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Chapter 2
detailed summary tables of results

 2.1 List of integrals sorted by grade for each CAS
  2.1.1 Rubi
  2.1.2 Mathematica
  2.1.3 Maple
  2.1.4 Maxima
  2.1.5 FriCAS
  2.1.6 Sympy
  2.1.7 Giac
 2.2 Detailed conclusion table per each integral for all CAS systems
 2.3 Detailed conclusion table specific for Rubi results

2.1 List of integrals sorted by grade for each CAS

2.1.1 Rubi

A grade: { 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20, 21, 22, 23, 24, 25, 26, 27, 28, 29, 30, 31, 32, 33 }

B grade: { }

C grade: { }

F grade: { }

2.1.2 Mathematica

A grade: { 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20, 21, 22, 23, 24, 25, 26, 27, 28, 29, 30, 31, 32, 33 }

B grade: { }

C grade: { }

F grade: { }

2.1.3 Maple

A grade: { 1, 2, 3, 4, 6, 7, 8, 9, 14, 15, 16, 17, 18, 19, 20, 21, 22, 23, 24, 27, 30, 32, 33 }

B grade: { 28, 29, 31 }

C grade: { 11, 12, 13, 25, 26 }

F grade: { 5, 10 }

2.1.4 Maxima

A grade: { 4, 9, 14, 15, 16, 17, 18, 19, 20, 21, 22, 23, 27, 30, 33

B grade: { 1, 2, 3, 6, 7, 8, 11, 12, 13, 28, 29, 31, 32 }

C grade: { 24, 25, 26 }

F grade: { 5, 10 }

2.1.5 FriCAS

A grade: { 3, 4, 8, 9, 11, 12, 13, 14, 15, 18, 19, 22, 23, 25, 26, 27, 30, 33 }

B grade: { 1, 2, 5, 6, 7, 10, 16, 17, 20, 21, 24, 28, 29, 31, 32 }

C grade: { }

F grade: { }

2.1.6 Sympy

A grade: { 4, 9, 14, 15, 19, 23, 27, 30, 33 }

B grade: { }

C grade: { }

F grade: { 1, 2, 3, 5, 6, 7, 8, 10, 11, 12, 13, 16, 17, 18, 20, 21, 22, 24, 25, 26, 28, 29, 31, 32 }

2.1.7 Giac

A grade: { 1, 2, 3, 4, 6, 7, 8, 9, 14, 15, 16, 17, 18, 19, 20, 21, 22, 23, 24, 27, 28, 30, 31, 32, 33 }

B grade: { 29 }

C grade: { 11, 12, 13, 25, 26 }

F grade: { 5, 10 }

2.2 Detailed conclusion table per each integral for all CAS systems

Detailed conclusion table per each integral is given by table below. The elapsed time is in seconds. For failed result it is given as F(-1) if the failure was due to timeout. It is given as F(-2) if the failure was due to an exception being raised, which could indicate a bug in the system. If the failure was due to integral not being evaluated within the time limit, then it is given just an F.

In this table,the column normalized size is defined as \(\frac{\text{antiderivative leaf size}}{\text{optimal antiderivative leaf size}}\)

Problem 1 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A B B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 225 225 149 252 1019 1075 0 220
normalized size 1 1. 0.66 1.12 4.53 4.78 0. 0.98
time (sec) N/A 0.14 0.309 0.099 1.64 2.055 0. 1.348
Problem 2 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A B B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 111 111 130 124 825 892 0 163
normalized size 1 1. 1.17 1.12 7.43 8.04 0. 1.47
time (sec) N/A 0.046 0.195 0.031 1.592 2.049 0. 1.365
Problem 3 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A B A F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 91 91 105 83 626 302 0 107
normalized size 1 1. 1.15 0.91 6.88 3.32 0. 1.18
time (sec) N/A 0.032 0.078 0.029 1.59 2.137 0. 1.35
Problem 4 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 17 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.01 16.229 0.027 0. 0. 0. 0.
Problem 5 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A F F B F F
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 107 107 132 0 0 872 0 0
normalized size 1 1. 1.23 0. 0. 8.15 0. 0.
time (sec) N/A 0.082 0.6 0.112 0. 2.091 0. 0.
Problem 6 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A B B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 227 227 152 244 1126 1065 0 225
normalized size 1 1. 0.67 1.07 4.96 4.69 0. 0.99
time (sec) N/A 0.135 0.301 0.079 1.734 2.033 0. 1.301
Problem 7 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A B B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 112 112 134 120 910 883 0 166
normalized size 1 1. 1.2 1.07 8.12 7.88 0. 1.48
time (sec) N/A 0.047 0.184 0.033 1.679 2.083 0. 1.36
Problem 8 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A B A F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 91 91 109 79 691 296 0 109
normalized size 1 1. 1.2 0.87 7.59 3.25 0. 1.2
time (sec) N/A 0.032 0.069 0.032 1.523 2.06 0. 1.423
Problem 9 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 18 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.01 17.559 0.028 0. 0. 0. 0.
Problem 10 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A F F B F F
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 108 108 136 0 0 860 0 0
normalized size 1 1. 1.26 0. 0. 7.96 0. 0.
time (sec) N/A 0.086 0.656 0.118 0. 2.123 0. 0.
Problem 11 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A C B A F C
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 66 66 72 75 247 181 0 72
normalized size 1 1. 1.09 1.14 3.74 2.74 0. 1.09
time (sec) N/A 0.056 0.151 0.04 1.43 2.179 0. 1.397
Problem 12 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A C B A F C
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 52 52 75 49 166 154 0 58
normalized size 1 1. 1.44 0.94 3.19 2.96 0. 1.12
time (sec) N/A 0.024 0.078 0.025 1.536 2.088 0. 1.379
Problem 13 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A C B A F C
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 39 39 24 25 127 62 0 28
normalized size 1 1. 0.62 0.64 3.26 1.59 0. 0.72
time (sec) N/A 0.015 0.025 0.024 1.403 2.072 0. 1.277
Problem 14 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 15 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.01 9.135 0.026 0. 0. 0. 0.
Problem 15 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 68 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.039 11.589 0.038 0. 0. 0. 0.
Problem 16 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A A B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 268 268 176 281 397 1905 0 246
normalized size 1 1. 0.66 1.05 1.48 7.11 0. 0.92
time (sec) N/A 0.245 0.743 0.11 1.336 2.17 0. 1.433
Problem 17 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A A B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 136 136 155 141 270 1651 0 192
normalized size 1 1. 1.14 1.04 1.99 12.14 0. 1.41
time (sec) N/A 0.094 0.385 0.049 1.282 2.149 0. 1.386
Problem 18 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A A A F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 110 110 140 94 130 358 0 127
normalized size 1 1. 1.27 0.85 1.18 3.25 0. 1.15
time (sec) N/A 0.062 0.141 0.04 1.685 2.012 0. 1.402
Problem 19 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 32 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.031 59.454 0.054 0. 0. 0. 0.
Problem 20 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A A B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 268 268 181 273 435 1889 0 251
normalized size 1 1. 0.68 1.02 1.62 7.05 0. 0.94
time (sec) N/A 0.233 0.733 0.102 1.491 2.167 0. 1.362
Problem 21 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A A B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 136 136 159 137 292 1635 0 194
normalized size 1 1. 1.17 1.01 2.15 12.02 0. 1.43
time (sec) N/A 0.091 0.38 0.049 1.345 2.169 0. 1.691
Problem 22 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A A A F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 110 110 144 90 130 352 0 130
normalized size 1 1. 1.31 0.82 1.18 3.2 0. 1.18
time (sec) N/A 0.062 0.138 0.043 1.692 2.114 0. 1.35
Problem 23 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 32 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.031 62.484 0.056 0. 0. 0. 0.
Problem 24 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A C B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 68 68 99 77 153 860 0 82
normalized size 1 1. 1.46 1.13 2.25 12.65 0. 1.21
time (sec) N/A 0.096 0.207 0.059 1.776 2.043 0. 1.326
Problem 25 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A C C A F C
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 75 75 88 75 163 265 0 95
normalized size 1 1. 1.17 1. 2.17 3.53 0. 1.27
time (sec) N/A 0.053 0.2 0.051 1.762 2.106 0. 1.384
Problem 26 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A C C A F C
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 56 56 48 49 61 132 0 57
normalized size 1 1. 0.86 0.88 1.09 2.36 0. 1.02
time (sec) N/A 0.033 0.073 0.036 1.551 2.08 0. 1.356
Problem 27 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 30 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.03 20.282 0.05 0. 0. 0. 0.
Problem 28 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A B B B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 261 261 194 493 724 1507 0 522
normalized size 1 1. 0.74 1.89 2.77 5.77 0. 2.
time (sec) N/A 0.188 0.573 0.049 1.508 2.12 0. 1.32
Problem 29 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A B B B F B
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 128 128 146 211 343 1033 0 282
normalized size 1 1. 1.14 1.65 2.68 8.07 0. 2.2
time (sec) N/A 0.06 0.266 0.032 1.431 2.161 0. 1.423
Problem 30 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 21 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.015 6.934 0.066 0. 0. 0. 0.
Problem 31 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A B B B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 311 311 240 558 811 2700 0 608
normalized size 1 1. 0.77 1.79 2.61 8.68 0. 1.95
time (sec) N/A 0.379 1.383 0.073 2.254 2.256 0. 1.392
Problem 32 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade A A A A B B F A
verified N/A Yes Yes TBD TBD TBD TBD TBD
size 160 160 177 241 404 1922 0 335
normalized size 1 1. 1.11 1.51 2.52 12.01 0. 2.09
time (sec) N/A 0.147 0.676 0.056 1.854 2.235 0. 1.376
Problem 33 Optimal Rubi Mathematica Maple Maxima Fricas Sympy Giac
grade N/A A A A A A A A
verified N/A N/A N/A TBD TBD TBD TBD TBD
size 43 0 0 0 0 0 0 0
normalized size 1 0. 0. 0. 0. 0. 0. 0.
time (sec) N/A 0.045 15.661 0.099 0. 0. 0. 0.

2.3 Detailed conclusion table specific for Rubi results

The following table is specific to Rubi. It gives additional statistics for each integral. the column steps is the number of steps used by Rubi to obtain the antiderivative. The rules column is the number of unique rules used. The integrand size column is the leaf size of the integrand. Finally the ratio \(\frac{\text{number of rules}}{\text{integrand size}}\) is given. The larger this ratio is, the harder the integral was to solve. In this test, problem number [11] had the largest ratio of [ 0.5385 ]

Table 2.1Rubi specific breakdown of results for each integral
# grade
number of
steps
used
number of
unique
rules
normalized
antiderivative
leaf size
integrand
leaf size
\(\frac{\text{number of rules}}{\text{integrand leaf size}}\)
1 A 12 7 1. 15 0.467
2 A 6 5 1. 13 0.385
3 A 5 4 1. 11 0.364
4 A 0 0 0. 0 0.
5 A 7 5 1. 33 0.152
6 A 12 7 1. 16 0.438
7 A 6 5 1. 14 0.357
8 A 5 4 1. 12 0.333
9 A 0 0 0. 0 0.
10 A 7 5 1. 35 0.143
11 A 12 7 1. 13 0.538
12 A 6 5 1. 11 0.454
13 A 5 4 1. 9 0.444
14 A 0 0 0. 0 0.
15 A 0 0 0. 0 0.
16 A 14 8 1. 17 0.471
17 A 8 6 1. 15 0.4
18 A 7 5 1. 13 0.385
19 A 0 0 0. 0 0.
20 A 14 8 1. 18 0.444
21 A 8 6 1. 16 0.375
22 A 7 5 1. 14 0.357
23 A 0 0 0. 0 0.
24 A 14 8 1. 15 0.533
25 A 8 6 1. 13 0.462
26 A 7 5 1. 11 0.454
27 A 0 0 0. 0 0.
28 A 12 7 1. 19 0.368
29 A 6 5 1. 17 0.294
30 A 0 0 0. 0 0.
31 A 14 8 1. 21 0.381
32 A 8 6 1. 19 0.316
33 A 0 0 0. 0 0.

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