:name
gyroelongated square bicupola (J45)
:number
89
:symbol
	@Q sub 4 @
:sfaces
34 24{3} 10{4}
:svertices
24 8(@3@.@4 sup 3@) 16(@3 sup 4@.@4@)
:net
34 4
4 17 25 26 18
4 25 17 16 24
3 25 24 33
4 26 25 36 37
3 26 37 32
4 18 26 27 19
3 18 19 9
4 17 18 8 7
3 17 7 13
4 30 22 21 29
4 22 30 31 23
3 22 23 14
4 21 22 11 10
3 21 10 15
4 29 21 20 28
3 29 28 38
4 30 29 39 40
3 30 40 34
3 0 1 2
3 2 1 3
3 2 3 4
3 4 3 5
3 4 5 6
3 6 5 12
3 6 12 16
3 16 12 23
3 16 23 24
3 24 23 31
3 24 31 35
3 35 31 41
3 35 41 42
3 42 41 43
3 42 43 44
3 44 43 45
:solid
34 4
4 51 59 55 48
4 59 51 54 62
3 59 62 66
4 55 59 66 64
3 55 64 58
4 48 55 58 50
3 48 50 46
4 51 48 46 47
3 51 47 54
4 67 60 56 63
4 60 67 68 61
3 60 61 53
4 56 60 53 49
3 56 49 52
4 63 56 52 57
3 63 57 65
4 67 63 65 69
3 67 69 68
3 58 57 50
3 50 57 52
3 50 52 46
3 46 52 49
3 46 49 47
3 47 49 53
3 47 53 54
3 54 53 61
3 54 61 62
3 62 61 68
3 62 68 66
3 66 68 69
3 66 69 64
3 64 69 65
3 64 65 58
3 58 65 57
:hinges
33
0 0 1 0 2.3561944901923449
1 3 2 0 2.5261129449194059
0 1 3 0 2.3561944901923449
3 3 4 0 2.5261129449194059
0 2 5 0 2.3561944901923449
5 3 6 0 2.5261129449194059
0 3 7 0 2.3561944901923449
7 3 8 0 2.5261129449194059
9 0 10 0 2.3561944901923449
10 3 11 0 2.5261129449194059
9 1 12 0 2.3561944901923449
12 3 13 0 2.5261129449194059
9 2 14 0 2.3561944901923449
14 3 15 0 2.5261129449194059
9 3 16 0 2.3561944901923449
16 3 17 0 2.5261129449194059
18 1 19 0 2.6871505056370706
19 2 20 0 2.6871505056370706
20 1 21 0 2.6871505056370706
21 2 22 0 2.6871505056370706
22 1 23 0 2.6871505056370706
23 2 24 0 2.6871505056370706
24 1 25 0 2.6871505056370706
25 2 26 0 2.6871505056370706
26 1 27 0 2.6871505056370706
27 2 28 0 2.6871505056370706
28 1 29 0 2.6871505056370706
29 2 30 0 2.6871505056370706
30 1 31 0 2.6871505056370706
31 2 32 0 2.6871505056370706
32 1 33 0 2.6871505056370706
1 2 26 2 2.4712905456469785
10 2 27 1 2.4712905456469785
:dih
5
16 3 3 2.6871505056370706
-8 3 3 2.6412090003740395
16 3 4 2.5261129449194059
8 3 4 2.4712905456469785
8 4 4 2.3561944901923449
:vertices
70 46
-.5[-1/2] .288675134594813[(1/6)*sqrt(3)] 0[0]
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2.5[5/2] 2.28867513459481[(2+(1/6)*sqrt(3))] 0[0]
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3[3] -1.57735026918963[(-1+(-1/3)*sqrt(3))] 0[0]
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3.5[7/2] 1.28867513459481[(1+(1/6)*sqrt(3))] 0[0]
3.5[7/2] 2.28867513459481[(2+(1/6)*sqrt(3))] 0[0]
3.5[7/2] 3.28867513459481[(3+(1/6)*sqrt(3))] 0[0]
4[4] -3.57735026918963[(-3+(-1/3)*sqrt(3))] 0[0]
4[4] -2.57735026918963[(-2+(-1/3)*sqrt(3))] 0[0]
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5[5] -3.57735026918963[(-3+(-1/3)*sqrt(3))] 0[0]
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5[5] 3.15470053837925[(2+(2/3)*sqrt(3))] 0[0]
5.36602540378444[(9/2+(1/2)*sqrt(3))] .78867513459481301[(1/2+(1/6)*sqrt(3))] 0[0]
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5.86602540378444[(5+(1/2)*sqrt(3))] -3.07735026918963[(-5/2+(-1/3)*sqrt(3))] 0[0]
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7.5[15/2] .288675134594813[(1/6)*sqrt(3)] 0[0]
8[8] -.577350269189626[(-1/3)*sqrt(3)] 0[0]
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:EOF
