:name octagonal antiprism :number 30 :symbol @S sub 8 @ :sfaces 18 16{3} 2{8} :svertices 16 16(@3 sup 3@.@8@) :net 18 8 8 16 12 7 6 11 15 19 20 8 13 17 22 23 18 14 10 9 3 0 1 2 3 2 1 3 3 2 3 4 3 4 3 5 3 4 5 8 3 8 5 12 3 8 12 13 3 13 12 16 3 13 16 17 3 17 16 21 3 17 21 24 3 24 21 25 3 24 25 26 3 26 25 27 3 26 27 28 3 28 27 29 :solid 18 8 8 37 33 30 34 38 42 45 41 8 35 39 43 44 40 36 32 31 3 40 38 36 3 36 38 34 3 36 34 32 3 32 34 30 3 32 30 31 3 31 30 33 3 31 33 35 3 35 33 37 3 35 37 39 3 39 37 41 3 39 41 43 3 43 41 45 3 43 45 44 3 44 45 42 3 44 42 40 3 40 42 38 :hinges 17 2 1 3 0 2.6871505056370706 3 2 4 0 2.6871505056370706 4 1 5 0 2.6871505056370706 5 2 6 0 2.6871505056370706 6 1 7 0 2.6871505056370706 7 2 8 0 2.6871505056370706 8 1 9 0 2.6871505056370706 9 2 10 0 2.6871505056370706 10 1 11 0 2.6871505056370706 11 2 12 0 2.6871505056370706 12 1 13 0 2.6871505056370706 13 2 14 0 2.6871505056370706 14 1 15 0 2.6871505056370706 15 2 16 0 2.6871505056370706 16 1 17 0 2.6871505056370706 0 0 9 1 1.6858923822495303 1 0 10 2 1.6858923822495303 :dih 2 16 3 3 2.6871505056370706 16 3 8 1.6858923822495303 :vertices 46 30 -.5[-1/2] .288675134595[(1/6)*sqrt(3)] 0[0] 0[0] -.57735026919[(-1/3)*sqrt(3)] 0[0] .5[1/2] .288675134595[(1/6)*sqrt(3)] 0[0] 1[1] -.57735026919[(-1/3)*sqrt(3)] 0[0] 1.5[3/2] .288675134595[(1/6)*sqrt(3)] 0[0] 2[2] -.57735026919[(-1/3)*sqrt(3)] 0[0] 2.29289321881[(3+(-1/2)*sqrt(2))] -2.28445705038[(-1+(-1/2)*sqrt(2)+(-1/3)*sqrt(3))] 0[0] 2.29289321881[(3+(-1/2)*sqrt(2))] -1.28445705038[((-1/2)*sqrt(2)+(-1/3)*sqrt(3))] 0[0] 2.5[5/2] .288675134595[(1/6)*sqrt(3)] 0[0] 2.79289321881[(7/2+(-1/2)*sqrt(2))] .99578191578100002[((1/2)*sqrt(2)+(1/6)*sqrt(3))] 0[0] 2.79289321881[(7/2+(-1/2)*sqrt(2))] 1.99578191578[(1+(1/2)*sqrt(2)+(1/6)*sqrt(3))] 0[0] 3[3] -2.99156383156[(-1-sqrt(2)+(-1/3)*sqrt(3))] 0[0] 3[3] -.57735026919[(-1/3)*sqrt(3)] 0[0] 3.5[7/2] .288675134595[(1/6)*sqrt(3)] 0[0] 3.5[7/2] 2.70288869697[(1+sqrt(2)+(1/6)*sqrt(3))] 0[0] 4[4] -2.99156383156[(-1-sqrt(2)+(-1/3)*sqrt(3))] 0[0] 4[4] -.57735026919[(-1/3)*sqrt(3)] 0[0] 4.5[9/2] .288675134595[(1/6)*sqrt(3)] 0[0] 4.5[9/2] 2.70288869697[(1+sqrt(2)+(1/6)*sqrt(3))] 0[0] 4.70710678119[(4+(1/2)*sqrt(2))] -2.28445705038[(-1+(-1/2)*sqrt(2)+(-1/3)*sqrt(3))] 0[0] 4.70710678119[(4+(1/2)*sqrt(2))] -1.28445705038[((-1/2)*sqrt(2)+(-1/3)*sqrt(3))] 0[0] 5[5] -.57735026919[(-1/3)*sqrt(3)] 0[0] 5.20710678119[(9/2+(1/2)*sqrt(2))] .99578191578100002[((1/2)*sqrt(2)+(1/6)*sqrt(3))] 0[0] 5.20710678119[(9/2+(1/2)*sqrt(2))] 1.99578191578[(1+(1/2)*sqrt(2)+(1/6)*sqrt(3))] 0[0] 5.5[11/2] .288675134595[(1/6)*sqrt(3)] 0[0] 6[6] -.57735026919[(-1/3)*sqrt(3)] 0[0] 6.5[13/2] .288675134595[(1/6)*sqrt(3)] 0[0] 7[7] -.57735026919[(-1/3)*sqrt(3)] 0[0] 7.5[15/2] .288675134595[(1/6)*sqrt(3)] 0[0] 8[8] -.57735026919[(-1/3)*sqrt(3)] 0[0] -5.0020810949225086 1.6715746053642511 -2.3809015940500897 -4.9026249112331808 1.1715746053629979 -1.5206060241865076 -4.9026249112329873 2.1715746053627481 -1.5206060241865489 -4.6193976625571007 .74769507285177477 -2.3809015940500289 -4.6193976625571805 2.5954541378754393 -2.3809015940501546 -4.1955181300458384 .46446782417651863 -1.5206060241864784 -4.1955181300453713 2.8786813865499536 -1.5206060241865781 -3.6955181300458384 .36501164048662538 -2.3809015940500077 -3.6955181300459239 2.9781375702383587 -2.3809015940501856 -3.1955181300458382 .46446782417651856 -1.5206060241864784 -3.1955181300459939 2.8786813865498245 -1.5206060241865784 -2.7716385975334361 .74769507285221199 -2.3809015940500387 -2.7716385975351875 2.5954541378735666 -2.3809015940501647 -2.4884113488584959 1.1715746053629976 -1.5206060241865076 -2.4884113488586895 2.1715746053627478 -1.5206060241865491 -2.3889551651684653 1.6715746053635482 -2.3809015940501037 :EOF