:name
great rhombicuboctahedron
:number
14
:symbol
@"t" left { pile { 3 above 4 } right }@	@K sub 4 @
:dual
hexakis octahedron
:sfaces
26 12{4} 8{6} 6{8}
:svertices
48 48(@4@.@6@.@8@)
:net
26 8
4 5 4 8 9
8 4 1 0 3 7 13 14 8
4 3 2 6 7
6 15 11 14 20 25 21
4 14 13 19 20
6 13 10 12 18 24 19
4 30 29 35 36
8 29 20 19 28 34 43 44 35
4 28 27 33 34
6 45 39 44 50 53 51
4 44 43 49 50
6 43 38 42 48 52 49
4 57 56 60 61
8 56 50 49 55 59 65 66 60
4 55 54 58 59
6 67 63 66 70 73 71
4 66 65 69 70
6 65 62 64 68 72 69
4 77 76 80 81
8 76 70 69 75 79 85 86 80
4 75 74 78 79
6 87 83 86 90 93 91
4 86 85 89 90
6 85 82 84 88 92 89
8 31 23 22 30 36 46 47 37
8 27 17 16 26 32 40 41 33
:hinges
25
0 1 1 7 2.3561944901923449
1 3 2 3 2.3561944901923449
3 2 4 3 2.5261129449194059
1 5 4 0 2.3561944901923449
4 1 5 5 2.5261129449194059
6 1 7 7 2.3561944901923449
7 3 8 3 2.3561944901923449
9 2 10 3 2.5261129449194059
7 5 10 0 2.3561944901923449
10 1 11 5 2.5261129449194059
7 1 4 2 2.3561944901923449
12 1 13 7 2.3561944901923449
13 3 14 3 2.3561944901923449
15 2 16 3 2.5261129449194059
13 5 16 0 2.3561944901923449
16 1 17 5 2.5261129449194059
13 1 10 2 2.3561944901923449
18 1 19 7 2.3561944901923449
19 3 20 3 2.3561944901923449
21 2 22 3 2.5261129449194059
19 5 22 0 2.3561944901923449
22 1 23 5 2.5261129449194059
19 1 16 2 2.3561944901923449
24 3 6 3 2.3561944901923449
25 7 8 1 2.3561944901923449
:dihedral
3
0 2.5261129449194059
0 2.3561944901923449
0 2.1862760354652839
:dih
3
24 4 6 2.5261129449194059
24 4 8 2.3561944901923449
24 6 8 2.1862760354652839
:vertices
94
-1.20710678118655[(-1/2+(-1/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
-1.20710678118655[(-1/2+(-1/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
-.5[-1/2] -3.91421356237309[(-5/2-sqrt(2))] 0[0]
-.5[-1/2] -2.91421356237309[(-3/2-sqrt(2))] 0[0]
-.5[-1/2] -.5[-1/2] 0[0]
-.5[-1/2] .5[1/2] 0[0]
.5[1/2] -3.91421356237309[(-5/2-sqrt(2))] 0[0]
.5[1/2] -2.91421356237309[(-3/2-sqrt(2))] 0[0]
.5[1/2] -.5[-1/2] 0[0]
.5[1/2] .5[1/2] 0[0]
.70710678118654701[(1/2)*sqrt(2)] -3.07313218497099[(-3/2+(-1/2)*sqrt(2)+(-1/2)*sqrt(3))] 0[0]
.70710678118654701[(1/2)*sqrt(2)] -.341081377402109[(-1/2+(-1/2)*sqrt(2)+(1/2)*sqrt(3))] 0[0]
1.20710678118655[(1/2+(1/2)*sqrt(2))] -3.93915758875542[(-3/2+(-1/2)*sqrt(2)-sqrt(3))] 0[0]
1.20710678118655[(1/2+(1/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
1.20710678118655[(1/2+(1/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
1.20710678118655[(1/2+(1/2)*sqrt(2))] .52494402638233[(-1/2+(-1/2)*sqrt(2)+sqrt(3))] 0[0]
2.20710678118655[(3/2+(1/2)*sqrt(2))] -5.6213203435596401[(-7/2+(-3/2)*sqrt(2))] 0[0]
2.20710678118655[(3/2+(1/2)*sqrt(2))] -4.6213203435596401[(-5/2+(-3/2)*sqrt(2))] 0[0]
2.20710678118655[(3/2+(1/2)*sqrt(2))] -3.93915758875542[(-3/2+(-1/2)*sqrt(2)-sqrt(3))] 0[0]
2.20710678118655[(3/2+(1/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
2.20710678118655[(3/2+(1/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
2.20710678118655[(3/2+(1/2)*sqrt(2))] .52494402638233[(-1/2+(-1/2)*sqrt(2)+sqrt(3))] 0[0]
2.20710678118655[(3/2+(1/2)*sqrt(2))] 1.20710678118655[(1/2+(1/2)*sqrt(2))] 0[0]
2.20710678118655[(3/2+(1/2)*sqrt(2))] 2.20710678118655[(3/2+(1/2)*sqrt(2))] 0[0]
2.70710678118655[(2+(1/2)*sqrt(2))] -3.07313218497099[(-3/2+(-1/2)*sqrt(2)+(-1/2)*sqrt(3))] 0[0]
2.70710678118655[(2+(1/2)*sqrt(2))] -.341081377402109[(-1/2+(-1/2)*sqrt(2)+(1/2)*sqrt(3))] 0[0]
2.91421356237309[(3/2+sqrt(2))] -6.32842712474619[(-7/2-2*sqrt(2))] 0[0]
2.91421356237309[(3/2+sqrt(2))] -3.91421356237309[(-5/2-sqrt(2))] 0[0]
2.91421356237309[(3/2+sqrt(2))] -2.91421356237309[(-3/2-sqrt(2))] 0[0]
2.91421356237309[(3/2+sqrt(2))] -.5[-1/2] 0[0]
2.91421356237309[(3/2+sqrt(2))] .5[1/2] 0[0]
2.91421356237309[(3/2+sqrt(2))] 2.91421356237309[(3/2+sqrt(2))] 0[0]
3.91421356237309[(5/2+sqrt(2))] -6.32842712474619[(-7/2-2*sqrt(2))] 0[0]
3.91421356237309[(5/2+sqrt(2))] -3.91421356237309[(-5/2-sqrt(2))] 0[0]
3.91421356237309[(5/2+sqrt(2))] -2.91421356237309[(-3/2-sqrt(2))] 0[0]
3.91421356237309[(5/2+sqrt(2))] -.5[-1/2] 0[0]
3.91421356237309[(5/2+sqrt(2))] .5[1/2] 0[0]
3.91421356237309[(5/2+sqrt(2))] 2.91421356237309[(3/2+sqrt(2))] 0[0]
4.1213203435596401[(2+(3/2)*sqrt(2))] -3.07313218497099[(-3/2+(-1/2)*sqrt(2)+(-1/2)*sqrt(3))] 0[0]
4.1213203435596401[(2+(3/2)*sqrt(2))] -.341081377402109[(-1/2+(-1/2)*sqrt(2)+(1/2)*sqrt(3))] 0[0]
4.6213203435596401[(5/2+(3/2)*sqrt(2))] -5.6213203435596401[(-7/2+(-3/2)*sqrt(2))] 0[0]
4.6213203435596401[(5/2+(3/2)*sqrt(2))] -4.6213203435596401[(-5/2+(-3/2)*sqrt(2))] 0[0]
4.6213203435596401[(5/2+(3/2)*sqrt(2))] -3.93915758875542[(-3/2+(-1/2)*sqrt(2)-sqrt(3))] 0[0]
4.6213203435596401[(5/2+(3/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
4.6213203435596401[(5/2+(3/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
4.6213203435596401[(5/2+(3/2)*sqrt(2))] .52494402638233[(-1/2+(-1/2)*sqrt(2)+sqrt(3))] 0[0]
4.6213203435596401[(5/2+(3/2)*sqrt(2))] 1.20710678118655[(1/2+(1/2)*sqrt(2))] 0[0]
4.6213203435596401[(5/2+(3/2)*sqrt(2))] 2.20710678118655[(3/2+(1/2)*sqrt(2))] 0[0]
5.6213203435596401[(7/2+(3/2)*sqrt(2))] -3.93915758875542[(-3/2+(-1/2)*sqrt(2)-sqrt(3))] 0[0]
5.6213203435596401[(7/2+(3/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
5.6213203435596401[(7/2+(3/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
5.6213203435596401[(7/2+(3/2)*sqrt(2))] .52494402638233[(-1/2+(-1/2)*sqrt(2)+sqrt(3))] 0[0]
6.1213203435596401[(4+(3/2)*sqrt(2))] -3.07313218497099[(-3/2+(-1/2)*sqrt(2)+(-1/2)*sqrt(3))] 0[0]
6.1213203435596401[(4+(3/2)*sqrt(2))] -.341081377402109[(-1/2+(-1/2)*sqrt(2)+(1/2)*sqrt(3))] 0[0]
6.32842712474619[(7/2+2*sqrt(2))] -3.91421356237309[(-5/2-sqrt(2))] 0[0]
6.32842712474619[(7/2+2*sqrt(2))] -2.91421356237309[(-3/2-sqrt(2))] 0[0]
6.32842712474619[(7/2+2*sqrt(2))] -.5[-1/2] 0[0]
6.32842712474619[(7/2+2*sqrt(2))] .5[1/2] 0[0]
7.32842712474619[(9/2+2*sqrt(2))] -3.91421356237309[(-5/2-sqrt(2))] 0[0]
7.32842712474619[(9/2+2*sqrt(2))] -2.91421356237309[(-3/2-sqrt(2))] 0[0]
7.32842712474619[(9/2+2*sqrt(2))] -.5[-1/2] 0[0]
7.32842712474619[(9/2+2*sqrt(2))] .5[1/2] 0[0]
7.53553390593274[(4+(5/2)*sqrt(2))] -3.07313218497099[(-3/2+(-1/2)*sqrt(2)+(-1/2)*sqrt(3))] 0[0]
7.53553390593274[(4+(5/2)*sqrt(2))] -.341081377402109[(-1/2+(-1/2)*sqrt(2)+(1/2)*sqrt(3))] 0[0]
8.03553390593274[(9/2+(5/2)*sqrt(2))] -3.93915758875542[(-3/2+(-1/2)*sqrt(2)-sqrt(3))] 0[0]
8.03553390593274[(9/2+(5/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
8.03553390593274[(9/2+(5/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
8.03553390593274[(9/2+(5/2)*sqrt(2))] .52494402638233[(-1/2+(-1/2)*sqrt(2)+sqrt(3))] 0[0]
9.03553390593274[(11/2+(5/2)*sqrt(2))] -3.93915758875542[(-3/2+(-1/2)*sqrt(2)-sqrt(3))] 0[0]
9.03553390593274[(11/2+(5/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
9.03553390593274[(11/2+(5/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
9.03553390593274[(11/2+(5/2)*sqrt(2))] .52494402638233[(-1/2+(-1/2)*sqrt(2)+sqrt(3))] 0[0]
9.53553390593274[(6+(5/2)*sqrt(2))] -3.07313218497099[(-3/2+(-1/2)*sqrt(2)+(-1/2)*sqrt(3))] 0[0]
9.53553390593274[(6+(5/2)*sqrt(2))] -.341081377402109[(-1/2+(-1/2)*sqrt(2)+(1/2)*sqrt(3))] 0[0]
9.7426406871192801[(11/2+3*sqrt(2))] -3.91421356237309[(-5/2-sqrt(2))] 0[0]
9.7426406871192801[(11/2+3*sqrt(2))] -2.91421356237309[(-3/2-sqrt(2))] 0[0]
9.7426406871192801[(11/2+3*sqrt(2))] -.5[-1/2] 0[0]
9.7426406871192801[(11/2+3*sqrt(2))] .5[1/2] 0[0]
10.7426406871193[(13/2+3*sqrt(2))] -3.91421356237309[(-5/2-sqrt(2))] 0[0]
10.7426406871193[(13/2+3*sqrt(2))] -2.91421356237309[(-3/2-sqrt(2))] 0[0]
10.7426406871193[(13/2+3*sqrt(2))] -.5[-1/2] 0[0]
10.7426406871193[(13/2+3*sqrt(2))] .5[1/2] 0[0]
10.9497474683058[(6+(7/2)*sqrt(2))] -3.07313218497099[(-3/2+(-1/2)*sqrt(2)+(-1/2)*sqrt(3))] 0[0]
10.9497474683058[(6+(7/2)*sqrt(2))] -.341081377402109[(-1/2+(-1/2)*sqrt(2)+(1/2)*sqrt(3))] 0[0]
11.4497474683058[(13/2+(7/2)*sqrt(2))] -3.93915758875542[(-3/2+(-1/2)*sqrt(2)-sqrt(3))] 0[0]
11.4497474683058[(13/2+(7/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
11.4497474683058[(13/2+(7/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
11.4497474683058[(13/2+(7/2)*sqrt(2))] .52494402638233[(-1/2+(-1/2)*sqrt(2)+sqrt(3))] 0[0]
12.4497474683058[(15/2+(7/2)*sqrt(2))] -3.93915758875542[(-3/2+(-1/2)*sqrt(2)-sqrt(3))] 0[0]
12.4497474683058[(15/2+(7/2)*sqrt(2))] -2.20710678118655[(-3/2+(-1/2)*sqrt(2))] 0[0]
12.4497474683058[(15/2+(7/2)*sqrt(2))] -1.20710678118655[(-1/2+(-1/2)*sqrt(2))] 0[0]
12.4497474683058[(15/2+(7/2)*sqrt(2))] .52494402638233[(-1/2+(-1/2)*sqrt(2)+sqrt(3))] 0[0]
12.9497474683058[(8+(7/2)*sqrt(2))] -3.07313218497099[(-3/2+(-1/2)*sqrt(2)+(-1/2)*sqrt(3))] 0[0]
12.9497474683058[(8+(7/2)*sqrt(2))] -.341081377402109[(-1/2+(-1/2)*sqrt(2)+(1/2)*sqrt(3))] 0[0]
:EOF
