:name
elongated triangular gyrobicupola (J36)
:number
80
:symbol
	@gQ sub 3 @
:sfaces
20 8{3} 12{4}
:svertices
18 6(@3@.@4@.@3@.@4@) 12(@3@.@4 sup 3@)
:net
20 4
3 9 18 12
4 18 9 8 17
3 18 17 22
4 12 18 23 19
3 12 19 13
4 9 12 6 5
3 9 5 4
3 24 15 21
4 15 24 25 16
3 15 16 11
4 21 15 10 14
3 21 14 20
4 24 21 27 28
3 24 28 29
4 1 0 2 3
4 3 2 7 8
4 8 7 16 17
4 17 16 25 26
4 26 25 30 31
4 31 30 32 33
:solid
20 4
3 37 45 43
4 45 37 36 44
3 45 44 50
4 43 45 50 47
3 43 47 39
4 37 43 39 34
3 37 34 36
3 48 42 40
4 42 48 51 46
3 42 46 38
4 40 42 38 35
3 40 35 41
4 48 40 41 49
3 48 49 51
4 39 41 35 34
4 34 35 38 36
4 36 38 46 44
4 44 46 51 50
4 50 51 49 47
4 47 49 41 39
:hinges
19
0 0 1 0 2.1862760354652839
1 3 2 0 2.1862760354652839
0 1 3 0 2.1862760354652839
3 3 4 0 2.1862760354652839
0 2 5 0 2.1862760354652839
5 3 6 0 2.1862760354652839
7 0 8 0 2.1862760354652839
8 3 9 0 2.1862760354652839
7 1 10 0 2.1862760354652839
10 3 11 0 2.1862760354652839
7 2 12 0 2.1862760354652839
12 3 13 0 2.1862760354652839
14 2 15 0 2.0943951023931955
15 2 16 0 2.0943951023931955
16 2 17 0 2.0943951023931955
17 2 18 0 2.0943951023931955
18 2 19 0 2.0943951023931955
1 2 16 3 2.5261129449194059
8 2 17 1 2.5261129449194059
:dih
4
-6 3 4 2.8017557441356713
18 3 4 2.1862760354652839
6 4 4 2.5261129449194059
6 4 4 2.0943951023931955
:vertices
52 34
-.5[-1/2] -.5[-1/2] 0[0]
-.5[-1/2] .5[1/2] 0[0]
.5[1/2] -.5[-1/2] 0[0]
.5[1/2] .5[1/2] 0[0]
.633974596215561[(3/2+(-1/2)*sqrt(3))] 1[1] 0[0]
.633974596215561[(3/2+(-1/2)*sqrt(3))] 2[2] 0[0]
1.13397459621556[(2+(-1/2)*sqrt(3))] 2.86602540378444[(2+(1/2)*sqrt(3))] 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]
1.63397459621556[(5/2+(-1/2)*sqrt(3))] -2[-2] 0[0]
1.63397459621556[(5/2+(-1/2)*sqrt(3))] -1[-1] 0[0]
2[2] 2.36602540378444[(3/2+(1/2)*sqrt(3))] 0[0]
2[2] 3.36602540378444[(5/2+(1/2)*sqrt(3))] 0[0]
2.13397459621556[(3+(-1/2)*sqrt(3))] -2.86602540378444[(-2+(-1/2)*sqrt(3))] 0[0]
2.5[5/2] -1.5[-3/2] 0[0]
2.5[5/2] -.5[-1/2] 0[0]
2.5[5/2] .5[1/2] 0[0]
2.5[5/2] 1.5[3/2] 0[0]
2.86602540378444[(2+(1/2)*sqrt(3))] 2.86602540378444[(2+(1/2)*sqrt(3))] 0[0]
3[3] -3.36602540378444[(-5/2+(-1/2)*sqrt(3))] 0[0]
3[3] -2.36602540378444[(-3/2+(-1/2)*sqrt(3))] 0[0]
3.36602540378444[(5/2+(1/2)*sqrt(3))] 1[1] 0[0]
3.36602540378444[(5/2+(1/2)*sqrt(3))] 2[2] 0[0]
3.5[7/2] -1.5[-3/2] 0[0]
3.5[7/2] -.5[-1/2] 0[0]
3.5[7/2] .5[1/2] 0[0]
3.86602540378444[(3+(1/2)*sqrt(3))] -2.86602540378444[(-2+(-1/2)*sqrt(3))] 0[0]
4.36602540378444[(7/2+(1/2)*sqrt(3))] -2[-2] 0[0]
4.36602540378444[(7/2+(1/2)*sqrt(3))] -1[-1] 0[0]
4.5[9/2] -.5[-1/2] 0[0]
4.5[9/2] .5[1/2] 0[0]
5.5[11/2] -.5[-1/2] 0[0]
5.5[11/2] .5[1/2] 0[0]
-3.0147156300331105 2.7689488141824283 -8.2625326955362401
-2.8964168360347492 2.6804454704762351 -7.2735066324361032
-2.7760643220669122 3.7383086728749251 -8.2043346065496934
-2.7137344005544836 3.2597422068420502 -9.0801708460791275
-2.6577655280685505 3.6498053291687322 -7.2153085434495562
-2.2993028750470181 2.0858212421659653 -8.4092341282289804
-2.2433340025610853 2.4758843644926471 -6.5443718255994092
-2.181004081048656 1.9973178984597723 -7.4202080651288431
-2.0046826945948864 3.445244223185145 -6.4861737366128625
-1.998321645568391 2.5766146348255864 -9.2268722787718678
-1.8220002591146216 4.0245409595509596 -8.2928379502558869
-1.7596703376021929 3.5459744935180845 -9.168674189785321
-1.7037014651162593 3.9360376158447667 -7.3038118871557495
-1.3452388120947268 2.372053528842 -8.4977374719351739
-1.2892699396087939 2.7621166511686823 -6.6328751693056023
-1.2269400180963647 2.283550185135807 -7.5087114088350371
-1.1065875041285287 3.341413387534497 -8.4395393829486272
-.98828871013016701 3.2529100438283038 -7.4505133198484901
:EOF
