:name
square gyrobicupola (J29)
:number
73
:symbol
	@gQ sub 4 @
:sfaces
18 8{3} 10{4}
:svertices
16 8(@3@.@4@.@3@.@4@) 8(@3@.@4 sup 3@)
:net
18 4
4 9 10 6 5
4 10 9 14 15
3 10 15 12
4 6 10 11 7
3 6 7 2
4 5 6 1 0
3 5 0 3
4 9 5 4 8
3 9 8 13
4 21 18 22 25
4 18 21 17 15
3 18 15 14
4 22 18 16 20
3 22 20 24
4 25 22 26 28
3 25 28 29
4 21 25 27 23
3 21 23 19
:solid
18 4
4 37 34 40 42
4 34 37 32 30
3 34 30 31
4 40 34 31 36
3 40 36 43
4 42 40 43 45
3 42 45 44
4 37 42 44 38
3 37 38 32
4 35 33 39 41
4 33 35 31 30
3 33 30 32
4 39 33 32 38
3 39 38 44
4 41 39 44 45
3 41 45 43
4 35 41 43 36
3 35 36 31
:hinges
17
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
1 2 11 1 1.7407147815219576
:dih
3
16 3 4 2.5261129449194059
8 3 4 1.7407147815219576
8 4 4 2.3561944901923449
:vertices
46 30
-2.5[-5/2] -.5[-1/2] 0[0]
-2.5[-5/2] .5[1/2] 0[0]
-2.36602540378444[(-3/2+(-1/2)*sqrt(3))] 1[1] 0[0]
-2[-2] -1.36602540378444[(-1/2+(-1/2)*sqrt(3))] 0[0]
-1.5[-3/2] -1.5[-3/2] 0[0]
-1.5[-3/2] -.5[-1/2] 0[0]
-1.5[-3/2] .5[1/2] 0[0]
-1.5[-3/2] 1.5[3/2] 0[0]
-.5[-1/2] -1.5[-3/2] 0[0]
-.5[-1/2] -.5[-1/2] 0[0]
-.5[-1/2] .5[1/2] 0[0]
-.5[-1/2] 1.5[3/2] 0[0]
0[0] 1.36602540378444[(1/2+(1/2)*sqrt(3))] 0[0]
.366025403784439[(-1/2+(1/2)*sqrt(3))] -1[-1] 0[0]
.5[1/2] -.5[-1/2] 0[0]
.5[1/2] .5[1/2] 0[0]
.866025403784439[(1/2)*sqrt(3)] -.866025403784439[(-1/2)*sqrt(3)] 0[0]
1[1] 1.36602540378444[(1/2+(1/2)*sqrt(3))] 0[0]
1.36602540378444[(1/2+(1/2)*sqrt(3))] 0[0] 0[0]
1.36602540378444[(1/2+(1/2)*sqrt(3))] 1.73205080756888[sqrt(3)] 0[0]
1.73205080756888[sqrt(3)] -1.36602540378444[(-1/2+(-1/2)*sqrt(3))] 0[0]
1.86602540378444[(1+(1/2)*sqrt(3))] .866025403784439[(1/2)*sqrt(3)] 0[0]
2.23205080756888[(1/2+sqrt(3))] -.5[-1/2] 0[0]
2.36602540378444[(3/2+(1/2)*sqrt(3))] 1.73205080756888[sqrt(3)] 0[0]
2.73205080756888[(1+sqrt(3))] -1.36602540378444[(-1/2+(-1/2)*sqrt(3))] 0[0]
2.73205080756888[(1+sqrt(3))] .366025403784439[(-1/2+(1/2)*sqrt(3))] 0[0]
3.09807621135332[(1/2+(3/2)*sqrt(3))] -1[-1] 0[0]
3.23205080756888[(3/2+sqrt(3))] 1.23205080756888[(-1/2+sqrt(3))] 0[0]
3.59807621135332[(1+(3/2)*sqrt(3))] -.133974596215561[(-1+(1/2)*sqrt(3))] 0[0]
3.59807621135332[(1+(3/2)*sqrt(3))] .866025403784439[(1/2)*sqrt(3)] 0[0]
.11493262492746052 1.0178730107877262 -6.2967956730455309
.39645959185177711 1.9431397317519202 -6.0425830416312639
.58648277176699516 .14540554813663314 -6.4250180799437691
.68240007564706679 .64369585195899641 -5.5633298277707469
.83304822187051819 1.4821841415243687 -6.8151827516857849
.9639270425713832 1.5689625729231893 -5.3091171963564798
1.266148993489442 2.3791970147008706 -5.8112944974568923
1.3045983687100528 .60971667887327569 -6.9434051585840231
1.5348823516908072 -.16318304930959193 -6.3521393153651113
1.6307996555708789 .33510725451277174 -5.490451063192089
1.702737623508183 1.9182414244733193 -6.5838942075114137
1.9123266224951953 1.2603739754769648 -5.2362384317778216
2.1742877703477176 1.0457739618222263 -6.7121166144096517
2.214548573413254 2.0706084172546455 -5.7384157328782345
2.4045717533284722 .27287423363935858 -6.1208507711907399
2.6860987202527887 1.198140954603552 -5.8666381397764724
:EOF
