0899999999999999 | 9.00000000000000100E-2 | Display_interval | 16 | 16. | 14 | 17 | 30 | No Pole | NA | NONE | NONE | NONE | 11 |
0 Seconds
|
Done | 269 | add_c_lin diffeq.max | add_c_lin maxima results | OK |
2014-09-23T00:15:05-05:00 | Maxima | add_c_sin | diff ( y , x , 1 ) = 1.0 + sin ( x ) ; | 0.1 | 1. | 1.000096000000049 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 15 | 40 | No Pole | NA | NONE | NONE | NONE | 3516 |
43 Seconds
|
Done | 269 | add_c_sin diffeq.max | add_c_sin maxima results | OK |
2014-09-23T00:16:30-05:00 | Maxima | add_full_lin | diff ( y , x , 1 ) = sin ( 0.3 * x + 0.1 ) + ( 0.1 * x + 0.2 ) ; | 1. | 5. | 5.000255999999664 | 5.120000E-4 | Pole Accuracy | 16 | 16. | 12 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 7813 |
1 Minutes 37 Seconds
|
Done | 269 | add_full_lin diffeq.max | add_full_lin maxima results | OK |
2014-09-23T00:18:37-05:00 | Maxima | add_lin_c | diff ( y , x , 1 ) = ( 0.1 * x + 0.2 ) + 0.3 ; | -5. | 5. | 5.099999999999997 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | No Pole | NA | NONE | NONE | NONE | 101 |
1 Seconds
|
Done | 269 | add_lin_c diffeq.max | add_lin_c maxima results | OK |
2014-09-23T00:19:09-05:00 | Maxima | add_lin_full | diff ( y , x , 1 ) = ( 0.1 * x + 0.2 ) + sin ( 0.3 * x + 0.1 ) ; | -5. | 5. | 2.447551999999789 | 5.120000E-4 | Pole Accuracy | 16 | 16. | 12 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 14546 |
2 Minutes 59 Seconds
|
4 Minutes 1 Seconds
|
269 | add_lin_full diffeq.max | add_lin_full maxima results | OK |
2014-09-23T00:22:39-05:00 | Maxima | add_lin_lin | diff ( y , x , 1 ) = ( 0.1 * x + 0.2 ) + ( 0.3 * x + 0.1 ) ; | -5. | 5. | 5.099999999999997 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | No Pole | NA | NONE | NONE | NONE | 101 |
1 Seconds
|
Done | 269 | add_lin_lin diffeq.max | add_lin_lin maxima results | OK |
2014-09-23T00:23:10-05:00 | Maxima | add | diff ( y , x , 1 ) = sin ( x ) + sin ( x ) ; | -5. | 5. | -1.758272000000437 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 12 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 12663 |
2 Minutes 59 Seconds
|
9 Minutes 14 Seconds
|
269 | add diffeq.max | add maxima results | OK |
2014-09-23T00:26:40-05:00 | Maxima | add_sin_c | diff ( y , x , 1 ) = sin ( x ) + 1.0 ; | -5. | 5. | -1.32896000000038 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 12 | 13 | 40 | No Pole | NA | NONE | NONE | NONE | 14340 |
2 Minutes 59 Seconds
|
8 Minutes 10 Seconds
|
269 | add_sin_c diffeq.max | add_sin_c maxima results | OK |
2014-09-23T00:26:40-05:00 | Maxima | add_sin_c | diff ( y , x , 1 ) = sin ( x ) + 1.0 ; | -5. | 5. | -1.32896000000038 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 12 | 13 | 40 | No Pole | NA | NONE | NONE | NONE | 14340 |
2 Minutes 59 Seconds
|
8 Minutes 10 Seconds
|
269 | add_sin_c diffeq.max | add_sin_c maxima results | OK |
2014-09-23T00:30:39-05:00 | Maxima | arccos_sqrt | diff ( y , x , 1 ) = arccos ( sqrt ( 0.1 * x + 0.2 ) ) ; | 0.0 | 0.5 | 0.5000000000000003 | 1.000E-3 | Max H | 16 | 16. | 13 | 11 | 30 | Real Sing | 2. | NONE | 2.0002204141583753 | NONE | 500 |
18 Seconds
|
Done | 269 | arccos_sqrt diffeq.max | arccos_sqrt maxima results | Poor Accuracy |
2014-09-23T00:30:39-05:00 | Maxima | arccos_sqrt | diff ( y , x , 1 ) = arccos ( sqrt ( 0.1 * x + 0.2 ) ) ; | 0.0 | 0.5 | 0.5000000000000003 | 1.000E-3 | Max H | 16 | 16. | 13 | 11 | 30 | Real Sing | 2. | NONE | 2.0002204141583753 | NONE | 500 |
18 Seconds
|
Done | 269 | arccos_sqrt diffeq.max | arccos_sqrt maxima results | Poor Accuracy |
2014-09-23T00:31:57-05:00 | Maxima | arcsin_sqrt | diff ( y , x , 1 ) = arcsin ( sqrt ( 0.1 * x + 0.2 ) ) ; | 0.0 | 0.5 | 0.5000000000000002 | 1.00E-2 | Max H | 16 | 16. | 14 | 9 | 30 | Real Sing | 2. | NONE | 2.0002204141583837 | NONE | 50 |
2 Seconds
|
Done | 269 | arcsin_sqrt diffeq.max | arcsin_sqrt maxima results | Poor Accuracy |
2014-09-23T00:32:31-05:00 | Maxima | arctan_sqrt | diff ( y , x , 1 ) = arctan ( sqrt ( 0.1 * x + 0.2 ) ) ; | -1. | 0.5 | -0.9735839999999736 | 1.600000E-5 | Pole Accuracy | 16 | 16. | 15 | 16 | 40 | Real Sing | 1. | NONE | NONE | NONE | 1651 |
2 Minutes 59 Seconds
|
2 Hours 49 Minutes 46 Seconds
|
269 | arctan_sqrt diffeq.max | arctan_sqrt maxima results | Poor Accuracy |
2014-09-23T00:32:31-05:00 | Maxima | arctan_sqrt | diff ( y , x , 1 ) = arctan ( sqrt ( 0.1 * x + 0.2 ) ) ; | -1. | 0.5 | -0.9735839999999736 | 1.600000E-5 | Pole Accuracy | 16 | 16. | 15 | 16 | 40 | Real Sing | 1. | NONE | NONE | NONE | 1651 |
2 Minutes 59 Seconds
|
2 Hours 49 Minutes 46 Seconds
|
269 | arctan_sqrt diffeq.max | arctan_sqrt maxima results | Poor Accuracy |
2014-09-23T00:37:02-05:00 | Maxima | cos_sqrt_lin | diff ( y , x , 1 ) = cos ( sqrt ( 2.0 * x + 3.0 ) ) ; | -1.4 | -1.3 | -1.299900000000011 | 1.0000E-4 | Max H | 16 | 16. | 13 | 7 | 30 | Real Sing | 0.10000000000000009 | NONE | 9.96710879465276600E-2 | NONE | 1001 |
37 Seconds
|
Done | 269 | cos_sqrt_lin diffeq.max | cos_sqrt_lin maxima results | Poor Accuracy |
2014-09-23T00:38:09-05:00 | Maxima | diff0 | diff ( y , x , 1 ) = y ; | -5. | 5. | 5.099999999999997 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 101 |
1 Seconds
|
Done | 269 | diff0 diffeq.max | diff0 maxima results | OK |
2014-09-23T00:38:41-05:00 | Maxima | diff2 | diff ( y , x , 3 ) = m1 * diff ( y , x , 1 ) ; | -1. | 1. | 0.22956800000005367 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 15 | 40 | No Pole | NA | NONE | NONE | NONE | 4803 |
2 Minutes 59 Seconds
|
4 Minutes 52 Seconds
|
269 | diff2 diffeq.max | diff2 maxima results | OK |
2014-09-23T00:42:12-05:00 | Maxima | diff | diff ( y , x , 2 ) = diff ( y , x , 1 ) ; | -5. | 5. | 5.099999999999997 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 101 |
2 Seconds
|
Done | 269 | diff diffeq.max | diff maxima results | OK |
2014-09-23T00:42:44-05:00 | Maxima | div_c_exp | diff ( y , x , 1 ) = 2.0 / exp ( x ) ; | 1. | 5. | 5.099999999999999 | 0.1 | Display_interval | 16 | 16. | 12 | 15 | 30 | No Pole | NA | NONE | NONE | NONE | 41 |
1 Seconds
|
Done | 269 | div_c_exp diffeq.max | div_c_exp maxima results | OK |
2014-09-23T00:43:14-05:00 | Maxima | div_c_lin | diff ( y , x , 1 ) = 2.0 / ( 0.2 * x + 0.3 ) ; | 2.5 | 3.1 | 3.1000000000000005 | 6.00000000000000100E-2 | Display_interval | 16 | 16. | 14 | 11 | 30 | Real Sing | 4. | NONE | NONE | NONE | 10 |
0 Seconds
|
Done | 269 | div_c_lin diffeq.max | div_c_lin maxima results | PROBLEM - Missing Singularity |
2014-09-23T00:43:44-05:00 | Maxima | div_exp_exp | diff ( y , x , 1 ) = exp ( 0.1 * x ) / exp ( 0.2 * x ) ; | -5. | 5. | 5.099999999999997 | 0.1 | Display_interval | 16 | 16. | 13 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 101 |
2 Seconds
|
Done | 269 | div_exp_exp diffeq.max | div_exp_exp maxima results | OK |
2014-09-23T00:44:16-05:00 | Maxima | div_lin_c | diff ( y , x , 1 ) = ( 0.2 * x + 0.3 ) / 2.0 ; | -5. | 5. | 5.099999999999997 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | No Pole | NA | NONE | NONE | NONE | 101 |
1 Seconds
|
Done | 269 | div_lin_c diffeq.max | div_lin_c maxima results | OK |
2014-09-23T00:44:48-05:00 | Maxima | div_lin_exp | diff ( y , x , 1 ) = ( 0.2 * x + 0.3 ) / exp ( x ) ; | 1. | 5. | 5.099999999999999 | 0.1 | Display_interval | 16 | 16. | 12 | 15 | 30 | No Pole | NA | NONE | NONE | NONE | 41 |
1 Seconds
|
Done | 269 | div_lin_exp diffeq.max | div_lin_exp maxima results | OK |
2014-09-23T00:45:19-05:00 | Maxima | div_lin_lin | diff ( y , x , 1 ) = ( 0.1 * x + 0.2 ) / ( 0.2 * x + 0.3 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | Real Sing | 1.6 | NONE | 1.5999999999999999 | NONE | 50 |
1 Seconds
|
Done | 269 | div_lin_lin diffeq.max | div_lin_lin maxima results | OK |
2014-09-23T00:45:19-05:00 | Maxima | div_lin_lin | diff ( y , x , 1 ) = ( 0.1 * x + 0.2 ) / ( 0.2 * x + 0.3 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | Real Sing | 1.6 | NONE | 1.5999999999999999 | NONE | 50 |
1 Seconds
|
Done | 269 | div_lin_lin diffeq.max | div_lin_lin maxima results | OK |
2014-09-23T00:46:21-05:00 | Maxima | div_sin_c | diff ( y , x , 1 ) = sin ( x ) / 2.0 ; | -5. | 5. | -1.4579840000003972 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 11 | 12 | 40 | No Pole | NA | NONE | NONE | NONE | 13836 |
2 Minutes 59 Seconds
|
8 Minutes 27 Seconds
|
269 | div_sin_c diffeq.max | div_sin_c maxima results | OK |
2014-09-23T00:49:50-05:00 | Maxima | exp_sqrt | diff ( y , x , 1 ) = exp ( sqrt ( 0.1 * x + 0.2 ) ) ; | 2. | 3. | 2.278080000000278 | 6.400000E-5 | Pole Accuracy | 16 | 16. | 13 | 9 | 40 | Real Sing | 4. | NONE | NONE | NONE | 4345 |
2 Minutes 59 Seconds
|
10 Minutes 46 Seconds
|
269 | exp_sqrt diffeq.max | exp_sqrt maxima results | Poor Accuracy |
2014-09-23T00:53:20-05:00 | Maxima | expt_c_c | diff ( y , x , 1 ) = expt ( 2.0 , 3.0 ) ; | -5. | 5. | 5.099999999999997 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 101 |
1 Seconds
|
Done | 269 | expt_c_c diffeq.max | expt_c_c maxima results | OK |
2014-09-23T00:53:52-05:00 | Maxima | expt_c_lin | diff ( y , x , 1 ) = expt ( 2.0 , ( 0.2 * x + 0.3 ) ) ; | 1. | 5. | 5.099999999999999 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | Not Given | NA | NONE | NONE | NONE | 41 |
1 Seconds
|
Done | 269 | expt_c_lin diffeq.max | expt_c_lin maxima results | OK |
2014-09-23T00:54:23-05:00 | Maxima | expt_c_sin | diff ( y , x , 1 ) = expt ( 2.0 , sin ( x ) ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | Unknown | 30 | Not Given | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | expt_c_sin diffeq.max | expt_c_sin maxima results | OK |
2014-09-23T00:54:55-05:00 | Maxima | expt_lin_c | diff ( y , x , 1 ) = expt ( ( 0.2 * x + 0.3 ) , 2.0 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | expt_lin_c diffeq.max | expt_lin_c maxima results | OK |
2014-09-23T00:55:26-05:00 | Maxima | expt_lin_lin | diff ( y , x , 1 ) = expt ( ( 0.1 * x + 0.2 ) , ( 0.2 * x + 0.3 ) ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | Unknown | 30 | Not Given | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | expt_lin_lin diffeq.max | expt_lin_lin maxima results | OK |
2014-09-23T00:55:59-05:00 | Maxima | expt_lin_sin | diff ( y , x , 1 ) = expt ( ( 0.2 * x + 0.3 ) , sin ( x ) ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | Unknown | 30 | Not Given | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | expt_lin_sin diffeq.max | expt_lin_sin maxima results | OK |
2014-09-23T00:56:31-05:00 | Maxima | expt_sin_c | diff ( y , x , 1 ) = expt ( sin ( 0.2 * x + 0.3 ) , 2.0 ) ; | 0.1 | 0.2 | 0.20000000000001328 | 3.200000E-5 | Pole Accuracy | 16 | 16. | 13 | 12 | 40 | Not Given | NA | NONE | NONE | NONE | 3125 |
2 Minutes 39 Seconds
|
Done | 269 | expt_sin_c diffeq.max | expt_sin_c maxima results | OK |
2014-09-23T00:56:31-05:00 | Maxima | expt_sin_c | diff ( y , x , 1 ) = expt ( sin ( 0.2 * x + 0.3 ) , 2.0 ) ; | 0.1 | 0.2 | 0.20000000000001328 | 3.200000E-5 | Pole Accuracy | 16 | 16. | 13 | 12 | 40 | Not Given | NA | NONE | NONE | NONE | 3125 |
2 Minutes 39 Seconds
|
Done | 269 | expt_sin_c diffeq.max | expt_sin_c maxima results | OK |
2014-09-23T01:00:13-05:00 | Maxima | expt_sin_sin | diff ( y , x , 1 ) = expt ( sin ( 0.1 * x ) , sin ( 0.2 * x ) ) ; | 0.1 | 5. | 5.0151999999999894 | 3.276800E-2 | Optimal | 16 | 16. | 13 | Unknown | 30 | Not Given | NA | NONE | NONE | NONE | 150 |
5 Seconds
|
Done | 269 | expt_sin_sin diffeq.max | expt_sin_sin maxima results | OK |
2014-09-23T01:00:49-05:00 | Maxima | h2sin | diff ( y , x , 2 ) = sin ( x ) ; | 0.1 | 5. | 2.503327999999812 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 9388 |
2 Minutes 59 Seconds
|
6 Minutes 6 Seconds
|
269 | h2sin diffeq.max | h2sin maxima results | OK |
2014-09-23T01:04:17-05:00 | Maxima | h3sin | diff ( y , x , 3 ) = sin ( x ) ; | 0.1 | 1.5 | 1.5000640000001153 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 5469 |
2 Minutes 32 Seconds
|
Done | 269 | h3sin diffeq.max | h3sin maxima results | OK |
2014-09-23T01:07:19-05:00 | Maxima | h5h3 | diff ( y , x , 5 ) = m1 * diff ( y , x , 3 ) ; | 0.1 | 1.5 | 0.8836160000000335 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 15 | 40 | No Pole | NA | NONE | NONE | NONE | 3061 |
2 Minutes 59 Seconds
|
5 Minutes 21 Seconds
|
269 | h5h3 diffeq.max | h5h3 maxima results | OK |
2014-09-23T01:10:50-05:00 | Maxima | lin_arccos | diff ( y , x , 1 ) = arccos ( 0.1 * x + 0.2 ) ; | -0.8 | 0.8 | 0.8999999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 8 | 30 | Not Given | NA | NONE | NONE | NONE | 17 |
0 Seconds
|
Done | 269 | lin_arccos diffeq.max | lin_arccos maxima results | Poor Accuracy |
2014-09-23T01:11:21-05:00 | Maxima | lin_arcsin | diff ( y , x , 1 ) = arcsin ( 0.1 * x + 0.2 ) ; | -0.8 | 0.8 | 0.8999999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 8 | 30 | Not Given | NA | NONE | NONE | NONE | 17 |
0 Seconds
|
Done | 269 | lin_arcsin diffeq.max | lin_arcsin maxima results | Poor Accuracy |
2014-09-23T01:11:52-05:00 | Maxima | lin_arctan | diff ( y , x , 1 ) = arctan ( 0.1 * x + 0.2 ) ; | -1. | -0.6 | -0.5999999999999996 | 4.00000000000000100E-2 | Display_interval | 16 | 16. | 14 | 7 | 30 | Not Given | NA | NONE | NONE | NONE | 10 |
0 Seconds
|
Done | 269 | lin_arctan diffeq.max | lin_arctan maxima results | Poor Accuracy |
2014-09-23T01:12:23-05:00 | Maxima | lin_cosh | diff ( y , x , 1 ) = cosh ( 2.0 * x + 3.0 ) ; | 0.1 | 2. | 0.10951910399989187 | 5.120000000E-7 | Pole Accuracy | 16 | 16. | 15 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 18592 |
2 Minutes 59 Seconds
|
9 Hours 58 Minutes 21 Seconds
|
269 | lin_cosh diffeq.max | lin_cosh maxima results | OK |
2014-09-23T01:15:54-05:00 | Maxima | lin_exp | diff ( y , x , 1 ) = exp ( 0.1 * x + 0.2 ) ; | 1. | 10. | 10.099999999999982 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 91 |
1 Seconds
|
Done | 269 | lin_exp diffeq.max | lin_exp maxima results | OK |
2014-09-23T01:16:25-05:00 | Maxima | lin_ln | diff ( y , x , 1 ) = ln ( 0.1 * x + 0.2 ) ; | 20. | 30. | 30.000000000000142 | 0.1 | Display_interval | 16 | 16. | 14 | 15 | 30 | Real Sing | 22. | NONE | 22.000000000000128 | NONE | 100 |
2 Seconds
|
Done | 269 | lin_ln diffeq.max | lin_ln maxima results | OK |
2014-09-23T01:16:57-05:00 | Maxima | lin_sin_cos | diff ( y , x , 1 ) = sin ( 2.0 * x + 3.0 ) + cos ( 1.5 * x - 2.0 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | lin_sin_cos diffeq.max | lin_sin_cos maxima results | OK |
2014-09-23T01:17:30-05:00 | Maxima | lin_sinh | diff ( y , x , 1 ) = sinh ( 2.0 * x + 3.0 ) ; | 0.1 | 2. | 1.978523904000341 | 1.310720000E-4 | Pole Accuracy | 16 | 16. | 13 | 14 | 40 | No Pole | NA | NONE | 0.24999998864409692 | NONE | 14332 |
2 Minutes 59 Seconds
|
3 Minutes 2 Seconds
|
269 | lin_sinh diffeq.max | lin_sinh maxima results | OK |
2014-09-23T01:21:01-05:00 | Maxima | lin_tanh | diff ( y , x , 1 ) = tanh ( 3.0 * x + 1.0 ) ; | 1.1 | 2. | 2.000000000000001 | 9.00E-2 | Display_interval | 16 | 16. | 14 | 17 | 40 | No Pole | NA | NONE | NONE | NONE | 10 |
0 Seconds
|
Done | 269 | lin_tanh diffeq.max | lin_tanh maxima results | OK |
2014-09-23T01:21:31-05:00 | Maxima | lin_tan | diff ( y , x , 1 ) = tan ( 2.0 * x + 3.0 ) ; | -1. | -0.9 | -0.8999999999999999 | 9.999999999999999000E-3 | Display_interval | 16 | 16. | 14 | 17 | 30 | Real Sing | 0.1953981629999999 | NONE | 0.1953981633974463 | NONE | 10 |
0 Seconds
|
Done | 269 | lin_tan diffeq.max | lin_tan maxima results | OK |
2014-09-23T01:22:02-05:00 | Maxima | ln_c_exp_c_sqrt_c | diff ( y , x , 1 ) = ln ( 0.1 ) + exp ( 0.1 ) + sqrt ( 0.1 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
0 Seconds
|
Done | 269 | ln_c_exp_c_sqrt_c diffeq.max | ln_c_exp_c_sqrt_c maxima results | OK |
2014-09-23T01:22:32-05:00 | Maxima | ln_sqrt | diff ( y , x , 1 ) = ln ( sqrt ( 0.1 * x + 0.2 ) ) ; | 10. | 11. | 11.099999999999996 | 0.1 | Display_interval | 16 | 16. | 14 | 8 | 40 | Real Sing | 12. | NONE | 12.012315919329573 | NONE | 11 |
0 Seconds
|
Done | 269 | ln_sqrt diffeq.max | ln_sqrt maxima results | Poor Accuracy |
2014-09-23T01:23:03-05:00 | Maxima | mtest1 | diff ( y1 , x , 1 ) = m1 * y2 + 1.0 ; | 0.1 | 10. | 0.16041600000000147 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 14 | 16 | 40 | No Pole | NA | NONE | NONE | NONE | 236 |
2 Minutes 54 Seconds
|
7 Hours 53 Minutes 23 Seconds
|
269 | mtest1 diffeq.max | mtest1 maxima results | OK |
ditto | ditto | ditto | diff ( y2 , x , 1 ) = y1 - 1.0 ; | ditto | ditto | ditto | ditto | ditto | ditto | ditto | 14 | 16 | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto |
2014-09-23T01:26:35-05:00 | Maxima | mtest2 | diff ( y1 , x , 1 ) = m1 * y2 ; | 0.2 | 0.8 | 0.20263000000000264 | 1.00000E-5 | Max H | 16 | 16. | 14 | 16 | 40 | No Pole | NA | NONE | NONE | NONE | 263 |
2 Minutes 57 Seconds
|
11 Hours 13 Minutes 2 Seconds
|
269 | mtest2 diffeq.max | mtest2 maxima results | Poor Accuracy -- BAD TEST?? |
ditto | ditto | ditto | diff ( y2 , x , 1 ) = y1 ; | ditto | ditto | ditto | ditto | ditto | ditto | ditto | 14 | 16 | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto |
2014-09-23T01:30:51-05:00 | Maxima | mtest4 | diff ( y2 , x , 3 ) = m1 * cos ( x ) ; | 0.1 | 5. | 0.12969600000000073 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 14 | 16 | 40 | No Pole | NA | NONE | NONE | NONE | 116 |
2 Minutes 47 Seconds
|
7 Hours 36 Minutes 26 Seconds
|
269 | mtest4 diffeq.max | mtest4 maxima results | OK |
ditto | ditto | ditto | diff ( y1 , x , 1 ) = m1 * y2 ; | ditto | ditto | ditto | ditto | ditto | ditto | ditto | 14 | 16 | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto |
2014-09-23T01:34:26-05:00 | Maxima | mtest5 | diff ( y1 , x , 1 ) = m1 * y2 ; | 0.5 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 13 | 9 | 30 | No Pole | NA | NONE | NONE | NONE | 46 |
18 Seconds
|
Done | 269 | mtest5 diffeq.max | mtest5 maxima results | OK |
ditto | ditto | ditto | diff ( y2 , x , 2 ) = diff ( y1 , x , 1 ) ; | ditto | ditto | ditto | ditto | ditto | ditto | ditto | 14 | 9 | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto |
2014-09-23T01:35:20-05:00 | Maxima | mtest6 | diff ( x1 , t , 1 ) = 4.0 * x2 - 2.0 * diff ( x2 , t , 1 ) - 2.0 * x1 ; | 1.5 | 8. | 1.5373999999999959 | 1.0000E-4 | Max H | 16 | 16. | 14 | 16 | 40 | Not Given | NA | NONE | NONE | NONE | 374 |
2 Minutes 56 Seconds
|
8 Hours 30 Minutes 58 Seconds
|
269 | mtest6 diffeq.max | mtest6 maxima results | ??? |
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 | ditto | 14 | 16 | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto |
2014-09-23T01:38:53-05:00 | Maxima | mtest7 | diff ( y2 , x , 5 ) = y1 ; | 0.1 | 0.7 | 0.14608000000000113 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 14 | 16 | 40 | No Pole | NA | NONE | NONE | NONE | 180 |
2 Minutes 52 Seconds
|
37 Minutes 22 Seconds
|
269 | mtest7 diffeq.max | mtest7 maxima results | OK |
ditto | ditto | ditto | diff ( y1 , x , 1 ) = m1 * diff ( y2 , x , 4 ) ; | ditto | ditto | ditto | ditto | ditto | ditto | ditto | 14 | 16 | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto |
2014-09-23T01:42:26-05:00 | Maxima | mtest8 | diff ( y2 , x , 4 ) = y1 - 1.0 ; | 0.1 | 1.4 | 0.14838400000000118 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 14 | 16 | 40 | No Pole | NA | NONE | NONE | NONE | 189 |
2 Minutes 52 Seconds
|
1 Hours 16 Minutes 59 Seconds
|
269 | mtest8 diffeq.max | mtest8 maxima results | OK |
ditto | ditto | ditto | diff ( y1 , x , 1 ) = m1 * diff ( y2 , x , 3 ) ; | ditto | ditto | ditto | ditto | ditto | ditto | ditto | 14 | 16 | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto | ditto |
2014-09-23T01:45:58-05:00 | Maxima | mult2 | diff ( y , x , 1 ) = sin ( x ) * cos ( x ) ; | 0.1 | 1. | 0.10666566656004285 | 6.55360000000E-7 | Pole Accuracy | 16 | 16. | 15 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 10171 |
2 Minutes 59 Seconds
|
6 Hours 44 Minutes 17 Seconds
|
269 | mult2 diffeq.max | mult2 maxima results | OK |
2014-09-23T01:49:27-05:00 | Maxima | mult_c_lin | diff ( y , x , 1 ) = 2.0 * ( 0.2 * x + 0.3 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
0 Seconds
|
Done | 269 | mult_c_lin diffeq.max | mult_c_lin maxima results | OK |
2014-09-23T01:49:57-05:00 | Maxima | mult_c_sin | diff ( y , x , 1 ) = 2.0 * sin ( x ) ; | 0.1 | 5. | 3.7129279999989233 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 12 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 14113 |
2 Minutes 59 Seconds
|
4 Minutes 4 Seconds
|
269 | mult_c_sin diffeq.max | mult_c_sin maxima results | OK |
2014-09-23T01:49:57-05:00 | Maxima | mult_c_sin | diff ( y , x , 1 ) = 2.0 * sin ( x ) ; | 0.1 | 5. | 3.7129279999989233 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 12 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 14113 |
2 Minutes 59 Seconds
|
4 Minutes 4 Seconds
|
269 | mult_c_sin diffeq.max | mult_c_sin maxima results | OK |
2014-09-23T01:53:55-05:00 | Maxima | mult_lin_c | diff ( y , x , 1 ) = ( 0.2 * x + 0.3 ) * 2.0 ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
0 Seconds
|
Done | 269 | mult_lin_c diffeq.max | mult_lin_c maxima results | OK |
2014-09-23T01:54:26-05:00 | Maxima | mult_lin_lin | diff ( y , x , 1 ) = ( 0.1 * x + 0.2 ) * ( 0.2 * x + 0.3 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | mult_lin_lin diffeq.max | mult_lin_lin maxima results | OK |
2014-09-23T01:54:56-05:00 | Maxima | mult_lin_sin | diff ( y , x , 1 ) = ( 0.2 * x + 0.3 ) * sin ( x ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | mult_lin_sin diffeq.max | mult_lin_sin maxima results | OK |
2014-09-23T01:55:27-05:00 | Maxima | mult | diff ( y , x , 1 ) = x * x ; | 0.1 | 10. | 10.09999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 100 |
1 Seconds
|
Done | 269 | mult diffeq.max | mult maxima results | OK |
2014-09-23T01:55:58-05:00 | Maxima | mult_sin_c | diff ( y , x , 1 ) = sin ( x ) * 2.0 ; | 0.1 | 5. | 3.710623999998925 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 12 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 14104 |
2 Minutes 59 Seconds
|
4 Minutes 4 Seconds
|
269 | mult_sin_c diffeq.max | mult_sin_c maxima results | OK |
2014-09-23T01:59:27-05:00 | Maxima | mult_sin_lin | diff ( y , x , 1 ) = sin ( x ) * ( 0.2 * x + 0.3 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | mult_sin_lin diffeq.max | mult_sin_lin maxima results | OK |
2014-09-23T01:59:27-05:00 | Maxima | mult_sin_lin | diff ( y , x , 1 ) = sin ( x ) * ( 0.2 * x + 0.3 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
1 Seconds
|
Done | 269 | mult_sin_lin diffeq.max | mult_sin_lin maxima results | OK |
2014-09-23T02:00:26-05:00 | Maxima | nonlinear1 | diff ( y , x , 1 ) = y * y ; | 0.0 | 0.5 | 0.5499999999999999 | 5.00E-2 | Display_interval | 16 | 16. | 14 | 16 | 20 | Real Sing | 0.5 | 0.5000000000000001 | 0.500000000000001 | NONE | 11 |
0 Seconds
|
Done | 269 | nonlinear1 diffeq.max | nonlinear1 maxima results | OK |
2014-09-23T02:00:55-05:00 | Maxima | nonlinear2 | diff ( y , x , 1 ) = y * y ; | 0.0 | 0.2 | 0.20000000000000007 | 2.000000000000000400E-2 | Display_interval | 16 | 16. | 14 | 17 | 20 | Real Sing | 0.31999999999999995 | 0.3199999999999999 | 0.31999999999999645 | NONE | 10 |
0 Seconds
|
Done | 269 | nonlinear2 diffeq.max | nonlinear2 maxima results | OK |
2014-09-23T02:01:26-05:00 | Maxima | sing1 | diff ( y , x , 1 ) = m1 * 2.0 * x / ( x * x + 0.000001 ) / ( x * x + 0.000001 ) ; | -2. | -1.5 | -1.4999999999999996 | 5.00E-2 | Display_interval | 16 | 16. | 14 | 17 | 20 | Complex Sing | 1.5500003225806114 | NONE | 1.5500064516950909 | 1.5500004830407181 | 10 |
0 Seconds
|
Done | 269 | sing1 diffeq.max | sing1 maxima results | OK |
2014-09-23T02:01:56-05:00 | Maxima | sing2 | diff ( y , x , 1 ) = 1.0 / ( x * x + 1.0 ) ; | -2. | -1.5 | -1.4999999999999996 | 5.00E-2 | Display_interval | 16 | 16. | 14 | 17 | 20 | Complex Sing | 1.8445866745696715 | NONE | NONE | 1.844586674569673 | 10 |
0 Seconds
|
Done | 269 | sing2 diffeq.max | sing2 maxima results | OK |
2014-09-23T02:02:56-05:00 | Maxima | sing4 | diff ( y , x , 1 ) = m1 * 2.0 * x / ( x * x + 1.0 ) / ( x * x + 1.0 ) ; | -2. | -1. | -0.9999999999999992 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 40 | Complex Sing | 1.48660687473185 | NONE | NONE | 1.4866068747318808 | 10 |
0 Seconds
|
Done | 269 | sing4 diffeq.max | sing4 maxima results | OK |
2014-09-23T02:03:27-05:00 | Maxima | sing5 | diff ( y , x , 1 ) = m1 * 3.0 / x / x / x / x ; | -1. | -0.7 | -0.6999999999999997 | 3.000000000000000400E-2 | Display_interval | 16 | 16. | 14 | 8 | 20 | Real Sing | 0.7299999999999998 | NONE | 0.7300000000000012 | NONE | 10 |
0 Seconds
|
Done | 269 | sing5 diffeq.max | sing5 maxima results | OK |
2014-09-23T02:03:56-05:00 | Maxima | sing6 | diff ( y , x , 1 ) = m1 * 2.0 / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) ; | 2. | 3. | 3.000000000000001 | 0.1 | Display_interval | 16 | 16. | 14 | 10 | 20 | Real Sing | 3.099999999999999 | NONE | 3.10000000000001 | NONE | 10 |
0 Seconds
|
Done | 269 | sing6 diffeq.max | sing6 maxima results | OK |
2014-09-23T02:04:27-05:00 | Maxima | sing7 | diff ( y , x , 1 ) = m1 * 5.0 / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) ; | 2. | 3. | 3.000000000000001 | 0.1 | Display_interval | 16 | 16. | 14 | 8 | 30 | Real Sing | 3.099999999999999 | NONE | 3.099999999999988 | NONE | 10 |
0 Seconds
|
Done | 269 | sing7 diffeq.max | sing7 maxima results | OK |
2014-09-23T02:05:00-05:00 | Maxima | sinh_sqrt | diff ( y , x , 1 ) = sinh ( sqrt ( 0.1 * x + 0.2 ) ) ; | 2. | 3. | 2.189120000000189 | 6.400000E-5 | Pole Accuracy | 16 | 16. | 13 | 8 | 40 | Real Sing | 4. | NONE | NONE | NONE | 2955 |
2 Minutes 59 Seconds
|
15 Minutes 49 Seconds
|
269 | sinh_sqrt diffeq.max | sinh_sqrt maxima results | Poor Accuracy |
2014-09-23T02:09:27-05:00 | Maxima | sin_sqrt_lin | diff ( y , x , 1 ) = sin ( sqrt ( 2.0 * x + 3.0 ) ) ; | 2. | 3. | 2.2951000000006228 | 1.0000E-4 | Max H | 16 | 16. | 13 | 7 | 40 | Real Sing | 3.5 | NONE | NONE | 3.9997343929991738 | 2951 |
2 Minutes 59 Seconds
|
10 Minutes 8 Seconds
|
269 | sin_sqrt_lin diffeq.max | sin_sqrt_lin maxima results | Poor Accuracy & PROBLEM - found complex singularity instead of real - COULD BE RIGHT!!! |
2014-09-23T02:09:27-05:00 | Maxima | sin_sqrt_lin | diff ( y , x , 1 ) = sin ( sqrt ( 2.0 * x + 3.0 ) ) ; | 2. | 3. | 2.2951000000006228 | 1.0000E-4 | Max H | 16 | 16. | 13 | 7 | 40 | Real Sing | 3.5 | NONE | NONE | 3.9997343929991738 | 2951 |
2 Minutes 59 Seconds
|
10 Minutes 8 Seconds
|
269 | sin_sqrt_lin diffeq.max | sin_sqrt_lin maxima results | Poor Accuracy & PROBLEM - found complex singularity instead of real - COULD BE RIGHT!!! |
2014-09-23T02:13:26-05:00 | Maxima | sqrt_tone | diff ( y , x , 1 ) = sqrt ( x ) ; | 0.5 | 0.6 | 0.6000000000000001 | 9.999999999999999000E-3 | Display_interval | 16 | 16. | 14 | 17 | 40 | Real Sing | 0.5 | NONE | 0.5000000000000023 | NONE | 10 |
0 Seconds
|
Done | 269 | sqrt_tone diffeq.max | sqrt_tone maxima results | OK |
2014-09-23T02:13:55-05:00 | Maxima | sqrt_sqrt | diff ( y , x , 1 ) = sqrt ( sqrt ( 0.1 * x + 0.2 ) ) ; | 0.1 | 0.5 | 0.5000000000000002 | 4.00000000000000100E-2 | Display_interval | 16 | 16. | 14 | 16 | 40 | Real Sing | 2.1 | NONE | 2.100000000000015 | NONE | 10 |
0 Seconds
|
Done | 269 | sqrt_sqrt diffeq.max | sqrt_sqrt maxima results | OK |
2014-09-23T02:14:26-05:00 | Maxima | sqrt_sqrt_tone | diff ( y , x , 1 ) = sqrt ( sqrt ( 0.1 * x + 0.2 ) ) ; | 0.5 | 1.5 | 1.5000000000000002 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 40 | Real Sing | 2.5 | NONE | 2.499999999999983 | NONE | 10 |
0 Seconds
|
Done | 269 | sqrt_sqrt_tone diffeq.max | sqrt_sqrt_tone maxima results | OK |
2014-09-23T02:14:56-05:00 | Maxima | sqrt_sqrt_tzero | diff ( y , x , 1 ) = sqrt ( sqrt ( 0.1 * x + 0.2 ) ) ; | 0.0 | 0.5 | 0.5499999999999999 | 5.00E-2 | Display_interval | 16 | 16. | 14 | 17 | 40 | Real Sing | 2. | NONE | 2.0000000000000253 | NONE | 11 |
0 Seconds
|
Done | 269 | sqrt_sqrt_tzero diffeq.max | sqrt_sqrt_tzero maxima results | OK |
2014-09-23T02:15:26-05:00 | Maxima | sub_c_lin | diff ( y , x , 1 ) = 0.3 - ( 0.1 * x + 0.2 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
0 Seconds
|
Done | 269 | sub_c_lin diffeq.max | sub_c_lin maxima results | OK |
2014-09-23T02:15:57-05:00 | Maxima | sub_c_sin | diff ( y , x , 1 ) = 1.0 - sin ( x ) ; | 0.1 | 5. | 3.81251199999885 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 14502 |
2 Minutes 59 Seconds
|
3 Minutes 57 Seconds
|
269 | sub_c_sin diffeq.max | sub_c_sin maxima results | OK |
2014-09-23T02:19:26-05:00 | Maxima | sub_full_lin | diff ( y , x , 1 ) = sin ( 0.3 * x + 0.1 ) - ( 0.1 * x + 0.2 ) ; | 0.1 | 5. | 5.00035199999963 | 5.120000E-4 | Pole Accuracy | 16 | 16. | 12 | 15 | 40 | No Pole | NA | NONE | NONE | NONE | 9571 |
1 Minutes 59 Seconds
|
Done | 269 | sub_full_lin diffeq.max | sub_full_lin maxima results | OK |
2014-09-23T02:21:56-05:00 | Maxima | sub_lin_c | diff ( y , x , 1 ) = ( 0.1 * x + 0.2 ) - 0.3 ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 16 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
0 Seconds
|
Done | 269 | sub_lin_c diffeq.max | sub_lin_c maxima results | OK |
2014-09-23T02:22:26-05:00 | Maxima | sub_lin_lin | diff ( y , x , 1 ) = ( 0.1 * x + 0.2 ) - ( 0.3 * x + 0.1 ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | 17 | 30 | No Pole | NA | NONE | NONE | NONE | 50 |
0 Seconds
|
Done | 269 | sub_lin_lin diffeq.max | sub_lin_lin maxima results | OK |
2014-09-23T02:22:57-05:00 | Maxima | sub_lin_sin | diff ( y , x , 1 ) = ( 0.1 * x + 1.0 ) - sin ( x ) ; | 0.1 | 5. | 3.8104639999988517 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 12 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 14494 |
2 Minutes 59 Seconds
|
3 Minutes 57 Seconds
|
269 | sub_lin_sin diffeq.max | sub_lin_sin maxima results | OK |
2014-09-23T02:26:26-05:00 | Maxima | sub | diff ( y , x , 1 ) = sin ( x ) - cos ( x ) ; | 0.0 | 10. | 3.237887999999273 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 12648 |
2 Minutes 59 Seconds
|
9 Minutes 15 Seconds
|
269 | sub diffeq.max | sub maxima results | OK |
2014-09-23T02:29:55-05:00 | Maxima | sub_sin_c | diff ( y , x , 1 ) = sin ( x ) - 1 , 0 ; | 0.1 | 5. | 3.156639999999332 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 12 | 13 | 40 | No Pole | NA | NONE | NONE | NONE | 11940 |
2 Minutes 59 Seconds
|
4 Minutes 48 Seconds
|
269 | sub_sin_c diffeq.max | sub_sin_c maxima results | OK |
2014-09-23T02:33:25-05:00 | Maxima | sub_sin_cos | diff ( y , x , 1 ) = m1 * sin ( x ) - cos ( x ) ; | 0.1 | 5. | 1.8551360000001624 | 2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 14 | 40 | No Pole | NA | NONE | NONE | NONE | 6856 |
2 Minutes 59 Seconds
|
8 Minutes 22 Seconds
|
269 | sub_sin_cos diffeq.max | sub_sin_cos maxima results | OK |
2014-09-23T02:36:55-05:00 | Maxima | tanh_sqrt | diff ( y , x , 1 ) = tanh ( sqrt ( 2.0 * x + 3.0 ) ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | Unknown | 30 | Real Sing | 1.6 | NONE | NONE | NONE | 50 |
2 Seconds
|
Done | 269 | tanh_sqrt diffeq.max | tanh_sqrt maxima results | ?? |
2014-09-23T02:37:28-05:00 | Maxima | tan_sqrt | diff ( y , x , 1 ) = ( 1.0 + ( tan ( sqrt ( 2.0 * x + 1.0 ) ) * tan ( sqrt ( 2.0 * x + 1.0 ) ) ) ) / sqrt ( 2.0 * x + 1.0 ) ; | 1.4 | 2.1 | 1.5064999999999882 | 1.0000E-4 | Max H | 16 | 16. | 13 | 6 | 40 | Real Sing | 3.4 | NONE | NONE | NONE | 1065 |
2 Minutes 58 Seconds
|
19 Minutes 35 Seconds
|
269 | tan_sqrt diffeq.max | tan_sqrt maxima results | PROBLEM - Singularity not accurate |
2014-09-23T02:40:59-05:00 | Maxima | tan_sqrt_lin | diff ( y , x , 1 ) = tan ( sqrt ( 2.0 * x + 3.0 ) ) ; | 0.1 | 5. | 5.099999999999998 | 0.1 | Display_interval | 16 | 16. | 14 | Unknown | 40 | Real Sing | 1.6 | NONE | 1.4925096023196076 | NONE | 50 |
4 Seconds
|
Done | 269 | tan_sqrt_lin diffeq.max | tan_sqrt_lin maxima results | PROBLEM - Singularity not accurate |
2014-09-23T02:42:05-05:00 | Maxima | div_c_lin_back | diff ( y , x , 1 ) = 2.0 / ( 0.2 * x + 0.3 ) ; | 3.1 | 2.5 | 2.4999999999999996 | -0.1 | Display_interval | 16 | 16. | 14 | 11 | 30 | Real Sing | 4.1 | NONE | NONE | NONE | 6 |
0 Seconds
|
0 Seconds
|
269 | div_c_lin_back diffeq.max | div_c_lin_back maxima results | PROBLEM - missing singularity |
2014-09-23T02:42:34-05:00 | Maxima | sin_back | diff ( y , x , 1 ) = sin ( x ) ; | -0.1 | -1. | -1.000096000000049 | -2.560000E-4 | Pole Accuracy | 16 | 16. | 13 | 15 | 40 | No Pole | NA | NONE | NONE | NONE | 3516 |
45 Seconds
|
45 Seconds
|
269 | sin_back diffeq.max | sin_back maxima results | OK |
2014-09-23T02:43:49-05:00 | Maxima | sing1_back | diff ( y , x , 1 ) = m1 * 2.0 * x / ( x * x + 0.000001 ) / ( x * x + 0.000001 ) ; | -1.5 | -2. | -2.0000000000000004 | -0.1 | Display_interval | 16 | 16. | 14 | 17 | 20 | Complex Sing | 1.6000003124999698 | NONE | 1.6000062500747148 | 1.6000002655588987 | 5 |
0 Seconds
|
0 Seconds
|
269 | sing1_back diffeq.max | sing1_back maxima results | OK |
2014-09-23T02:44:19-05:00 | Maxima | sing2_back | diff ( y , x , 1 ) = 1.0 / ( x * x + 1.0 ) ; | -1.5 | -2. | -2.0000000000000004 | -0.1 | Display_interval | 16 | 16. | 15 | 16 | 20 | Complex Sing | 1.886796226411321 | NONE | NONE | 1.8867962264113207 | 5 |
0 Seconds
|
0 Seconds
|
269 | sing2_back diffeq.max | sing2_back maxima results | OK |
2014-09-23T02:44:49-05:00 | Maxima | sing3_back | diff ( y , x , 1 ) = m1 * 2.0 / x / x / x ; | -0.7 | -2. | -2.0107199999999974 | -3.276800E-2 | Optimal | 16 | 16. | 13 | 8 | 20 | Real Sing | 0.732768 | NONE | 0.7327679999999996 | NONE | 40 |
1 Seconds
|
1 Seconds
|
269 | sing3_back diffeq.max | sing3_back maxima results | Poor Accuracy |
2014-09-23T02:44:49-05:00 | Maxima | sing3_back | diff ( y , x , 1 ) = m1 * 2.0 / x / x / x ; | -0.7 | -2. | -2.0107199999999974 | -3.276800E-2 | Optimal | 16 | 16. | 13 | 8 | 20 | Real Sing | 0.732768 | NONE | 0.7327679999999996 | NONE | 40 |
1 Seconds
|
1 Seconds
|
269 | sing3_back diffeq.max | sing3_back maxima results | Poor Accuracy |
2014-09-23T02:45:48-05:00 | Maxima | sing5_back | diff ( y , x , 1 ) = m1 * 3.0 / x / x / x / x ; | -0.7 | -1. | -1.0276800000000001 | -3.276800E-2 | Optimal | 16 | 16. | 14 | 8 | 20 | Real Sing | 0.732768 | NONE | 0.7327680000000004 | NONE | 10 |
0 Seconds
|
0 Seconds
|
269 | sing5_back diffeq.max | sing5_back maxima results | Poor Accuracy |
2014-09-23T02:46:18-05:00 | Maxima | sing6_back | diff ( y , x , 1 ) = m1 * 2.0 / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) ; | 3. | 2. | 1.9999999999999991 | -0.1 | Display_interval | 16 | 16. | 14 | 9 | 20 | Real Sing | 3.1 | NONE | 3.100000000000007 | NONE | 10 |
0 Seconds
|
0 Seconds
|
269 | sing6_back diffeq.max | sing6_back maxima results | OK |
2014-09-23T02:46:49-05:00 | Maxima | sing7_back | diff ( y , x , 1 ) = m1 * 5.0 / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) / ( x - 6.0 ) ; | 3. | 2. | 1.9999999999999991 | -0.1 | Display_interval | 16 | 16. | 13 | 7 | 30 | Real Sing | 3.1 | NONE | 3.099999999999985 | NONE | 10 |
0 Seconds
|
1 Seconds
|
269 | sing7_back diffeq.max | sing7_back maxima results | OK |