/export/starexec/sandbox/solver/bin/starexec_run_default /export/starexec/sandbox/benchmark/theBenchmark.xml /export/starexec/sandbox/output/output_files


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YES

After renaming modulo { 0->0, 1->1, 2->2, 3->3, 4->4, 5->5 }, 
it remains to prove termination of the 49-rule system
{ 0 1 0 2 -> 0 0 3 1 2 ,
  0 1 3 4 -> 0 4 1 0 3 ,
  0 1 3 4 -> 0 4 1 1 3 ,
  0 1 3 4 -> 0 4 1 3 1 ,
  0 2 1 4 -> 0 4 1 2 3 ,
  0 2 1 4 -> 0 4 1 3 2 ,
  0 2 1 4 -> 2 0 4 1 4 ,
  0 2 1 4 -> 5 5 0 4 1 2 ,
  0 2 1 5 -> 5 0 4 1 2 ,
  0 2 2 4 -> 0 4 2 2 5 ,
  0 2 2 4 -> 0 4 2 5 2 ,
  3 4 0 2 -> 3 0 4 5 2 ,
  3 4 0 2 -> 3 5 0 4 2 ,
  0 0 1 4 5 -> 0 4 1 0 3 5 ,
  0 1 0 2 4 -> 2 0 0 4 1 1 ,
  0 1 2 3 4 -> 2 0 4 1 0 3 ,
  0 1 3 3 4 -> 0 0 3 1 3 4 ,
  0 1 4 0 2 -> 0 4 1 5 0 2 ,
  0 1 4 1 5 -> 2 5 0 4 1 1 ,
  0 1 4 3 4 -> 0 4 0 3 1 4 ,
  0 1 4 3 4 -> 3 0 4 1 5 4 ,
  0 1 4 3 5 -> 5 4 5 0 3 1 ,
  0 1 5 0 2 -> 0 0 4 1 2 5 ,
  0 1 5 1 4 -> 4 5 0 3 1 1 ,
  0 2 1 4 4 -> 0 4 1 2 4 3 ,
  0 2 1 4 5 -> 0 4 1 2 5 2 ,
  0 2 1 5 4 -> 5 0 2 0 4 1 ,
  0 2 4 1 5 -> 5 0 4 1 5 2 ,
  0 2 4 3 5 -> 0 4 5 2 5 3 ,
  0 2 5 1 4 -> 0 0 5 4 1 2 ,
  3 0 1 3 2 -> 0 3 1 0 3 2 ,
  3 0 2 1 4 -> 4 0 4 1 3 2 ,
  3 0 2 1 5 -> 5 3 2 0 4 1 ,
  3 0 4 0 2 -> 0 3 4 0 4 2 ,
  3 0 4 0 2 -> 0 4 1 2 0 3 ,
  3 0 5 1 4 -> 3 0 4 1 1 5 ,
  3 0 5 1 5 -> 0 4 1 3 5 5 ,
  3 2 4 1 2 -> 3 1 2 2 5 4 ,
  3 2 4 1 5 -> 3 1 4 5 2 5 ,
  3 4 0 1 2 -> 0 4 2 0 3 1 ,
  3 4 0 1 4 -> 0 4 1 5 3 4 ,
  3 4 0 1 5 -> 0 4 1 5 5 3 ,
  3 4 0 2 4 -> 0 3 4 0 4 2 ,
  3 4 1 2 4 -> 0 4 1 2 4 3 ,
  3 4 1 3 5 -> 4 3 0 3 1 5 ,
  3 4 3 0 2 -> 3 3 0 4 1 2 ,
  3 4 5 0 2 -> 0 3 0 4 2 5 ,
  3 5 0 2 2 -> 0 3 2 5 2 5 ,
  3 5 2 1 4 -> 3 5 1 0 4 2 }


The system was reversed.

After renaming modulo { 2->0, 0->1, 1->2, 3->3, 4->4, 5->5 }, 
it remains to prove termination of the 49-rule system
{ 0 1 2 1 -> 0 2 3 1 1 ,
  4 3 2 1 -> 3 1 2 4 1 ,
  4 3 2 1 -> 3 2 2 4 1 ,
  4 3 2 1 -> 2 3 2 4 1 ,
  4 2 0 1 -> 3 0 2 4 1 ,
  4 2 0 1 -> 0 3 2 4 1 ,
  4 2 0 1 -> 4 2 4 1 0 ,
  4 2 0 1 -> 0 2 4 1 5 5 ,
  5 2 0 1 -> 0 2 4 1 5 ,
  4 0 0 1 -> 5 0 0 4 1 ,
  4 0 0 1 -> 0 5 0 4 1 ,
  0 1 4 3 -> 0 5 4 1 3 ,
  0 1 4 3 -> 0 4 1 5 3 ,
  5 4 2 1 1 -> 5 3 1 2 4 1 ,
  4 0 1 2 1 -> 2 2 4 1 1 0 ,
  4 3 0 2 1 -> 3 1 2 4 1 0 ,
  4 3 3 2 1 -> 4 3 2 3 1 1 ,
  0 1 4 2 1 -> 0 1 5 2 4 1 ,
  5 2 4 2 1 -> 2 2 4 1 5 0 ,
  4 3 4 2 1 -> 4 2 3 1 4 1 ,
  4 3 4 2 1 -> 4 5 2 4 1 3 ,
  5 3 4 2 1 -> 2 3 1 5 4 5 ,
  0 1 5 2 1 -> 5 0 2 4 1 1 ,
  4 2 5 2 1 -> 2 2 3 1 5 4 ,
  4 4 2 0 1 -> 3 4 0 2 4 1 ,
  5 4 2 0 1 -> 0 5 0 2 4 1 ,
  4 5 2 0 1 -> 2 4 1 0 1 5 ,
  5 2 4 0 1 -> 0 5 2 4 1 5 ,
  5 3 4 0 1 -> 3 5 0 5 4 1 ,
  4 2 5 0 1 -> 0 2 4 5 1 1 ,
  0 3 2 1 3 -> 0 3 1 2 3 1 ,
  4 2 0 1 3 -> 0 3 2 4 1 4 ,
  5 2 0 1 3 -> 2 4 1 0 3 5 ,
  0 1 4 1 3 -> 0 4 1 4 3 1 ,
  0 1 4 1 3 -> 3 1 0 2 4 1 ,
  4 2 5 1 3 -> 5 2 2 4 1 3 ,
  5 2 5 1 3 -> 5 5 3 2 4 1 ,
  0 2 4 0 3 -> 4 5 0 0 2 3 ,
  5 2 4 0 3 -> 5 0 5 4 2 3 ,
  0 2 1 4 3 -> 2 3 1 0 4 1 ,
  4 2 1 4 3 -> 4 3 5 2 4 1 ,
  5 2 1 4 3 -> 3 5 5 2 4 1 ,
  4 0 1 4 3 -> 0 4 1 4 3 1 ,
  4 0 2 4 3 -> 3 4 0 2 4 1 ,
  5 3 2 4 3 -> 5 2 3 1 3 4 ,
  0 1 3 4 3 -> 0 2 4 1 3 3 ,
  0 1 5 4 3 -> 5 0 4 1 3 1 ,
  0 0 1 5 3 -> 5 0 5 0 3 1 ,
  4 2 0 5 3 -> 0 4 1 2 5 3 }


Applying sparse untiling TRFCU(2) [Geser/Hofbauer/Waldmann, FSCD 2019].

After renaming modulo { 4->0, 2->1, 0->2, 1->3, 3->4, 5->5 },
it remains to prove termination of the 30-rule system
{ 0 1 2 3 -> 4 2 1 0 3 ,
  0 1 2 3 -> 2 4 1 0 3 ,
  0 1 2 3 -> 0 1 0 3 2 ,
  0 1 2 3 -> 2 1 0 3 5 5 ,
  5 1 2 3 -> 2 1 0 3 5 ,
  0 2 2 3 -> 5 2 2 0 3 ,
  0 2 2 3 -> 2 5 2 0 3 ,
  2 3 0 4 -> 2 5 0 3 4 ,
  2 3 0 4 -> 2 0 3 5 4 ,
  0 0 1 2 3 -> 4 0 2 1 0 3 ,
  5 0 1 2 3 -> 2 5 2 1 0 3 ,
  0 5 1 2 3 -> 1 0 3 2 3 5 ,
  5 1 0 2 3 -> 2 5 1 0 3 5 ,
  5 4 0 2 3 -> 4 5 2 5 0 3 ,
  0 1 5 2 3 -> 2 1 0 5 3 3 ,
  0 1 2 3 4 -> 2 4 1 0 3 0 ,
  5 1 2 3 4 -> 1 0 3 2 4 5 ,
  2 3 0 3 4 -> 2 0 3 0 4 3 ,
  2 3 0 3 4 -> 4 3 2 1 0 3 ,
  0 1 5 3 4 -> 5 1 1 0 3 4 ,
  5 1 5 3 4 -> 5 5 4 1 0 3 ,
  2 1 0 2 4 -> 0 5 2 2 1 4 ,
  5 1 0 2 4 -> 5 2 5 0 1 4 ,
  0 2 3 0 4 -> 2 0 3 0 4 3 ,
  0 2 1 0 4 -> 4 0 2 1 0 3 ,
  5 4 1 0 4 -> 5 1 4 3 4 0 ,
  2 3 4 0 4 -> 2 1 0 3 4 4 ,
  2 3 5 0 4 -> 5 2 0 3 4 3 ,
  2 2 3 5 4 -> 5 2 5 2 4 3 ,
  0 1 2 5 4 -> 2 0 3 1 5 4 }


The system was filtered by the following matrix interpretation
of type E_J with J = {1,...,2} and dimension 5:

0 is interpreted by
 /         \
| 1 0 1 0 0 |
| 0 1 0 0 0 |
| 0 0 0 0 0 |
| 0 0 0 0 0 |
| 0 0 0 0 0 |
 \         /
1 is interpreted by
 /         \
| 1 0 0 0 0 |
| 0 1 0 0 0 |
| 0 0 0 1 0 |
| 0 0 0 0 0 |
| 0 0 0 0 0 |
 \         /
2 is interpreted by
 /         \
| 1 0 0 0 0 |
| 0 1 0 0 0 |
| 0 0 0 0 0 |
| 0 0 0 0 1 |
| 0 0 0 0 0 |
 \         /
3 is interpreted by
 /         \
| 1 0 0 0 0 |
| 0 1 0 0 0 |
| 0 0 0 0 0 |
| 0 0 0 0 0 |
| 0 1 0 0 0 |
 \         /
4 is interpreted by
 /         \
| 1 0 1 0 0 |
| 0 1 0 0 0 |
| 0 0 0 0 0 |
| 0 0 0 0 0 |
| 0 0 0 0 0 |
 \         /
5 is interpreted by
 /         \
| 1 0 0 0 0 |
| 0 1 0 0 0 |
| 0 0 0 0 0 |
| 0 0 0 0 0 |
| 0 0 0 0 0 |
 \         /

After renaming modulo { 5->0, 1->1, 2->2, 3->3, 0->4, 4->5 }, 
it remains to prove termination of the 23-rule system
{ 0 1 2 3 -> 2 1 4 3 0 ,
  4 2 2 3 -> 0 2 2 4 3 ,
  4 2 2 3 -> 2 0 2 4 3 ,
  2 3 4 5 -> 2 0 4 3 5 ,
  2 3 4 5 -> 2 4 3 0 5 ,
  4 0 1 2 3 -> 1 4 3 2 3 0 ,
  0 1 4 2 3 -> 2 0 1 4 3 0 ,
  0 5 4 2 3 -> 5 0 2 0 4 3 ,
  4 1 0 2 3 -> 2 1 4 0 3 3 ,
  0 1 2 3 5 -> 1 4 3 2 5 0 ,
  2 3 4 3 5 -> 2 4 3 4 5 3 ,
  2 3 4 3 5 -> 5 3 2 1 4 3 ,
  4 1 0 3 5 -> 0 1 1 4 3 5 ,
  0 1 0 3 5 -> 0 0 5 1 4 3 ,
  2 1 4 2 5 -> 4 0 2 2 1 5 ,
  0 1 4 2 5 -> 0 2 0 4 1 5 ,
  4 2 3 4 5 -> 2 4 3 4 5 3 ,
  4 2 1 4 5 -> 5 4 2 1 4 3 ,
  0 5 1 4 5 -> 0 1 5 3 5 4 ,
  2 3 5 4 5 -> 2 1 4 3 5 5 ,
  2 3 0 4 5 -> 0 2 4 3 5 3 ,
  2 2 3 0 5 -> 0 2 0 2 5 3 ,
  4 1 2 0 5 -> 2 4 3 1 0 5 }


Applying sparse tiling TRFC(2) [Geser/Hofbauer/Waldmann, FSCD 2019].

After renaming modulo { (0,0)->0, (0,1)->1, (1,2)->2, (2,3)->3, (3,0)->4, (0,2)->5, (2,1)->6, (1,4)->7, (4,3)->8, (3,1)->9, (3,2)->10, (3,3)->11, (0,3)->12, (3,4)->13, (0,4)->14, (3,5)->15, (0,5)->16, (3,7)->17, (0,7)->18, (1,0)->19, (2,0)->20, (2,2)->21, (4,0)->22, (4,2)->23, (5,0)->24, (5,2)->25, (6,0)->26, (6,2)->27, (2,4)->28, (4,4)->29, (5,4)->30, (6,4)->31, (4,5)->32, (5,1)->33, (5,3)->34, (5,5)->35, (5,7)->36, (1,1)->37, (4,1)->38, (6,1)->39, (1,5)->40, (2,5)->41, (6,5)->42, (4,7)->43 },
it remains to prove termination of the 1127-rule system
{ 0 1 2 3 4 -> 5 6 7 8 4 0 ,
  0 1 2 3 9 -> 5 6 7 8 4 1 ,
  0 1 2 3 10 -> 5 6 7 8 4 5 ,
  0 1 2 3 11 -> 5 6 7 8 4 12 ,
  0 1 2 3 13 -> 5 6 7 8 4 14 ,
  0 1 2 3 15 -> 5 6 7 8 4 16 ,
  0 1 2 3 17 -> 5 6 7 8 4 18 ,
  19 1 2 3 4 -> 2 6 7 8 4 0 ,
  19 1 2 3 9 -> 2 6 7 8 4 1 ,
  19 1 2 3 10 -> 2 6 7 8 4 5 ,
  19 1 2 3 11 -> 2 6 7 8 4 12 ,
  19 1 2 3 13 -> 2 6 7 8 4 14 ,
  19 1 2 3 15 -> 2 6 7 8 4 16 ,
  19 1 2 3 17 -> 2 6 7 8 4 18 ,
  20 1 2 3 4 -> 21 6 7 8 4 0 ,
  20 1 2 3 9 -> 21 6 7 8 4 1 ,
  20 1 2 3 10 -> 21 6 7 8 4 5 ,
  20 1 2 3 11 -> 21 6 7 8 4 12 ,
  20 1 2 3 13 -> 21 6 7 8 4 14 ,
  20 1 2 3 15 -> 21 6 7 8 4 16 ,
  20 1 2 3 17 -> 21 6 7 8 4 18 ,
  4 1 2 3 4 -> 10 6 7 8 4 0 ,
  4 1 2 3 9 -> 10 6 7 8 4 1 ,
  4 1 2 3 10 -> 10 6 7 8 4 5 ,
  4 1 2 3 11 -> 10 6 7 8 4 12 ,
  4 1 2 3 13 -> 10 6 7 8 4 14 ,
  4 1 2 3 15 -> 10 6 7 8 4 16 ,
  4 1 2 3 17 -> 10 6 7 8 4 18 ,
  22 1 2 3 4 -> 23 6 7 8 4 0 ,
  22 1 2 3 9 -> 23 6 7 8 4 1 ,
  22 1 2 3 10 -> 23 6 7 8 4 5 ,
  22 1 2 3 11 -> 23 6 7 8 4 12 ,
  22 1 2 3 13 -> 23 6 7 8 4 14 ,
  22 1 2 3 15 -> 23 6 7 8 4 16 ,
  22 1 2 3 17 -> 23 6 7 8 4 18 ,
  24 1 2 3 4 -> 25 6 7 8 4 0 ,
  24 1 2 3 9 -> 25 6 7 8 4 1 ,
  24 1 2 3 10 -> 25 6 7 8 4 5 ,
  24 1 2 3 11 -> 25 6 7 8 4 12 ,
  24 1 2 3 13 -> 25 6 7 8 4 14 ,
  24 1 2 3 15 -> 25 6 7 8 4 16 ,
  24 1 2 3 17 -> 25 6 7 8 4 18 ,
  26 1 2 3 4 -> 27 6 7 8 4 0 ,
  26 1 2 3 9 -> 27 6 7 8 4 1 ,
  26 1 2 3 10 -> 27 6 7 8 4 5 ,
  26 1 2 3 11 -> 27 6 7 8 4 12 ,
  26 1 2 3 13 -> 27 6 7 8 4 14 ,
  26 1 2 3 15 -> 27 6 7 8 4 16 ,
  26 1 2 3 17 -> 27 6 7 8 4 18 ,
  14 23 21 3 4 -> 0 5 21 28 8 4 ,
  14 23 21 3 9 -> 0 5 21 28 8 9 ,
  14 23 21 3 10 -> 0 5 21 28 8 10 ,
  14 23 21 3 11 -> 0 5 21 28 8 11 ,
  14 23 21 3 13 -> 0 5 21 28 8 13 ,
  14 23 21 3 15 -> 0 5 21 28 8 15 ,
  14 23 21 3 17 -> 0 5 21 28 8 17 ,
  7 23 21 3 4 -> 19 5 21 28 8 4 ,
  7 23 21 3 9 -> 19 5 21 28 8 9 ,
  7 23 21 3 10 -> 19 5 21 28 8 10 ,
  7 23 21 3 11 -> 19 5 21 28 8 11 ,
  7 23 21 3 13 -> 19 5 21 28 8 13 ,
  7 23 21 3 15 -> 19 5 21 28 8 15 ,
  7 23 21 3 17 -> 19 5 21 28 8 17 ,
  28 23 21 3 4 -> 20 5 21 28 8 4 ,
  28 23 21 3 9 -> 20 5 21 28 8 9 ,
  28 23 21 3 10 -> 20 5 21 28 8 10 ,
  28 23 21 3 11 -> 20 5 21 28 8 11 ,
  28 23 21 3 13 -> 20 5 21 28 8 13 ,
  28 23 21 3 15 -> 20 5 21 28 8 15 ,
  28 23 21 3 17 -> 20 5 21 28 8 17 ,
  13 23 21 3 4 -> 4 5 21 28 8 4 ,
  13 23 21 3 9 -> 4 5 21 28 8 9 ,
  13 23 21 3 10 -> 4 5 21 28 8 10 ,
  13 23 21 3 11 -> 4 5 21 28 8 11 ,
  13 23 21 3 13 -> 4 5 21 28 8 13 ,
  13 23 21 3 15 -> 4 5 21 28 8 15 ,
  13 23 21 3 17 -> 4 5 21 28 8 17 ,
  29 23 21 3 4 -> 22 5 21 28 8 4 ,
  29 23 21 3 9 -> 22 5 21 28 8 9 ,
  29 23 21 3 10 -> 22 5 21 28 8 10 ,
  29 23 21 3 11 -> 22 5 21 28 8 11 ,
  29 23 21 3 13 -> 22 5 21 28 8 13 ,
  29 23 21 3 15 -> 22 5 21 28 8 15 ,
  29 23 21 3 17 -> 22 5 21 28 8 17 ,
  30 23 21 3 4 -> 24 5 21 28 8 4 ,
  30 23 21 3 9 -> 24 5 21 28 8 9 ,
  30 23 21 3 10 -> 24 5 21 28 8 10 ,
  30 23 21 3 11 -> 24 5 21 28 8 11 ,
  30 23 21 3 13 -> 24 5 21 28 8 13 ,
  30 23 21 3 15 -> 24 5 21 28 8 15 ,
  30 23 21 3 17 -> 24 5 21 28 8 17 ,
  31 23 21 3 4 -> 26 5 21 28 8 4 ,
  31 23 21 3 9 -> 26 5 21 28 8 9 ,
  31 23 21 3 10 -> 26 5 21 28 8 10 ,
  31 23 21 3 11 -> 26 5 21 28 8 11 ,
  31 23 21 3 13 -> 26 5 21 28 8 13 ,
  31 23 21 3 15 -> 26 5 21 28 8 15 ,
  31 23 21 3 17 -> 26 5 21 28 8 17 ,
  14 23 21 3 4 -> 5 20 5 28 8 4 ,
  14 23 21 3 9 -> 5 20 5 28 8 9 ,
  14 23 21 3 10 -> 5 20 5 28 8 10 ,
  14 23 21 3 11 -> 5 20 5 28 8 11 ,
  14 23 21 3 13 -> 5 20 5 28 8 13 ,
  14 23 21 3 15 -> 5 20 5 28 8 15 ,
  14 23 21 3 17 -> 5 20 5 28 8 17 ,
  7 23 21 3 4 -> 2 20 5 28 8 4 ,
  7 23 21 3 9 -> 2 20 5 28 8 9 ,
  7 23 21 3 10 -> 2 20 5 28 8 10 ,
  7 23 21 3 11 -> 2 20 5 28 8 11 ,
  7 23 21 3 13 -> 2 20 5 28 8 13 ,
  7 23 21 3 15 -> 2 20 5 28 8 15 ,
  7 23 21 3 17 -> 2 20 5 28 8 17 ,
  28 23 21 3 4 -> 21 20 5 28 8 4 ,
  28 23 21 3 9 -> 21 20 5 28 8 9 ,
  28 23 21 3 10 -> 21 20 5 28 8 10 ,
  28 23 21 3 11 -> 21 20 5 28 8 11 ,
  28 23 21 3 13 -> 21 20 5 28 8 13 ,
  28 23 21 3 15 -> 21 20 5 28 8 15 ,
  28 23 21 3 17 -> 21 20 5 28 8 17 ,
  13 23 21 3 4 -> 10 20 5 28 8 4 ,
  13 23 21 3 9 -> 10 20 5 28 8 9 ,
  13 23 21 3 10 -> 10 20 5 28 8 10 ,
  13 23 21 3 11 -> 10 20 5 28 8 11 ,
  13 23 21 3 13 -> 10 20 5 28 8 13 ,
  13 23 21 3 15 -> 10 20 5 28 8 15 ,
  13 23 21 3 17 -> 10 20 5 28 8 17 ,
  29 23 21 3 4 -> 23 20 5 28 8 4 ,
  29 23 21 3 9 -> 23 20 5 28 8 9 ,
  29 23 21 3 10 -> 23 20 5 28 8 10 ,
  29 23 21 3 11 -> 23 20 5 28 8 11 ,
  29 23 21 3 13 -> 23 20 5 28 8 13 ,
  29 23 21 3 15 -> 23 20 5 28 8 15 ,
  29 23 21 3 17 -> 23 20 5 28 8 17 ,
  30 23 21 3 4 -> 25 20 5 28 8 4 ,
  30 23 21 3 9 -> 25 20 5 28 8 9 ,
  30 23 21 3 10 -> 25 20 5 28 8 10 ,
  30 23 21 3 11 -> 25 20 5 28 8 11 ,
  30 23 21 3 13 -> 25 20 5 28 8 13 ,
  30 23 21 3 15 -> 25 20 5 28 8 15 ,
  30 23 21 3 17 -> 25 20 5 28 8 17 ,
  31 23 21 3 4 -> 27 20 5 28 8 4 ,
  31 23 21 3 9 -> 27 20 5 28 8 9 ,
  31 23 21 3 10 -> 27 20 5 28 8 10 ,
  31 23 21 3 11 -> 27 20 5 28 8 11 ,
  31 23 21 3 13 -> 27 20 5 28 8 13 ,
  31 23 21 3 15 -> 27 20 5 28 8 15 ,
  31 23 21 3 17 -> 27 20 5 28 8 17 ,
  5 3 13 32 24 -> 5 20 14 8 15 24 ,
  5 3 13 32 33 -> 5 20 14 8 15 33 ,
  5 3 13 32 25 -> 5 20 14 8 15 25 ,
  5 3 13 32 34 -> 5 20 14 8 15 34 ,
  5 3 13 32 30 -> 5 20 14 8 15 30 ,
  5 3 13 32 35 -> 5 20 14 8 15 35 ,
  5 3 13 32 36 -> 5 20 14 8 15 36 ,
  2 3 13 32 24 -> 2 20 14 8 15 24 ,
  2 3 13 32 33 -> 2 20 14 8 15 33 ,
  2 3 13 32 25 -> 2 20 14 8 15 25 ,
  2 3 13 32 34 -> 2 20 14 8 15 34 ,
  2 3 13 32 30 -> 2 20 14 8 15 30 ,
  2 3 13 32 35 -> 2 20 14 8 15 35 ,
  2 3 13 32 36 -> 2 20 14 8 15 36 ,
  21 3 13 32 24 -> 21 20 14 8 15 24 ,
  21 3 13 32 33 -> 21 20 14 8 15 33 ,
  21 3 13 32 25 -> 21 20 14 8 15 25 ,
  21 3 13 32 34 -> 21 20 14 8 15 34 ,
  21 3 13 32 30 -> 21 20 14 8 15 30 ,
  21 3 13 32 35 -> 21 20 14 8 15 35 ,
  21 3 13 32 36 -> 21 20 14 8 15 36 ,
  10 3 13 32 24 -> 10 20 14 8 15 24 ,
  10 3 13 32 33 -> 10 20 14 8 15 33 ,
  10 3 13 32 25 -> 10 20 14 8 15 25 ,
  10 3 13 32 34 -> 10 20 14 8 15 34 ,
  10 3 13 32 30 -> 10 20 14 8 15 30 ,
  10 3 13 32 35 -> 10 20 14 8 15 35 ,
  10 3 13 32 36 -> 10 20 14 8 15 36 ,
  23 3 13 32 24 -> 23 20 14 8 15 24 ,
  23 3 13 32 33 -> 23 20 14 8 15 33 ,
  23 3 13 32 25 -> 23 20 14 8 15 25 ,
  23 3 13 32 34 -> 23 20 14 8 15 34 ,
  23 3 13 32 30 -> 23 20 14 8 15 30 ,
  23 3 13 32 35 -> 23 20 14 8 15 35 ,
  23 3 13 32 36 -> 23 20 14 8 15 36 ,
  25 3 13 32 24 -> 25 20 14 8 15 24 ,
  25 3 13 32 33 -> 25 20 14 8 15 33 ,
  25 3 13 32 25 -> 25 20 14 8 15 25 ,
  25 3 13 32 34 -> 25 20 14 8 15 34 ,
  25 3 13 32 30 -> 25 20 14 8 15 30 ,
  25 3 13 32 35 -> 25 20 14 8 15 35 ,
  25 3 13 32 36 -> 25 20 14 8 15 36 ,
  27 3 13 32 24 -> 27 20 14 8 15 24 ,
  27 3 13 32 33 -> 27 20 14 8 15 33 ,
  27 3 13 32 25 -> 27 20 14 8 15 25 ,
  27 3 13 32 34 -> 27 20 14 8 15 34 ,
  27 3 13 32 30 -> 27 20 14 8 15 30 ,
  27 3 13 32 35 -> 27 20 14 8 15 35 ,
  27 3 13 32 36 -> 27 20 14 8 15 36 ,
  5 3 13 32 24 -> 5 28 8 4 16 24 ,
  5 3 13 32 33 -> 5 28 8 4 16 33 ,
  5 3 13 32 25 -> 5 28 8 4 16 25 ,
  5 3 13 32 34 -> 5 28 8 4 16 34 ,
  5 3 13 32 30 -> 5 28 8 4 16 30 ,
  5 3 13 32 35 -> 5 28 8 4 16 35 ,
  5 3 13 32 36 -> 5 28 8 4 16 36 ,
  2 3 13 32 24 -> 2 28 8 4 16 24 ,
  2 3 13 32 33 -> 2 28 8 4 16 33 ,
  2 3 13 32 25 -> 2 28 8 4 16 25 ,
  2 3 13 32 34 -> 2 28 8 4 16 34 ,
  2 3 13 32 30 -> 2 28 8 4 16 30 ,
  2 3 13 32 35 -> 2 28 8 4 16 35 ,
  2 3 13 32 36 -> 2 28 8 4 16 36 ,
  21 3 13 32 24 -> 21 28 8 4 16 24 ,
  21 3 13 32 33 -> 21 28 8 4 16 33 ,
  21 3 13 32 25 -> 21 28 8 4 16 25 ,
  21 3 13 32 34 -> 21 28 8 4 16 34 ,
  21 3 13 32 30 -> 21 28 8 4 16 30 ,
  21 3 13 32 35 -> 21 28 8 4 16 35 ,
  21 3 13 32 36 -> 21 28 8 4 16 36 ,
  10 3 13 32 24 -> 10 28 8 4 16 24 ,
  10 3 13 32 33 -> 10 28 8 4 16 33 ,
  10 3 13 32 25 -> 10 28 8 4 16 25 ,
  10 3 13 32 34 -> 10 28 8 4 16 34 ,
  10 3 13 32 30 -> 10 28 8 4 16 30 ,
  10 3 13 32 35 -> 10 28 8 4 16 35 ,
  10 3 13 32 36 -> 10 28 8 4 16 36 ,
  23 3 13 32 24 -> 23 28 8 4 16 24 ,
  23 3 13 32 33 -> 23 28 8 4 16 33 ,
  23 3 13 32 25 -> 23 28 8 4 16 25 ,
  23 3 13 32 34 -> 23 28 8 4 16 34 ,
  23 3 13 32 30 -> 23 28 8 4 16 30 ,
  23 3 13 32 35 -> 23 28 8 4 16 35 ,
  23 3 13 32 36 -> 23 28 8 4 16 36 ,
  25 3 13 32 24 -> 25 28 8 4 16 24 ,
  25 3 13 32 33 -> 25 28 8 4 16 33 ,
  25 3 13 32 25 -> 25 28 8 4 16 25 ,
  25 3 13 32 34 -> 25 28 8 4 16 34 ,
  25 3 13 32 30 -> 25 28 8 4 16 30 ,
  25 3 13 32 35 -> 25 28 8 4 16 35 ,
  25 3 13 32 36 -> 25 28 8 4 16 36 ,
  27 3 13 32 24 -> 27 28 8 4 16 24 ,
  27 3 13 32 33 -> 27 28 8 4 16 33 ,
  27 3 13 32 25 -> 27 28 8 4 16 25 ,
  27 3 13 32 34 -> 27 28 8 4 16 34 ,
  27 3 13 32 30 -> 27 28 8 4 16 30 ,
  27 3 13 32 35 -> 27 28 8 4 16 35 ,
  27 3 13 32 36 -> 27 28 8 4 16 36 ,
  14 22 1 2 3 4 -> 1 7 8 10 3 4 0 ,
  14 22 1 2 3 9 -> 1 7 8 10 3 4 1 ,
  14 22 1 2 3 10 -> 1 7 8 10 3 4 5 ,
  14 22 1 2 3 11 -> 1 7 8 10 3 4 12 ,
  14 22 1 2 3 13 -> 1 7 8 10 3 4 14 ,
  14 22 1 2 3 15 -> 1 7 8 10 3 4 16 ,
  14 22 1 2 3 17 -> 1 7 8 10 3 4 18 ,
  7 22 1 2 3 4 -> 37 7 8 10 3 4 0 ,
  7 22 1 2 3 9 -> 37 7 8 10 3 4 1 ,
  7 22 1 2 3 10 -> 37 7 8 10 3 4 5 ,
  7 22 1 2 3 11 -> 37 7 8 10 3 4 12 ,
  7 22 1 2 3 13 -> 37 7 8 10 3 4 14 ,
  7 22 1 2 3 15 -> 37 7 8 10 3 4 16 ,
  7 22 1 2 3 17 -> 37 7 8 10 3 4 18 ,
  28 22 1 2 3 4 -> 6 7 8 10 3 4 0 ,
  28 22 1 2 3 9 -> 6 7 8 10 3 4 1 ,
  28 22 1 2 3 10 -> 6 7 8 10 3 4 5 ,
  28 22 1 2 3 11 -> 6 7 8 10 3 4 12 ,
  28 22 1 2 3 13 -> 6 7 8 10 3 4 14 ,
  28 22 1 2 3 15 -> 6 7 8 10 3 4 16 ,
  28 22 1 2 3 17 -> 6 7 8 10 3 4 18 ,
  13 22 1 2 3 4 -> 9 7 8 10 3 4 0 ,
  13 22 1 2 3 9 -> 9 7 8 10 3 4 1 ,
  13 22 1 2 3 10 -> 9 7 8 10 3 4 5 ,
  13 22 1 2 3 11 -> 9 7 8 10 3 4 12 ,
  13 22 1 2 3 13 -> 9 7 8 10 3 4 14 ,
  13 22 1 2 3 15 -> 9 7 8 10 3 4 16 ,
  13 22 1 2 3 17 -> 9 7 8 10 3 4 18 ,
  29 22 1 2 3 4 -> 38 7 8 10 3 4 0 ,
  29 22 1 2 3 9 -> 38 7 8 10 3 4 1 ,
  29 22 1 2 3 10 -> 38 7 8 10 3 4 5 ,
  29 22 1 2 3 11 -> 38 7 8 10 3 4 12 ,
  29 22 1 2 3 13 -> 38 7 8 10 3 4 14 ,
  29 22 1 2 3 15 -> 38 7 8 10 3 4 16 ,
  29 22 1 2 3 17 -> 38 7 8 10 3 4 18 ,
  30 22 1 2 3 4 -> 33 7 8 10 3 4 0 ,
  30 22 1 2 3 9 -> 33 7 8 10 3 4 1 ,
  30 22 1 2 3 10 -> 33 7 8 10 3 4 5 ,
  30 22 1 2 3 11 -> 33 7 8 10 3 4 12 ,
  30 22 1 2 3 13 -> 33 7 8 10 3 4 14 ,
  30 22 1 2 3 15 -> 33 7 8 10 3 4 16 ,
  30 22 1 2 3 17 -> 33 7 8 10 3 4 18 ,
  31 22 1 2 3 4 -> 39 7 8 10 3 4 0 ,
  31 22 1 2 3 9 -> 39 7 8 10 3 4 1 ,
  31 22 1 2 3 10 -> 39 7 8 10 3 4 5 ,
  31 22 1 2 3 11 -> 39 7 8 10 3 4 12 ,
  31 22 1 2 3 13 -> 39 7 8 10 3 4 14 ,
  31 22 1 2 3 15 -> 39 7 8 10 3 4 16 ,
  31 22 1 2 3 17 -> 39 7 8 10 3 4 18 ,
  0 1 7 23 3 4 -> 5 20 1 7 8 4 0 ,
  0 1 7 23 3 9 -> 5 20 1 7 8 4 1 ,
  0 1 7 23 3 10 -> 5 20 1 7 8 4 5 ,
  0 1 7 23 3 11 -> 5 20 1 7 8 4 12 ,
  0 1 7 23 3 13 -> 5 20 1 7 8 4 14 ,
  0 1 7 23 3 15 -> 5 20 1 7 8 4 16 ,
  0 1 7 23 3 17 -> 5 20 1 7 8 4 18 ,
  19 1 7 23 3 4 -> 2 20 1 7 8 4 0 ,
  19 1 7 23 3 9 -> 2 20 1 7 8 4 1 ,
  19 1 7 23 3 10 -> 2 20 1 7 8 4 5 ,
  19 1 7 23 3 11 -> 2 20 1 7 8 4 12 ,
  19 1 7 23 3 13 -> 2 20 1 7 8 4 14 ,
  19 1 7 23 3 15 -> 2 20 1 7 8 4 16 ,
  19 1 7 23 3 17 -> 2 20 1 7 8 4 18 ,
  20 1 7 23 3 4 -> 21 20 1 7 8 4 0 ,
  20 1 7 23 3 9 -> 21 20 1 7 8 4 1 ,
  20 1 7 23 3 10 -> 21 20 1 7 8 4 5 ,
  20 1 7 23 3 11 -> 21 20 1 7 8 4 12 ,
  20 1 7 23 3 13 -> 21 20 1 7 8 4 14 ,
  20 1 7 23 3 15 -> 21 20 1 7 8 4 16 ,
  20 1 7 23 3 17 -> 21 20 1 7 8 4 18 ,
  4 1 7 23 3 4 -> 10 20 1 7 8 4 0 ,
  4 1 7 23 3 9 -> 10 20 1 7 8 4 1 ,
  4 1 7 23 3 10 -> 10 20 1 7 8 4 5 ,
  4 1 7 23 3 11 -> 10 20 1 7 8 4 12 ,
  4 1 7 23 3 13 -> 10 20 1 7 8 4 14 ,
  4 1 7 23 3 15 -> 10 20 1 7 8 4 16 ,
  4 1 7 23 3 17 -> 10 20 1 7 8 4 18 ,
  22 1 7 23 3 4 -> 23 20 1 7 8 4 0 ,
  22 1 7 23 3 9 -> 23 20 1 7 8 4 1 ,
  22 1 7 23 3 10 -> 23 20 1 7 8 4 5 ,
  22 1 7 23 3 11 -> 23 20 1 7 8 4 12 ,
  22 1 7 23 3 13 -> 23 20 1 7 8 4 14 ,
  22 1 7 23 3 15 -> 23 20 1 7 8 4 16 ,
  22 1 7 23 3 17 -> 23 20 1 7 8 4 18 ,
  24 1 7 23 3 4 -> 25 20 1 7 8 4 0 ,
  24 1 7 23 3 9 -> 25 20 1 7 8 4 1 ,
  24 1 7 23 3 10 -> 25 20 1 7 8 4 5 ,
  24 1 7 23 3 11 -> 25 20 1 7 8 4 12 ,
  24 1 7 23 3 13 -> 25 20 1 7 8 4 14 ,
  24 1 7 23 3 15 -> 25 20 1 7 8 4 16 ,
  24 1 7 23 3 17 -> 25 20 1 7 8 4 18 ,
  26 1 7 23 3 4 -> 27 20 1 7 8 4 0 ,
  26 1 7 23 3 9 -> 27 20 1 7 8 4 1 ,
  26 1 7 23 3 10 -> 27 20 1 7 8 4 5 ,
  26 1 7 23 3 11 -> 27 20 1 7 8 4 12 ,
  26 1 7 23 3 13 -> 27 20 1 7 8 4 14 ,
  26 1 7 23 3 15 -> 27 20 1 7 8 4 16 ,
  26 1 7 23 3 17 -> 27 20 1 7 8 4 18 ,
  0 16 30 23 3 4 -> 16 24 5 20 14 8 4 ,
  0 16 30 23 3 9 -> 16 24 5 20 14 8 9 ,
  0 16 30 23 3 10 -> 16 24 5 20 14 8 10 ,
  0 16 30 23 3 11 -> 16 24 5 20 14 8 11 ,
  0 16 30 23 3 13 -> 16 24 5 20 14 8 13 ,
  0 16 30 23 3 15 -> 16 24 5 20 14 8 15 ,
  0 16 30 23 3 17 -> 16 24 5 20 14 8 17 ,
  19 16 30 23 3 4 -> 40 24 5 20 14 8 4 ,
  19 16 30 23 3 9 -> 40 24 5 20 14 8 9 ,
  19 16 30 23 3 10 -> 40 24 5 20 14 8 10 ,
  19 16 30 23 3 11 -> 40 24 5 20 14 8 11 ,
  19 16 30 23 3 13 -> 40 24 5 20 14 8 13 ,
  19 16 30 23 3 15 -> 40 24 5 20 14 8 15 ,
  19 16 30 23 3 17 -> 40 24 5 20 14 8 17 ,
  20 16 30 23 3 4 -> 41 24 5 20 14 8 4 ,
  20 16 30 23 3 9 -> 41 24 5 20 14 8 9 ,
  20 16 30 23 3 10 -> 41 24 5 20 14 8 10 ,
  20 16 30 23 3 11 -> 41 24 5 20 14 8 11 ,
  20 16 30 23 3 13 -> 41 24 5 20 14 8 13 ,
  20 16 30 23 3 15 -> 41 24 5 20 14 8 15 ,
  20 16 30 23 3 17 -> 41 24 5 20 14 8 17 ,
  4 16 30 23 3 4 -> 15 24 5 20 14 8 4 ,
  4 16 30 23 3 9 -> 15 24 5 20 14 8 9 ,
  4 16 30 23 3 10 -> 15 24 5 20 14 8 10 ,
  4 16 30 23 3 11 -> 15 24 5 20 14 8 11 ,
  4 16 30 23 3 13 -> 15 24 5 20 14 8 13 ,
  4 16 30 23 3 15 -> 15 24 5 20 14 8 15 ,
  4 16 30 23 3 17 -> 15 24 5 20 14 8 17 ,
  22 16 30 23 3 4 -> 32 24 5 20 14 8 4 ,
  22 16 30 23 3 9 -> 32 24 5 20 14 8 9 ,
  22 16 30 23 3 10 -> 32 24 5 20 14 8 10 ,
  22 16 30 23 3 11 -> 32 24 5 20 14 8 11 ,
  22 16 30 23 3 13 -> 32 24 5 20 14 8 13 ,
  22 16 30 23 3 15 -> 32 24 5 20 14 8 15 ,
  22 16 30 23 3 17 -> 32 24 5 20 14 8 17 ,
  24 16 30 23 3 4 -> 35 24 5 20 14 8 4 ,
  24 16 30 23 3 9 -> 35 24 5 20 14 8 9 ,
  24 16 30 23 3 10 -> 35 24 5 20 14 8 10 ,
  24 16 30 23 3 11 -> 35 24 5 20 14 8 11 ,
  24 16 30 23 3 13 -> 35 24 5 20 14 8 13 ,
  24 16 30 23 3 15 -> 35 24 5 20 14 8 15 ,
  24 16 30 23 3 17 -> 35 24 5 20 14 8 17 ,
  26 16 30 23 3 4 -> 42 24 5 20 14 8 4 ,
  26 16 30 23 3 9 -> 42 24 5 20 14 8 9 ,
  26 16 30 23 3 10 -> 42 24 5 20 14 8 10 ,
  26 16 30 23 3 11 -> 42 24 5 20 14 8 11 ,
  26 16 30 23 3 13 -> 42 24 5 20 14 8 13 ,
  26 16 30 23 3 15 -> 42 24 5 20 14 8 15 ,
  26 16 30 23 3 17 -> 42 24 5 20 14 8 17 ,
  14 38 19 5 3 4 -> 5 6 7 22 12 11 4 ,
  14 38 19 5 3 9 -> 5 6 7 22 12 11 9 ,
  14 38 19 5 3 10 -> 5 6 7 22 12 11 10 ,
  14 38 19 5 3 11 -> 5 6 7 22 12 11 11 ,
  14 38 19 5 3 13 -> 5 6 7 22 12 11 13 ,
  14 38 19 5 3 15 -> 5 6 7 22 12 11 15 ,
  14 38 19 5 3 17 -> 5 6 7 22 12 11 17 ,
  7 38 19 5 3 4 -> 2 6 7 22 12 11 4 ,
  7 38 19 5 3 9 -> 2 6 7 22 12 11 9 ,
  7 38 19 5 3 10 -> 2 6 7 22 12 11 10 ,
  7 38 19 5 3 11 -> 2 6 7 22 12 11 11 ,
  7 38 19 5 3 13 -> 2 6 7 22 12 11 13 ,
  7 38 19 5 3 15 -> 2 6 7 22 12 11 15 ,
  7 38 19 5 3 17 -> 2 6 7 22 12 11 17 ,
  28 38 19 5 3 4 -> 21 6 7 22 12 11 4 ,
  28 38 19 5 3 9 -> 21 6 7 22 12 11 9 ,
  28 38 19 5 3 10 -> 21 6 7 22 12 11 10 ,
  28 38 19 5 3 11 -> 21 6 7 22 12 11 11 ,
  28 38 19 5 3 13 -> 21 6 7 22 12 11 13 ,
  28 38 19 5 3 15 -> 21 6 7 22 12 11 15 ,
  28 38 19 5 3 17 -> 21 6 7 22 12 11 17 ,
  13 38 19 5 3 4 -> 10 6 7 22 12 11 4 ,
  13 38 19 5 3 9 -> 10 6 7 22 12 11 9 ,
  13 38 19 5 3 10 -> 10 6 7 22 12 11 10 ,
  13 38 19 5 3 11 -> 10 6 7 22 12 11 11 ,
  13 38 19 5 3 13 -> 10 6 7 22 12 11 13 ,
  13 38 19 5 3 15 -> 10 6 7 22 12 11 15 ,
  13 38 19 5 3 17 -> 10 6 7 22 12 11 17 ,
  29 38 19 5 3 4 -> 23 6 7 22 12 11 4 ,
  29 38 19 5 3 9 -> 23 6 7 22 12 11 9 ,
  29 38 19 5 3 10 -> 23 6 7 22 12 11 10 ,
  29 38 19 5 3 11 -> 23 6 7 22 12 11 11 ,
  29 38 19 5 3 13 -> 23 6 7 22 12 11 13 ,
  29 38 19 5 3 15 -> 23 6 7 22 12 11 15 ,
  29 38 19 5 3 17 -> 23 6 7 22 12 11 17 ,
  30 38 19 5 3 4 -> 25 6 7 22 12 11 4 ,
  30 38 19 5 3 9 -> 25 6 7 22 12 11 9 ,
  30 38 19 5 3 10 -> 25 6 7 22 12 11 10 ,
  30 38 19 5 3 11 -> 25 6 7 22 12 11 11 ,
  30 38 19 5 3 13 -> 25 6 7 22 12 11 13 ,
  30 38 19 5 3 15 -> 25 6 7 22 12 11 15 ,
  30 38 19 5 3 17 -> 25 6 7 22 12 11 17 ,
  31 38 19 5 3 4 -> 27 6 7 22 12 11 4 ,
  31 38 19 5 3 9 -> 27 6 7 22 12 11 9 ,
  31 38 19 5 3 10 -> 27 6 7 22 12 11 10 ,
  31 38 19 5 3 11 -> 27 6 7 22 12 11 11 ,
  31 38 19 5 3 13 -> 27 6 7 22 12 11 13 ,
  31 38 19 5 3 15 -> 27 6 7 22 12 11 15 ,
  31 38 19 5 3 17 -> 27 6 7 22 12 11 17 ,
  0 1 2 3 15 24 -> 1 7 8 10 41 24 0 ,
  0 1 2 3 15 33 -> 1 7 8 10 41 24 1 ,
  0 1 2 3 15 25 -> 1 7 8 10 41 24 5 ,
  0 1 2 3 15 34 -> 1 7 8 10 41 24 12 ,
  0 1 2 3 15 30 -> 1 7 8 10 41 24 14 ,
  0 1 2 3 15 35 -> 1 7 8 10 41 24 16 ,
  0 1 2 3 15 36 -> 1 7 8 10 41 24 18 ,
  19 1 2 3 15 24 -> 37 7 8 10 41 24 0 ,
  19 1 2 3 15 33 -> 37 7 8 10 41 24 1 ,
  19 1 2 3 15 25 -> 37 7 8 10 41 24 5 ,
  19 1 2 3 15 34 -> 37 7 8 10 41 24 12 ,
  19 1 2 3 15 30 -> 37 7 8 10 41 24 14 ,
  19 1 2 3 15 35 -> 37 7 8 10 41 24 16 ,
  19 1 2 3 15 36 -> 37 7 8 10 41 24 18 ,
  20 1 2 3 15 24 -> 6 7 8 10 41 24 0 ,
  20 1 2 3 15 33 -> 6 7 8 10 41 24 1 ,
  20 1 2 3 15 25 -> 6 7 8 10 41 24 5 ,
  20 1 2 3 15 34 -> 6 7 8 10 41 24 12 ,
  20 1 2 3 15 30 -> 6 7 8 10 41 24 14 ,
  20 1 2 3 15 35 -> 6 7 8 10 41 24 16 ,
  20 1 2 3 15 36 -> 6 7 8 10 41 24 18 ,
  4 1 2 3 15 24 -> 9 7 8 10 41 24 0 ,
  4 1 2 3 15 33 -> 9 7 8 10 41 24 1 ,
  4 1 2 3 15 25 -> 9 7 8 10 41 24 5 ,
  4 1 2 3 15 34 -> 9 7 8 10 41 24 12 ,
  4 1 2 3 15 30 -> 9 7 8 10 41 24 14 ,
  4 1 2 3 15 35 -> 9 7 8 10 41 24 16 ,
  4 1 2 3 15 36 -> 9 7 8 10 41 24 18 ,
  22 1 2 3 15 24 -> 38 7 8 10 41 24 0 ,
  22 1 2 3 15 33 -> 38 7 8 10 41 24 1 ,
  22 1 2 3 15 25 -> 38 7 8 10 41 24 5 ,
  22 1 2 3 15 34 -> 38 7 8 10 41 24 12 ,
  22 1 2 3 15 30 -> 38 7 8 10 41 24 14 ,
  22 1 2 3 15 35 -> 38 7 8 10 41 24 16 ,
  22 1 2 3 15 36 -> 38 7 8 10 41 24 18 ,
  24 1 2 3 15 24 -> 33 7 8 10 41 24 0 ,
  24 1 2 3 15 33 -> 33 7 8 10 41 24 1 ,
  24 1 2 3 15 25 -> 33 7 8 10 41 24 5 ,
  24 1 2 3 15 34 -> 33 7 8 10 41 24 12 ,
  24 1 2 3 15 30 -> 33 7 8 10 41 24 14 ,
  24 1 2 3 15 35 -> 33 7 8 10 41 24 16 ,
  24 1 2 3 15 36 -> 33 7 8 10 41 24 18 ,
  26 1 2 3 15 24 -> 39 7 8 10 41 24 0 ,
  26 1 2 3 15 33 -> 39 7 8 10 41 24 1 ,
  26 1 2 3 15 25 -> 39 7 8 10 41 24 5 ,
  26 1 2 3 15 34 -> 39 7 8 10 41 24 12 ,
  26 1 2 3 15 30 -> 39 7 8 10 41 24 14 ,
  26 1 2 3 15 35 -> 39 7 8 10 41 24 16 ,
  26 1 2 3 15 36 -> 39 7 8 10 41 24 18 ,
  5 3 13 8 15 24 -> 5 28 8 13 32 34 4 ,
  5 3 13 8 15 33 -> 5 28 8 13 32 34 9 ,
  5 3 13 8 15 25 -> 5 28 8 13 32 34 10 ,
  5 3 13 8 15 34 -> 5 28 8 13 32 34 11 ,
  5 3 13 8 15 30 -> 5 28 8 13 32 34 13 ,
  5 3 13 8 15 35 -> 5 28 8 13 32 34 15 ,
  5 3 13 8 15 36 -> 5 28 8 13 32 34 17 ,
  2 3 13 8 15 24 -> 2 28 8 13 32 34 4 ,
  2 3 13 8 15 33 -> 2 28 8 13 32 34 9 ,
  2 3 13 8 15 25 -> 2 28 8 13 32 34 10 ,
  2 3 13 8 15 34 -> 2 28 8 13 32 34 11 ,
  2 3 13 8 15 30 -> 2 28 8 13 32 34 13 ,
  2 3 13 8 15 35 -> 2 28 8 13 32 34 15 ,
  2 3 13 8 15 36 -> 2 28 8 13 32 34 17 ,
  21 3 13 8 15 24 -> 21 28 8 13 32 34 4 ,
  21 3 13 8 15 33 -> 21 28 8 13 32 34 9 ,
  21 3 13 8 15 25 -> 21 28 8 13 32 34 10 ,
  21 3 13 8 15 34 -> 21 28 8 13 32 34 11 ,
  21 3 13 8 15 30 -> 21 28 8 13 32 34 13 ,
  21 3 13 8 15 35 -> 21 28 8 13 32 34 15 ,
  21 3 13 8 15 36 -> 21 28 8 13 32 34 17 ,
  10 3 13 8 15 24 -> 10 28 8 13 32 34 4 ,
  10 3 13 8 15 33 -> 10 28 8 13 32 34 9 ,
  10 3 13 8 15 25 -> 10 28 8 13 32 34 10 ,
  10 3 13 8 15 34 -> 10 28 8 13 32 34 11 ,
  10 3 13 8 15 30 -> 10 28 8 13 32 34 13 ,
  10 3 13 8 15 35 -> 10 28 8 13 32 34 15 ,
  10 3 13 8 15 36 -> 10 28 8 13 32 34 17 ,
  23 3 13 8 15 24 -> 23 28 8 13 32 34 4 ,
  23 3 13 8 15 33 -> 23 28 8 13 32 34 9 ,
  23 3 13 8 15 25 -> 23 28 8 13 32 34 10 ,
  23 3 13 8 15 34 -> 23 28 8 13 32 34 11 ,
  23 3 13 8 15 30 -> 23 28 8 13 32 34 13 ,
  23 3 13 8 15 35 -> 23 28 8 13 32 34 15 ,
  23 3 13 8 15 36 -> 23 28 8 13 32 34 17 ,
  25 3 13 8 15 24 -> 25 28 8 13 32 34 4 ,
  25 3 13 8 15 33 -> 25 28 8 13 32 34 9 ,
  25 3 13 8 15 25 -> 25 28 8 13 32 34 10 ,
  25 3 13 8 15 34 -> 25 28 8 13 32 34 11 ,
  25 3 13 8 15 30 -> 25 28 8 13 32 34 13 ,
  25 3 13 8 15 35 -> 25 28 8 13 32 34 15 ,
  25 3 13 8 15 36 -> 25 28 8 13 32 34 17 ,
  27 3 13 8 15 24 -> 27 28 8 13 32 34 4 ,
  27 3 13 8 15 33 -> 27 28 8 13 32 34 9 ,
  27 3 13 8 15 25 -> 27 28 8 13 32 34 10 ,
  27 3 13 8 15 34 -> 27 28 8 13 32 34 11 ,
  27 3 13 8 15 30 -> 27 28 8 13 32 34 13 ,
  27 3 13 8 15 35 -> 27 28 8 13 32 34 15 ,
  27 3 13 8 15 36 -> 27 28 8 13 32 34 17 ,
  5 3 13 8 15 24 -> 16 34 10 6 7 8 4 ,
  5 3 13 8 15 33 -> 16 34 10 6 7 8 9 ,
  5 3 13 8 15 25 -> 16 34 10 6 7 8 10 ,
  5 3 13 8 15 34 -> 16 34 10 6 7 8 11 ,
  5 3 13 8 15 30 -> 16 34 10 6 7 8 13 ,
  5 3 13 8 15 35 -> 16 34 10 6 7 8 15 ,
  5 3 13 8 15 36 -> 16 34 10 6 7 8 17 ,
  2 3 13 8 15 24 -> 40 34 10 6 7 8 4 ,
  2 3 13 8 15 33 -> 40 34 10 6 7 8 9 ,
  2 3 13 8 15 25 -> 40 34 10 6 7 8 10 ,
  2 3 13 8 15 34 -> 40 34 10 6 7 8 11 ,
  2 3 13 8 15 30 -> 40 34 10 6 7 8 13 ,
  2 3 13 8 15 35 -> 40 34 10 6 7 8 15 ,
  2 3 13 8 15 36 -> 40 34 10 6 7 8 17 ,
  21 3 13 8 15 24 -> 41 34 10 6 7 8 4 ,
  21 3 13 8 15 33 -> 41 34 10 6 7 8 9 ,
  21 3 13 8 15 25 -> 41 34 10 6 7 8 10 ,
  21 3 13 8 15 34 -> 41 34 10 6 7 8 11 ,
  21 3 13 8 15 30 -> 41 34 10 6 7 8 13 ,
  21 3 13 8 15 35 -> 41 34 10 6 7 8 15 ,
  21 3 13 8 15 36 -> 41 34 10 6 7 8 17 ,
  10 3 13 8 15 24 -> 15 34 10 6 7 8 4 ,
  10 3 13 8 15 33 -> 15 34 10 6 7 8 9 ,
  10 3 13 8 15 25 -> 15 34 10 6 7 8 10 ,
  10 3 13 8 15 34 -> 15 34 10 6 7 8 11 ,
  10 3 13 8 15 30 -> 15 34 10 6 7 8 13 ,
  10 3 13 8 15 35 -> 15 34 10 6 7 8 15 ,
  10 3 13 8 15 36 -> 15 34 10 6 7 8 17 ,
  23 3 13 8 15 24 -> 32 34 10 6 7 8 4 ,
  23 3 13 8 15 33 -> 32 34 10 6 7 8 9 ,
  23 3 13 8 15 25 -> 32 34 10 6 7 8 10 ,
  23 3 13 8 15 34 -> 32 34 10 6 7 8 11 ,
  23 3 13 8 15 30 -> 32 34 10 6 7 8 13 ,
  23 3 13 8 15 35 -> 32 34 10 6 7 8 15 ,
  23 3 13 8 15 36 -> 32 34 10 6 7 8 17 ,
  25 3 13 8 15 24 -> 35 34 10 6 7 8 4 ,
  25 3 13 8 15 33 -> 35 34 10 6 7 8 9 ,
  25 3 13 8 15 25 -> 35 34 10 6 7 8 10 ,
  25 3 13 8 15 34 -> 35 34 10 6 7 8 11 ,
  25 3 13 8 15 30 -> 35 34 10 6 7 8 13 ,
  25 3 13 8 15 35 -> 35 34 10 6 7 8 15 ,
  25 3 13 8 15 36 -> 35 34 10 6 7 8 17 ,
  27 3 13 8 15 24 -> 42 34 10 6 7 8 4 ,
  27 3 13 8 15 33 -> 42 34 10 6 7 8 9 ,
  27 3 13 8 15 25 -> 42 34 10 6 7 8 10 ,
  27 3 13 8 15 34 -> 42 34 10 6 7 8 11 ,
  27 3 13 8 15 30 -> 42 34 10 6 7 8 13 ,
  27 3 13 8 15 35 -> 42 34 10 6 7 8 15 ,
  27 3 13 8 15 36 -> 42 34 10 6 7 8 17 ,
  14 38 19 12 15 24 -> 0 1 37 7 8 15 24 ,
  14 38 19 12 15 33 -> 0 1 37 7 8 15 33 ,
  14 38 19 12 15 25 -> 0 1 37 7 8 15 25 ,
  14 38 19 12 15 34 -> 0 1 37 7 8 15 34 ,
  14 38 19 12 15 30 -> 0 1 37 7 8 15 30 ,
  14 38 19 12 15 35 -> 0 1 37 7 8 15 35 ,
  14 38 19 12 15 36 -> 0 1 37 7 8 15 36 ,
  7 38 19 12 15 24 -> 19 1 37 7 8 15 24 ,
  7 38 19 12 15 33 -> 19 1 37 7 8 15 33 ,
  7 38 19 12 15 25 -> 19 1 37 7 8 15 25 ,
  7 38 19 12 15 34 -> 19 1 37 7 8 15 34 ,
  7 38 19 12 15 30 -> 19 1 37 7 8 15 30 ,
  7 38 19 12 15 35 -> 19 1 37 7 8 15 35 ,
  7 38 19 12 15 36 -> 19 1 37 7 8 15 36 ,
  28 38 19 12 15 24 -> 20 1 37 7 8 15 24 ,
  28 38 19 12 15 33 -> 20 1 37 7 8 15 33 ,
  28 38 19 12 15 25 -> 20 1 37 7 8 15 25 ,
  28 38 19 12 15 34 -> 20 1 37 7 8 15 34 ,
  28 38 19 12 15 30 -> 20 1 37 7 8 15 30 ,
  28 38 19 12 15 35 -> 20 1 37 7 8 15 35 ,
  28 38 19 12 15 36 -> 20 1 37 7 8 15 36 ,
  13 38 19 12 15 24 -> 4 1 37 7 8 15 24 ,
  13 38 19 12 15 33 -> 4 1 37 7 8 15 33 ,
  13 38 19 12 15 25 -> 4 1 37 7 8 15 25 ,
  13 38 19 12 15 34 -> 4 1 37 7 8 15 34 ,
  13 38 19 12 15 30 -> 4 1 37 7 8 15 30 ,
  13 38 19 12 15 35 -> 4 1 37 7 8 15 35 ,
  13 38 19 12 15 36 -> 4 1 37 7 8 15 36 ,
  29 38 19 12 15 24 -> 22 1 37 7 8 15 24 ,
  29 38 19 12 15 33 -> 22 1 37 7 8 15 33 ,
  29 38 19 12 15 25 -> 22 1 37 7 8 15 25 ,
  29 38 19 12 15 34 -> 22 1 37 7 8 15 34 ,
  29 38 19 12 15 30 -> 22 1 37 7 8 15 30 ,
  29 38 19 12 15 35 -> 22 1 37 7 8 15 35 ,
  29 38 19 12 15 36 -> 22 1 37 7 8 15 36 ,
  30 38 19 12 15 24 -> 24 1 37 7 8 15 24 ,
  30 38 19 12 15 33 -> 24 1 37 7 8 15 33 ,
  30 38 19 12 15 25 -> 24 1 37 7 8 15 25 ,
  30 38 19 12 15 34 -> 24 1 37 7 8 15 34 ,
  30 38 19 12 15 30 -> 24 1 37 7 8 15 30 ,
  30 38 19 12 15 35 -> 24 1 37 7 8 15 35 ,
  30 38 19 12 15 36 -> 24 1 37 7 8 15 36 ,
  31 38 19 12 15 24 -> 26 1 37 7 8 15 24 ,
  31 38 19 12 15 33 -> 26 1 37 7 8 15 33 ,
  31 38 19 12 15 25 -> 26 1 37 7 8 15 25 ,
  31 38 19 12 15 34 -> 26 1 37 7 8 15 34 ,
  31 38 19 12 15 30 -> 26 1 37 7 8 15 30 ,
  31 38 19 12 15 35 -> 26 1 37 7 8 15 35 ,
  31 38 19 12 15 36 -> 26 1 37 7 8 15 36 ,
  0 1 19 12 15 24 -> 0 0 16 33 7 8 4 ,
  0 1 19 12 15 33 -> 0 0 16 33 7 8 9 ,
  0 1 19 12 15 25 -> 0 0 16 33 7 8 10 ,
  0 1 19 12 15 34 -> 0 0 16 33 7 8 11 ,
  0 1 19 12 15 30 -> 0 0 16 33 7 8 13 ,
  0 1 19 12 15 35 -> 0 0 16 33 7 8 15 ,
  0 1 19 12 15 36 -> 0 0 16 33 7 8 17 ,
  19 1 19 12 15 24 -> 19 0 16 33 7 8 4 ,
  19 1 19 12 15 33 -> 19 0 16 33 7 8 9 ,
  19 1 19 12 15 25 -> 19 0 16 33 7 8 10 ,
  19 1 19 12 15 34 -> 19 0 16 33 7 8 11 ,
  19 1 19 12 15 30 -> 19 0 16 33 7 8 13 ,
  19 1 19 12 15 35 -> 19 0 16 33 7 8 15 ,
  19 1 19 12 15 36 -> 19 0 16 33 7 8 17 ,
  20 1 19 12 15 24 -> 20 0 16 33 7 8 4 ,
  20 1 19 12 15 33 -> 20 0 16 33 7 8 9 ,
  20 1 19 12 15 25 -> 20 0 16 33 7 8 10 ,
  20 1 19 12 15 34 -> 20 0 16 33 7 8 11 ,
  20 1 19 12 15 30 -> 20 0 16 33 7 8 13 ,
  20 1 19 12 15 35 -> 20 0 16 33 7 8 15 ,
  20 1 19 12 15 36 -> 20 0 16 33 7 8 17 ,
  4 1 19 12 15 24 -> 4 0 16 33 7 8 4 ,
  4 1 19 12 15 33 -> 4 0 16 33 7 8 9 ,
  4 1 19 12 15 25 -> 4 0 16 33 7 8 10 ,
  4 1 19 12 15 34 -> 4 0 16 33 7 8 11 ,
  4 1 19 12 15 30 -> 4 0 16 33 7 8 13 ,
  4 1 19 12 15 35 -> 4 0 16 33 7 8 15 ,
  4 1 19 12 15 36 -> 4 0 16 33 7 8 17 ,
  22 1 19 12 15 24 -> 22 0 16 33 7 8 4 ,
  22 1 19 12 15 33 -> 22 0 16 33 7 8 9 ,
  22 1 19 12 15 25 -> 22 0 16 33 7 8 10 ,
  22 1 19 12 15 34 -> 22 0 16 33 7 8 11 ,
  22 1 19 12 15 30 -> 22 0 16 33 7 8 13 ,
  22 1 19 12 15 35 -> 22 0 16 33 7 8 15 ,
  22 1 19 12 15 36 -> 22 0 16 33 7 8 17 ,
  24 1 19 12 15 24 -> 24 0 16 33 7 8 4 ,
  24 1 19 12 15 33 -> 24 0 16 33 7 8 9 ,
  24 1 19 12 15 25 -> 24 0 16 33 7 8 10 ,
  24 1 19 12 15 34 -> 24 0 16 33 7 8 11 ,
  24 1 19 12 15 30 -> 24 0 16 33 7 8 13 ,
  24 1 19 12 15 35 -> 24 0 16 33 7 8 15 ,
  24 1 19 12 15 36 -> 24 0 16 33 7 8 17 ,
  26 1 19 12 15 24 -> 26 0 16 33 7 8 4 ,
  26 1 19 12 15 33 -> 26 0 16 33 7 8 9 ,
  26 1 19 12 15 25 -> 26 0 16 33 7 8 10 ,
  26 1 19 12 15 34 -> 26 0 16 33 7 8 11 ,
  26 1 19 12 15 30 -> 26 0 16 33 7 8 13 ,
  26 1 19 12 15 35 -> 26 0 16 33 7 8 15 ,
  26 1 19 12 15 36 -> 26 0 16 33 7 8 17 ,
  5 6 7 23 41 24 -> 14 22 5 21 6 40 24 ,
  5 6 7 23 41 33 -> 14 22 5 21 6 40 33 ,
  5 6 7 23 41 25 -> 14 22 5 21 6 40 25 ,
  5 6 7 23 41 34 -> 14 22 5 21 6 40 34 ,
  5 6 7 23 41 30 -> 14 22 5 21 6 40 30 ,
  5 6 7 23 41 35 -> 14 22 5 21 6 40 35 ,
  5 6 7 23 41 36 -> 14 22 5 21 6 40 36 ,
  2 6 7 23 41 24 -> 7 22 5 21 6 40 24 ,
  2 6 7 23 41 33 -> 7 22 5 21 6 40 33 ,
  2 6 7 23 41 25 -> 7 22 5 21 6 40 25 ,
  2 6 7 23 41 34 -> 7 22 5 21 6 40 34 ,
  2 6 7 23 41 30 -> 7 22 5 21 6 40 30 ,
  2 6 7 23 41 35 -> 7 22 5 21 6 40 35 ,
  2 6 7 23 41 36 -> 7 22 5 21 6 40 36 ,
  21 6 7 23 41 24 -> 28 22 5 21 6 40 24 ,
  21 6 7 23 41 33 -> 28 22 5 21 6 40 33 ,
  21 6 7 23 41 25 -> 28 22 5 21 6 40 25 ,
  21 6 7 23 41 34 -> 28 22 5 21 6 40 34 ,
  21 6 7 23 41 30 -> 28 22 5 21 6 40 30 ,
  21 6 7 23 41 35 -> 28 22 5 21 6 40 35 ,
  21 6 7 23 41 36 -> 28 22 5 21 6 40 36 ,
  10 6 7 23 41 24 -> 13 22 5 21 6 40 24 ,
  10 6 7 23 41 33 -> 13 22 5 21 6 40 33 ,
  10 6 7 23 41 25 -> 13 22 5 21 6 40 25 ,
  10 6 7 23 41 34 -> 13 22 5 21 6 40 34 ,
  10 6 7 23 41 30 -> 13 22 5 21 6 40 30 ,
  10 6 7 23 41 35 -> 13 22 5 21 6 40 35 ,
  10 6 7 23 41 36 -> 13 22 5 21 6 40 36 ,
  23 6 7 23 41 24 -> 29 22 5 21 6 40 24 ,
  23 6 7 23 41 33 -> 29 22 5 21 6 40 33 ,
  23 6 7 23 41 25 -> 29 22 5 21 6 40 25 ,
  23 6 7 23 41 34 -> 29 22 5 21 6 40 34 ,
  23 6 7 23 41 30 -> 29 22 5 21 6 40 30 ,
  23 6 7 23 41 35 -> 29 22 5 21 6 40 35 ,
  23 6 7 23 41 36 -> 29 22 5 21 6 40 36 ,
  25 6 7 23 41 24 -> 30 22 5 21 6 40 24 ,
  25 6 7 23 41 33 -> 30 22 5 21 6 40 33 ,
  25 6 7 23 41 25 -> 30 22 5 21 6 40 25 ,
  25 6 7 23 41 34 -> 30 22 5 21 6 40 34 ,
  25 6 7 23 41 30 -> 30 22 5 21 6 40 30 ,
  25 6 7 23 41 35 -> 30 22 5 21 6 40 35 ,
  25 6 7 23 41 36 -> 30 22 5 21 6 40 36 ,
  27 6 7 23 41 24 -> 31 22 5 21 6 40 24 ,
  27 6 7 23 41 33 -> 31 22 5 21 6 40 33 ,
  27 6 7 23 41 25 -> 31 22 5 21 6 40 25 ,
  27 6 7 23 41 34 -> 31 22 5 21 6 40 34 ,
  27 6 7 23 41 30 -> 31 22 5 21 6 40 30 ,
  27 6 7 23 41 35 -> 31 22 5 21 6 40 35 ,
  27 6 7 23 41 36 -> 31 22 5 21 6 40 36 ,
  0 1 7 23 41 24 -> 0 5 20 14 38 40 24 ,
  0 1 7 23 41 33 -> 0 5 20 14 38 40 33 ,
  0 1 7 23 41 25 -> 0 5 20 14 38 40 25 ,
  0 1 7 23 41 34 -> 0 5 20 14 38 40 34 ,
  0 1 7 23 41 30 -> 0 5 20 14 38 40 30 ,
  0 1 7 23 41 35 -> 0 5 20 14 38 40 35 ,
  0 1 7 23 41 36 -> 0 5 20 14 38 40 36 ,
  19 1 7 23 41 24 -> 19 5 20 14 38 40 24 ,
  19 1 7 23 41 33 -> 19 5 20 14 38 40 33 ,
  19 1 7 23 41 25 -> 19 5 20 14 38 40 25 ,
  19 1 7 23 41 34 -> 19 5 20 14 38 40 34 ,
  19 1 7 23 41 30 -> 19 5 20 14 38 40 30 ,
  19 1 7 23 41 35 -> 19 5 20 14 38 40 35 ,
  19 1 7 23 41 36 -> 19 5 20 14 38 40 36 ,
  20 1 7 23 41 24 -> 20 5 20 14 38 40 24 ,
  20 1 7 23 41 33 -> 20 5 20 14 38 40 33 ,
  20 1 7 23 41 25 -> 20 5 20 14 38 40 25 ,
  20 1 7 23 41 34 -> 20 5 20 14 38 40 34 ,
  20 1 7 23 41 30 -> 20 5 20 14 38 40 30 ,
  20 1 7 23 41 35 -> 20 5 20 14 38 40 35 ,
  20 1 7 23 41 36 -> 20 5 20 14 38 40 36 ,
  4 1 7 23 41 24 -> 4 5 20 14 38 40 24 ,
  4 1 7 23 41 33 -> 4 5 20 14 38 40 33 ,
  4 1 7 23 41 25 -> 4 5 20 14 38 40 25 ,
  4 1 7 23 41 34 -> 4 5 20 14 38 40 34 ,
  4 1 7 23 41 30 -> 4 5 20 14 38 40 30 ,
  4 1 7 23 41 35 -> 4 5 20 14 38 40 35 ,
  4 1 7 23 41 36 -> 4 5 20 14 38 40 36 ,
  22 1 7 23 41 24 -> 22 5 20 14 38 40 24 ,
  22 1 7 23 41 33 -> 22 5 20 14 38 40 33 ,
  22 1 7 23 41 25 -> 22 5 20 14 38 40 25 ,
  22 1 7 23 41 34 -> 22 5 20 14 38 40 34 ,
  22 1 7 23 41 30 -> 22 5 20 14 38 40 30 ,
  22 1 7 23 41 35 -> 22 5 20 14 38 40 35 ,
  22 1 7 23 41 36 -> 22 5 20 14 38 40 36 ,
  24 1 7 23 41 24 -> 24 5 20 14 38 40 24 ,
  24 1 7 23 41 33 -> 24 5 20 14 38 40 33 ,
  24 1 7 23 41 25 -> 24 5 20 14 38 40 25 ,
  24 1 7 23 41 34 -> 24 5 20 14 38 40 34 ,
  24 1 7 23 41 30 -> 24 5 20 14 38 40 30 ,
  24 1 7 23 41 35 -> 24 5 20 14 38 40 35 ,
  24 1 7 23 41 36 -> 24 5 20 14 38 40 36 ,
  26 1 7 23 41 24 -> 26 5 20 14 38 40 24 ,
  26 1 7 23 41 33 -> 26 5 20 14 38 40 33 ,
  26 1 7 23 41 25 -> 26 5 20 14 38 40 25 ,
  26 1 7 23 41 34 -> 26 5 20 14 38 40 34 ,
  26 1 7 23 41 30 -> 26 5 20 14 38 40 30 ,
  26 1 7 23 41 35 -> 26 5 20 14 38 40 35 ,
  26 1 7 23 41 36 -> 26 5 20 14 38 40 36 ,
  14 23 3 13 32 24 -> 5 28 8 13 32 34 4 ,
  14 23 3 13 32 33 -> 5 28 8 13 32 34 9 ,
  14 23 3 13 32 25 -> 5 28 8 13 32 34 10 ,
  14 23 3 13 32 34 -> 5 28 8 13 32 34 11 ,
  14 23 3 13 32 30 -> 5 28 8 13 32 34 13 ,
  14 23 3 13 32 35 -> 5 28 8 13 32 34 15 ,
  14 23 3 13 32 36 -> 5 28 8 13 32 34 17 ,
  7 23 3 13 32 24 -> 2 28 8 13 32 34 4 ,
  7 23 3 13 32 33 -> 2 28 8 13 32 34 9 ,
  7 23 3 13 32 25 -> 2 28 8 13 32 34 10 ,
  7 23 3 13 32 34 -> 2 28 8 13 32 34 11 ,
  7 23 3 13 32 30 -> 2 28 8 13 32 34 13 ,
  7 23 3 13 32 35 -> 2 28 8 13 32 34 15 ,
  7 23 3 13 32 36 -> 2 28 8 13 32 34 17 ,
  28 23 3 13 32 24 -> 21 28 8 13 32 34 4 ,
  28 23 3 13 32 33 -> 21 28 8 13 32 34 9 ,
  28 23 3 13 32 25 -> 21 28 8 13 32 34 10 ,
  28 23 3 13 32 34 -> 21 28 8 13 32 34 11 ,
  28 23 3 13 32 30 -> 21 28 8 13 32 34 13 ,
  28 23 3 13 32 35 -> 21 28 8 13 32 34 15 ,
  28 23 3 13 32 36 -> 21 28 8 13 32 34 17 ,
  13 23 3 13 32 24 -> 10 28 8 13 32 34 4 ,
  13 23 3 13 32 33 -> 10 28 8 13 32 34 9 ,
  13 23 3 13 32 25 -> 10 28 8 13 32 34 10 ,
  13 23 3 13 32 34 -> 10 28 8 13 32 34 11 ,
  13 23 3 13 32 30 -> 10 28 8 13 32 34 13 ,
  13 23 3 13 32 35 -> 10 28 8 13 32 34 15 ,
  13 23 3 13 32 36 -> 10 28 8 13 32 34 17 ,
  29 23 3 13 32 24 -> 23 28 8 13 32 34 4 ,
  29 23 3 13 32 33 -> 23 28 8 13 32 34 9 ,
  29 23 3 13 32 25 -> 23 28 8 13 32 34 10 ,
  29 23 3 13 32 34 -> 23 28 8 13 32 34 11 ,
  29 23 3 13 32 30 -> 23 28 8 13 32 34 13 ,
  29 23 3 13 32 35 -> 23 28 8 13 32 34 15 ,
  29 23 3 13 32 36 -> 23 28 8 13 32 34 17 ,
  30 23 3 13 32 24 -> 25 28 8 13 32 34 4 ,
  30 23 3 13 32 33 -> 25 28 8 13 32 34 9 ,
  30 23 3 13 32 25 -> 25 28 8 13 32 34 10 ,
  30 23 3 13 32 34 -> 25 28 8 13 32 34 11 ,
  30 23 3 13 32 30 -> 25 28 8 13 32 34 13 ,
  30 23 3 13 32 35 -> 25 28 8 13 32 34 15 ,
  30 23 3 13 32 36 -> 25 28 8 13 32 34 17 ,
  31 23 3 13 32 24 -> 27 28 8 13 32 34 4 ,
  31 23 3 13 32 33 -> 27 28 8 13 32 34 9 ,
  31 23 3 13 32 25 -> 27 28 8 13 32 34 10 ,
  31 23 3 13 32 34 -> 27 28 8 13 32 34 11 ,
  31 23 3 13 32 30 -> 27 28 8 13 32 34 13 ,
  31 23 3 13 32 35 -> 27 28 8 13 32 34 15 ,
  31 23 3 13 32 36 -> 27 28 8 13 32 34 17 ,
  14 23 6 7 32 24 -> 16 30 23 6 7 8 4 ,
  14 23 6 7 32 33 -> 16 30 23 6 7 8 9 ,
  14 23 6 7 32 25 -> 16 30 23 6 7 8 10 ,
  14 23 6 7 32 34 -> 16 30 23 6 7 8 11 ,
  14 23 6 7 32 30 -> 16 30 23 6 7 8 13 ,
  14 23 6 7 32 35 -> 16 30 23 6 7 8 15 ,
  14 23 6 7 32 36 -> 16 30 23 6 7 8 17 ,
  7 23 6 7 32 24 -> 40 30 23 6 7 8 4 ,
  7 23 6 7 32 33 -> 40 30 23 6 7 8 9 ,
  7 23 6 7 32 25 -> 40 30 23 6 7 8 10 ,
  7 23 6 7 32 34 -> 40 30 23 6 7 8 11 ,
  7 23 6 7 32 30 -> 40 30 23 6 7 8 13 ,
  7 23 6 7 32 35 -> 40 30 23 6 7 8 15 ,
  7 23 6 7 32 36 -> 40 30 23 6 7 8 17 ,
  28 23 6 7 32 24 -> 41 30 23 6 7 8 4 ,
  28 23 6 7 32 33 -> 41 30 23 6 7 8 9 ,
  28 23 6 7 32 25 -> 41 30 23 6 7 8 10 ,
  28 23 6 7 32 34 -> 41 30 23 6 7 8 11 ,
  28 23 6 7 32 30 -> 41 30 23 6 7 8 13 ,
  28 23 6 7 32 35 -> 41 30 23 6 7 8 15 ,
  28 23 6 7 32 36 -> 41 30 23 6 7 8 17 ,
  13 23 6 7 32 24 -> 15 30 23 6 7 8 4 ,
  13 23 6 7 32 33 -> 15 30 23 6 7 8 9 ,
  13 23 6 7 32 25 -> 15 30 23 6 7 8 10 ,
  13 23 6 7 32 34 -> 15 30 23 6 7 8 11 ,
  13 23 6 7 32 30 -> 15 30 23 6 7 8 13 ,
  13 23 6 7 32 35 -> 15 30 23 6 7 8 15 ,
  13 23 6 7 32 36 -> 15 30 23 6 7 8 17 ,
  29 23 6 7 32 24 -> 32 30 23 6 7 8 4 ,
  29 23 6 7 32 33 -> 32 30 23 6 7 8 9 ,
  29 23 6 7 32 25 -> 32 30 23 6 7 8 10 ,
  29 23 6 7 32 34 -> 32 30 23 6 7 8 11 ,
  29 23 6 7 32 30 -> 32 30 23 6 7 8 13 ,
  29 23 6 7 32 35 -> 32 30 23 6 7 8 15 ,
  29 23 6 7 32 36 -> 32 30 23 6 7 8 17 ,
  30 23 6 7 32 24 -> 35 30 23 6 7 8 4 ,
  30 23 6 7 32 33 -> 35 30 23 6 7 8 9 ,
  30 23 6 7 32 25 -> 35 30 23 6 7 8 10 ,
  30 23 6 7 32 34 -> 35 30 23 6 7 8 11 ,
  30 23 6 7 32 30 -> 35 30 23 6 7 8 13 ,
  30 23 6 7 32 35 -> 35 30 23 6 7 8 15 ,
  30 23 6 7 32 36 -> 35 30 23 6 7 8 17 ,
  31 23 6 7 32 24 -> 42 30 23 6 7 8 4 ,
  31 23 6 7 32 33 -> 42 30 23 6 7 8 9 ,
  31 23 6 7 32 25 -> 42 30 23 6 7 8 10 ,
  31 23 6 7 32 34 -> 42 30 23 6 7 8 11 ,
  31 23 6 7 32 30 -> 42 30 23 6 7 8 13 ,
  31 23 6 7 32 35 -> 42 30 23 6 7 8 15 ,
  31 23 6 7 32 36 -> 42 30 23 6 7 8 17 ,
  0 16 33 7 32 24 -> 0 1 40 34 15 30 22 ,
  0 16 33 7 32 33 -> 0 1 40 34 15 30 38 ,
  0 16 33 7 32 25 -> 0 1 40 34 15 30 23 ,
  0 16 33 7 32 34 -> 0 1 40 34 15 30 8 ,
  0 16 33 7 32 30 -> 0 1 40 34 15 30 29 ,
  0 16 33 7 32 35 -> 0 1 40 34 15 30 32 ,
  0 16 33 7 32 36 -> 0 1 40 34 15 30 43 ,
  19 16 33 7 32 24 -> 19 1 40 34 15 30 22 ,
  19 16 33 7 32 33 -> 19 1 40 34 15 30 38 ,
  19 16 33 7 32 25 -> 19 1 40 34 15 30 23 ,
  19 16 33 7 32 34 -> 19 1 40 34 15 30 8 ,
  19 16 33 7 32 30 -> 19 1 40 34 15 30 29 ,
  19 16 33 7 32 35 -> 19 1 40 34 15 30 32 ,
  19 16 33 7 32 36 -> 19 1 40 34 15 30 43 ,
  20 16 33 7 32 24 -> 20 1 40 34 15 30 22 ,
  20 16 33 7 32 33 -> 20 1 40 34 15 30 38 ,
  20 16 33 7 32 25 -> 20 1 40 34 15 30 23 ,
  20 16 33 7 32 34 -> 20 1 40 34 15 30 8 ,
  20 16 33 7 32 30 -> 20 1 40 34 15 30 29 ,
  20 16 33 7 32 35 -> 20 1 40 34 15 30 32 ,
  20 16 33 7 32 36 -> 20 1 40 34 15 30 43 ,
  4 16 33 7 32 24 -> 4 1 40 34 15 30 22 ,
  4 16 33 7 32 33 -> 4 1 40 34 15 30 38 ,
  4 16 33 7 32 25 -> 4 1 40 34 15 30 23 ,
  4 16 33 7 32 34 -> 4 1 40 34 15 30 8 ,
  4 16 33 7 32 30 -> 4 1 40 34 15 30 29 ,
  4 16 33 7 32 35 -> 4 1 40 34 15 30 32 ,
  4 16 33 7 32 36 -> 4 1 40 34 15 30 43 ,
  22 16 33 7 32 24 -> 22 1 40 34 15 30 22 ,
  22 16 33 7 32 33 -> 22 1 40 34 15 30 38 ,
  22 16 33 7 32 25 -> 22 1 40 34 15 30 23 ,
  22 16 33 7 32 34 -> 22 1 40 34 15 30 8 ,
  22 16 33 7 32 30 -> 22 1 40 34 15 30 29 ,
  22 16 33 7 32 35 -> 22 1 40 34 15 30 32 ,
  22 16 33 7 32 36 -> 22 1 40 34 15 30 43 ,
  24 16 33 7 32 24 -> 24 1 40 34 15 30 22 ,
  24 16 33 7 32 33 -> 24 1 40 34 15 30 38 ,
  24 16 33 7 32 25 -> 24 1 40 34 15 30 23 ,
  24 16 33 7 32 34 -> 24 1 40 34 15 30 8 ,
  24 16 33 7 32 30 -> 24 1 40 34 15 30 29 ,
  24 16 33 7 32 35 -> 24 1 40 34 15 30 32 ,
  24 16 33 7 32 36 -> 24 1 40 34 15 30 43 ,
  26 16 33 7 32 24 -> 26 1 40 34 15 30 22 ,
  26 16 33 7 32 33 -> 26 1 40 34 15 30 38 ,
  26 16 33 7 32 25 -> 26 1 40 34 15 30 23 ,
  26 16 33 7 32 34 -> 26 1 40 34 15 30 8 ,
  26 16 33 7 32 30 -> 26 1 40 34 15 30 29 ,
  26 16 33 7 32 35 -> 26 1 40 34 15 30 32 ,
  26 16 33 7 32 36 -> 26 1 40 34 15 30 43 ,
  5 3 15 30 32 24 -> 5 6 7 8 15 35 24 ,
  5 3 15 30 32 33 -> 5 6 7 8 15 35 33 ,
  5 3 15 30 32 25 -> 5 6 7 8 15 35 25 ,
  5 3 15 30 32 34 -> 5 6 7 8 15 35 34 ,
  5 3 15 30 32 30 -> 5 6 7 8 15 35 30 ,
  5 3 15 30 32 35 -> 5 6 7 8 15 35 35 ,
  5 3 15 30 32 36 -> 5 6 7 8 15 35 36 ,
  2 3 15 30 32 24 -> 2 6 7 8 15 35 24 ,
  2 3 15 30 32 33 -> 2 6 7 8 15 35 33 ,
  2 3 15 30 32 25 -> 2 6 7 8 15 35 25 ,
  2 3 15 30 32 34 -> 2 6 7 8 15 35 34 ,
  2 3 15 30 32 30 -> 2 6 7 8 15 35 30 ,
  2 3 15 30 32 35 -> 2 6 7 8 15 35 35 ,
  2 3 15 30 32 36 -> 2 6 7 8 15 35 36 ,
  21 3 15 30 32 24 -> 21 6 7 8 15 35 24 ,
  21 3 15 30 32 33 -> 21 6 7 8 15 35 33 ,
  21 3 15 30 32 25 -> 21 6 7 8 15 35 25 ,
  21 3 15 30 32 34 -> 21 6 7 8 15 35 34 ,
  21 3 15 30 32 30 -> 21 6 7 8 15 35 30 ,
  21 3 15 30 32 35 -> 21 6 7 8 15 35 35 ,
  21 3 15 30 32 36 -> 21 6 7 8 15 35 36 ,
  10 3 15 30 32 24 -> 10 6 7 8 15 35 24 ,
  10 3 15 30 32 33 -> 10 6 7 8 15 35 33 ,
  10 3 15 30 32 25 -> 10 6 7 8 15 35 25 ,
  10 3 15 30 32 34 -> 10 6 7 8 15 35 34 ,
  10 3 15 30 32 30 -> 10 6 7 8 15 35 30 ,
  10 3 15 30 32 35 -> 10 6 7 8 15 35 35 ,
  10 3 15 30 32 36 -> 10 6 7 8 15 35 36 ,
  23 3 15 30 32 24 -> 23 6 7 8 15 35 24 ,
  23 3 15 30 32 33 -> 23 6 7 8 15 35 33 ,
  23 3 15 30 32 25 -> 23 6 7 8 15 35 25 ,
  23 3 15 30 32 34 -> 23 6 7 8 15 35 34 ,
  23 3 15 30 32 30 -> 23 6 7 8 15 35 30 ,
  23 3 15 30 32 35 -> 23 6 7 8 15 35 35 ,
  23 3 15 30 32 36 -> 23 6 7 8 15 35 36 ,
  25 3 15 30 32 24 -> 25 6 7 8 15 35 24 ,
  25 3 15 30 32 33 -> 25 6 7 8 15 35 33 ,
  25 3 15 30 32 25 -> 25 6 7 8 15 35 25 ,
  25 3 15 30 32 34 -> 25 6 7 8 15 35 34 ,
  25 3 15 30 32 30 -> 25 6 7 8 15 35 30 ,
  25 3 15 30 32 35 -> 25 6 7 8 15 35 35 ,
  25 3 15 30 32 36 -> 25 6 7 8 15 35 36 ,
  27 3 15 30 32 24 -> 27 6 7 8 15 35 24 ,
  27 3 15 30 32 33 -> 27 6 7 8 15 35 33 ,
  27 3 15 30 32 25 -> 27 6 7 8 15 35 25 ,
  27 3 15 30 32 34 -> 27 6 7 8 15 35 34 ,
  27 3 15 30 32 30 -> 27 6 7 8 15 35 30 ,
  27 3 15 30 32 35 -> 27 6 7 8 15 35 35 ,
  27 3 15 30 32 36 -> 27 6 7 8 15 35 36 ,
  5 3 4 14 32 24 -> 0 5 28 8 15 34 4 ,
  5 3 4 14 32 33 -> 0 5 28 8 15 34 9 ,
  5 3 4 14 32 25 -> 0 5 28 8 15 34 10 ,
  5 3 4 14 32 34 -> 0 5 28 8 15 34 11 ,
  5 3 4 14 32 30 -> 0 5 28 8 15 34 13 ,
  5 3 4 14 32 35 -> 0 5 28 8 15 34 15 ,
  5 3 4 14 32 36 -> 0 5 28 8 15 34 17 ,
  2 3 4 14 32 24 -> 19 5 28 8 15 34 4 ,
  2 3 4 14 32 33 -> 19 5 28 8 15 34 9 ,
  2 3 4 14 32 25 -> 19 5 28 8 15 34 10 ,
  2 3 4 14 32 34 -> 19 5 28 8 15 34 11 ,
  2 3 4 14 32 30 -> 19 5 28 8 15 34 13 ,
  2 3 4 14 32 35 -> 19 5 28 8 15 34 15 ,
  2 3 4 14 32 36 -> 19 5 28 8 15 34 17 ,
  21 3 4 14 32 24 -> 20 5 28 8 15 34 4 ,
  21 3 4 14 32 33 -> 20 5 28 8 15 34 9 ,
  21 3 4 14 32 25 -> 20 5 28 8 15 34 10 ,
  21 3 4 14 32 34 -> 20 5 28 8 15 34 11 ,
  21 3 4 14 32 30 -> 20 5 28 8 15 34 13 ,
  21 3 4 14 32 35 -> 20 5 28 8 15 34 15 ,
  21 3 4 14 32 36 -> 20 5 28 8 15 34 17 ,
  10 3 4 14 32 24 -> 4 5 28 8 15 34 4 ,
  10 3 4 14 32 33 -> 4 5 28 8 15 34 9 ,
  10 3 4 14 32 25 -> 4 5 28 8 15 34 10 ,
  10 3 4 14 32 34 -> 4 5 28 8 15 34 11 ,
  10 3 4 14 32 30 -> 4 5 28 8 15 34 13 ,
  10 3 4 14 32 35 -> 4 5 28 8 15 34 15 ,
  10 3 4 14 32 36 -> 4 5 28 8 15 34 17 ,
  23 3 4 14 32 24 -> 22 5 28 8 15 34 4 ,
  23 3 4 14 32 33 -> 22 5 28 8 15 34 9 ,
  23 3 4 14 32 25 -> 22 5 28 8 15 34 10 ,
  23 3 4 14 32 34 -> 22 5 28 8 15 34 11 ,
  23 3 4 14 32 30 -> 22 5 28 8 15 34 13 ,
  23 3 4 14 32 35 -> 22 5 28 8 15 34 15 ,
  23 3 4 14 32 36 -> 22 5 28 8 15 34 17 ,
  25 3 4 14 32 24 -> 24 5 28 8 15 34 4 ,
  25 3 4 14 32 33 -> 24 5 28 8 15 34 9 ,
  25 3 4 14 32 25 -> 24 5 28 8 15 34 10 ,
  25 3 4 14 32 34 -> 24 5 28 8 15 34 11 ,
  25 3 4 14 32 30 -> 24 5 28 8 15 34 13 ,
  25 3 4 14 32 35 -> 24 5 28 8 15 34 15 ,
  25 3 4 14 32 36 -> 24 5 28 8 15 34 17 ,
  27 3 4 14 32 24 -> 26 5 28 8 15 34 4 ,
  27 3 4 14 32 33 -> 26 5 28 8 15 34 9 ,
  27 3 4 14 32 25 -> 26 5 28 8 15 34 10 ,
  27 3 4 14 32 34 -> 26 5 28 8 15 34 11 ,
  27 3 4 14 32 30 -> 26 5 28 8 15 34 13 ,
  27 3 4 14 32 35 -> 26 5 28 8 15 34 15 ,
  27 3 4 14 32 36 -> 26 5 28 8 15 34 17 ,
  5 21 3 4 16 24 -> 0 5 20 5 41 34 4 ,
  5 21 3 4 16 33 -> 0 5 20 5 41 34 9 ,
  5 21 3 4 16 25 -> 0 5 20 5 41 34 10 ,
  5 21 3 4 16 34 -> 0 5 20 5 41 34 11 ,
  5 21 3 4 16 30 -> 0 5 20 5 41 34 13 ,
  5 21 3 4 16 35 -> 0 5 20 5 41 34 15 ,
  5 21 3 4 16 36 -> 0 5 20 5 41 34 17 ,
  2 21 3 4 16 24 -> 19 5 20 5 41 34 4 ,
  2 21 3 4 16 33 -> 19 5 20 5 41 34 9 ,
  2 21 3 4 16 25 -> 19 5 20 5 41 34 10 ,
  2 21 3 4 16 34 -> 19 5 20 5 41 34 11 ,
  2 21 3 4 16 30 -> 19 5 20 5 41 34 13 ,
  2 21 3 4 16 35 -> 19 5 20 5 41 34 15 ,
  2 21 3 4 16 36 -> 19 5 20 5 41 34 17 ,
  21 21 3 4 16 24 -> 20 5 20 5 41 34 4 ,
  21 21 3 4 16 33 -> 20 5 20 5 41 34 9 ,
  21 21 3 4 16 25 -> 20 5 20 5 41 34 10 ,
  21 21 3 4 16 34 -> 20 5 20 5 41 34 11 ,
  21 21 3 4 16 30 -> 20 5 20 5 41 34 13 ,
  21 21 3 4 16 35 -> 20 5 20 5 41 34 15 ,
  21 21 3 4 16 36 -> 20 5 20 5 41 34 17 ,
  10 21 3 4 16 24 -> 4 5 20 5 41 34 4 ,
  10 21 3 4 16 33 -> 4 5 20 5 41 34 9 ,
  10 21 3 4 16 25 -> 4 5 20 5 41 34 10 ,
  10 21 3 4 16 34 -> 4 5 20 5 41 34 11 ,
  10 21 3 4 16 30 -> 4 5 20 5 41 34 13 ,
  10 21 3 4 16 35 -> 4 5 20 5 41 34 15 ,
  10 21 3 4 16 36 -> 4 5 20 5 41 34 17 ,
  23 21 3 4 16 24 -> 22 5 20 5 41 34 4 ,
  23 21 3 4 16 33 -> 22 5 20 5 41 34 9 ,
  23 21 3 4 16 25 -> 22 5 20 5 41 34 10 ,
  23 21 3 4 16 34 -> 22 5 20 5 41 34 11 ,
  23 21 3 4 16 30 -> 22 5 20 5 41 34 13 ,
  23 21 3 4 16 35 -> 22 5 20 5 41 34 15 ,
  23 21 3 4 16 36 -> 22 5 20 5 41 34 17 ,
  25 21 3 4 16 24 -> 24 5 20 5 41 34 4 ,
  25 21 3 4 16 33 -> 24 5 20 5 41 34 9 ,
  25 21 3 4 16 25 -> 24 5 20 5 41 34 10 ,
  25 21 3 4 16 34 -> 24 5 20 5 41 34 11 ,
  25 21 3 4 16 30 -> 24 5 20 5 41 34 13 ,
  25 21 3 4 16 35 -> 24 5 20 5 41 34 15 ,
  25 21 3 4 16 36 -> 24 5 20 5 41 34 17 ,
  27 21 3 4 16 24 -> 26 5 20 5 41 34 4 ,
  27 21 3 4 16 33 -> 26 5 20 5 41 34 9 ,
  27 21 3 4 16 25 -> 26 5 20 5 41 34 10 ,
  27 21 3 4 16 34 -> 26 5 20 5 41 34 11 ,
  27 21 3 4 16 30 -> 26 5 20 5 41 34 13 ,
  27 21 3 4 16 35 -> 26 5 20 5 41 34 15 ,
  27 21 3 4 16 36 -> 26 5 20 5 41 34 17 ,
  14 38 2 20 16 24 -> 5 28 8 9 19 16 24 ,
  14 38 2 20 16 33 -> 5 28 8 9 19 16 33 ,
  14 38 2 20 16 25 -> 5 28 8 9 19 16 25 ,
  14 38 2 20 16 34 -> 5 28 8 9 19 16 34 ,
  14 38 2 20 16 30 -> 5 28 8 9 19 16 30 ,
  14 38 2 20 16 35 -> 5 28 8 9 19 16 35 ,
  14 38 2 20 16 36 -> 5 28 8 9 19 16 36 ,
  7 38 2 20 16 24 -> 2 28 8 9 19 16 24 ,
  7 38 2 20 16 33 -> 2 28 8 9 19 16 33 ,
  7 38 2 20 16 25 -> 2 28 8 9 19 16 25 ,
  7 38 2 20 16 34 -> 2 28 8 9 19 16 34 ,
  7 38 2 20 16 30 -> 2 28 8 9 19 16 30 ,
  7 38 2 20 16 35 -> 2 28 8 9 19 16 35 ,
  7 38 2 20 16 36 -> 2 28 8 9 19 16 36 ,
  28 38 2 20 16 24 -> 21 28 8 9 19 16 24 ,
  28 38 2 20 16 33 -> 21 28 8 9 19 16 33 ,
  28 38 2 20 16 25 -> 21 28 8 9 19 16 25 ,
  28 38 2 20 16 34 -> 21 28 8 9 19 16 34 ,
  28 38 2 20 16 30 -> 21 28 8 9 19 16 30 ,
  28 38 2 20 16 35 -> 21 28 8 9 19 16 35 ,
  28 38 2 20 16 36 -> 21 28 8 9 19 16 36 ,
  13 38 2 20 16 24 -> 10 28 8 9 19 16 24 ,
  13 38 2 20 16 33 -> 10 28 8 9 19 16 33 ,
  13 38 2 20 16 25 -> 10 28 8 9 19 16 25 ,
  13 38 2 20 16 34 -> 10 28 8 9 19 16 34 ,
  13 38 2 20 16 30 -> 10 28 8 9 19 16 30 ,
  13 38 2 20 16 35 -> 10 28 8 9 19 16 35 ,
  13 38 2 20 16 36 -> 10 28 8 9 19 16 36 ,
  29 38 2 20 16 24 -> 23 28 8 9 19 16 24 ,
  29 38 2 20 16 33 -> 23 28 8 9 19 16 33 ,
  29 38 2 20 16 25 -> 23 28 8 9 19 16 25 ,
  29 38 2 20 16 34 -> 23 28 8 9 19 16 34 ,
  29 38 2 20 16 30 -> 23 28 8 9 19 16 30 ,
  29 38 2 20 16 35 -> 23 28 8 9 19 16 35 ,
  29 38 2 20 16 36 -> 23 28 8 9 19 16 36 ,
  30 38 2 20 16 24 -> 25 28 8 9 19 16 24 ,
  30 38 2 20 16 33 -> 25 28 8 9 19 16 33 ,
  30 38 2 20 16 25 -> 25 28 8 9 19 16 25 ,
  30 38 2 20 16 34 -> 25 28 8 9 19 16 34 ,
  30 38 2 20 16 30 -> 25 28 8 9 19 16 30 ,
  30 38 2 20 16 35 -> 25 28 8 9 19 16 35 ,
  30 38 2 20 16 36 -> 25 28 8 9 19 16 36 ,
  31 38 2 20 16 24 -> 27 28 8 9 19 16 24 ,
  31 38 2 20 16 33 -> 27 28 8 9 19 16 33 ,
  31 38 2 20 16 25 -> 27 28 8 9 19 16 25 ,
  31 38 2 20 16 34 -> 27 28 8 9 19 16 34 ,
  31 38 2 20 16 30 -> 27 28 8 9 19 16 30 ,
  31 38 2 20 16 35 -> 27 28 8 9 19 16 35 ,
  31 38 2 20 16 36 -> 27 28 8 9 19 16 36 }


The system was filtered by the following matrix interpretation
of type E_J with J = {1,...,2} and dimension 2:

0 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
1 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
2 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
3 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
4 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
5 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
6 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
7 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
8 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
9 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
10 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
11 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
12 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
13 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
14 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
15 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
16 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
17 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
18 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
19 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
20 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
21 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
22 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
23 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
24 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
25 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
26 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
27 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
28 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
29 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
30 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
31 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
32 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
33 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
34 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
35 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
36 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
37 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
38 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
39 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
40 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
41 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
42 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
43 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /

After renaming modulo { 14->0, 22->1, 1->2, 2->3, 3->4, 4->5, 7->6, 8->7, 10->8, 0->9, 9->10, 5->11, 11->12, 12->13, 13->14, 15->15, 16->16, 17->17, 18->18, 37->19, 28->20, 6->21, 29->22, 38->23, 30->24, 33->25, 31->26, 39->27, 19->28, 24->29, 25->30, 34->31, 35->32, 36->33, 20->34, 26->35, 23->36, 41->37, 21->38, 40->39, 27->40, 32->41, 42->42 }, 
it remains to prove termination of the 371-rule system
{ 0 1 2 3 4 5 -> 2 6 7 8 4 5 9 ,
  0 1 2 3 4 10 -> 2 6 7 8 4 5 2 ,
  0 1 2 3 4 8 -> 2 6 7 8 4 5 11 ,
  0 1 2 3 4 12 -> 2 6 7 8 4 5 13 ,
  0 1 2 3 4 14 -> 2 6 7 8 4 5 0 ,
  0 1 2 3 4 15 -> 2 6 7 8 4 5 16 ,
  0 1 2 3 4 17 -> 2 6 7 8 4 5 18 ,
  6 1 2 3 4 5 -> 19 6 7 8 4 5 9 ,
  6 1 2 3 4 10 -> 19 6 7 8 4 5 2 ,
  6 1 2 3 4 8 -> 19 6 7 8 4 5 11 ,
  6 1 2 3 4 12 -> 19 6 7 8 4 5 13 ,
  6 1 2 3 4 14 -> 19 6 7 8 4 5 0 ,
  6 1 2 3 4 15 -> 19 6 7 8 4 5 16 ,
  6 1 2 3 4 17 -> 19 6 7 8 4 5 18 ,
  20 1 2 3 4 5 -> 21 6 7 8 4 5 9 ,
  20 1 2 3 4 10 -> 21 6 7 8 4 5 2 ,
  20 1 2 3 4 8 -> 21 6 7 8 4 5 11 ,
  20 1 2 3 4 12 -> 21 6 7 8 4 5 13 ,
  20 1 2 3 4 14 -> 21 6 7 8 4 5 0 ,
  20 1 2 3 4 15 -> 21 6 7 8 4 5 16 ,
  20 1 2 3 4 17 -> 21 6 7 8 4 5 18 ,
  14 1 2 3 4 5 -> 10 6 7 8 4 5 9 ,
  14 1 2 3 4 10 -> 10 6 7 8 4 5 2 ,
  14 1 2 3 4 8 -> 10 6 7 8 4 5 11 ,
  14 1 2 3 4 12 -> 10 6 7 8 4 5 13 ,
  14 1 2 3 4 14 -> 10 6 7 8 4 5 0 ,
  14 1 2 3 4 15 -> 10 6 7 8 4 5 16 ,
  14 1 2 3 4 17 -> 10 6 7 8 4 5 18 ,
  22 1 2 3 4 5 -> 23 6 7 8 4 5 9 ,
  22 1 2 3 4 10 -> 23 6 7 8 4 5 2 ,
  22 1 2 3 4 8 -> 23 6 7 8 4 5 11 ,
  22 1 2 3 4 12 -> 23 6 7 8 4 5 13 ,
  22 1 2 3 4 14 -> 23 6 7 8 4 5 0 ,
  22 1 2 3 4 15 -> 23 6 7 8 4 5 16 ,
  22 1 2 3 4 17 -> 23 6 7 8 4 5 18 ,
  24 1 2 3 4 5 -> 25 6 7 8 4 5 9 ,
  24 1 2 3 4 10 -> 25 6 7 8 4 5 2 ,
  24 1 2 3 4 8 -> 25 6 7 8 4 5 11 ,
  24 1 2 3 4 12 -> 25 6 7 8 4 5 13 ,
  24 1 2 3 4 14 -> 25 6 7 8 4 5 0 ,
  24 1 2 3 4 15 -> 25 6 7 8 4 5 16 ,
  24 1 2 3 4 17 -> 25 6 7 8 4 5 18 ,
  26 1 2 3 4 5 -> 27 6 7 8 4 5 9 ,
  26 1 2 3 4 10 -> 27 6 7 8 4 5 2 ,
  26 1 2 3 4 8 -> 27 6 7 8 4 5 11 ,
  26 1 2 3 4 12 -> 27 6 7 8 4 5 13 ,
  26 1 2 3 4 14 -> 27 6 7 8 4 5 0 ,
  26 1 2 3 4 15 -> 27 6 7 8 4 5 16 ,
  26 1 2 3 4 17 -> 27 6 7 8 4 5 18 ,
  0 23 28 13 15 29 -> 9 2 19 6 7 15 29 ,
  0 23 28 13 15 25 -> 9 2 19 6 7 15 25 ,
  0 23 28 13 15 30 -> 9 2 19 6 7 15 30 ,
  0 23 28 13 15 31 -> 9 2 19 6 7 15 31 ,
  0 23 28 13 15 24 -> 9 2 19 6 7 15 24 ,
  0 23 28 13 15 32 -> 9 2 19 6 7 15 32 ,
  0 23 28 13 15 33 -> 9 2 19 6 7 15 33 ,
  6 23 28 13 15 29 -> 28 2 19 6 7 15 29 ,
  6 23 28 13 15 25 -> 28 2 19 6 7 15 25 ,
  6 23 28 13 15 30 -> 28 2 19 6 7 15 30 ,
  6 23 28 13 15 31 -> 28 2 19 6 7 15 31 ,
  6 23 28 13 15 24 -> 28 2 19 6 7 15 24 ,
  6 23 28 13 15 32 -> 28 2 19 6 7 15 32 ,
  6 23 28 13 15 33 -> 28 2 19 6 7 15 33 ,
  20 23 28 13 15 29 -> 34 2 19 6 7 15 29 ,
  20 23 28 13 15 25 -> 34 2 19 6 7 15 25 ,
  20 23 28 13 15 30 -> 34 2 19 6 7 15 30 ,
  20 23 28 13 15 31 -> 34 2 19 6 7 15 31 ,
  20 23 28 13 15 24 -> 34 2 19 6 7 15 24 ,
  20 23 28 13 15 32 -> 34 2 19 6 7 15 32 ,
  20 23 28 13 15 33 -> 34 2 19 6 7 15 33 ,
  14 23 28 13 15 29 -> 5 2 19 6 7 15 29 ,
  14 23 28 13 15 25 -> 5 2 19 6 7 15 25 ,
  14 23 28 13 15 30 -> 5 2 19 6 7 15 30 ,
  14 23 28 13 15 31 -> 5 2 19 6 7 15 31 ,
  14 23 28 13 15 24 -> 5 2 19 6 7 15 24 ,
  14 23 28 13 15 32 -> 5 2 19 6 7 15 32 ,
  14 23 28 13 15 33 -> 5 2 19 6 7 15 33 ,
  22 23 28 13 15 29 -> 1 2 19 6 7 15 29 ,
  22 23 28 13 15 25 -> 1 2 19 6 7 15 25 ,
  22 23 28 13 15 30 -> 1 2 19 6 7 15 30 ,
  22 23 28 13 15 31 -> 1 2 19 6 7 15 31 ,
  22 23 28 13 15 24 -> 1 2 19 6 7 15 24 ,
  22 23 28 13 15 32 -> 1 2 19 6 7 15 32 ,
  22 23 28 13 15 33 -> 1 2 19 6 7 15 33 ,
  24 23 28 13 15 29 -> 29 2 19 6 7 15 29 ,
  24 23 28 13 15 25 -> 29 2 19 6 7 15 25 ,
  24 23 28 13 15 30 -> 29 2 19 6 7 15 30 ,
  24 23 28 13 15 31 -> 29 2 19 6 7 15 31 ,
  24 23 28 13 15 24 -> 29 2 19 6 7 15 24 ,
  24 23 28 13 15 32 -> 29 2 19 6 7 15 32 ,
  24 23 28 13 15 33 -> 29 2 19 6 7 15 33 ,
  26 23 28 13 15 29 -> 35 2 19 6 7 15 29 ,
  26 23 28 13 15 25 -> 35 2 19 6 7 15 25 ,
  26 23 28 13 15 30 -> 35 2 19 6 7 15 30 ,
  26 23 28 13 15 31 -> 35 2 19 6 7 15 31 ,
  26 23 28 13 15 24 -> 35 2 19 6 7 15 24 ,
  26 23 28 13 15 32 -> 35 2 19 6 7 15 32 ,
  26 23 28 13 15 33 -> 35 2 19 6 7 15 33 ,
  9 2 28 13 15 29 -> 9 9 16 25 6 7 5 ,
  9 2 28 13 15 25 -> 9 9 16 25 6 7 10 ,
  9 2 28 13 15 30 -> 9 9 16 25 6 7 8 ,
  9 2 28 13 15 31 -> 9 9 16 25 6 7 12 ,
  9 2 28 13 15 24 -> 9 9 16 25 6 7 14 ,
  9 2 28 13 15 32 -> 9 9 16 25 6 7 15 ,
  28 2 28 13 15 29 -> 28 9 16 25 6 7 5 ,
  28 2 28 13 15 25 -> 28 9 16 25 6 7 10 ,
  28 2 28 13 15 30 -> 28 9 16 25 6 7 8 ,
  28 2 28 13 15 31 -> 28 9 16 25 6 7 12 ,
  28 2 28 13 15 24 -> 28 9 16 25 6 7 14 ,
  28 2 28 13 15 32 -> 28 9 16 25 6 7 15 ,
  34 2 28 13 15 29 -> 34 9 16 25 6 7 5 ,
  34 2 28 13 15 25 -> 34 9 16 25 6 7 10 ,
  34 2 28 13 15 30 -> 34 9 16 25 6 7 8 ,
  34 2 28 13 15 31 -> 34 9 16 25 6 7 12 ,
  34 2 28 13 15 24 -> 34 9 16 25 6 7 14 ,
  34 2 28 13 15 32 -> 34 9 16 25 6 7 15 ,
  5 2 28 13 15 29 -> 5 9 16 25 6 7 5 ,
  5 2 28 13 15 25 -> 5 9 16 25 6 7 10 ,
  5 2 28 13 15 30 -> 5 9 16 25 6 7 8 ,
  5 2 28 13 15 31 -> 5 9 16 25 6 7 12 ,
  5 2 28 13 15 24 -> 5 9 16 25 6 7 14 ,
  5 2 28 13 15 32 -> 5 9 16 25 6 7 15 ,
  1 2 28 13 15 29 -> 1 9 16 25 6 7 5 ,
  1 2 28 13 15 25 -> 1 9 16 25 6 7 10 ,
  1 2 28 13 15 30 -> 1 9 16 25 6 7 8 ,
  1 2 28 13 15 31 -> 1 9 16 25 6 7 12 ,
  1 2 28 13 15 24 -> 1 9 16 25 6 7 14 ,
  1 2 28 13 15 32 -> 1 9 16 25 6 7 15 ,
  29 2 28 13 15 29 -> 29 9 16 25 6 7 5 ,
  29 2 28 13 15 25 -> 29 9 16 25 6 7 10 ,
  29 2 28 13 15 30 -> 29 9 16 25 6 7 8 ,
  29 2 28 13 15 31 -> 29 9 16 25 6 7 12 ,
  29 2 28 13 15 24 -> 29 9 16 25 6 7 14 ,
  29 2 28 13 15 32 -> 29 9 16 25 6 7 15 ,
  35 2 28 13 15 29 -> 35 9 16 25 6 7 5 ,
  35 2 28 13 15 25 -> 35 9 16 25 6 7 10 ,
  35 2 28 13 15 30 -> 35 9 16 25 6 7 8 ,
  35 2 28 13 15 31 -> 35 9 16 25 6 7 12 ,
  35 2 28 13 15 24 -> 35 9 16 25 6 7 14 ,
  35 2 28 13 15 32 -> 35 9 16 25 6 7 15 ,
  11 21 6 36 37 29 -> 0 1 11 38 21 39 29 ,
  11 21 6 36 37 25 -> 0 1 11 38 21 39 25 ,
  11 21 6 36 37 30 -> 0 1 11 38 21 39 30 ,
  11 21 6 36 37 31 -> 0 1 11 38 21 39 31 ,
  11 21 6 36 37 24 -> 0 1 11 38 21 39 24 ,
  11 21 6 36 37 32 -> 0 1 11 38 21 39 32 ,
  11 21 6 36 37 33 -> 0 1 11 38 21 39 33 ,
  3 21 6 36 37 29 -> 6 1 11 38 21 39 29 ,
  3 21 6 36 37 25 -> 6 1 11 38 21 39 25 ,
  3 21 6 36 37 30 -> 6 1 11 38 21 39 30 ,
  3 21 6 36 37 31 -> 6 1 11 38 21 39 31 ,
  3 21 6 36 37 24 -> 6 1 11 38 21 39 24 ,
  3 21 6 36 37 32 -> 6 1 11 38 21 39 32 ,
  3 21 6 36 37 33 -> 6 1 11 38 21 39 33 ,
  38 21 6 36 37 29 -> 20 1 11 38 21 39 29 ,
  38 21 6 36 37 25 -> 20 1 11 38 21 39 25 ,
  38 21 6 36 37 30 -> 20 1 11 38 21 39 30 ,
  38 21 6 36 37 31 -> 20 1 11 38 21 39 31 ,
  38 21 6 36 37 24 -> 20 1 11 38 21 39 24 ,
  38 21 6 36 37 32 -> 20 1 11 38 21 39 32 ,
  38 21 6 36 37 33 -> 20 1 11 38 21 39 33 ,
  8 21 6 36 37 29 -> 14 1 11 38 21 39 29 ,
  8 21 6 36 37 25 -> 14 1 11 38 21 39 25 ,
  8 21 6 36 37 30 -> 14 1 11 38 21 39 30 ,
  8 21 6 36 37 31 -> 14 1 11 38 21 39 31 ,
  8 21 6 36 37 24 -> 14 1 11 38 21 39 24 ,
  8 21 6 36 37 32 -> 14 1 11 38 21 39 32 ,
  8 21 6 36 37 33 -> 14 1 11 38 21 39 33 ,
  36 21 6 36 37 29 -> 22 1 11 38 21 39 29 ,
  36 21 6 36 37 25 -> 22 1 11 38 21 39 25 ,
  36 21 6 36 37 30 -> 22 1 11 38 21 39 30 ,
  36 21 6 36 37 31 -> 22 1 11 38 21 39 31 ,
  36 21 6 36 37 24 -> 22 1 11 38 21 39 24 ,
  36 21 6 36 37 32 -> 22 1 11 38 21 39 32 ,
  36 21 6 36 37 33 -> 22 1 11 38 21 39 33 ,
  30 21 6 36 37 29 -> 24 1 11 38 21 39 29 ,
  30 21 6 36 37 25 -> 24 1 11 38 21 39 25 ,
  30 21 6 36 37 30 -> 24 1 11 38 21 39 30 ,
  30 21 6 36 37 31 -> 24 1 11 38 21 39 31 ,
  30 21 6 36 37 24 -> 24 1 11 38 21 39 24 ,
  30 21 6 36 37 32 -> 24 1 11 38 21 39 32 ,
  30 21 6 36 37 33 -> 24 1 11 38 21 39 33 ,
  40 21 6 36 37 29 -> 26 1 11 38 21 39 29 ,
  40 21 6 36 37 25 -> 26 1 11 38 21 39 25 ,
  40 21 6 36 37 30 -> 26 1 11 38 21 39 30 ,
  40 21 6 36 37 31 -> 26 1 11 38 21 39 31 ,
  40 21 6 36 37 24 -> 26 1 11 38 21 39 24 ,
  40 21 6 36 37 32 -> 26 1 11 38 21 39 32 ,
  40 21 6 36 37 33 -> 26 1 11 38 21 39 33 ,
  9 2 6 36 37 29 -> 9 11 34 0 23 39 29 ,
  9 2 6 36 37 25 -> 9 11 34 0 23 39 25 ,
  9 2 6 36 37 30 -> 9 11 34 0 23 39 30 ,
  9 2 6 36 37 31 -> 9 11 34 0 23 39 31 ,
  9 2 6 36 37 24 -> 9 11 34 0 23 39 24 ,
  9 2 6 36 37 32 -> 9 11 34 0 23 39 32 ,
  9 2 6 36 37 33 -> 9 11 34 0 23 39 33 ,
  28 2 6 36 37 29 -> 28 11 34 0 23 39 29 ,
  28 2 6 36 37 25 -> 28 11 34 0 23 39 25 ,
  28 2 6 36 37 30 -> 28 11 34 0 23 39 30 ,
  28 2 6 36 37 31 -> 28 11 34 0 23 39 31 ,
  28 2 6 36 37 24 -> 28 11 34 0 23 39 24 ,
  28 2 6 36 37 32 -> 28 11 34 0 23 39 32 ,
  28 2 6 36 37 33 -> 28 11 34 0 23 39 33 ,
  34 2 6 36 37 29 -> 34 11 34 0 23 39 29 ,
  34 2 6 36 37 25 -> 34 11 34 0 23 39 25 ,
  34 2 6 36 37 30 -> 34 11 34 0 23 39 30 ,
  34 2 6 36 37 31 -> 34 11 34 0 23 39 31 ,
  34 2 6 36 37 24 -> 34 11 34 0 23 39 24 ,
  34 2 6 36 37 32 -> 34 11 34 0 23 39 32 ,
  34 2 6 36 37 33 -> 34 11 34 0 23 39 33 ,
  5 2 6 36 37 29 -> 5 11 34 0 23 39 29 ,
  5 2 6 36 37 25 -> 5 11 34 0 23 39 25 ,
  5 2 6 36 37 30 -> 5 11 34 0 23 39 30 ,
  5 2 6 36 37 31 -> 5 11 34 0 23 39 31 ,
  5 2 6 36 37 24 -> 5 11 34 0 23 39 24 ,
  5 2 6 36 37 32 -> 5 11 34 0 23 39 32 ,
  5 2 6 36 37 33 -> 5 11 34 0 23 39 33 ,
  1 2 6 36 37 29 -> 1 11 34 0 23 39 29 ,
  1 2 6 36 37 25 -> 1 11 34 0 23 39 25 ,
  1 2 6 36 37 30 -> 1 11 34 0 23 39 30 ,
  1 2 6 36 37 31 -> 1 11 34 0 23 39 31 ,
  1 2 6 36 37 24 -> 1 11 34 0 23 39 24 ,
  1 2 6 36 37 32 -> 1 11 34 0 23 39 32 ,
  1 2 6 36 37 33 -> 1 11 34 0 23 39 33 ,
  29 2 6 36 37 29 -> 29 11 34 0 23 39 29 ,
  29 2 6 36 37 25 -> 29 11 34 0 23 39 25 ,
  29 2 6 36 37 30 -> 29 11 34 0 23 39 30 ,
  29 2 6 36 37 31 -> 29 11 34 0 23 39 31 ,
  29 2 6 36 37 24 -> 29 11 34 0 23 39 24 ,
  29 2 6 36 37 32 -> 29 11 34 0 23 39 32 ,
  29 2 6 36 37 33 -> 29 11 34 0 23 39 33 ,
  35 2 6 36 37 29 -> 35 11 34 0 23 39 29 ,
  35 2 6 36 37 25 -> 35 11 34 0 23 39 25 ,
  35 2 6 36 37 30 -> 35 11 34 0 23 39 30 ,
  35 2 6 36 37 31 -> 35 11 34 0 23 39 31 ,
  35 2 6 36 37 24 -> 35 11 34 0 23 39 24 ,
  35 2 6 36 37 32 -> 35 11 34 0 23 39 32 ,
  35 2 6 36 37 33 -> 35 11 34 0 23 39 33 ,
  0 36 21 6 41 29 -> 16 24 36 21 6 7 5 ,
  0 36 21 6 41 25 -> 16 24 36 21 6 7 10 ,
  0 36 21 6 41 30 -> 16 24 36 21 6 7 8 ,
  0 36 21 6 41 31 -> 16 24 36 21 6 7 12 ,
  0 36 21 6 41 24 -> 16 24 36 21 6 7 14 ,
  0 36 21 6 41 32 -> 16 24 36 21 6 7 15 ,
  6 36 21 6 41 29 -> 39 24 36 21 6 7 5 ,
  6 36 21 6 41 25 -> 39 24 36 21 6 7 10 ,
  6 36 21 6 41 30 -> 39 24 36 21 6 7 8 ,
  6 36 21 6 41 31 -> 39 24 36 21 6 7 12 ,
  6 36 21 6 41 24 -> 39 24 36 21 6 7 14 ,
  6 36 21 6 41 32 -> 39 24 36 21 6 7 15 ,
  20 36 21 6 41 29 -> 37 24 36 21 6 7 5 ,
  20 36 21 6 41 25 -> 37 24 36 21 6 7 10 ,
  20 36 21 6 41 30 -> 37 24 36 21 6 7 8 ,
  20 36 21 6 41 31 -> 37 24 36 21 6 7 12 ,
  20 36 21 6 41 24 -> 37 24 36 21 6 7 14 ,
  20 36 21 6 41 32 -> 37 24 36 21 6 7 15 ,
  14 36 21 6 41 29 -> 15 24 36 21 6 7 5 ,
  14 36 21 6 41 25 -> 15 24 36 21 6 7 10 ,
  14 36 21 6 41 30 -> 15 24 36 21 6 7 8 ,
  14 36 21 6 41 31 -> 15 24 36 21 6 7 12 ,
  14 36 21 6 41 24 -> 15 24 36 21 6 7 14 ,
  14 36 21 6 41 32 -> 15 24 36 21 6 7 15 ,
  22 36 21 6 41 29 -> 41 24 36 21 6 7 5 ,
  22 36 21 6 41 25 -> 41 24 36 21 6 7 10 ,
  22 36 21 6 41 30 -> 41 24 36 21 6 7 8 ,
  22 36 21 6 41 31 -> 41 24 36 21 6 7 12 ,
  22 36 21 6 41 24 -> 41 24 36 21 6 7 14 ,
  22 36 21 6 41 32 -> 41 24 36 21 6 7 15 ,
  24 36 21 6 41 29 -> 32 24 36 21 6 7 5 ,
  24 36 21 6 41 25 -> 32 24 36 21 6 7 10 ,
  24 36 21 6 41 30 -> 32 24 36 21 6 7 8 ,
  24 36 21 6 41 31 -> 32 24 36 21 6 7 12 ,
  24 36 21 6 41 24 -> 32 24 36 21 6 7 14 ,
  24 36 21 6 41 32 -> 32 24 36 21 6 7 15 ,
  26 36 21 6 41 29 -> 42 24 36 21 6 7 5 ,
  26 36 21 6 41 25 -> 42 24 36 21 6 7 10 ,
  26 36 21 6 41 30 -> 42 24 36 21 6 7 8 ,
  26 36 21 6 41 31 -> 42 24 36 21 6 7 12 ,
  26 36 21 6 41 24 -> 42 24 36 21 6 7 14 ,
  26 36 21 6 41 32 -> 42 24 36 21 6 7 15 ,
  9 16 25 6 41 29 -> 9 2 39 31 15 24 1 ,
  9 16 25 6 41 25 -> 9 2 39 31 15 24 23 ,
  9 16 25 6 41 30 -> 9 2 39 31 15 24 36 ,
  9 16 25 6 41 31 -> 9 2 39 31 15 24 7 ,
  9 16 25 6 41 24 -> 9 2 39 31 15 24 22 ,
  9 16 25 6 41 32 -> 9 2 39 31 15 24 41 ,
  28 16 25 6 41 29 -> 28 2 39 31 15 24 1 ,
  28 16 25 6 41 25 -> 28 2 39 31 15 24 23 ,
  28 16 25 6 41 30 -> 28 2 39 31 15 24 36 ,
  28 16 25 6 41 31 -> 28 2 39 31 15 24 7 ,
  28 16 25 6 41 24 -> 28 2 39 31 15 24 22 ,
  28 16 25 6 41 32 -> 28 2 39 31 15 24 41 ,
  34 16 25 6 41 29 -> 34 2 39 31 15 24 1 ,
  34 16 25 6 41 25 -> 34 2 39 31 15 24 23 ,
  34 16 25 6 41 30 -> 34 2 39 31 15 24 36 ,
  34 16 25 6 41 31 -> 34 2 39 31 15 24 7 ,
  34 16 25 6 41 24 -> 34 2 39 31 15 24 22 ,
  34 16 25 6 41 32 -> 34 2 39 31 15 24 41 ,
  5 16 25 6 41 29 -> 5 2 39 31 15 24 1 ,
  5 16 25 6 41 25 -> 5 2 39 31 15 24 23 ,
  5 16 25 6 41 30 -> 5 2 39 31 15 24 36 ,
  5 16 25 6 41 31 -> 5 2 39 31 15 24 7 ,
  5 16 25 6 41 24 -> 5 2 39 31 15 24 22 ,
  5 16 25 6 41 32 -> 5 2 39 31 15 24 41 ,
  1 16 25 6 41 29 -> 1 2 39 31 15 24 1 ,
  1 16 25 6 41 25 -> 1 2 39 31 15 24 23 ,
  1 16 25 6 41 30 -> 1 2 39 31 15 24 36 ,
  1 16 25 6 41 31 -> 1 2 39 31 15 24 7 ,
  1 16 25 6 41 24 -> 1 2 39 31 15 24 22 ,
  1 16 25 6 41 32 -> 1 2 39 31 15 24 41 ,
  29 16 25 6 41 29 -> 29 2 39 31 15 24 1 ,
  29 16 25 6 41 25 -> 29 2 39 31 15 24 23 ,
  29 16 25 6 41 30 -> 29 2 39 31 15 24 36 ,
  29 16 25 6 41 31 -> 29 2 39 31 15 24 7 ,
  29 16 25 6 41 24 -> 29 2 39 31 15 24 22 ,
  29 16 25 6 41 32 -> 29 2 39 31 15 24 41 ,
  35 16 25 6 41 29 -> 35 2 39 31 15 24 1 ,
  35 16 25 6 41 25 -> 35 2 39 31 15 24 23 ,
  35 16 25 6 41 30 -> 35 2 39 31 15 24 36 ,
  35 16 25 6 41 31 -> 35 2 39 31 15 24 7 ,
  35 16 25 6 41 24 -> 35 2 39 31 15 24 22 ,
  35 16 25 6 41 32 -> 35 2 39 31 15 24 41 ,
  0 23 3 34 16 29 -> 11 20 7 10 28 16 29 ,
  0 23 3 34 16 25 -> 11 20 7 10 28 16 25 ,
  0 23 3 34 16 30 -> 11 20 7 10 28 16 30 ,
  0 23 3 34 16 31 -> 11 20 7 10 28 16 31 ,
  0 23 3 34 16 24 -> 11 20 7 10 28 16 24 ,
  0 23 3 34 16 32 -> 11 20 7 10 28 16 32 ,
  0 23 3 34 16 33 -> 11 20 7 10 28 16 33 ,
  6 23 3 34 16 29 -> 3 20 7 10 28 16 29 ,
  6 23 3 34 16 25 -> 3 20 7 10 28 16 25 ,
  6 23 3 34 16 30 -> 3 20 7 10 28 16 30 ,
  6 23 3 34 16 31 -> 3 20 7 10 28 16 31 ,
  6 23 3 34 16 24 -> 3 20 7 10 28 16 24 ,
  6 23 3 34 16 32 -> 3 20 7 10 28 16 32 ,
  6 23 3 34 16 33 -> 3 20 7 10 28 16 33 ,
  20 23 3 34 16 29 -> 38 20 7 10 28 16 29 ,
  20 23 3 34 16 25 -> 38 20 7 10 28 16 25 ,
  20 23 3 34 16 30 -> 38 20 7 10 28 16 30 ,
  20 23 3 34 16 31 -> 38 20 7 10 28 16 31 ,
  20 23 3 34 16 24 -> 38 20 7 10 28 16 24 ,
  20 23 3 34 16 32 -> 38 20 7 10 28 16 32 ,
  20 23 3 34 16 33 -> 38 20 7 10 28 16 33 ,
  14 23 3 34 16 29 -> 8 20 7 10 28 16 29 ,
  14 23 3 34 16 25 -> 8 20 7 10 28 16 25 ,
  14 23 3 34 16 30 -> 8 20 7 10 28 16 30 ,
  14 23 3 34 16 31 -> 8 20 7 10 28 16 31 ,
  14 23 3 34 16 24 -> 8 20 7 10 28 16 24 ,
  14 23 3 34 16 32 -> 8 20 7 10 28 16 32 ,
  14 23 3 34 16 33 -> 8 20 7 10 28 16 33 ,
  22 23 3 34 16 29 -> 36 20 7 10 28 16 29 ,
  22 23 3 34 16 25 -> 36 20 7 10 28 16 25 ,
  22 23 3 34 16 30 -> 36 20 7 10 28 16 30 ,
  22 23 3 34 16 31 -> 36 20 7 10 28 16 31 ,
  22 23 3 34 16 24 -> 36 20 7 10 28 16 24 ,
  22 23 3 34 16 32 -> 36 20 7 10 28 16 32 ,
  22 23 3 34 16 33 -> 36 20 7 10 28 16 33 ,
  24 23 3 34 16 29 -> 30 20 7 10 28 16 29 ,
  24 23 3 34 16 25 -> 30 20 7 10 28 16 25 ,
  24 23 3 34 16 30 -> 30 20 7 10 28 16 30 ,
  24 23 3 34 16 31 -> 30 20 7 10 28 16 31 ,
  24 23 3 34 16 24 -> 30 20 7 10 28 16 24 ,
  24 23 3 34 16 32 -> 30 20 7 10 28 16 32 ,
  24 23 3 34 16 33 -> 30 20 7 10 28 16 33 ,
  26 23 3 34 16 29 -> 40 20 7 10 28 16 29 ,
  26 23 3 34 16 25 -> 40 20 7 10 28 16 25 ,
  26 23 3 34 16 30 -> 40 20 7 10 28 16 30 ,
  26 23 3 34 16 31 -> 40 20 7 10 28 16 31 ,
  26 23 3 34 16 24 -> 40 20 7 10 28 16 24 ,
  26 23 3 34 16 32 -> 40 20 7 10 28 16 32 ,
  26 23 3 34 16 33 -> 40 20 7 10 28 16 33 }


The system was filtered by the following matrix interpretation
of type E_J with J = {1,...,2} and dimension 2:

0 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
1 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
2 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
3 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
4 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
5 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
6 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
7 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
8 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
9 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
10 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
11 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
12 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
13 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
14 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
15 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
16 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
17 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
18 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
19 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
20 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
21 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
22 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
23 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
24 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
25 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
26 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
27 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
28 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
29 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
30 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
31 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
32 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
33 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
34 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
35 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
36 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
37 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
38 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
39 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
40 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
41 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
42 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /

After renaming modulo { 0->0, 36->1, 21->2, 6->3, 41->4, 25->5, 16->6, 24->7, 7->8, 10->9, 30->10, 8->11, 31->12, 12->13, 14->14, 32->15, 15->16, 20->17, 37->18, 22->19, 9->20, 29->21, 2->22, 39->23, 1->24, 23->25, 28->26, 34->27, 5->28, 35->29, 3->30, 33->31, 26->32, 40->33 }, 
it remains to prove termination of the 95-rule system
{ 0 1 2 3 4 5 -> 6 7 1 2 3 8 9 ,
  0 1 2 3 4 10 -> 6 7 1 2 3 8 11 ,
  0 1 2 3 4 12 -> 6 7 1 2 3 8 13 ,
  0 1 2 3 4 7 -> 6 7 1 2 3 8 14 ,
  0 1 2 3 4 15 -> 6 7 1 2 3 8 16 ,
  17 1 2 3 4 5 -> 18 7 1 2 3 8 9 ,
  17 1 2 3 4 10 -> 18 7 1 2 3 8 11 ,
  17 1 2 3 4 12 -> 18 7 1 2 3 8 13 ,
  17 1 2 3 4 7 -> 18 7 1 2 3 8 14 ,
  17 1 2 3 4 15 -> 18 7 1 2 3 8 16 ,
  14 1 2 3 4 5 -> 16 7 1 2 3 8 9 ,
  14 1 2 3 4 10 -> 16 7 1 2 3 8 11 ,
  14 1 2 3 4 12 -> 16 7 1 2 3 8 13 ,
  14 1 2 3 4 7 -> 16 7 1 2 3 8 14 ,
  14 1 2 3 4 15 -> 16 7 1 2 3 8 16 ,
  19 1 2 3 4 5 -> 4 7 1 2 3 8 9 ,
  19 1 2 3 4 10 -> 4 7 1 2 3 8 11 ,
  19 1 2 3 4 12 -> 4 7 1 2 3 8 13 ,
  19 1 2 3 4 7 -> 4 7 1 2 3 8 14 ,
  19 1 2 3 4 15 -> 4 7 1 2 3 8 16 ,
  7 1 2 3 4 5 -> 15 7 1 2 3 8 9 ,
  7 1 2 3 4 10 -> 15 7 1 2 3 8 11 ,
  7 1 2 3 4 12 -> 15 7 1 2 3 8 13 ,
  7 1 2 3 4 7 -> 15 7 1 2 3 8 14 ,
  7 1 2 3 4 15 -> 15 7 1 2 3 8 16 ,
  20 6 5 3 4 21 -> 20 22 23 12 16 7 24 ,
  20 6 5 3 4 5 -> 20 22 23 12 16 7 25 ,
  20 6 5 3 4 10 -> 20 22 23 12 16 7 1 ,
  20 6 5 3 4 7 -> 20 22 23 12 16 7 19 ,
  20 6 5 3 4 15 -> 20 22 23 12 16 7 4 ,
  26 6 5 3 4 21 -> 26 22 23 12 16 7 24 ,
  26 6 5 3 4 5 -> 26 22 23 12 16 7 25 ,
  26 6 5 3 4 10 -> 26 22 23 12 16 7 1 ,
  26 6 5 3 4 7 -> 26 22 23 12 16 7 19 ,
  26 6 5 3 4 15 -> 26 22 23 12 16 7 4 ,
  27 6 5 3 4 21 -> 27 22 23 12 16 7 24 ,
  27 6 5 3 4 5 -> 27 22 23 12 16 7 25 ,
  27 6 5 3 4 10 -> 27 22 23 12 16 7 1 ,
  27 6 5 3 4 7 -> 27 22 23 12 16 7 19 ,
  27 6 5 3 4 15 -> 27 22 23 12 16 7 4 ,
  28 6 5 3 4 21 -> 28 22 23 12 16 7 24 ,
  28 6 5 3 4 5 -> 28 22 23 12 16 7 25 ,
  28 6 5 3 4 10 -> 28 22 23 12 16 7 1 ,
  28 6 5 3 4 7 -> 28 22 23 12 16 7 19 ,
  28 6 5 3 4 15 -> 28 22 23 12 16 7 4 ,
  24 6 5 3 4 21 -> 24 22 23 12 16 7 24 ,
  24 6 5 3 4 5 -> 24 22 23 12 16 7 25 ,
  24 6 5 3 4 10 -> 24 22 23 12 16 7 1 ,
  24 6 5 3 4 7 -> 24 22 23 12 16 7 19 ,
  24 6 5 3 4 15 -> 24 22 23 12 16 7 4 ,
  21 6 5 3 4 21 -> 21 22 23 12 16 7 24 ,
  21 6 5 3 4 5 -> 21 22 23 12 16 7 25 ,
  21 6 5 3 4 10 -> 21 22 23 12 16 7 1 ,
  21 6 5 3 4 7 -> 21 22 23 12 16 7 19 ,
  21 6 5 3 4 15 -> 21 22 23 12 16 7 4 ,
  29 6 5 3 4 21 -> 29 22 23 12 16 7 24 ,
  29 6 5 3 4 5 -> 29 22 23 12 16 7 25 ,
  29 6 5 3 4 10 -> 29 22 23 12 16 7 1 ,
  29 6 5 3 4 7 -> 29 22 23 12 16 7 19 ,
  29 6 5 3 4 15 -> 29 22 23 12 16 7 4 ,
  3 25 30 27 6 21 -> 30 17 8 9 26 6 21 ,
  3 25 30 27 6 5 -> 30 17 8 9 26 6 5 ,
  3 25 30 27 6 10 -> 30 17 8 9 26 6 10 ,
  3 25 30 27 6 12 -> 30 17 8 9 26 6 12 ,
  3 25 30 27 6 7 -> 30 17 8 9 26 6 7 ,
  3 25 30 27 6 15 -> 30 17 8 9 26 6 15 ,
  3 25 30 27 6 31 -> 30 17 8 9 26 6 31 ,
  14 25 30 27 6 21 -> 11 17 8 9 26 6 21 ,
  14 25 30 27 6 5 -> 11 17 8 9 26 6 5 ,
  14 25 30 27 6 10 -> 11 17 8 9 26 6 10 ,
  14 25 30 27 6 12 -> 11 17 8 9 26 6 12 ,
  14 25 30 27 6 7 -> 11 17 8 9 26 6 7 ,
  14 25 30 27 6 15 -> 11 17 8 9 26 6 15 ,
  14 25 30 27 6 31 -> 11 17 8 9 26 6 31 ,
  19 25 30 27 6 21 -> 1 17 8 9 26 6 21 ,
  19 25 30 27 6 5 -> 1 17 8 9 26 6 5 ,
  19 25 30 27 6 10 -> 1 17 8 9 26 6 10 ,
  19 25 30 27 6 12 -> 1 17 8 9 26 6 12 ,
  19 25 30 27 6 7 -> 1 17 8 9 26 6 7 ,
  19 25 30 27 6 15 -> 1 17 8 9 26 6 15 ,
  19 25 30 27 6 31 -> 1 17 8 9 26 6 31 ,
  7 25 30 27 6 21 -> 10 17 8 9 26 6 21 ,
  7 25 30 27 6 5 -> 10 17 8 9 26 6 5 ,
  7 25 30 27 6 10 -> 10 17 8 9 26 6 10 ,
  7 25 30 27 6 12 -> 10 17 8 9 26 6 12 ,
  7 25 30 27 6 7 -> 10 17 8 9 26 6 7 ,
  7 25 30 27 6 15 -> 10 17 8 9 26 6 15 ,
  7 25 30 27 6 31 -> 10 17 8 9 26 6 31 ,
  32 25 30 27 6 21 -> 33 17 8 9 26 6 21 ,
  32 25 30 27 6 5 -> 33 17 8 9 26 6 5 ,
  32 25 30 27 6 10 -> 33 17 8 9 26 6 10 ,
  32 25 30 27 6 12 -> 33 17 8 9 26 6 12 ,
  32 25 30 27 6 7 -> 33 17 8 9 26 6 7 ,
  32 25 30 27 6 15 -> 33 17 8 9 26 6 15 ,
  32 25 30 27 6 31 -> 33 17 8 9 26 6 31 }


The system was filtered by the following matrix interpretation
of type E_J with J = {1,...,2} and dimension 2:

0 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
1 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
2 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
3 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
4 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
5 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
6 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
7 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
8 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
9 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
10 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
11 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
12 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
13 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
14 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
15 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
16 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
17 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
18 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
19 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
20 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
21 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
22 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
23 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
24 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
25 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
26 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
27 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
28 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
29 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
30 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
31 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
32 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
33 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /

After renaming modulo { 0->0, 1->1, 2->2, 3->3, 4->4, 7->5, 6->6, 8->7, 14->8, 19->9, 15->10 }, 
it remains to prove termination of the 3-rule system
{ 0 1 2 3 4 5 -> 6 5 1 2 3 7 8 ,
  9 1 2 3 4 5 -> 4 5 1 2 3 7 8 ,
  5 1 2 3 4 5 -> 10 5 1 2 3 7 8 }


The system was filtered by the following matrix interpretation
of type E_J with J = {1,...,2} and dimension 2:

0 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
1 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
2 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
3 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
4 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
5 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
6 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
7 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
8 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /
9 is interpreted by
 /   \
| 1 1 |
| 0 1 |
 \   /
10 is interpreted by
 /   \
| 1 0 |
| 0 1 |
 \   /

After renaming modulo {  }, 
it remains to prove termination of the 0-rule system
{ }

The system is trivially terminating.