# Clipping Test:
# Shows a yellow/purple checkerboard with the border beeing green
mtllib TestCameraClipping.mtl
v -9 -9 0
v -8 -9 0
v -7 -9 0
v -6 -9 0
v -5 -9 0
v -4 -9 0
v -3 -9 0
v -2 -9 0
v -1 -9 0
v 0 -9 0
v 1 -9 0
v 2 -9 0
v 3 -9 0
v 4 -9 0
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v 9 -7 0
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v 2 -6 0
v 3 -6 0
v 4 -6 0
v 5 -6 0
v 6 -6 0
v 7 -6 0
v 8 -6 0
v 9 -6 0
v -9 -5 0
v -8 -5 0
v -7 -5 0
v -6 -5 0
v -5 -5 0
v -4 -5 0
v -3 -5 0
v -2 -5 0
v -1 -5 0
v 0 -5 0
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v 2 -5 0
v 3 -5 0
v 4 -5 0
v 5 -5 0
v 6 -5 0
v 7 -5 0
v 8 -5 0
v 9 -5 0
v -9 -4 0
v -8 -4 0
v -7 -4 0
v -6 -4 0
v -5 -4 0
v -4 -4 0
v -3 -4 0
v -2 -4 0
v -1 -4 0
v 0 -4 0
v 1 -4 0
v 2 -4 0
v 3 -4 0
v 4 -4 0
v 5 -4 0
v 6 -4 0
v 7 -4 0
v 8 -4 0
v 9 -4 0
v -9 -3 0
v -8 -3 0
v -7 -3 0
v -6 -3 0
v -5 -3 0
v -4 -3 0
v -3 -3 0
v -2 -3 0
v -1 -3 0
v 0 -3 0
v 1 -3 0
v 2 -3 0
v 3 -3 0
v 4 -3 0
v 5 -3 0
v 6 -3 0
v 7 -3 0
v 8 -3 0
v 9 -3 0
v -9 -2 0
v -8 -2 0
v -7 -2 0
v -6 -2 0
v -5 -2 0
v -4 -2 0
v -3 -2 0
v -2 -2 0
v -1 -2 0
v 0 -2 0
v 1 -2 0
v 2 -2 0
v 3 -2 0
v 4 -2 0
v 5 -2 0
v 6 -2 0
v 7 -2 0
v 8 -2 0
v 9 -2 0
v -9 -1 0
v -8 -1 0
v -7 -1 0
v -6 -1 0
v -5 -1 0
v -4 -1 0
v -3 -1 0
v -2 -1 0
v -1 -1 0
v 0 -1 0
v 1 -1 0
v 2 -1 0
v 3 -1 0
v 4 -1 0
v 5 -1 0
v 6 -1 0
v 7 -1 0
v 8 -1 0
v 9 -1 0
v -9 0 0
v -8 0 0
v -7 0 0
v -6 0 0
v -5 0 0
v -4 0 0
v -3 0 0
v -2 0 0
v -1 0 0
v 0 0 0
v 1 0 0
v 2 0 0
v 3 0 0
v 4 0 0
v 5 0 0
v 6 0 0
v 7 0 0
v 8 0 0
v 9 0 0
v -9 1 0
v -8 1 0
v -7 1 0
v -6 1 0
v -5 1 0
v -4 1 0
v -3 1 0
v -2 1 0
v -1 1 0
v 0 1 0
v 1 1 0
v 2 1 0
v 3 1 0
v 4 1 0
v 5 1 0
v 6 1 0
v 7 1 0
v 8 1 0
v 9 1 0
v -9 2 0
v -8 2 0
v -7 2 0
v -6 2 0
v -5 2 0
v -4 2 0
v -3 2 0
v -2 2 0
v -1 2 0
v 0 2 0
v 1 2 0
v 2 2 0
v 3 2 0
v 4 2 0
v 5 2 0
v 6 2 0
v 7 2 0
v 8 2 0
v 9 2 0
v -9 3 0
v -8 3 0
v -7 3 0
v -6 3 0
v -5 3 0
v -4 3 0
v -3 3 0
v -2 3 0
v -1 3 0
v 0 3 0
v 1 3 0
v 2 3 0
v 3 3 0
v 4 3 0
v 5 3 0
v 6 3 0
v 7 3 0
v 8 3 0
v 9 3 0
v -9 4 0
v -8 4 0
v -7 4 0
v -6 4 0
v -5 4 0
v -4 4 0
v -3 4 0
v -2 4 0
v -1 4 0
v 0 4 0
v 1 4 0
v 2 4 0
v 3 4 0
v 4 4 0
v 5 4 0
v 6 4 0
v 7 4 0
v 8 4 0
v 9 4 0
v -9 5 0
v -8 5 0
v -7 5 0
v -6 5 0
v -5 5 0
v -4 5 0
v -3 5 0
v -2 5 0
v -1 5 0
v 0 5 0
v 1 5 0
v 2 5 0
v 3 5 0
v 4 5 0
v 5 5 0
v 6 5 0
v 7 5 0
v 8 5 0
v 9 5 0
v -9 6 0
v -8 6 0
v -7 6 0
v -6 6 0
v -5 6 0
v -4 6 0
v -3 6 0
v -2 6 0
v -1 6 0
v 0 6 0
v 1 6 0
v 2 6 0
v 3 6 0
v 4 6 0
v 5 6 0
v 6 6 0
v 7 6 0
v 8 6 0
v 9 6 0
v -9 7 0
v -8 7 0
v -7 7 0
v -6 7 0
v -5 7 0
v -4 7 0
v -3 7 0
v -2 7 0
v -1 7 0
v 0 7 0
v 1 7 0
v 2 7 0
v 3 7 0
v 4 7 0
v 5 7 0
v 6 7 0
v 7 7 0
v 8 7 0
v 9 7 0
v -9 8 0
v -8 8 0
v -7 8 0
v -6 8 0
v -5 8 0
v -4 8 0
v -3 8 0
v -2 8 0
v -1 8 0
v 0 8 0
v 1 8 0
v 2 8 0
v 3 8 0
v 4 8 0
v 5 8 0
v 6 8 0
v 7 8 0
v 8 8 0
v 9 8 0
v -9 9 0
v -8 9 0
v -7 9 0
v -6 9 0
v -5 9 0
v -4 9 0
v -3 9 0
v -2 9 0
v -1 9 0
v 0 9 0
v 1 9 0
v 2 9 0
v 3 9 0
v 4 9 0
v 5 9 0
v 6 9 0
v 7 9 0
v 8 9 0
v 9 9 0
o tile_1_1
usemtl cb_border
f 2 21 20
f 2 20 1
o tile_2_1
usemtl cb_border
f 3 22 21
f 3 21 2
o tile_3_1
usemtl cb_border
f 4 23 22
f 4 22 3
o tile_4_1
usemtl cb_border
f 5 24 23
f 5 23 4
o tile_5_1
usemtl cb_border
f 6 25 24
f 6 24 5
o tile_6_1
usemtl cb_border
f 7 26 25
f 7 25 6
o tile_7_1
usemtl cb_border
f 8 27 26
f 8 26 7
o tile_8_1
usemtl cb_border
f 9 28 27
f 9 27 8
o tile_9_1
usemtl cb_border
f 10 29 28
f 10 28 9
o tile_10_1
usemtl cb_border
f 11 30 29
f 11 29 10
o tile_11_1
usemtl cb_border
f 12 31 30
f 12 30 11
o tile_12_1
usemtl cb_border
f 13 32 31
f 13 31 12
o tile_13_1
usemtl cb_border
f 14 33 32
f 14 32 13
o tile_14_1
usemtl cb_border
f 15 34 33
f 15 33 14
o tile_15_1
usemtl cb_border
f 16 35 34
f 16 34 15
o tile_16_1
usemtl cb_border
f 17 36 35
f 17 35 16
o tile_17_1
usemtl cb_border
f 18 37 36
f 18 36 17
o tile_18_1
usemtl cb_border
f 19 38 37
f 19 37 18
o tile_1_2
usemtl cb_border
f 21 40 39
f 21 39 20
o tile_2_2
usemtl cb_even
f 22 41 40
f 22 40 21
o tile_3_2
usemtl cb_odd
f 23 42 41
f 23 41 22
o tile_4_2
usemtl cb_even
f 24 43 42
f 24 42 23
o tile_5_2
usemtl cb_odd
f 25 44 43
f 25 43 24
o tile_6_2
usemtl cb_even
f 26 45 44
f 26 44 25
o tile_7_2
usemtl cb_odd
f 27 46 45
f 27 45 26
o tile_8_2
usemtl cb_even
f 28 47 46
f 28 46 27
o tile_9_2
usemtl cb_odd
f 29 48 47
f 29 47 28
o tile_10_2
usemtl cb_even
f 30 49 48
f 30 48 29
o tile_11_2
usemtl cb_odd
f 31 50 49
f 31 49 30
o tile_12_2
usemtl cb_even
f 32 51 50
f 32 50 31
o tile_13_2
usemtl cb_odd
f 33 52 51
f 33 51 32
o tile_14_2
usemtl cb_even
f 34 53 52
f 34 52 33
o tile_15_2
usemtl cb_odd
f 35 54 53
f 35 53 34
o tile_16_2
usemtl cb_even
f 36 55 54
f 36 54 35
o tile_17_2
usemtl cb_odd
f 37 56 55
f 37 55 36
o tile_18_2
usemtl cb_border
f 38 57 56
f 38 56 37
o tile_1_3
usemtl cb_border
f 40 59 58
f 40 58 39
o tile_2_3
usemtl cb_odd
f 41 60 59
f 41 59 40
o tile_3_3
usemtl cb_even
f 42 61 60
f 42 60 41
o tile_4_3
usemtl cb_odd
f 43 62 61
f 43 61 42
o tile_5_3
usemtl cb_even
f 44 63 62
f 44 62 43
o tile_6_3
usemtl cb_odd
f 45 64 63
f 45 63 44
o tile_7_3
usemtl cb_even
f 46 65 64
f 46 64 45
o tile_8_3
usemtl cb_odd
f 47 66 65
f 47 65 46
o tile_9_3
usemtl cb_even
f 48 67 66
f 48 66 47
o tile_10_3
usemtl cb_odd
f 49 68 67
f 49 67 48
o tile_11_3
usemtl cb_even
f 50 69 68
f 50 68 49
o tile_12_3
usemtl cb_odd
f 51 70 69
f 51 69 50
o tile_13_3
usemtl cb_even
f 52 71 70
f 52 70 51
o tile_14_3
usemtl cb_odd
f 53 72 71
f 53 71 52
o tile_15_3
usemtl cb_even
f 54 73 72
f 54 72 53
o tile_16_3
usemtl cb_odd
f 55 74 73
f 55 73 54
o tile_17_3
usemtl cb_even
f 56 75 74
f 56 74 55
o tile_18_3
usemtl cb_border
f 57 76 75
f 57 75 56
o tile_1_4
usemtl cb_border
f 59 78 77
f 59 77 58
o tile_2_4
usemtl cb_even
f 60 79 78
f 60 78 59
o tile_3_4
usemtl cb_odd
f 61 80 79
f 61 79 60
o tile_4_4
usemtl cb_even
f 62 81 80
f 62 80 61
o tile_5_4
usemtl cb_odd
f 63 82 81
f 63 81 62
o tile_6_4
usemtl cb_even
f 64 83 82
f 64 82 63
o tile_7_4
usemtl cb_odd
f 65 84 83
f 65 83 64
o tile_8_4
usemtl cb_even
f 66 85 84
f 66 84 65
o tile_9_4
usemtl cb_odd
f 67 86 85
f 67 85 66
o tile_10_4
usemtl cb_even
f 68 87 86
f 68 86 67
o tile_11_4
usemtl cb_odd
f 69 88 87
f 69 87 68
o tile_12_4
usemtl cb_even
f 70 89 88
f 70 88 69
o tile_13_4
usemtl cb_odd
f 71 90 89
f 71 89 70
o tile_14_4
usemtl cb_even
f 72 91 90
f 72 90 71
o tile_15_4
usemtl cb_odd
f 73 92 91
f 73 91 72
o tile_16_4
usemtl cb_even
f 74 93 92
f 74 92 73
o tile_17_4
usemtl cb_odd
f 75 94 93
f 75 93 74
o tile_18_4
usemtl cb_border
f 76 95 94
f 76 94 75
o tile_1_5
usemtl cb_border
f 78 97 96
f 78 96 77
o tile_2_5
usemtl cb_odd
f 79 98 97
f 79 97 78
o tile_3_5
usemtl cb_even
f 80 99 98
f 80 98 79
o tile_4_5
usemtl cb_odd
f 81 100 99
f 81 99 80
o tile_5_5
usemtl cb_even
f 82 101 100
f 82 100 81
o tile_6_5
usemtl cb_odd
f 83 102 101
f 83 101 82
o tile_7_5
usemtl cb_even
f 84 103 102
f 84 102 83
o tile_8_5
usemtl cb_odd
f 85 104 103
f 85 103 84
o tile_9_5
usemtl cb_even
f 86 105 104
f 86 104 85
o tile_10_5
usemtl cb_odd
f 87 106 105
f 87 105 86
o tile_11_5
usemtl cb_even
f 88 107 106
f 88 106 87
o tile_12_5
usemtl cb_odd
f 89 108 107
f 89 107 88
o tile_13_5
usemtl cb_even
f 90 109 108
f 90 108 89
o tile_14_5
usemtl cb_odd
f 91 110 109
f 91 109 90
o tile_15_5
usemtl cb_even
f 92 111 110
f 92 110 91
o tile_16_5
usemtl cb_odd
f 93 112 111
f 93 111 92
o tile_17_5
usemtl cb_even
f 94 113 112
f 94 112 93
o tile_18_5
usemtl cb_border
f 95 114 113
f 95 113 94
o tile_1_6
usemtl cb_border
f 97 116 115
f 97 115 96
o tile_2_6
usemtl cb_even
f 98 117 116
f 98 116 97
o tile_3_6
usemtl cb_odd
f 99 118 117
f 99 117 98
o tile_4_6
usemtl cb_even
f 100 119 118
f 100 118 99
o tile_5_6
usemtl cb_odd
f 101 120 119
f 101 119 100
o tile_6_6
usemtl cb_even
f 102 121 120
f 102 120 101
o tile_7_6
usemtl cb_odd
f 103 122 121
f 103 121 102
o tile_8_6
usemtl cb_even
f 104 123 122
f 104 122 103
o tile_9_6
usemtl cb_odd
f 105 124 123
f 105 123 104
o tile_10_6
usemtl cb_even
f 106 125 124
f 106 124 105
o tile_11_6
usemtl cb_odd
f 107 126 125
f 107 125 106
o tile_12_6
usemtl cb_even
f 108 127 126
f 108 126 107
o tile_13_6
usemtl cb_odd
f 109 128 127
f 109 127 108
o tile_14_6
usemtl cb_even
f 110 129 128
f 110 128 109
o tile_15_6
usemtl cb_odd
f 111 130 129
f 111 129 110
o tile_16_6
usemtl cb_even
f 112 131 130
f 112 130 111
o tile_17_6
usemtl cb_odd
f 113 132 131
f 113 131 112
o tile_18_6
usemtl cb_border
f 114 133 132
f 114 132 113
o tile_1_7
usemtl cb_border
f 116 135 134
f 116 134 115
o tile_2_7
usemtl cb_odd
f 117 136 135
f 117 135 116
o tile_3_7
usemtl cb_even
f 118 137 136
f 118 136 117
o tile_4_7
usemtl cb_odd
f 119 138 137
f 119 137 118
o tile_5_7
usemtl cb_even
f 120 139 138
f 120 138 119
o tile_6_7
usemtl cb_odd
f 121 140 139
f 121 139 120
o tile_7_7
usemtl cb_even
f 122 141 140
f 122 140 121
o tile_8_7
usemtl cb_odd
f 123 142 141
f 123 141 122
o tile_9_7
usemtl cb_even
f 124 143 142
f 124 142 123
o tile_10_7
usemtl cb_odd
f 125 144 143
f 125 143 124
o tile_11_7
usemtl cb_even
f 126 145 144
f 126 144 125
o tile_12_7
usemtl cb_odd
f 127 146 145
f 127 145 126
o tile_13_7
usemtl cb_even
f 128 147 146
f 128 146 127
o tile_14_7
usemtl cb_odd
f 129 148 147
f 129 147 128
o tile_15_7
usemtl cb_even
f 130 149 148
f 130 148 129
o tile_16_7
usemtl cb_odd
f 131 150 149
f 131 149 130
o tile_17_7
usemtl cb_even
f 132 151 150
f 132 150 131
o tile_18_7
usemtl cb_border
f 133 152 151
f 133 151 132
o tile_1_8
usemtl cb_border
f 135 154 153
f 135 153 134
o tile_2_8
usemtl cb_even
f 136 155 154
f 136 154 135
o tile_3_8
usemtl cb_odd
f 137 156 155
f 137 155 136
o tile_4_8
usemtl cb_even
f 138 157 156
f 138 156 137
o tile_5_8
usemtl cb_odd
f 139 158 157
f 139 157 138
o tile_6_8
usemtl cb_even
f 140 159 158
f 140 158 139
o tile_7_8
usemtl cb_odd
f 141 160 159
f 141 159 140
o tile_8_8
usemtl cb_even
f 142 161 160
f 142 160 141
o tile_9_8
usemtl cb_odd
f 143 162 161
f 143 161 142
o tile_10_8
usemtl cb_even
f 144 163 162
f 144 162 143
o tile_11_8
usemtl cb_odd
f 145 164 163
f 145 163 144
o tile_12_8
usemtl cb_even
f 146 165 164
f 146 164 145
o tile_13_8
usemtl cb_odd
f 147 166 165
f 147 165 146
o tile_14_8
usemtl cb_even
f 148 167 166
f 148 166 147
o tile_15_8
usemtl cb_odd
f 149 168 167
f 149 167 148
o tile_16_8
usemtl cb_even
f 150 169 168
f 150 168 149
o tile_17_8
usemtl cb_odd
f 151 170 169
f 151 169 150
o tile_18_8
usemtl cb_border
f 152 171 170
f 152 170 151
o tile_1_9
usemtl cb_border
f 154 173 172
f 154 172 153
o tile_2_9
usemtl cb_odd
f 155 174 173
f 155 173 154
o tile_3_9
usemtl cb_even
f 156 175 174
f 156 174 155
o tile_4_9
usemtl cb_odd
f 157 176 175
f 157 175 156
o tile_5_9
usemtl cb_even
f 158 177 176
f 158 176 157
o tile_6_9
usemtl cb_odd
f 159 178 177
f 159 177 158
o tile_7_9
usemtl cb_even
f 160 179 178
f 160 178 159
o tile_8_9
usemtl cb_odd
f 161 180 179
f 161 179 160
o tile_9_9
usemtl cb_even
f 162 181 180
f 162 180 161
o tile_10_9
usemtl cb_odd
f 163 182 181
f 163 181 162
o tile_11_9
usemtl cb_even
f 164 183 182
f 164 182 163
o tile_12_9
usemtl cb_odd
f 165 184 183
f 165 183 164
o tile_13_9
usemtl cb_even
f 166 185 184
f 166 184 165
o tile_14_9
usemtl cb_odd
f 167 186 185
f 167 185 166
o tile_15_9
usemtl cb_even
f 168 187 186
f 168 186 167
o tile_16_9
usemtl cb_odd
f 169 188 187
f 169 187 168
o tile_17_9
usemtl cb_even
f 170 189 188
f 170 188 169
o tile_18_9
usemtl cb_border
f 171 190 189
f 171 189 170
o tile_1_10
usemtl cb_border
f 173 192 191
f 173 191 172
o tile_2_10
usemtl cb_even
f 174 193 192
f 174 192 173
o tile_3_10
usemtl cb_odd
f 175 194 193
f 175 193 174
o tile_4_10
usemtl cb_even
f 176 195 194
f 176 194 175
o tile_5_10
usemtl cb_odd
f 177 196 195
f 177 195 176
o tile_6_10
usemtl cb_even
f 178 197 196
f 178 196 177
o tile_7_10
usemtl cb_odd
f 179 198 197
f 179 197 178
o tile_8_10
usemtl cb_even
f 180 199 198
f 180 198 179
o tile_9_10
usemtl cb_odd
f 181 200 199
f 181 199 180
o tile_10_10
usemtl cb_even
f 182 201 200
f 182 200 181
o tile_11_10
usemtl cb_odd
f 183 202 201
f 183 201 182
o tile_12_10
usemtl cb_even
f 184 203 202
f 184 202 183
o tile_13_10
usemtl cb_odd
f 185 204 203
f 185 203 184
o tile_14_10
usemtl cb_even
f 186 205 204
f 186 204 185
o tile_15_10
usemtl cb_odd
f 187 206 205
f 187 205 186
o tile_16_10
usemtl cb_even
f 188 207 206
f 188 206 187
o tile_17_10
usemtl cb_odd
f 189 208 207
f 189 207 188
o tile_18_10
usemtl cb_border
f 190 209 208
f 190 208 189
o tile_1_11
usemtl cb_border
f 192 211 210
f 192 210 191
o tile_2_11
usemtl cb_odd
f 193 212 211
f 193 211 192
o tile_3_11
usemtl cb_even
f 194 213 212
f 194 212 193
o tile_4_11
usemtl cb_odd
f 195 214 213
f 195 213 194
o tile_5_11
usemtl cb_even
f 196 215 214
f 196 214 195
o tile_6_11
usemtl cb_odd
f 197 216 215
f 197 215 196
o tile_7_11
usemtl cb_even
f 198 217 216
f 198 216 197
o tile_8_11
usemtl cb_odd
f 199 218 217
f 199 217 198
o tile_9_11
usemtl cb_even
f 200 219 218
f 200 218 199
o tile_10_11
usemtl cb_odd
f 201 220 219
f 201 219 200
o tile_11_11
usemtl cb_even
f 202 221 220
f 202 220 201
o tile_12_11
usemtl cb_odd
f 203 222 221
f 203 221 202
o tile_13_11
usemtl cb_even
f 204 223 222
f 204 222 203
o tile_14_11
usemtl cb_odd
f 205 224 223
f 205 223 204
o tile_15_11
usemtl cb_even
f 206 225 224
f 206 224 205
o tile_16_11
usemtl cb_odd
f 207 226 225
f 207 225 206
o tile_17_11
usemtl cb_even
f 208 227 226
f 208 226 207
o tile_18_11
usemtl cb_border
f 209 228 227
f 209 227 208
o tile_1_12
usemtl cb_border
f 211 230 229
f 211 229 210
o tile_2_12
usemtl cb_even
f 212 231 230
f 212 230 211
o tile_3_12
usemtl cb_odd
f 213 232 231
f 213 231 212
o tile_4_12
usemtl cb_even
f 214 233 232
f 214 232 213
o tile_5_12
usemtl cb_odd
f 215 234 233
f 215 233 214
o tile_6_12
usemtl cb_even
f 216 235 234
f 216 234 215
o tile_7_12
usemtl cb_odd
f 217 236 235
f 217 235 216
o tile_8_12
usemtl cb_even
f 218 237 236
f 218 236 217
o tile_9_12
usemtl cb_odd
f 219 238 237
f 219 237 218
o tile_10_12
usemtl cb_even
f 220 239 238
f 220 238 219
o tile_11_12
usemtl cb_odd
f 221 240 239
f 221 239 220
o tile_12_12
usemtl cb_even
f 222 241 240
f 222 240 221
o tile_13_12
usemtl cb_odd
f 223 242 241
f 223 241 222
o tile_14_12
usemtl cb_even
f 224 243 242
f 224 242 223
o tile_15_12
usemtl cb_odd
f 225 244 243
f 225 243 224
o tile_16_12
usemtl cb_even
f 226 245 244
f 226 244 225
o tile_17_12
usemtl cb_odd
f 227 246 245
f 227 245 226
o tile_18_12
usemtl cb_border
f 228 247 246
f 228 246 227
o tile_1_13
usemtl cb_border
f 230 249 248
f 230 248 229
o tile_2_13
usemtl cb_odd
f 231 250 249
f 231 249 230
o tile_3_13
usemtl cb_even
f 232 251 250
f 232 250 231
o tile_4_13
usemtl cb_odd
f 233 252 251
f 233 251 232
o tile_5_13
usemtl cb_even
f 234 253 252
f 234 252 233
o tile_6_13
usemtl cb_odd
f 235 254 253
f 235 253 234
o tile_7_13
usemtl cb_even
f 236 255 254
f 236 254 235
o tile_8_13
usemtl cb_odd
f 237 256 255
f 237 255 236
o tile_9_13
usemtl cb_even
f 238 257 256
f 238 256 237
o tile_10_13
usemtl cb_odd
f 239 258 257
f 239 257 238
o tile_11_13
usemtl cb_even
f 240 259 258
f 240 258 239
o tile_12_13
usemtl cb_odd
f 241 260 259
f 241 259 240
o tile_13_13
usemtl cb_even
f 242 261 260
f 242 260 241
o tile_14_13
usemtl cb_odd
f 243 262 261
f 243 261 242
o tile_15_13
usemtl cb_even
f 244 263 262
f 244 262 243
o tile_16_13
usemtl cb_odd
f 245 264 263
f 245 263 244
o tile_17_13
usemtl cb_even
f 246 265 264
f 246 264 245
o tile_18_13
usemtl cb_border
f 247 266 265
f 247 265 246
o tile_1_14
usemtl cb_border
f 249 268 267
f 249 267 248
o tile_2_14
usemtl cb_even
f 250 269 268
f 250 268 249
o tile_3_14
usemtl cb_odd
f 251 270 269
f 251 269 250
o tile_4_14
usemtl cb_even
f 252 271 270
f 252 270 251
o tile_5_14
usemtl cb_odd
f 253 272 271
f 253 271 252
o tile_6_14
usemtl cb_even
f 254 273 272
f 254 272 253
o tile_7_14
usemtl cb_odd
f 255 274 273
f 255 273 254
o tile_8_14
usemtl cb_even
f 256 275 274
f 256 274 255
o tile_9_14
usemtl cb_odd
f 257 276 275
f 257 275 256
o tile_10_14
usemtl cb_even
f 258 277 276
f 258 276 257
o tile_11_14
usemtl cb_odd
f 259 278 277
f 259 277 258
o tile_12_14
usemtl cb_even
f 260 279 278
f 260 278 259
o tile_13_14
usemtl cb_odd
f 261 280 279
f 261 279 260
o tile_14_14
usemtl cb_even
f 262 281 280
f 262 280 261
o tile_15_14
usemtl cb_odd
f 263 282 281
f 263 281 262
o tile_16_14
usemtl cb_even
f 264 283 282
f 264 282 263
o tile_17_14
usemtl cb_odd
f 265 284 283
f 265 283 264
o tile_18_14
usemtl cb_border
f 266 285 284
f 266 284 265
o tile_1_15
usemtl cb_border
f 268 287 286
f 268 286 267
o tile_2_15
usemtl cb_odd
f 269 288 287
f 269 287 268
o tile_3_15
usemtl cb_even
f 270 289 288
f 270 288 269
o tile_4_15
usemtl cb_odd
f 271 290 289
f 271 289 270
o tile_5_15
usemtl cb_even
f 272 291 290
f 272 290 271
o tile_6_15
usemtl cb_odd
f 273 292 291
f 273 291 272
o tile_7_15
usemtl cb_even
f 274 293 292
f 274 292 273
o tile_8_15
usemtl cb_odd
f 275 294 293
f 275 293 274
o tile_9_15
usemtl cb_even
f 276 295 294
f 276 294 275
o tile_10_15
usemtl cb_odd
f 277 296 295
f 277 295 276
o tile_11_15
usemtl cb_even
f 278 297 296
f 278 296 277
o tile_12_15
usemtl cb_odd
f 279 298 297
f 279 297 278
o tile_13_15
usemtl cb_even
f 280 299 298
f 280 298 279
o tile_14_15
usemtl cb_odd
f 281 300 299
f 281 299 280
o tile_15_15
usemtl cb_even
f 282 301 300
f 282 300 281
o tile_16_15
usemtl cb_odd
f 283 302 301
f 283 301 282
o tile_17_15
usemtl cb_even
f 284 303 302
f 284 302 283
o tile_18_15
usemtl cb_border
f 285 304 303
f 285 303 284
o tile_1_16
usemtl cb_border
f 287 306 305
f 287 305 286
o tile_2_16
usemtl cb_even
f 288 307 306
f 288 306 287
o tile_3_16
usemtl cb_odd
f 289 308 307
f 289 307 288
o tile_4_16
usemtl cb_even
f 290 309 308
f 290 308 289
o tile_5_16
usemtl cb_odd
f 291 310 309
f 291 309 290
o tile_6_16
usemtl cb_even
f 292 311 310
f 292 310 291
o tile_7_16
usemtl cb_odd
f 293 312 311
f 293 311 292
o tile_8_16
usemtl cb_even
f 294 313 312
f 294 312 293
o tile_9_16
usemtl cb_odd
f 295 314 313
f 295 313 294
o tile_10_16
usemtl cb_even
f 296 315 314
f 296 314 295
o tile_11_16
usemtl cb_odd
f 297 316 315
f 297 315 296
o tile_12_16
usemtl cb_even
f 298 317 316
f 298 316 297
o tile_13_16
usemtl cb_odd
f 299 318 317
f 299 317 298
o tile_14_16
usemtl cb_even
f 300 319 318
f 300 318 299
o tile_15_16
usemtl cb_odd
f 301 320 319
f 301 319 300
o tile_16_16
usemtl cb_even
f 302 321 320
f 302 320 301
o tile_17_16
usemtl cb_odd
f 303 322 321
f 303 321 302
o tile_18_16
usemtl cb_border
f 304 323 322
f 304 322 303
o tile_1_17
usemtl cb_border
f 306 325 324
f 306 324 305
o tile_2_17
usemtl cb_odd
f 307 326 325
f 307 325 306
o tile_3_17
usemtl cb_even
f 308 327 326
f 308 326 307
o tile_4_17
usemtl cb_odd
f 309 328 327
f 309 327 308
o tile_5_17
usemtl cb_even
f 310 329 328
f 310 328 309
o tile_6_17
usemtl cb_odd
f 311 330 329
f 311 329 310
o tile_7_17
usemtl cb_even
f 312 331 330
f 312 330 311
o tile_8_17
usemtl cb_odd
f 313 332 331
f 313 331 312
o tile_9_17
usemtl cb_even
f 314 333 332
f 314 332 313
o tile_10_17
usemtl cb_odd
f 315 334 333
f 315 333 314
o tile_11_17
usemtl cb_even
f 316 335 334
f 316 334 315
o tile_12_17
usemtl cb_odd
f 317 336 335
f 317 335 316
o tile_13_17
usemtl cb_even
f 318 337 336
f 318 336 317
o tile_14_17
usemtl cb_odd
f 319 338 337
f 319 337 318
o tile_15_17
usemtl cb_even
f 320 339 338
f 320 338 319
o tile_16_17
usemtl cb_odd
f 321 340 339
f 321 339 320
o tile_17_17
usemtl cb_even
f 322 341 340
f 322 340 321
o tile_18_17
usemtl cb_border
f 323 342 341
f 323 341 322
o tile_1_18
usemtl cb_border
f 325 344 343
f 325 343 324
o tile_2_18
usemtl cb_border
f 326 345 344
f 326 344 325
o tile_3_18
usemtl cb_border
f 327 346 345
f 327 345 326
o tile_4_18
usemtl cb_border
f 328 347 346
f 328 346 327
o tile_5_18
usemtl cb_border
f 329 348 347
f 329 347 328
o tile_6_18
usemtl cb_border
f 330 349 348
f 330 348 329
o tile_7_18
usemtl cb_border
f 331 350 349
f 331 349 330
o tile_8_18
usemtl cb_border
f 332 351 350
f 332 350 331
o tile_9_18
usemtl cb_border
f 333 352 351
f 333 351 332
o tile_10_18
usemtl cb_border
f 334 353 352
f 334 352 333
o tile_11_18
usemtl cb_border
f 335 354 353
f 335 353 334
o tile_12_18
usemtl cb_border
f 336 355 354
f 336 354 335
o tile_13_18
usemtl cb_border
f 337 356 355
f 337 355 336
o tile_14_18
usemtl cb_border
f 338 357 356
f 338 356 337
o tile_15_18
usemtl cb_border
f 339 358 357
f 339 357 338
o tile_16_18
usemtl cb_border
f 340 359 358
f 340 358 339
o tile_17_18
usemtl cb_border
f 341 360 359
f 341 359 340
o tile_18_18
usemtl cb_border
f 342 361 360
f 342 360 341