4
1 0 -0.29999999999999999 # cp 0
5
1.0000000000000002 0.3568220897730896 -0.29999999999999999 # cp 1
6
0.80901699437494801 0.68761435889789313 -0.29999999999999999 # cp 2
7
0.50000000000000089 0.86602540378443815 -0.29999999999999999 # cp 3
8
0.19098300562505391 1.0444364486709834 -0.29999999999999999 # cp 4
9
-0.19098300562505077 1.0444364486709841 -0.29999999999999999 # cp 5
10
-0.49999999999999828 0.86602540378443971 -0.29999999999999999 # cp 6
11
-0.80901699437494579 0.68761435889789557 -0.29999999999999999 # cp 7
12
-0.99999999999999911 0.35682208977309243 -0.29999999999999999 # cp 8
13
-1 2.7869999390151108e-15 -0.29999999999999999 # cp 9
14
-1.0000000000000011 -0.35682208977308688 -0.29999999999999999 # cp 10
15
-0.80901699437495012 -0.68761435889789069 -0.29999999999999999 # cp 11
16
-0.50000000000000344 -0.8660254037844366 -0.29999999999999999 # cp 12
17
-0.19098300562505705 -1.0444364486709827 -0.29999999999999999 # cp 13
18
0.19098300562504739 -1.0444364486709845 -0.29999999999999999 # cp 14
19
0.49999999999999545 -0.86602540378444126 -0.29999999999999999 # cp 15
20
0.80901699437494368 -0.68761435889789813 -0.29999999999999999 # cp 16
21
0.99999999999999778 -0.35682208977309615 -0.29999999999999999 # cp 17
22
1 0 0.29999999999999999 # cp 18
23
1.0000000000000002 0.3568220897730896 0.29999999999999999 # cp 19
24
0.80901699437494801 0.68761435889789313 0.29999999999999999 # cp 20
25
0.50000000000000089 0.86602540378443815 0.29999999999999999 # cp 21
26
0.19098300562505391 1.0444364486709834 0.29999999999999999 # cp 22
27
-0.19098300562505077 1.0444364486709841 0.29999999999999999 # cp 23
28
-0.49999999999999828 0.86602540378443971 0.29999999999999999 # cp 24
29
-0.80901699437494579 0.68761435889789557 0.29999999999999999 # cp 25
30
-0.99999999999999911 0.35682208977309243 0.29999999999999999 # cp 26
31
-1 2.7869999390151108e-15 0.29999999999999999 # cp 27
32
-1.0000000000000011 -0.35682208977308688 0.29999999999999999 # cp 28
33
-0.80901699437495012 -0.68761435889789069 0.29999999999999999 # cp 29
34
-0.50000000000000344 -0.8660254037844366 0.29999999999999999 # cp 30
35
-0.19098300562505705 -1.0444364486709827 0.29999999999999999 # cp 31
36
0.19098300562504739 -1.0444364486709845 0.29999999999999999 # cp 32
37
0.49999999999999545 -0.86602540378444126 0.29999999999999999 # cp 33
38
0.80901699437494368 -0.68761435889789813 0.29999999999999999 # cp 34
39
0.99999999999999778 -0.35682208977309615 0.29999999999999999 # cp 35
40
1.7 0 -0.29999999999999999 # cp 36
41
1.4166666666666672 0.49074772881118162 -0.29999999999999999 # cp 37
42
1.1333333333333342 0.98149545762236323 -0.29999999999999999 # cp 38
43
0.85000000000000153 1.4722431864335448 -0.29999999999999999 # cp 39
44
0.28333333333333532 1.4722431864335457 -0.29999999999999999 # cp 40
45
-0.28333333333333083 1.4722431864335466 -0.29999999999999999 # cp 41
46
-0.84999999999999709 1.4722431864335475 -0.29999999999999999 # cp 42
47
-1.1333333333333313 0.98149545762236678 -0.29999999999999999 # cp 43
48
-1.4166666666666656 0.49074772881118617 -0.29999999999999999 # cp 44
49
-1.7 5.4928515530707947e-15 -0.29999999999999999 # cp 45
50
-1.4166666666666685 -0.49074772881117706 -0.29999999999999999 # cp 46
51
-1.1333333333333373 -0.98149545762235968 -0.29999999999999999 # cp 47
52
-0.85000000000000586 -1.4722431864335421 -0.29999999999999999 # cp 48
53
-0.28333333333333977 -1.4722431864335448 -0.29999999999999999 # cp 49
54
0.28333333333332628 -1.4722431864335475 -0.29999999999999999 # cp 50
55
0.84999999999999221 -1.4722431864335501 -0.29999999999999999 # cp 51
56
1.1333333333333282 -0.98149545762237045 -0.29999999999999999 # cp 52
57
1.4166666666666641 -0.49074772881119072 -0.29999999999999999 # cp 53
58
1.7 0 0.29999999999999999 # cp 54
59
1.4166666666666672 0.49074772881118162 0.29999999999999999 # cp 55
60
1.1333333333333342 0.98149545762236323 0.29999999999999999 # cp 56
61
0.85000000000000153 1.4722431864335448 0.29999999999999999 # cp 57
62
0.28333333333333532 1.4722431864335457 0.29999999999999999 # cp 58
63
-0.28333333333333083 1.4722431864335466 0.29999999999999999 # cp 59
64
-0.84999999999999709 1.4722431864335475 0.29999999999999999 # cp 60
65
-1.1333333333333313 0.98149545762236678 0.29999999999999999 # cp 61
66
-1.4166666666666656 0.49074772881118617 0.29999999999999999 # cp 62
67
-1.7 5.4928515530707947e-15 0.29999999999999999 # cp 63
68
-1.4166666666666685 -0.49074772881117706 0.29999999999999999 # cp 64
69
-1.1333333333333373 -0.98149545762235968 0.29999999999999999 # cp 65
70
-0.85000000000000586 -1.4722431864335421 0.29999999999999999 # cp 66
71
-0.28333333333333977 -1.4722431864335448 0.29999999999999999 # cp 67
72
0.28333333333332628 -1.4722431864335475 0.29999999999999999 # cp 68
73
0.84999999999999221 -1.4722431864335501 0.29999999999999999 # cp 69
74
1.1333333333333282 -0.98149545762237045 0.29999999999999999 # cp 70
75
1.4166666666666641 -0.49074772881119072 0.29999999999999999 # cp 71
77
-1.1000000000000001 0.050000000000000003 0 # cp 73
78
-1.23 0.17000000000000001 0.050000000000000003 # cp 74
80
( # begin topological vertices
81
vbottom0 () () () ( (vertex 36 ) )
82
vbottom1 () () () ( (vertex 39 ) )
83
vbottom2 () () () ( (vertex 42 ) )
84
vbottom3 () () () ( (vertex 45 ) )
85
vbottom4 () () () ( (vertex 48 ) )
86
vbottom5 () () () ( (vertex 51 ) )
87
vtop0 () () () ( (vertex 54 ) )
88
vtop1 () () () ( (vertex 57 ) )
89
vtop2 () () () ( (vertex 60 ) )
90
vtop3 () () () ( (vertex 63 ) )
91
vtop4 () () () ( (vertex 66 ) )
92
vtop5 () () () ( (vertex 69 ) )
93
vcrk0 () () () ( (vertex 72 ) )
94
vcrk1 () () () ( (vertex 73 ) )
95
vcrk2 () () () ( (vertex 74 ) )
96
) # end topological vertices
97
( # begin topological edges
98
ebottom0 () (vbottom0 vbottom1 ) () ( (bezier_curve 1 36 39 ) )
99
ebottom1 () (vbottom1 vbottom2 ) () ( (bezier_curve 1 39 42 ) )
100
ebottom2 () (vbottom2 vbottom3 ) () ( (bezier_curve 1 42 45 ) )
101
ebottom3 () (vbottom3 vbottom4 ) () ( (bezier_curve 1 45 48 ) )
102
ebottom4 () (vbottom4 vbottom5 ) () ( (bezier_curve 1 48 51 ) )
103
ebottom5 () (vbottom5 vbottom0 ) () ( (bezier_curve 1 51 36 ) )
104
etop0 () (vtop0 vtop1 ) () ( (bezier_curve 1 54 57 ) )
105
etop1 () (vtop1 vtop2 ) () ( (bezier_curve 1 57 60 ) )
106
etop2 () (vtop2 vtop3 ) () ( (bezier_curve 1 60 63 ) )
107
etop3 () (vtop3 vtop4 ) () ( (bezier_curve 1 63 66 ) )
108
etop4 () (vtop4 vtop5 ) () ( (bezier_curve 1 66 69 ) )
109
etop5 () (vtop5 vtop0 ) () ( (bezier_curve 1 69 54 ) )
110
eside0 () (vbottom0 vtop0 ) () ( (bezier_curve 1 36 54 ) )
111
eside1 () (vbottom1 vtop1 ) () ( (bezier_curve 1 39 57 ) )
112
eside2 () (vbottom2 vtop2 ) () ( (bezier_curve 1 42 60 ) )
113
eside3 () (vbottom3 vtop3 ) () ( (bezier_curve 1 45 63 ) )
114
eside4 () (vbottom4 vtop4 ) () ( (bezier_curve 1 48 66 ) )
115
eside5 () (vbottom5 vtop5 ) () ( (bezier_curve 1 51 69 ) )
116
ebottomcirc () () () ( (bezier_curve 3 0 1 2 3 )
117
(bezier_curve 3 3 4 5 6 )
118
(bezier_curve 3 6 7 8 9 )
119
(bezier_curve 3 9 10 11 12 )
120
(bezier_curve 3 12 13 14 15 )
121
(bezier_curve 3 15 16 17 0 ) )
122
etopcirc () () () ( (bezier_curve 3 18 19 20 21 )
123
(bezier_curve 3 21 22 23 24 )
124
(bezier_curve 3 24 25 26 27 )
125
(bezier_curve 3 27 28 29 30 )
126
(bezier_curve 3 30 31 32 33 )
127
(bezier_curve 3 33 34 35 18 ) )
128
ecrk0 () (vcrk0 vcrk1 ) () ( (bezier_curve 1 72 73 ) )
129
ecrk1 () (vcrk1 vcrk2 ) () ( (bezier_curve 1 73 74 ) )
130
ecrk2 () (vcrk2 vcrk0 ) () ( (bezier_curve 1 74 72 ) )
131
) # end topological edges
132
( # begin topological surfaces
133
s_bottom ( color (0.5 0.0 0.0 1)
134
) (ebottomcirc ebottom0 ebottom1 ebottom2 ebottom3 ebottom4 ebottom5 ) () ( (bezier_quad 3 1 36 37 38 39 0 1 2 3 )
135
(bezier_quad 3 1 39 40 41 42 3 4 5 6 )
136
(bezier_quad 3 1 42 43 44 45 6 7 8 9 )
137
(bezier_quad 3 1 45 46 47 48 9 10 11 12 )
138
(bezier_quad 3 1 48 49 50 51 12 13 14 15 )
139
(bezier_quad 3 1 51 52 53 36 15 16 17 0 ) )
140
s_top ( color (1.0 0.0 0.0 1)
141
) (etopcirc etop0 etop1 etop2 etop3 etop4 etop5 ) () ( (bezier_quad 3 1 54 55 56 57 18 19 20 21 )
142
(bezier_quad 3 1 57 58 59 60 21 22 23 24 )
143
(bezier_quad 3 1 60 61 62 63 24 25 26 27 )
144
(bezier_quad 3 1 63 64 65 66 27 28 29 30 )
145
(bezier_quad 3 1 66 67 68 69 30 31 32 33 )
146
(bezier_quad 3 1 69 70 71 54 33 34 35 18 ) )
147
s_inner ( color (0.0 0.5 0.0 1)
148
) (ebottomcirc etopcirc ) () ( (bezier_quad 3 1 0 1 2 3 18 19 20 21 )
149
(bezier_quad 3 1 3 4 5 6 21 22 23 24 )
150
(bezier_quad 3 1 6 7 8 9 24 25 26 27 )
151
(bezier_quad 3 1 9 10 11 12 27 28 29 30 )
152
(bezier_quad 3 1 12 13 14 15 30 31 32 33 )
153
(bezier_quad 3 1 15 16 17 0 33 34 35 18 ) )
154
s_outer0 ( color (0.5 0.5 0.0 1)
155
) (ebottom0 etop0 eside0 eside1 ) () ( (bezier_quad 1 1 36 39 54 57 ) )
156
s_outer1 ( color (1.0 0.5 0.0 1)
157
) (ebottom1 etop1 eside1 eside2 ) () ( (bezier_quad 1 1 39 42 57 60 ) )
158
s_outer2 ( color (0.0 1.0 0.0 1)
159
) (ebottom2 etop2 eside2 eside3 ) () ( (bezier_quad 1 1 42 45 60 63 ) )
160
s_outer3 ( color (0.5 1.0 0.0 1)
161
) (ebottom3 etop3 eside3 eside4 ) () ( (bezier_quad 1 1 45 48 63 66 ) )
162
s_outer4 ( color (1.0 1.0 0.0 1)
163
) (ebottom4 etop4 eside4 eside5 ) () ( (bezier_quad 1 1 48 51 66 69 ) )
164
s_outer5 ( color (0.0 0.0 0.5 1)
165
) (ebottom5 etop5 eside5 eside0 ) () ( (bezier_quad 1 1 51 36 69 54 ) )
166
crack ( color (0.5 0.0 0.5 1)
167
) (ecrk0 ecrk1 ecrk2 ) () ( (bezier_triangle 1 72 73 74 ) )
168
) # end topological surfaces
169
( # begin topological regions
170
hexnutcrack () (s_bottom s_top s_inner s_outer0 s_outer1 s_outer2 s_outer3 s_outer4 s_outer5 crack crack ) () ( )
171
) # end topological regions