Generated 8/31/05 2-cocycle twisted invariants Z_3[t,t^(-1)]/( 6 element quandles [0 0 0 0 0 0] [ ] [1 1 1 1 1 1] [ ] [2 2 2 2 2 2] [ ] [3 3 3 3 5 4] [ ] [4 4 4 5 4 3] [ ] [5 5 5 4 3 5] Knot, 1 [[12, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[12, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[17] + x[18]) t + 2 x[17] + 2 x[18]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[17] + 2 x[18]) t + x[17] + x[18]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[12, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[12, 0]] Knot, 25 [[6, 0], [6, (x[17] + x[18]) t + 2 x[17] + 2 x[18]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[12, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [12, (2 x[17] + 2 x[18]) t + x[17] + x[18]], [12, (x[17] + x[18]) t + 2 x[17] + 2 x[18]]] Knot, 33 [[12, 0]] Knot, 34 [[12, 0]] Knot, 35 [[12, 0]] [0 0 0 0 0 0] [ ] [1 1 1 2 2 2] [ ] [2 2 2 1 1 1] [ ] [3 3 3 3 5 4] [ ] [4 4 4 5 4 3] [ ] [5 5 5 4 3 5] Knot, 1 [[12, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[12, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[6] + x[5]) t + 2 x[6] + 2 x[5]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[5] + 2 x[6]) t + x[5] + x[6]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[12, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[12, 0]] Knot, 25 [[6, 0], [6, (x[5] + x[6]) t + 2 x[5] + 2 x[6]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[12, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [12, (2 x[6] + 2 x[5]) t + x[5] + x[6]], [12, (x[5] + x[6]) t + 2 x[6] + 2 x[5]]] Knot, 33 [[12, 0]] Knot, 34 [[12, 0]] Knot, 35 [[12, 0]] [0 0 0 0 1 2] [ ] [1 1 1 2 0 1] [ ] [2 2 2 1 2 0] [ ] [3 3 3 3 5 4] [ ] [4 4 4 5 4 3] [ ] [5 5 5 4 3 5] Knot, 1 [[12, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[12, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[3] + x[1]) t + 2 x[3] + 2 x[1]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[3] + 2 x[1]) t + x[3] + x[1]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[12, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[12, 0]] Knot, 25 [[6, 0], [6, (x[3] + x[1]) t + 2 x[3] + 2 x[1]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[12, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [12, (x[3] + x[1]) t + 2 x[3] + 2 x[1]], [12, (2 x[3] + 2 x[1]) t + x[3] + x[1]]] Knot, 33 [[12, 0]] Knot, 34 [[12, 0]] Knot, 35 [[12, 0]] [0 0 0 1 1 1] [ ] [1 1 1 2 2 2] [ ] [2 2 2 0 0 0] [ ] [3 3 3 3 5 4] [ ] [4 4 4 5 4 3] [ ] [5 5 5 4 3 5] Knot, 1 [[12, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[12, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[10] + x[1]) t + 2 x[10] + 2 x[1]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[10] + 2 x[1]) t + x[10] + x[1]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[12, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[12, 0]] Knot, 25 [[6, 0], [6, (x[10] + x[1]) t + 2 x[10] + 2 x[1]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[12, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [12, (2 x[10] + 2 x[1]) t + x[10] + x[1]], [12, (x[10] + x[1]) t + 2 x[10] + 2 x[1]]] Knot, 33 [[12, 0]] Knot, 34 [[12, 0]] Knot, 35 [[12, 0]] [0 0 0 0 0 0] [ ] [1 1 1 1 1 1] [ ] [2 2 2 2 3 3] [ ] [3 3 3 3 2 2] [ ] [4 4 5 5 4 4] [ ] [5 5 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 0 0 1 1] [ ] [1 1 1 1 0 0] [ ] [2 2 2 2 3 3] [ ] [3 3 3 3 2 2] [ ] [4 4 5 5 4 4] [ ] [5 5 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 0 1 0 0] [ ] [1 1 1 0 1 1] [ ] [2 2 2 2 5 4] [ ] [3 3 3 3 3 3] [ ] [4 4 5 4 4 2] [ ] [5 5 4 5 2 5] Knot, 1 [[12, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[12, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[3] + x[5]) t + 2 x[3] + 2 x[5]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[3] + 2 x[5]) t + x[3] + x[5]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[12, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[12, 0]] Knot, 25 [[6, 0], [6, (x[3] + x[5]) t + 2 x[3] + 2 x[5]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[12, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [12, (x[3] + x[5]) t + 2 x[3] + 2 x[5]], [12, (2 x[3] + 2 x[5]) t + x[3] + x[5]]] Knot, 33 [[12, 0]] Knot, 34 [[12, 0]] Knot, 35 [[12, 0]] [0 0 0 0 0 0] [ ] [1 1 1 1 1 1] [ ] [2 2 2 5 3 4] [ ] [3 3 4 3 5 2] [ ] [4 4 5 2 4 3] [ ] [5 5 3 4 2 5] Knot, 1 [[18, 0]] Knot, 2 [[6, 0], [2, (2 x[1] + x[6] + x[7] + x[4] + x[8]) t + x[1] + 2 x[8] + 2 x[6] + 2 x[7] + 2 x[4]], [2, (x[4] + x[8]) t + 2 x[8] + 2 x[4]], [2, (x[7] + x[2] + x[6] + x[4]) t + 2 x[6] + 2 x[2] + 2 x[7] + 2 x[4]] , [2, (2 x[8] + 2 x[4]) t + x[4] + x[8]], [2, (x[1] + 2 x[8] + 2 x[6] + 2 x[7] + 2 x[4]) t + x[7] + x[8] + x[6] + x[4] + 2 x[1]], [2, (2 x[6] + 2 x[2] + 2 x[7] + 2 x[4]) t + x[4] + x[6] + x[7] + x[2]] ] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0], [2, (x[6] + x[7] + x[4] + x[2]) t + 2 x[6] + 2 x[7] + 2 x[2] + 2 x[4]] , [2, (x[6] + x[7] + x[8] + x[4] + 2 x[1]) t + 2 x[8] + 2 x[6] + 2 x[4] + 2 x[7] + x[1]], [2, (2 x[8] + 2 x[4]) t + x[8] + x[4]], [2, (2 x[6] + 2 x[7] + 2 x[4] + 2 x[2]) t + x[6] + x[7] + x[4] + x[2]] , [2, (2 x[6] + 2 x[7] + 2 x[8] + 2 x[4] + x[1]) t + x[6] + x[7] + x[8] + x[4] + 2 x[1]], [2, (x[8] + x[4]) t + 2 x[4] + 2 x[8]]] Knot, 10 [[6, 0], [2, (x[6] + x[7] + x[4] + x[2]) t + 2 x[6] + 2 x[7] + 2 x[2] + 2 x[4]] , [2, (x[6] + x[7] + x[8] + x[4] + 2 x[1]) t + 2 x[8] + 2 x[6] + 2 x[4] + 2 x[7] + x[1]], [2, (2 x[8] + 2 x[4]) t + x[8] + x[4]], [2, (2 x[6] + 2 x[7] + 2 x[4] + 2 x[2]) t + x[6] + x[7] + x[4] + x[2]] , [2, (2 x[6] + 2 x[7] + 2 x[8] + 2 x[4] + x[1]) t + x[6] + x[7] + x[8] + x[4] + 2 x[1]], [2, (x[8] + x[4]) t + 2 x[4] + 2 x[8]]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0], [2, (x[6] + x[7] + x[4] + x[2]) t + 2 x[2] + 2 x[4] + 2 x[7] + 2 x[6]] , [2, (2 x[6] + 2 x[7] + 2 x[2] + 2 x[4]) t + x[6] + x[7] + x[4] + x[2]] , [2, (x[6] + x[7] + x[8] + x[4] + 2 x[1]) t + 2 x[6] + 2 x[4] + x[1] + 2 x[8] + 2 x[7]], [2, (2 x[8] + 2 x[4]) t + x[8] + x[4]], [2, (2 x[6] + 2 x[7] + 2 x[8] + 2 x[4] + x[1]) t + x[6] + x[7] + x[8] + x[4] + 2 x[1]], [2, (x[8] + x[4]) t + 2 x[4] + 2 x[8]]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0], [2, (x[6] + x[7] + x[8] + x[4] + 2 x[1]) t + 2 x[4] + 2 x[6] + 2 x[7] + x[1] + 2 x[8]], [2, (2 x[8] + 2 x[4]) t + x[8] + x[4]], [2, (x[8] + x[4]) t + 2 x[4] + 2 x[8]], [2, (2 x[6] + 2 x[7] + 2 x[4] + 2 x[2]) t + x[6] + x[7] + x[4] + x[2]] , [2, (x[6] + x[7] + x[4] + x[2]) t + 2 x[4] + 2 x[7] + 2 x[6] + 2 x[2]] , [2, (2 x[6] + 2 x[7] + 2 x[8] + 2 x[4] + x[1]) t + x[6] + x[7] + x[8] + x[4] + 2 x[1]]] Knot, 19 [[18, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[18, 0]] Knot, 25 [[6, 0], [2, (2 x[8] + 2 x[4]) t + x[8] + x[4]], [2, (2 x[6] + 2 x[2] + 2 x[7] + 2 x[4]) t + x[6] + x[7] + x[2] + x[4]] , [2, (x[8] + x[4]) t + 2 x[8] + 2 x[4]], [2, (x[6] + x[7] + x[2] + x[4]) t + 2 x[4] + 2 x[6] + 2 x[7] + 2 x[2]] , [2, (2 x[8] + x[1] + 2 x[6] + 2 x[7] + 2 x[4]) t + x[8] + x[6] + x[4] + x[7] + 2 x[1]], [2, (x[8] + x[6] + x[4] + x[7] + 2 x[1]) t + x[1] + 2 x[8] + 2 x[4] + 2 x[6] + 2 x[7]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0], [2, (2 x[6] + 2 x[7] + 2 x[8] + 2 x[4] + x[1]) t + 2 x[1] + x[8] + x[4] + x[7] + x[6]], [2, (x[8] + x[4]) t + 2 x[8] + 2 x[4]], [2, (2 x[6] + 2 x[7] + 2 x[4] + 2 x[2]) t + x[4] + x[6] + x[2] + x[7]] , [2, (2 x[8] + 2 x[4]) t + x[8] + x[4]], [2, (2 x[1] + x[6] + x[7] + x[8] + x[4]) t + 2 x[6] + 2 x[7] + 2 x[8] + 2 x[4] + x[1]], [2, (x[6] + x[2] + x[7] + x[4]) t + 2 x[6] + 2 x[7] + 2 x[4] + 2 x[2]] ] Knot, 28 [[6, 0]] Knot, 29 [[18, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [10, (2 x[8] + 2 x[4]) t + x[4] + x[8]], [10, (x[4] + x[8]) t + 2 x[8] + 2 x[4]], [ 10, (2 x[2] + 2 x[6] + 2 x[4] + 2 x[7]) t + x[4] + x[6] + x[2] + x[7]] , [10, (x[7] + x[8] + x[6] + x[4] + 2 x[1]) t + x[1] + 2 x[6] + 2 x[7] + 2 x[4] + 2 x[8]], [ 10, (x[4] + x[6] + x[2] + x[7]) t + 2 x[2] + 2 x[6] + 2 x[4] + 2 x[7]] , [10, (x[1] + 2 x[6] + 2 x[7] + 2 x[4] + 2 x[8]) t + x[7] + x[8] + x[6] + x[4] + 2 x[1]]] Knot, 33 [[18, 0]] Knot, 34 [[18, 0]] Knot, 35 [[18, 0]] [0 0 1 1 1 1] [ ] [1 1 0 0 0 0] [ ] [2 2 2 2 2 2] [ ] [3 3 3 3 5 4] [ ] [4 4 4 5 4 3] [ ] [5 5 5 4 3 5] Knot, 1 [[12, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[12, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[4] + x[5]) t + 2 x[4] + 2 x[5]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[4] + 2 x[5]) t + x[4] + x[5]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[12, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[12, 0]] Knot, 25 [[6, 0], [6, (x[4] + x[5]) t + 2 x[4] + 2 x[5]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[12, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [12, (x[4] + x[5]) t + 2 x[4] + 2 x[5]], [12, (2 x[4] + 2 x[5]) t + x[4] + x[5]]] Knot, 33 [[12, 0]] Knot, 34 [[12, 0]] Knot, 35 [[12, 0]] [0 0 1 1 1 1] [ ] [1 1 0 0 0 0] [ ] [2 2 2 2 3 3] [ ] [3 3 3 3 2 2] [ ] [4 4 5 5 4 4] [ ] [5 5 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 1 1 1 1] [ ] [1 1 0 0 0 0] [ ] [2 2 2 5 3 4] [ ] [3 3 4 3 5 2] [ ] [4 4 5 2 4 3] [ ] [5 5 3 4 2 5] Knot, 1 [[18, 0]] Knot, 2 [[6, 0], [2, (2 x[1] + 2 x[7] + 2 x[2] + 2 x[5]) t + x[7] + x[1] + x[2] + x[5]] , [2, (x[1] + x[2] + x[5] + 2 x[6] + x[9]) t + x[6] + 2 x[9] + 2 x[1] + 2 x[2] + 2 x[5]], [2, (x[9] + x[5]) t + 2 x[9] + 2 x[5]], [2, (x[2] + x[7] + x[1] + x[5]) t + 2 x[1] + 2 x[7] + 2 x[2] + 2 x[5]] , [2, (2 x[9] + 2 x[5]) t + x[9] + x[5]], [2, (x[6] + 2 x[9] + 2 x[1] + 2 x[2] + 2 x[5]) t + x[2] + x[9] + x[1] + x[5] + 2 x[6]]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0], [2, (x[9] + x[5]) t + 2 x[9] + 2 x[5]], [2, (2 x[9] + x[6] + 2 x[5] + 2 x[1] + 2 x[2]) t + x[9] + 2 x[6] + x[5] + x[1] + x[2]], [2, (2 x[9] + 2 x[5]) t + x[9] + x[5]], [2, (2 x[7] + 2 x[5] + 2 x[1] + 2 x[2]) t + x[7] + x[5] + x[1] + x[2]] , [2, (x[7] + x[5] + x[1] + x[2]) t + 2 x[1] + 2 x[2] + 2 x[5] + 2 x[7]] , [2, (x[9] + 2 x[6] + x[5] + x[1] + x[2]) t + 2 x[9] + 2 x[1] + 2 x[5] + 2 x[2] + x[6]]] Knot, 10 [[6, 0], [2, (x[9] + x[5]) t + 2 x[9] + 2 x[5]], [2, (2 x[9] + x[6] + 2 x[5] + 2 x[1] + 2 x[2]) t + x[9] + 2 x[6] + x[5] + x[1] + x[2]], [2, (2 x[9] + 2 x[5]) t + x[9] + x[5]], [2, (2 x[7] + 2 x[5] + 2 x[1] + 2 x[2]) t + x[7] + x[5] + x[1] + x[2]] , [2, (x[7] + x[5] + x[1] + x[2]) t + 2 x[1] + 2 x[2] + 2 x[5] + 2 x[7]] , [2, (x[9] + 2 x[6] + x[5] + x[1] + x[2]) t + 2 x[9] + 2 x[1] + 2 x[5] + 2 x[2] + x[6]]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0], [2, (2 x[9] + x[6] + 2 x[5] + 2 x[1] + 2 x[2]) t + x[9] + 2 x[6] + x[5] + x[1] + x[2]], [2, (x[7] + x[5] + x[1] + x[2]) t + 2 x[7] + 2 x[5] + 2 x[2] + 2 x[1]] , [2, (x[9] + 2 x[6] + x[5] + x[1] + x[2]) t + 2 x[2] + 2 x[5] + 2 x[1] + 2 x[9] + x[6]], [2, (2 x[9] + 2 x[5]) t + x[9] + x[5]], [2, (x[9] + x[5]) t + 2 x[5] + 2 x[9]], [2, (2 x[1] + 2 x[2] + 2 x[7] + 2 x[5]) t + x[7] + x[5] + x[1] + x[2]] ] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0], [2, (x[9] + x[5]) t + 2 x[5] + 2 x[9]], [2, (x[9] + 2 x[6] + x[5] + x[1] + x[2]) t + 2 x[5] + 2 x[1] + 2 x[2] + x[6] + 2 x[9]], [2, (2 x[7] + 2 x[5] + 2 x[1] + 2 x[2]) t + x[7] + x[5] + x[1] + x[2]] , [2, (2 x[9] + 2 x[5]) t + x[9] + x[5]], [2, (x[7] + x[5] + x[1] + x[2]) t + 2 x[5] + 2 x[2] + 2 x[1] + 2 x[7]] , [2, (2 x[9] + x[6] + 2 x[5] + 2 x[1] + 2 x[2]) t + x[9] + 2 x[6] + x[5] + x[1] + x[2]]] Knot, 19 [[18, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[18, 0]] Knot, 25 [[6, 0], [2, (2 x[9] + 2 x[5]) t + x[9] + x[5]], [2, (2 x[1] + 2 x[7] + 2 x[2] + 2 x[5]) t + x[1] + x[2] + x[5] + x[7]] , [2, (2 x[9] + x[6] + 2 x[1] + 2 x[2] + 2 x[5]) t + x[9] + x[1] + x[5] + x[2] + 2 x[6]], [2, (x[1] + x[2] + x[5] + x[7]) t + 2 x[5] + 2 x[1] + 2 x[2] + 2 x[7]] , [2, (x[9] + x[5]) t + 2 x[9] + 2 x[5]], [2, (x[9] + x[1] + x[5] + x[2] + 2 x[6]) t + x[6] + 2 x[9] + 2 x[5] + 2 x[1] + 2 x[2]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0], [2, (x[9] + x[5]) t + 2 x[9] + 2 x[5]], [2, (x[9] + x[1] + x[5] + x[2] + 2 x[6]) t + 2 x[9] + x[6] + 2 x[5] + 2 x[1] + 2 x[2]], [2, (x[1] + x[7] + x[2] + x[5]) t + 2 x[7] + 2 x[5] + 2 x[1] + 2 x[2]] , [2, (2 x[7] + 2 x[5] + 2 x[1] + 2 x[2]) t + x[7] + x[1] + x[5] + x[2]] , [2, (2 x[9] + 2 x[5]) t + x[9] + x[5]], [2, (2 x[9] + x[6] + 2 x[5] + 2 x[1] + 2 x[2]) t + 2 x[6] + x[9] + x[5] + x[2] + x[1]]] Knot, 28 [[6, 0]] Knot, 29 [[18, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [10, (x[9] + x[1] + x[2] + 2 x[6] + x[5]) t + 2 x[1] + 2 x[2] + x[6] + 2 x[9] + 2 x[5]], [ 10, (x[5] + x[1] + x[7] + x[2]) t + 2 x[7] + 2 x[1] + 2 x[5] + 2 x[2]] , [10, (2 x[9] + 2 x[5]) t + x[9] + x[5]], [10, (2 x[1] + 2 x[2] + x[6] + 2 x[9] + 2 x[5]) t + x[2] + x[9] + x[1] + x[5] + 2 x[6]], [10, (x[9] + x[5]) t + 2 x[9] + 2 x[5]], [ 10, (2 x[7] + 2 x[1] + 2 x[5] + 2 x[2]) t + x[5] + x[1] + x[7] + x[2]] ] Knot, 33 [[18, 0]] Knot, 34 [[18, 0]] Knot, 35 [[18, 0]] [0 0 0 0 0 0] [ ] [1 1 4 5 3 2] [ ] [2 3 2 4 5 1] [ ] [3 2 5 3 1 4] [ ] [4 5 1 2 4 3] [ ] [5 4 3 1 2 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0], [2, (2 x[4] + 2 x[6] + x[7] + x[5]) t + 2 x[5] + x[4] + x[6] + 2 x[7]] , [2, (2 x[9] + 2 x[10] + x[3] + x[11]) t + 2 x[3] + x[9] + x[10] + 2 x[11]] , [2, (2 x[4] + x[3] + 2 x[6] + x[11] + x[5] + x[7]) t + 2 x[11] + 2 x[3] + x[4] + x[6] + 2 x[5] + 2 x[7]], [2, (2 x[9] + x[7] + x[5] + 2 x[10] + x[11] + x[3]) t + x[10] + x[9] + 2 x[7] + 2 x[5] + 2 x[3] + 2 x[11]], [2, (2 x[3] + 2 x[5] + 2 x[7] + x[9] + x[10] + 2 x[11]) t + 2 x[9] + x[7] + x[5] + 2 x[10] + x[11] + x[3]], [2, (2 x[11] + 2 x[3] + x[4] + x[6] + 2 x[5] + 2 x[7]) t + 2 x[4] + x[3] + 2 x[6] + x[11] + x[5] + x[7]], [ 2, (x[5] + x[7] + x[3] + x[11]) t + 2 x[7] + 2 x[5] + 2 x[3] + 2 x[11] ], [ 2, (2 x[7] + 2 x[5] + 2 x[3] + 2 x[11]) t + x[11] + x[3] + x[5] + x[7] ], [2, (2 x[3] + 2 x[11] + x[9] + x[10]) t + 2 x[9] + 2 x[10] + x[3] + x[11]] , [2, (2 x[5] + x[4] + x[6] + 2 x[7]) t + 2 x[4] + 2 x[6] + x[7] + x[5]] ] Knot, 3 [[26, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [2, (2 x[7] + 2 x[5]) t + x[5] + x[7]], [2, (2 x[11] + 2 x[3]) t + x[3] + x[11]], [2, (x[11] + 2 x[6] + 2 x[7] + x[3] + 2 x[4] + 2 x[5]) t + x[6] + x[7] + 2 x[11] + 2 x[3] + x[4] + x[5]], [2, (2 x[6] + 2 x[4]) t + x[4] + x[6]], [2, (2 x[9] + 2 x[10]) t + x[9] + x[10]], [2, (2 x[11] + x[9] + x[10] + x[6] + 2 x[7] + 2 x[3] + x[4] + 2 x[5]) t + x[11] + 2 x[4] + 2 x[6] + 2 x[9] + 2 x[10] + x[5] + x[7] + x[3]], [ 2, (x[11] + x[9] + x[10] + x[6] + x[7] + x[3] + x[4] + x[5]) t + 2 x[7] + 2 x[3] + 2 x[11] + 2 x[10] + 2 x[4] + 2 x[9] + 2 x[6] + 2 x[5]], [2, (x[9] + x[10] + 2 x[6] + x[7] + 2 x[4] + x[5]) t + 2 x[7] + x[4] + x[6] + 2 x[5] + 2 x[9] + 2 x[10]], [2, (x[11] + 2 x[9] + 2 x[10] + x[6] + x[3] + x[4]) t + 2 x[11] + x[9] + x[10] + 2 x[3] + 2 x[4] + 2 x[6]], [2, (2 x[11] + 2 x[9] + 2 x[10] + x[7] + 2 x[3] + x[5]) t + x[9] + x[10] + 2 x[5] + 2 x[7] + x[11] + x[3]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0], [ 1, (2 x[11] + 2 x[6] + 2 x[3] + 2 x[4]) t + x[11] + x[3] + x[4] + x[6] ], [1, (x[11] + 2 x[9] + 2 x[10] + 2 x[6] + 2 x[7] + x[3] + 2 x[4] + 2 x[5]) t + x[5] + x[4] + x[6] + 2 x[11] + x[7] + 2 x[3] + x[10] + x[9]], [1, (x[11] + x[9] + x[10] + x[6] + 2 x[7] + x[3] + x[4] + 2 x[5]) t + 2 x[11] + 2 x[9] + 2 x[10] + 2 x[6] + x[7] + 2 x[3] + 2 x[4] + x[5] ], [1, (x[11] + x[6] + 2 x[7] + x[3] + x[4] + 2 x[5]) t + 2 x[4] + x[7] + x[5] + 2 x[11] + 2 x[6] + 2 x[3]], [1, (2 x[11] + x[9] + x[10] + x[7] + 2 x[3] + x[5]) t + 2 x[9] + x[3] + x[11] + 2 x[7] + 2 x[10] + 2 x[5]], [ 1, (x[11] + x[6] + x[3] + x[4]) t + 2 x[11] + 2 x[6] + 2 x[3] + 2 x[4] ], [1, (x[11] + 2 x[9] + 2 x[10] + x[6] + 2 x[7] + x[3] + x[4] + 2 x[5]) t + 2 x[3] + 2 x[11] + x[5] + x[7] + 2 x[4] + 2 x[6] + x[9] + x[10]], [ 1, (2 x[9] + 2 x[10] + 2 x[7] + 2 x[5]) t + x[7] + x[5] + x[9] + x[10] ], [1, (2 x[11] + 2 x[6] + x[7] + 2 x[3] + 2 x[4] + x[5]) t + x[11] + x[6] + 2 x[7] + x[3] + x[4] + 2 x[5]], [1, (2 x[11] + 2 x[6] + 2 x[7] + 2 x[3] + 2 x[4] + 2 x[5]) t + x[11] + x[6] + x[7] + x[3] + x[4] + x[5]], [ 1, (x[9] + x[10] + 2 x[6] + 2 x[4]) t + 2 x[9] + 2 x[10] + x[6] + x[4] ], [1, (2 x[11] + x[9] + x[10] + 2 x[6] + x[7] + 2 x[3] + 2 x[4] + x[5]) t + x[11] + 2 x[9] + 2 x[10] + x[6] + 2 x[7] + x[3] + x[4] + 2 x[5]], [ 1, (x[11] + x[9] + x[10] + x[7] + x[3] + x[5]) t + 2 x[5] + 2 x[9] + 2 x[10] + 2 x[11] + 2 x[7] + 2 x[3]], [1, (x[11] + 2 x[9] + 2 x[10] + 2 x[7] + x[3] + 2 x[5]) t + 2 x[11] + x[9] + x[10] + x[7] + 2 x[3] + x[5]], [1, (x[11] + x[6] + x[7] + x[3] + x[4] + x[5]) t + 2 x[3] + 2 x[4] + 2 x[6] + 2 x[7] + 2 x[11] + 2 x[5]], [ 1, (2 x[9] + 2 x[10] + x[6] + x[4]) t + x[10] + 2 x[4] + x[9] + 2 x[6] ], [1, (2 x[11] + x[9] + x[10] + x[6] + x[7] + 2 x[3] + x[4] + x[5]) t + x[11] + 2 x[9] + 2 x[10] + 2 x[6] + 2 x[7] + x[3] + 2 x[4] + 2 x[5] ], [1, (2 x[11] + 2 x[9] + 2 x[10] + 2 x[6] + x[7] + 2 x[3] + 2 x[4] + x[5]) t + x[3] + x[9] + x[10] + 2 x[7] + x[4] + 2 x[5] + x[11] + x[6]], [ 1, (x[9] + x[10] + x[7] + x[5]) t + 2 x[9] + 2 x[10] + 2 x[7] + 2 x[5] ], [1, (2 x[11] + 2 x[9] + 2 x[10] + 2 x[7] + 2 x[3] + 2 x[5]) t + x[11] + x[9] + x[10] + x[7] + x[3] + x[5]]] Knot, 23 [[6, 0], [ 2, (x[7] + x[5] + x[3] + x[11]) t + 2 x[3] + 2 x[11] + 2 x[7] + 2 x[5] ], [2, (2 x[3] + 2 x[5] + 2 x[7] + x[10] + 2 x[11] + x[9]) t + x[5] + x[3] + x[11] + 2 x[10] + x[7] + 2 x[9]], [2, (x[11] + 2 x[6] + x[7] + x[3] + 2 x[4] + x[5]) t + 2 x[3] + x[4] + x[6] + 2 x[11] + 2 x[5] + 2 x[7]], [2, (2 x[4] + 2 x[6] + x[7] + x[5]) t + x[6] + 2 x[7] + x[4] + 2 x[5]] , [2, (x[3] + 2 x[9] + 2 x[10] + x[11]) t + 2 x[11] + x[9] + x[10] + 2 x[3]] , [2, (2 x[11] + x[9] + x[10] + 2 x[3]) t + x[3] + x[11] + 2 x[10] + 2 x[9]] , [2, (x[11] + 2 x[9] + 2 x[10] + x[7] + x[3] + x[5]) t + 2 x[3] + 2 x[5] + 2 x[7] + x[10] + 2 x[11] + x[9]], [ 2, (2 x[11] + 2 x[7] + 2 x[3] + 2 x[5]) t + x[7] + x[5] + x[3] + x[11] ], [2, (x[6] + 2 x[7] + x[4] + 2 x[5]) t + x[7] + x[5] + 2 x[6] + 2 x[4]] , [2, (2 x[3] + x[4] + x[6] + 2 x[11] + 2 x[5] + 2 x[7]) t + x[3] + x[5] + x[7] + 2 x[4] + x[11] + 2 x[6]]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0], [2, (2 x[3] + 2 x[11] + 2 x[5] + 2 x[7] + x[4] + x[6] + x[9] + x[10]) t + 2 x[6] + x[11] + x[3] + 2 x[4] + 2 x[9] + 2 x[10] + x[5] + x[7]], [ 2, (x[11] + x[9] + x[10] + x[6] + x[7] + x[3] + x[4] + x[5]) t + 2 x[11] + 2 x[4] + 2 x[9] + 2 x[10] + 2 x[3] + 2 x[6] + 2 x[7] + 2 x[5]], [2, (2 x[11] + 2 x[3]) t + x[3] + x[11]], [2, (2 x[11] + 2 x[9] + 2 x[10] + x[7] + 2 x[3] + x[5]) t + x[3] + x[11] + 2 x[5] + 2 x[7] + x[9] + x[10]], [2, (2 x[4] + 2 x[6]) t + x[4] + x[6]], [2, (2 x[7] + 2 x[5]) t + x[5] + x[7]], [2, (x[11] + 2 x[6] + 2 x[7] + x[3] + 2 x[4] + 2 x[5]) t + x[7] + x[5] + 2 x[3] + 2 x[11] + x[4] + x[6]], [2, (x[5] + x[7] + x[9] + x[10] + 2 x[4] + 2 x[6]) t + 2 x[9] + 2 x[10] + x[4] + x[6] + 2 x[5] + 2 x[7]], [2, (2 x[9] + 2 x[10]) t + x[9] + x[10]], [2, (x[3] + x[4] + x[6] + x[11] + 2 x[9] + 2 x[10]) t + x[10] + 2 x[6] + 2 x[4] + x[9] + 2 x[3] + 2 x[11]]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [2, (x[9] + 2 x[7] + 2 x[5] + x[10] + 2 x[11] + 2 x[3]) t + x[5] + x[7] + x[3] + x[11] + 2 x[9] + 2 x[10]], [2, (x[3] + 2 x[4] + x[5] + x[7] + 2 x[6] + x[11]) t + x[4] + 2 x[3] + x[6] + 2 x[11] + 2 x[5] + 2 x[7]], [2, (x[9] + x[10] + 2 x[3] + 2 x[11]) t + x[3] + 2 x[9] + 2 x[10] + x[11]] , [2, (2 x[4] + 2 x[6] + x[5] + x[7]) t + x[4] + x[6] + 2 x[7] + 2 x[5]] , [2, (x[5] + x[7] + x[3] + x[11] + 2 x[9] + 2 x[10]) t + x[9] + 2 x[7] + 2 x[5] + x[10] + 2 x[11] + 2 x[3]], [ 2, (2 x[7] + 2 x[11] + 2 x[3] + 2 x[5]) t + x[7] + x[5] + x[3] + x[11] ], [ 2, (x[7] + x[5] + x[3] + x[11]) t + 2 x[11] + 2 x[5] + 2 x[7] + 2 x[3] ], [2, (x[4] + 2 x[3] + x[6] + 2 x[11] + 2 x[5] + 2 x[7]) t + x[3] + 2 x[4] + x[5] + x[7] + 2 x[6] + x[11]], [2, (x[4] + x[6] + 2 x[7] + 2 x[5]) t + x[5] + 2 x[4] + 2 x[6] + x[7]] , [2, (2 x[9] + x[3] + x[11] + 2 x[10]) t + x[9] + x[10] + 2 x[3] + 2 x[11]] ] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0], [2, (2 x[5] + x[6] + 2 x[7] + 2 x[10] + x[4] + 2 x[9]) t + 2 x[6] + x[5] + x[7] + 2 x[4] + x[9] + x[10]], [2, (x[3] + x[11]) t + 2 x[11] + 2 x[3]], [2, (x[9] + x[10]) t + 2 x[10] + 2 x[9]], [2, (x[4] + 2 x[3] + x[6] + 2 x[11] + x[5] + x[7]) t + 2 x[6] + 2 x[7] + 2 x[5] + 2 x[4] + x[3] + x[11]], [2, (x[4] + x[6]) t + 2 x[6] + 2 x[4]], [2, (x[9] + 2 x[7] + 2 x[5] + x[10] + x[3] + x[11]) t + 2 x[10] + 2 x[3] + 2 x[11] + 2 x[9] + x[5] + x[7]], [2, (2 x[6] + 2 x[3] + 2 x[11] + x[10] + x[9] + 2 x[4]) t + 2 x[10] + x[3] + x[11] + 2 x[9] + x[4] + x[6]], [2, (2 x[3] + 2 x[4] + 2 x[6] + 2 x[11] + 2 x[7] + 2 x[9] + 2 x[5] + 2 x[10]) t + x[10] + x[5] + x[7] + x[9] + x[3] + x[11] + x[4] + x[6]], [2, (2 x[4] + 2 x[9] + x[7] + x[5] + 2 x[10] + 2 x[6] + x[11] + x[3]) t + 2 x[3] + 2 x[5] + 2 x[7] + x[4] + x[9] + x[10] + x[6] + 2 x[11]], [2, (x[7] + x[5]) t + 2 x[5] + 2 x[7]]] [0 0 0 0 1 1] [ ] [1 1 1 1 0 0] [ ] [2 2 2 2 3 3] [ ] [3 3 3 3 2 2] [ ] [5 5 5 5 4 4] [ ] [4 4 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 0 0 1 1] [ ] [1 1 1 1 2 2] [ ] [2 2 2 2 3 3] [ ] [3 3 3 3 0 0] [ ] [5 5 5 5 4 4] [ ] [4 4 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 1 1 0 0] [ ] [1 1 0 0 1 1] [ ] [2 2 2 2 3 3] [ ] [3 3 3 3 2 2] [ ] [5 5 4 4 4 4] [ ] [4 4 5 5 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 1 1 1 1] [ ] [1 1 0 0 0 0] [ ] [2 2 2 2 3 3] [ ] [3 3 3 3 2 2] [ ] [5 5 4 4 4 4] [ ] [4 4 5 5 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 1 1 1 1] [ ] [1 1 0 0 0 0] [ ] [2 2 2 2 3 3] [ ] [3 3 3 3 2 2] [ ] [5 5 5 5 4 4] [ ] [4 4 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 0 0 5 4] [ ] [1 1 3 2 1 1] [ ] [2 3 2 1 2 2] [ ] [3 2 1 3 3 3] [ ] [5 4 4 4 4 0] [ ] [4 5 5 5 0 5] Knot, 1 [[18, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[18, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[7] + x[4]) t + 2 x[7] + 2 x[4]], [6, (x[3] + x[1] + x[2]) t + 2 x[1] + 2 x[2] + 2 x[3]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[2] + 2 x[3] + 2 x[1]) t + x[3] + x[1] + x[2]], [6, (2 x[7] + 2 x[4]) t + x[7] + x[4]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[18, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[18, 0]] Knot, 25 [[6, 0], [6, (x[7] + x[4]) t + 2 x[7] + 2 x[4]], [6, (x[1] + x[2] + x[3]) t + 2 x[3] + 2 x[1] + 2 x[2]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[18, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [12, (x[7] + x[4]) t + 2 x[7] + 2 x[4]], [12, (x[1] + x[2] + x[3]) t + 2 x[2] + 2 x[3] + 2 x[1]], [12, (2 x[2] + 2 x[3] + 2 x[1]) t + x[1] + x[2] + x[3]], [12, (2 x[7] + 2 x[4]) t + x[7] + x[4]]] Knot, 33 [[18, 0]] Knot, 34 [[18, 0]] Knot, 35 [[18, 0]] [0 0 0 1 1 1] [ ] [1 1 1 2 2 2] [ ] [2 2 2 0 0 0] [ ] [4 4 4 3 3 3] [ ] [5 5 5 4 4 4] [ ] [3 3 3 5 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 1 1 1 1] [ ] [1 1 0 0 0 0] [ ] [3 3 2 2 3 3] [ ] [2 2 3 3 2 2] [ ] [5 5 5 5 4 4] [ ] [4 4 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 1 1 2 3] [ ] [1 1 0 0 3 2] [ ] [3 3 2 2 0 1] [ ] [2 2 3 3 1 0] [ ] [5 5 5 5 4 4] [ ] [4 4 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 1 1 2 3] [ ] [1 1 0 0 3 2] [ ] [3 3 2 2 1 0] [ ] [2 2 3 3 0 1] [ ] [5 5 5 5 4 4] [ ] [4 4 4 4 5 5] Knot, 1 [[6, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[6, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[6, 0]] Knot, 25 [[6, 0]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[6, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0]] Knot, 33 [[6, 0]] Knot, 34 [[6, 0]] Knot, 35 [[6, 0]] [0 0 3 2 2 3] [ ] [1 1 4 5 5 4] [ ] [3 3 2 0 0 2] [ ] [2 2 0 3 3 0] [ ] [5 5 1 4 4 1] [ ] [4 4 5 1 1 5] Knot, 1 [[18, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[18, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[2] + x[7] + x[1]) t + 2 x[2] + 2 x[1] + 2 x[7]], [6, (x[4] + x[3]) t + 2 x[3] + 2 x[4]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[1] + 2 x[2] + 2 x[7]) t + x[2] + x[7] + x[1]], [6, (2 x[3] + 2 x[4]) t + x[3] + x[4]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[18, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[18, 0]] Knot, 25 [[6, 0], [6, (x[4] + x[3]) t + 2 x[3] + 2 x[4]], [6, (x[2] + x[7] + x[1]) t + 2 x[2] + 2 x[7] + 2 x[1]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[18, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [12, (x[1] + x[2] + x[7]) t + 2 x[1] + 2 x[2] + 2 x[7]], [12, (2 x[3] + 2 x[4]) t + x[3] + x[4]], [12, (2 x[1] + 2 x[2] + 2 x[7]) t + x[1] + x[2] + x[7]], [12, (x[3] + x[4]) t + 2 x[3] + 2 x[4]]] Knot, 33 [[18, 0]] Knot, 34 [[18, 0]] Knot, 35 [[18, 0]] [0 0 3 2 5 4] [ ] [1 1 4 5 2 3] [ ] [3 4 2 0 1 2] [ ] [2 5 0 3 3 1] [ ] [5 2 1 4 4 0] [ ] [4 3 5 1 0 5] Knot, 1 [[30, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[30, 0]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [6, (x[1] + x[4] + x[6] + x[8]) t + 2 x[8] + 2 x[6] + 2 x[1] + 2 x[4]] , [6, (x[7] + x[9]) t + 2 x[7] + 2 x[9]], [6, (2 x[4] + x[7] + x[9] + x[8]) t + x[4] + 2 x[8] + 2 x[9] + 2 x[7]] , [6, (x[6] + x[1]) t + 2 x[1] + 2 x[6]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [6, (2 x[1] + 2 x[6]) t + x[1] + x[6]], [6, (x[4] + 2 x[7] + 2 x[8] + 2 x[9]) t + x[8] + 2 x[4] + x[7] + x[9]] , [6, (2 x[7] + 2 x[9]) t + x[7] + x[9]], [6, (2 x[8] + 2 x[4] + 2 x[6] + 2 x[1]) t + x[1] + x[8] + x[6] + x[4]] ] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[54, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[54, 0]] Knot, 25 [[6, 0], [6, (x[1] + x[4] + x[6] + x[8]) t + 2 x[1] + 2 x[4] + 2 x[8] + 2 x[6]] , [6, (x[7] + x[9]) t + 2 x[7] + 2 x[9]], [6, (x[7] + x[9] + 2 x[4] + x[8]) t + 2 x[9] + x[4] + 2 x[7] + 2 x[8]] , [6, (x[6] + x[1]) t + 2 x[1] + 2 x[6]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[54, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [ 12, (2 x[8] + 2 x[4] + 2 x[6] + 2 x[1]) t + x[6] + x[8] + x[4] + x[1]] , [ 12, (x[6] + x[8] + x[4] + x[1]) t + 2 x[8] + 2 x[4] + 2 x[6] + 2 x[1]] , [ 12, (x[9] + 2 x[4] + x[7] + x[8]) t + 2 x[8] + x[4] + 2 x[7] + 2 x[9]] , [12, (x[7] + x[9]) t + 2 x[7] + 2 x[9]], [ 12, (2 x[8] + x[4] + 2 x[7] + 2 x[9]) t + x[9] + 2 x[4] + x[7] + x[8]] , [12, (2 x[1] + 2 x[6]) t + x[1] + x[6]], [12, (x[1] + x[6]) t + 2 x[1] + 2 x[6]], [12, (2 x[7] + 2 x[9]) t + x[7] + x[9]]] Knot, 33 [[30, 0], [4, (2 x[1] + 2 x[4] + 2 x[6] + x[7] + x[9]) t + 2 x[7] + x[1] + 2 x[9] + x[4] + x[6]], [4, (2 x[7] + x[1] + 2 x[9] + x[4] + x[6]) t + 2 x[1] + 2 x[4] + 2 x[6] + x[7] + x[9]], [4, 2 x[4] t + x[4]], [4, 2 x[8] t + x[8]], [4, x[8] t + 2 x[8]], [4, x[4] t + 2 x[4]]] Knot, 34 [[54, 0]] Knot, 35 [[54, 0]] [0 0 5 2 3 4] [ ] [1 1 3 4 5 2] [ ] [3 5 2 1 2 0] [ ] [4 2 0 3 1 3] [ ] [5 3 4 0 4 1] [ ] [2 4 1 5 0 5] Knot, 1 [[30, 0]] Knot, 2 [[6, 0]] Knot, 3 [[6, 0]] Knot, 4 [[6, 0]] Knot, 5 [[6, 0], [3, (2 x[3] + 2 x[7] + 2 x[2] + 2 x[8] + 2 x[5] + x[6]) t + x[8] + x[3] + x[2] + x[7] + x[5] + 2 x[6]], [3, (2 x[2] + 2 x[5] + 2 x[3] + 2 x[7] + x[6]) t + x[7] + x[2] + x[5] + 2 x[6] + x[3]], [3, (x[3] + x[7] + x[2] + 2 x[4] + x[5] + 2 x[6]) t + 2 x[2] + 2 x[3] + x[4] + 2 x[7] + 2 x[5] + x[6]], [3, (2 x[5] + 2 x[8] + 2 x[3] + 2 x[7] + 2 x[2] + x[4] + x[6]) t + x[5] + x[7] + x[8] + 2 x[6] + x[2] + x[3] + 2 x[4]], [3, (2 x[2] + 2 x[3] + x[4] + 2 x[7] + 2 x[5] + x[6]) t + x[7] + x[3] + x[2] + x[5] + 2 x[6] + 2 x[4]], [3, (x[3] + x[7] + x[2] + x[8] + 2 x[4] + x[5] + 2 x[6]) t + 2 x[5] + 2 x[8] + 2 x[3] + 2 x[7] + 2 x[2] + x[4] + x[6]], [3, (x[2] + x[5] + x[3] + x[7] + 2 x[6]) t + 2 x[2] + 2 x[5] + 2 x[3] + 2 x[7] + x[6]], [3, (x[7] + x[8] + x[5] + 2 x[6] + x[2] + x[3]) t + 2 x[3] + 2 x[7] + 2 x[2] + 2 x[8] + 2 x[5] + x[6]]] Knot, 6 [[6, 0]] Knot, 7 [[6, 0]] Knot, 8 [[6, 0]] Knot, 9 [[6, 0]] Knot, 10 [[6, 0]] Knot, 11 [[6, 0], [4, (x[7] + 2 x[8] + x[6]) t + 2 x[7] + x[8] + 2 x[6]], [4, (x[4] + 2 x[5] + 2 x[6] + 2 x[2] + 2 x[3]) t + x[3] + 2 x[4] + x[6] + x[2] + x[5]], [4, (2 x[7] + x[8] + x[4] + x[5] + x[2] + x[3]) t + 2 x[8] + 2 x[2] + 2 x[5] + 2 x[4] + 2 x[3] + x[7]], [4, (x[8] + 2 x[4] + 2 x[5] + 2 x[6] + 2 x[2] + 2 x[3]) t + x[2] + x[5] + x[6] + x[3] + 2 x[8] + x[4]], [4, (2 x[5] + 2 x[6] + 2 x[2] + 2 x[3]) t + x[3] + x[2] + x[6] + x[5]] , [4, (2 x[8] + 2 x[4] + 2 x[5] + 2 x[6] + 2 x[2] + 2 x[3]) t + x[3] + x[6] + x[4] + x[2] + x[5] + x[8]]] Knot, 12 [[6, 0]] Knot, 13 [[6, 0]] Knot, 14 [[6, 0], [3, (2 x[8] + 2 x[6] + x[4] + 2 x[7]) t + x[8] + x[6] + 2 x[4] + x[7]] , [3, (2 x[3] + 2 x[2] + x[7] + x[4] + 2 x[5]) t + 2 x[7] + x[3] + x[2] + 2 x[4] + x[5]], [3, (x[4] + 2 x[6] + 2 x[7]) t + 2 x[4] + x[6] + x[7]], [3, (2 x[3] + 2 x[2] + 2 x[5] + x[7]) t + x[2] + x[5] + x[3] + 2 x[7]] , [3, (2 x[8] + 2 x[7] + 2 x[4] + 2 x[6]) t + x[6] + x[4] + x[7] + x[8]] , [3, (2 x[6] + 2 x[7] + 2 x[4]) t + x[6] + x[4] + x[7]], [3, (2 x[2] + 2 x[3] + x[7] + x[8] + 2 x[5]) t + 2 x[8] + x[3] + x[2] + 2 x[7] + x[5]], [3, (2 x[5] + 2 x[2] + x[4] + x[7] + x[8] + 2 x[3]) t + x[2] + 2 x[4] + x[5] + 2 x[8] + x[3] + 2 x[7]]] Knot, 15 [[6, 0]] Knot, 16 [[6, 0]] Knot, 17 [[6, 0]] Knot, 18 [[6, 0]] Knot, 19 [[54, 0]] Knot, 20 [[6, 0]] Knot, 21 [[6, 0]] Knot, 22 [[6, 0]] Knot, 23 [[6, 0]] Knot, 24 [[54, 0]] Knot, 25 [[6, 0], [24, (2 x[4] + 2 x[5] + 2 x[6] + 2 x[2] + 2 x[3]) t + x[2] + x[4] + x[3] + x[5] + x[6]]] Knot, 26 [[6, 0]] Knot, 27 [[6, 0]] Knot, 28 [[6, 0]] Knot, 29 [[54, 0]] Knot, 30 [[6, 0]] Knot, 31 [[6, 0]] Knot, 32 [[6, 0], [4, (2 x[2] + 2 x[3] + x[4] + 2 x[5] + 2 x[8] + 2 x[6]) t + 2 x[4] + x[6] + x[2] + x[5] + x[3] + x[8]], [4, (x[3] + x[2] + 2 x[8] + x[5] + 2 x[4] + x[6]) t + 2 x[2] + 2 x[3] + x[8] + x[4] + 2 x[5] + 2 x[6]], [4, (x[7] + x[6]) t + 2 x[7] + 2 x[6]], [4, (x[3] + x[2] + 2 x[7] + 2 x[8] + x[4] + x[5]) t + 2 x[3] + 2 x[4] + x[8] + x[7] + 2 x[2] + 2 x[5]], [4, (2 x[8] + x[7] + 2 x[4] + x[6]) t + x[8] + 2 x[7] + x[4] + 2 x[6]] , [4, (2 x[2] + 2 x[3] + 2 x[5] + 2 x[6] + x[8]) t + x[6] + 2 x[8] + x[5] + x[2] + x[3]], [4, (x[8] + x[6] + x[7]) t + 2 x[7] + 2 x[8] + 2 x[6]], [4, (x[3] + x[2] + 2 x[8] + x[5] + x[6]) t + 2 x[2] + 2 x[3] + 2 x[5] + 2 x[6] + x[8]], [4, (x[6] + x[4] + x[7] + 2 x[8]) t + 2 x[4] + 2 x[7] + x[8] + 2 x[6]] , [4, (x[5] + x[2] + x[8] + x[3] + 2 x[7]) t + 2 x[3] + 2 x[2] + 2 x[8] + 2 x[5] + x[7]], [4, (2 x[7] + x[3] + x[5] + 2 x[4] + x[8] + x[2]) t + 2 x[3] + 2 x[2] + x[7] + 2 x[8] + x[4] + 2 x[5]], [4, (2 x[3] + 2 x[4] + x[8] + x[7] + 2 x[2] + 2 x[5]) t + 2 x[8] + x[2] + x[3] + 2 x[7] + x[4] + x[5]], [4, (2 x[2] + 2 x[3] + x[8] + x[4] + 2 x[5] + 2 x[6]) t + 2 x[4] + x[6] + x[2] + x[3] + 2 x[8] + x[5]], [4, (2 x[3] + 2 x[2] + 2 x[8] + 2 x[5] + 2 x[6]) t + x[6] + x[8] + x[3] + x[2] + x[5]], [4, (x[8] + 2 x[7] + x[4] + 2 x[6]) t + x[7] + 2 x[4] + x[6] + 2 x[8]] , [4, (2 x[7] + 2 x[6]) t + x[7] + x[6]], [4, (2 x[4] + 2 x[7] + x[8] + 2 x[6]) t + x[4] + x[6] + x[7] + 2 x[8]] , [4, (2 x[3] + 2 x[2] + x[7] + 2 x[8] + x[4] + 2 x[5]) t + x[3] + x[5] + 2 x[4] + 2 x[7] + x[8] + x[2]], [4, (2 x[7] + 2 x[8] + 2 x[6]) t + x[8] + x[6] + x[7]], [4, (2 x[2] + 2 x[5] + 2 x[3] + x[7] + 2 x[4]) t + x[4] + x[3] + x[2] + 2 x[7] + x[5]], [4, (x[4] + x[3] + x[2] + 2 x[7] + x[5]) t + 2 x[2] + 2 x[5] + 2 x[3] + x[7] + 2 x[4]], [4, (x[3] + x[5] + x[6] + x[2] + x[8]) t + 2 x[3] + 2 x[2] + 2 x[8] + 2 x[5] + 2 x[6]], [4, (x[6] + x[2] + x[3] + x[8] + 2 x[4] + x[5]) t + 2 x[2] + 2 x[3] + x[4] + 2 x[5] + 2 x[8] + 2 x[6]], [4, (2 x[3] + 2 x[2] + 2 x[8] + 2 x[5] + x[7]) t + x[8] + x[5] + 2 x[7] + x[3] + x[2]]] Knot, 33 [[30, 0], [4, 2 x[4] t + x[4]], [4, x[8] t + 2 x[8]], [4, 2 x[8] t + x[8]], [4, (x[2] + x[3] + x[4] + x[5] + 2 x[6] + x[7] + 2 x[8]) t + 2 x[2] + 2 x[3] + 2 x[4] + 2 x[5] + x[6] + 2 x[7] + x[8]], [4, x[4] t + 2 x[4]], [4, (2 x[2] + 2 x[3] + 2 x[4] + 2 x[5] + x[6] + 2 x[7] + x[8]) t + x[2] + x[3] + x[4] + x[5] + 2 x[6] + x[7] + 2 x[8]]] Knot, 34 [[54, 0]] Knot, 35 [[54, 0]]