forked from 0ad/0ad
1663 lines
109 KiB (Stored with Git LFS)
Plaintext
1663 lines
109 KiB (Stored with Git LFS)
Plaintext
<?xml version="1.0" encoding="utf-8" ?>
|
|
<COLLADA xmlns="http://www.collada.org/2005/11/COLLADASchema" version="1.4.1">
|
|
<asset>
|
|
<contributor>
|
|
<authoring_tool>modo 501 [Build 45398], Microsoft Windows 7 Service Pack 1 (6.1.7601 Service Pack 1)</authoring_tool>
|
|
<comments>
|
|
Plug-in: [Build 45398];
|
|
Use Absolute Path: No;
|
|
Merge Reference Items: No;
|
|
Save Hidden Items: Yes;
|
|
Save Cameras: Yes;
|
|
Save Lights: Yes;
|
|
Save Locators: Yes;
|
|
Save Triangles as Triangles: No;
|
|
Bake Matrices: No;
|
|
Save Vertex Normals: Yes;
|
|
Save UV Texture Coordinates: Yes;
|
|
Save Vertex Colors: Yes;
|
|
Save Vertex Weights: Yes;
|
|
Save Animation: Yes;
|
|
Sample Animation: No;
|
|
Sample Animation Start: 0;
|
|
Sample Animation End: 120;
|
|
Save modo Profile: Yes;
|
|
Save Maya Profile: Yes;
|
|
Save 3ds Max Profile: Yes;
|
|
Formatted Arrays: Yes;
|
|
</comments>
|
|
<source_data>file:///G:/3D%20Modeling/Documents/Wildfire%20Games/Mauryan%20Civic%20Centre/art/meshes/props/ashoka_lion.dae</source_data>
|
|
</contributor>
|
|
<created>2012-08-11T17:18:01Z</created>
|
|
<modified>2012-08-11T17:18:01Z</modified>
|
|
<up_axis>Y_UP</up_axis>
|
|
</asset>
|
|
<library_cameras>
|
|
<camera id="Camera-Camera" name="Camera">
|
|
<optics>
|
|
<technique_common>
|
|
<perspective>
|
|
<xfov sid="HFOV">39.5978</xfov>
|
|
<yfov sid="YFOV">26.9915</yfov>
|
|
<znear sid="near_clip">0.01</znear>
|
|
<zfar sid="far_clip">10000</zfar>
|
|
</perspective>
|
|
</technique_common>
|
|
<technique profile="modo401">
|
|
<param sid="projType" name="Projection_Type" type="Name">persp</param>
|
|
<param sid="focalLen" name="Focal_Length" type="float">0.05</param>
|
|
<param sid="distort" name="Lens_Distortion" type="float">0</param>
|
|
<param sid="squeeze" name="Lens_Squeeze" type="float">1</param>
|
|
<param sid="focusDist" name="Focus_Distance" type="float">4</param>
|
|
<param sid="fStop" name="F-Stop" type="float">4</param>
|
|
<param sid="blurLen" name="Blur_Length" type="float">0.5</param>
|
|
<param sid="blurOff" name="Blur_Offset" type="float">0</param>
|
|
<param sid="ioDist" name="Interocular_Distance" type="float">0.065</param>
|
|
<param sid="convDist" name="Convergence_Distance" type="float">2</param>
|
|
</technique>
|
|
</optics>
|
|
<imager>
|
|
<technique profile="modo401">
|
|
<param sid="apertureX" name="Film_Width" type="float">0.036</param>
|
|
<param sid="apertureY" name="Film_Height" type="float">0.024</param>
|
|
<param sid="offsetX" name="Film_Offset_X" type="float">0</param>
|
|
<param sid="offsetY" name="Film_Offset_Y" type="float">0</param>
|
|
<param sid="filmFit" name="Film_Fit" type="Name">fill</param>
|
|
</technique>
|
|
</imager>
|
|
</camera>
|
|
</library_cameras>
|
|
<library_materials>
|
|
<material id="Material-Ashoka_Lion_Mat" name="Ashoka_Lion_Mat">
|
|
<instance_effect url="#Effect-Ashoka_Lion_Mat" />
|
|
</material>
|
|
</library_materials>
|
|
<library_effects>
|
|
<effect id="Effect-Ashoka_Lion_Mat" name="Ashoka_Lion_Mat">
|
|
<profile_COMMON>
|
|
<technique sid="common">
|
|
<phong>
|
|
<diffuse>
|
|
<color sid="diffuse_effect_rgb">0.8 0.8 0.8 1</color>
|
|
</diffuse>
|
|
<specular>
|
|
<color sid="specular_effect_rgb">0.2 0.2 0.2 1</color>
|
|
</specular>
|
|
<shininess>
|
|
<float sid="specular_effect_rgb">256</float>
|
|
</shininess>
|
|
</phong>
|
|
</technique>
|
|
</profile_COMMON>
|
|
</effect>
|
|
</library_effects>
|
|
<library_geometries>
|
|
<geometry id="Geometry-Ashoka_Lion" name="Ashoka_Lion">
|
|
<mesh>
|
|
<source id="Geometry-Ashoka_Lion-positions" name="positions">
|
|
<float_array id="Geometry-Ashoka_Lion-positions-array" count="735">
|
|
0.447769 -0.000152662 -0.534799
|
|
0.480429 -0.000152662 -0.0946689
|
|
0.435166 -0.000152662 0.465621
|
|
0.279434 0.921113 -0.0790544
|
|
0.323938 0.94429 0.227627
|
|
0.20285 1.02535 0.4528
|
|
0.219437 1.45208 0.227382
|
|
0.285426 1.51978 0.502749
|
|
0.185162 1.32752 0.695789
|
|
0.404958 0.639933 -0.408803
|
|
0.36769 0.618269 0.0558209
|
|
0.335918 0.58816 0.405925
|
|
0.382356 0.283655 -0.577862
|
|
0.303493 0.171988 -0.125032
|
|
0.326358 0.254817 0.324742
|
|
0.180194 1.60212 0.514871
|
|
0.131761 1.47646 0.155866
|
|
0.120189 1.3139 0.736927
|
|
0.15478 0.911516 -0.222888
|
|
0.254418 1.30773 0.12057
|
|
0.133645 1.29192 -0.0120673
|
|
0.307414 1.22309 0.494956
|
|
0.194913 1.13442 0.629679
|
|
0.123101 0.981814 0.546252
|
|
0.13428 1.1052 0.675046
|
|
0.237507 0.643598 -0.613657
|
|
0.166233 0.58612 0.465516
|
|
0.318221 -0.000152662 -0.638527
|
|
0.245538 0.312429 -0.725536
|
|
0.120881 -0.000152662 0.477393
|
|
0.183341 0.289421 0.390816
|
|
0.125103 1.39437 0.0657048
|
|
0.228527 1.39968 0.18246
|
|
0.0872941 1.23015 0.801388
|
|
0.188337 1.25578 0.693542
|
|
0.178236 0.426796 0.43204
|
|
0.348579 0.427342 0.372077
|
|
0.247467 0.492507 -0.709108
|
|
0.435371 0.497327 -0.524338
|
|
0.390414 0.15015 0.444682
|
|
0.129474 0.150509 0.463243
|
|
0.296862 0.144882 -0.731863
|
|
0.434334 0.150313 -0.611063
|
|
0.189272 1.58173 0.574042
|
|
0.253858 1.49068 0.561607
|
|
0.268876 1.00039 0.368852
|
|
0.361185 0.603125 0.250981
|
|
0.419312 0.109395 -0.101725
|
|
0.303287 0.174935 0.0788541
|
|
0.416348 -0.000152662 0.0830703
|
|
0.362264 0.0949477 0.0773225
|
|
0.353173 0.459027 -0.0148387
|
|
0.35067 0.440019 0.19158
|
|
0.257998 1.18333 0.554796
|
|
0.296446 1.41024 0.488074
|
|
0.255231 1.35293 0.579583
|
|
0.303831 1.3163 0.26706
|
|
0.259027 1.4942 0.352275
|
|
0.280032 1.4259 0.331114
|
|
0.363523 0.212007 -0.346571
|
|
0.501648 -0.000152662 -0.339742
|
|
0.446581 0.138777 -0.349054
|
|
0.154304 1.57143 0.32431
|
|
0.32626 0.954471 0.0461907
|
|
0.402946 0.628259 -0.169652
|
|
0.416013 0.470611 -0.253021
|
|
0.145494 1.11807 -0.105342
|
|
0.295074 1.17812 0.467397
|
|
0.278679 1.13787 0.0271564
|
|
0.306672 1.15805 0.168829
|
|
0.190055 1.07971 0.481217
|
|
0.250352 1.13981 0.44903
|
|
0.177824 1.07753 0.563279
|
|
0.247876 1.18638 0.517147
|
|
0.224401 1.1409 0.498992
|
|
0.159782 1.18805 0.513432
|
|
0.170854 1.1473 0.498748
|
|
0.0785949 -0.000152662 0.387655
|
|
0.0747736 0.1363 0.375564
|
|
0.109638 0.295457 0.328664
|
|
0.138649 0.49247 -0.788463
|
|
0.145724 0.297523 -0.804887
|
|
0.0998814 0.428123 0.336504
|
|
0.0520937 1.22794 0.798137
|
|
0.0718617 1.30662 0.752327
|
|
0.0515637 1.16306 0.498764
|
|
0.0768981 1.18164 0.506677
|
|
0.096837 0.598116 0.420537
|
|
0.0808339 0.934344 0.561306
|
|
0.0634675 1.02868 0.656179
|
|
0.0876577 1.119 -0.124125
|
|
0.0960758 0.912654 -0.240148
|
|
0.111048 1.53566 0.638675
|
|
0.0540061 1.07741 0.695613
|
|
0.0786414 1.39926 0.0517592
|
|
0.0809927 1.29342 -0.0275054
|
|
0.0805268 1.4903 0.138537
|
|
0.104402 1.60269 0.513881
|
|
0.181411 0.14788 -0.748105
|
|
0.147142 -0.000152662 -0.408696
|
|
0.0964081 1.5992 0.315877
|
|
0.142701 0.65485 -0.664445
|
|
-4.76837e-007 0.49247 -0.788463
|
|
-4.76837e-007 0.65485 -0.664445
|
|
-4.76837e-007 1.4903 0.138537
|
|
-4.76837e-007 1.5992 0.315877
|
|
-4.76837e-007 0.598116 0.420537
|
|
-4.76837e-007 0.428123 0.336504
|
|
-4.76837e-007 0.912654 -0.240148
|
|
-4.76837e-007 1.119 -0.124125
|
|
-4.76837e-007 1.22794 0.804887
|
|
-4.76837e-007 1.07741 0.695613
|
|
-4.76837e-007 -0.0126887 -0.41352
|
|
-4.76837e-007 0.112017 -0.752929
|
|
-4.76837e-007 0.295457 0.328664
|
|
-4.76837e-007 0.136161 0.374493
|
|
-4.76837e-007 1.30662 0.752327
|
|
-4.76837e-007 1.18289 0.503326
|
|
-4.76837e-007 1.03788 0.647006
|
|
-4.76837e-007 0.936849 0.558213
|
|
-4.76837e-007 1.60269 0.513881
|
|
-4.76837e-007 0.297523 -0.804887
|
|
-4.76837e-007 1.16559 0.503866
|
|
-4.76837e-007 1.29342 -0.0275054
|
|
-4.76837e-007 1.39926 0.0517592
|
|
-4.76837e-007 1.53566 0.638675
|
|
-4.76837e-007 -0.000152662 0.386584
|
|
0.120574 1.06162 0.595301
|
|
0.120407 1.09745 0.566831
|
|
0.0608079 1.10331 0.573005
|
|
0.0646398 1.05186 0.637616
|
|
0.129319 1.10638 0.662161
|
|
0.138839 1.14798 0.586932
|
|
0.0701487 1.15102 0.56981
|
|
0.0637589 1.09538 0.665833
|
|
-0.44777 -0.000152662 -0.534799
|
|
-0.48043 -0.000152662 -0.0946689
|
|
-0.435167 -0.000152662 0.465621
|
|
-0.279435 0.921113 -0.0790544
|
|
-0.323939 0.94429 0.227627
|
|
-0.202851 1.02535 0.4528
|
|
-0.219438 1.45208 0.227382
|
|
-0.285427 1.51978 0.502749
|
|
-0.185163 1.32752 0.695789
|
|
-0.404959 0.639933 -0.408803
|
|
-0.367691 0.618269 0.0558209
|
|
-0.335919 0.58816 0.405925
|
|
-0.382357 0.283655 -0.577862
|
|
-0.303494 0.171988 -0.125032
|
|
-0.326359 0.254817 0.324742
|
|
-0.180195 1.60212 0.514871
|
|
-0.131762 1.47646 0.155866
|
|
-0.12019 1.3139 0.736927
|
|
-0.154781 0.911516 -0.222888
|
|
-0.254419 1.30773 0.12057
|
|
-0.133646 1.29192 -0.0120673
|
|
-0.307415 1.22309 0.494956
|
|
-0.194914 1.13442 0.629679
|
|
-0.123102 0.981814 0.546252
|
|
-0.134281 1.1052 0.675046
|
|
-0.237508 0.643598 -0.613657
|
|
-0.166234 0.58612 0.465516
|
|
-0.318222 -0.000152662 -0.638527
|
|
-0.245539 0.312429 -0.725536
|
|
-0.120882 -0.000152662 0.477393
|
|
-0.183342 0.289421 0.390816
|
|
-0.125103 1.39437 0.0657048
|
|
-0.228528 1.39968 0.18246
|
|
-0.0872948 1.23015 0.801388
|
|
-0.188337 1.25578 0.693542
|
|
-0.178237 0.426796 0.43204
|
|
-0.348579 0.427342 0.372077
|
|
-0.247468 0.492507 -0.709108
|
|
-0.435372 0.497327 -0.524338
|
|
-0.390415 0.15015 0.444682
|
|
-0.129474 0.150509 0.463243
|
|
-0.296863 0.144882 -0.731863
|
|
-0.434335 0.150313 -0.611063
|
|
-0.189273 1.58173 0.574042
|
|
-0.253859 1.49068 0.561607
|
|
-0.268877 1.00039 0.368852
|
|
-0.361186 0.603125 0.250982
|
|
-0.419313 0.109395 -0.101725
|
|
-0.303288 0.174935 0.0788541
|
|
-0.416349 -0.000152662 0.0830703
|
|
-0.362265 0.0949477 0.0773225
|
|
-0.353174 0.459027 -0.0148387
|
|
-0.350671 0.440019 0.19158
|
|
-0.257998 1.18333 0.554796
|
|
-0.296447 1.41024 0.488074
|
|
-0.255232 1.35293 0.579583
|
|
-0.303832 1.3163 0.26706
|
|
-0.259028 1.4942 0.352275
|
|
-0.280033 1.4259 0.331114
|
|
-0.363523 0.212007 -0.346571
|
|
-0.501649 -0.000152662 -0.339742
|
|
-0.446582 0.138777 -0.349054
|
|
-0.154305 1.57143 0.32431
|
|
-0.326261 0.954471 0.0461907
|
|
-0.402947 0.628259 -0.169652
|
|
-0.416014 0.470611 -0.253021
|
|
-0.145495 1.11807 -0.105342
|
|
-0.295075 1.17812 0.467397
|
|
-0.27868 1.13787 0.0271564
|
|
-0.306673 1.15805 0.168829
|
|
-0.190056 1.07971 0.481217
|
|
-0.250352 1.13981 0.44903
|
|
-0.177825 1.07753 0.563279
|
|
-0.247877 1.18638 0.517147
|
|
-0.224402 1.1409 0.498992
|
|
-0.159783 1.18805 0.513432
|
|
-0.170855 1.1473 0.498748
|
|
-0.0785959 -0.000152662 0.387655
|
|
-0.0747743 0.1363 0.375564
|
|
-0.109639 0.295457 0.328664
|
|
-0.13865 0.49247 -0.788463
|
|
-0.145725 0.297523 -0.804887
|
|
-0.0998824 0.428123 0.336504
|
|
-0.0520945 1.22794 0.798137
|
|
-0.0718627 1.30662 0.752327
|
|
-0.0515647 1.16306 0.498764
|
|
-0.0768991 1.18164 0.506677
|
|
-0.096838 0.598116 0.420537
|
|
-0.0808349 0.934344 0.561306
|
|
-0.0634682 1.02868 0.656179
|
|
-0.0876586 1.119 -0.124125
|
|
-0.0960767 0.912654 -0.240148
|
|
-0.111049 1.53566 0.638675
|
|
-0.0540071 1.07741 0.695613
|
|
-0.0786424 1.39926 0.0517592
|
|
-0.0809937 1.29342 -0.0275054
|
|
-0.0805278 1.4903 0.138537
|
|
-0.104403 1.60269 0.513881
|
|
-0.181412 0.14788 -0.748105
|
|
-0.147143 -0.000152662 -0.408696
|
|
-0.0964091 1.5992 0.315877
|
|
-0.142702 0.65485 -0.664445
|
|
-0.120575 1.06162 0.595301
|
|
-0.120408 1.09745 0.566831
|
|
-0.0608089 1.10331 0.573005
|
|
-0.0646408 1.05186 0.637616
|
|
-0.12932 1.10638 0.662161
|
|
-0.13884 1.14798 0.586932
|
|
-0.0701497 1.15102 0.56981
|
|
-0.0637596 1.09538 0.665833
|
|
</float_array>
|
|
<technique_common>
|
|
<accessor count="245" source="#Geometry-Ashoka_Lion-positions-array" stride="3">
|
|
<param name="X" type="float" />
|
|
<param name="Y" type="float" />
|
|
<param name="Z" type="float" />
|
|
</accessor>
|
|
</technique_common>
|
|
</source>
|
|
<source id="Geometry-Ashoka_Lion-normals" name="normals">
|
|
<float_array id="Geometry-Ashoka_Lion-normals-array" count="1704">
|
|
0.990968 0.0523511 0.123459
|
|
0.993253 -0.115964 -0.000778166
|
|
0.997748 0.00652843 0.0667533
|
|
0.982729 -0.150993 0.106981
|
|
0.97839 0.135662 0.156043
|
|
0.863542 0.0174857 0.503973
|
|
0.966527 -0.0407015 0.253316
|
|
0.833646 -0.122489 0.538545
|
|
0.880149 -0.131708 0.45606
|
|
0.763515 0.618279 0.186481
|
|
0.5794 0.777264 0.245266
|
|
0.527448 0.836296 0.149691
|
|
0.638226 0.714134 0.287541
|
|
0.7478 0.639739 0.177565
|
|
0.966359 -0.24208 0.0868727
|
|
0.985073 -0.0966192 0.142466
|
|
0.96122 -0.231694 0.149579
|
|
0.987721 0.0273473 0.153819
|
|
0.870293 -0.376794 0.3172
|
|
0.888841 -0.0359164 0.456806
|
|
0.366411 -0.384175 0.847439
|
|
0.0639777 -0.491102 0.868749
|
|
0.412162 -0.542401 0.732068
|
|
0.989598 0.0767713 0.121662
|
|
0.984582 0.15333 -0.084196
|
|
0.967432 0.208914 -0.142937
|
|
0.445951 0.352101 0.822893
|
|
0.0481592 0.482713 0.874454
|
|
0.261617 0.479715 0.837515
|
|
-0.00122999 0.527646 0.849464
|
|
0.0324475 0.544311 0.838256
|
|
0.131964 0.521809 -0.842794
|
|
0.117041 0.637886 -0.761185
|
|
0.450982 0.512433 -0.730773
|
|
0.470125 0.60094 -0.646416
|
|
-0.718942 -0.206833 0.663583
|
|
-0.690177 -0.247052 0.680163
|
|
-0.621069 -0.290996 0.727732
|
|
-0.555828 -0.278199 0.783365
|
|
-0.327495 -0.379179 0.865431
|
|
0.46544 0.829813 -0.307856
|
|
0.541908 0.828406 -0.141704
|
|
0.803274 0.532737 -0.266351
|
|
0.582151 0.778538 -0.234473
|
|
0.0370116 0.148692 0.988191
|
|
0.0581155 0.229542 0.971562
|
|
0.0539335 0.11905 0.991422
|
|
0.0686869 0.270022 0.960401
|
|
0.784204 0.417604 -0.458944
|
|
0.731146 0.505351 -0.458307
|
|
0.960652 0.234154 0.149395
|
|
0.916176 0.053244 0.397223
|
|
-0.0438921 -0.325216 0.944621
|
|
-0.0355218 -0.260356 0.964859
|
|
-0.0426025 -0.32027 0.946368
|
|
0.272781 0.689479 -0.670977
|
|
0.107265 0.403456 -0.90869
|
|
0 0.743657 -0.668561
|
|
0 0.359887 -0.932996
|
|
0.154417 -0.752624 -0.640088
|
|
0.1403 -0.922163 -0.36046
|
|
0 -0.931375 -0.364061
|
|
0 -0.938648 -0.344877
|
|
-0.0836463 -0.917364 -0.389162
|
|
0.255731 -0.243935 -0.935466
|
|
0.00412624 -0.2918 -0.95647
|
|
0.18994 -0.174184 -0.966221
|
|
-0.0114583 -0.0811929 -0.996633
|
|
0.179853 0.766591 -0.616434
|
|
0 0.749578 -0.661916
|
|
0 0.645842 -0.763471
|
|
0.188799 0.720374 0.667395
|
|
0.194131 0.708705 0.67827
|
|
0.194987 0.722414 0.663399
|
|
0.25495 0.689657 0.677771
|
|
0.64284 -0.741669 -0.191533
|
|
0.438865 -0.819098 -0.369425
|
|
0.267556 -0.89089 -0.367054
|
|
0.107997 -0.894535 -0.433756
|
|
0.266804 -0.869942 -0.414749
|
|
-0.852587 0.487744 0.187618
|
|
-0.89023 0.443058 0.105781
|
|
-0.763515 0.618279 0.186481
|
|
-0.854617 0.519093 0.0131095
|
|
-0.940303 0.135837 0.312056
|
|
-0.990968 0.0523508 0.12346
|
|
-0.996988 -0.0510599 0.0583702
|
|
-0.993253 -0.115964 -0.000777746
|
|
-0.966527 -0.0407019 0.253317
|
|
-0.97839 0.135662 0.156043
|
|
-0.970942 0.171757 -0.166644
|
|
-0.89546 0.364042 -0.256173
|
|
-0.887417 0.455538 0.0705374
|
|
-0.912657 0.408602 -0.0100449
|
|
-0.982551 0.146616 -0.114447
|
|
-0.984998 -0.130011 0.113473
|
|
-0.992087 -0.0272152 0.122571
|
|
-0.702778 -0.317609 0.636575
|
|
-0.539644 -0.578583 0.611577
|
|
-0.564423 -0.539319 0.624949
|
|
-0.631136 -0.631473 0.450455
|
|
-0.945501 0.308099 -0.105371
|
|
-0.988672 0.146738 0.0315619
|
|
-0.895868 0.35515 -0.267001
|
|
-0.967432 0.208914 -0.142937
|
|
-0.776297 0.442298 -0.44915
|
|
0.0470963 -0.349975 0.935574
|
|
0.0438921 -0.325216 0.944621
|
|
0.0467695 -0.342313 0.938421
|
|
-0.00297 -0.219098 0.975698
|
|
-0.502496 0.676626 -0.538215
|
|
-0.179853 0.766591 -0.616434
|
|
-0.470125 0.60094 -0.646416
|
|
-0.117041 0.637886 -0.761185
|
|
-0.272781 0.689479 -0.670977
|
|
-0.474289 0.672311 -0.568373
|
|
-0.133689 0.749909 -0.647892
|
|
-0.351925 0.685582 -0.63728
|
|
-0.693227 0.151156 0.70469
|
|
-0.760775 -0.0972464 0.641689
|
|
-0.445951 0.3521 0.822893
|
|
-0.587982 0.18383 0.787708
|
|
-0.515502 0.344262 0.784692
|
|
-0.727 0.274027 0.629587
|
|
-0.624167 0.193923 0.756841
|
|
-0.614738 0.381723 0.690207
|
|
-0.0686869 0.270022 0.960401
|
|
0.0450916 0.599453 0.799139
|
|
-0.156411 0.396165 0.904759
|
|
-0.406131 0.784866 0.46802
|
|
-0.248502 0.647955 0.72
|
|
-0.467185 -0.0416264 0.883179
|
|
-0.484967 -0.0888551 0.870007
|
|
-0.688787 -0.00554573 0.724942
|
|
-0.712928 -0.310225 0.628884
|
|
-0.792755 -0.067944 0.605742
|
|
-0.22125 0.934013 -0.280479
|
|
0 0.930535 -0.366202
|
|
0.209412 0.202139 0.956706
|
|
0.13118 0.224534 0.965596
|
|
5.78913e-009 0.11192 0.993717
|
|
2.29249e-008 0.183257 0.983065
|
|
0 0.113524 0.993535
|
|
0 -0.190414 0.981704
|
|
0 -0.320773 0.947156
|
|
-0.219144 -0.0653377 -0.973502
|
|
-0.21693 0.278037 -0.935755
|
|
-0.188799 0.720374 0.667395
|
|
-0.194131 0.708705 0.67827
|
|
-0.0900098 0.763138 0.639937
|
|
-0.139855 0.77979 0.61022
|
|
-0.0672667 -0.873527 -0.482106
|
|
-0.267551 -0.890891 -0.367056
|
|
-0.141072 -0.916139 -0.375216
|
|
-0.413472 -0.878371 -0.239801
|
|
0.985625 -0.168376 -0.0138531
|
|
0.742454 -0.280001 0.608574
|
|
0.760775 -0.0972462 0.641688
|
|
0.974713 0.220567 -0.0358499
|
|
0.942821 0.314778 -0.109561
|
|
0.887417 0.455538 0.0705374
|
|
0.815509 0.564319 0.128411
|
|
0.849043 -0.0897147 0.52065
|
|
0.689346 -0.478105 0.544259
|
|
0.694507 -0.0879426 0.714091
|
|
0.739725 -0.30979 0.597358
|
|
0.575228 -0.410656 0.707442
|
|
-0.686949 0.0133332 0.726583
|
|
-0.633044 0.129266 0.763246
|
|
0.60259 -0.420142 0.678503
|
|
0.380076 -0.525001 0.761522
|
|
0.116955 -0.580375 0.805907
|
|
0.0211387 -0.57111 0.820601
|
|
0.176247 -0.586087 0.790847
|
|
0.502496 0.676626 -0.538215
|
|
0.22125 0.934013 -0.280479
|
|
0.784462 -0.510995 0.351431
|
|
0.68216 -0.461785 0.566933
|
|
0.744612 -0.306217 0.593113
|
|
0.596688 -0.294572 0.746452
|
|
0.621082 0.273028 -0.734651
|
|
0.474289 0.672311 -0.568373
|
|
0.678813 0.348324 -0.646439
|
|
0.674992 0.644714 -0.358789
|
|
0.484967 -0.0888553 0.870007
|
|
0.326076 -0.200695 0.923794
|
|
0.330191 -0.113902 0.937017
|
|
0.331095 -0.24048 0.912439
|
|
0.469777 0.436486 -0.767326
|
|
0.81002 0.321811 -0.49021
|
|
-0.0460845 -0.349756 0.935707
|
|
-0.0470963 -0.349975 0.935574
|
|
-1.17681e-007 -0.575211 0.818005
|
|
-2.3598e-007 -0.587448 0.809262
|
|
0.0492051 0.97177 0.230742
|
|
0 0.988639 0.150311
|
|
-0.231864 -0.382123 0.894551
|
|
-0.040948 -0.421659 0.905829
|
|
0 -0.402174 0.915563
|
|
1.22042e-007 -0.592291 0.805724
|
|
0.117715 0.638958 0.760182
|
|
0 0.695598 0.718431
|
|
-8.09808e-008 0.50163 0.865082
|
|
0.0598278 -0.888286 -0.455378
|
|
0.0737678 -0.883298 -0.462973
|
|
-0.983422 0.108869 0.145013
|
|
-0.996159 0.078702 0.0383844
|
|
-0.984006 0.138177 0.112426
|
|
-0.979644 0.194975 0.0477836
|
|
-0.982729 -0.150993 0.106981
|
|
-0.997748 0.00652843 0.0667532
|
|
-0.863542 0.0174848 0.503973
|
|
-0.833646 -0.122489 0.538546
|
|
-0.880149 -0.131708 0.45606
|
|
-0.527448 0.836296 0.149691
|
|
-0.5794 0.777264 0.245266
|
|
-0.638226 0.714134 0.287541
|
|
-0.7478 0.639739 0.177565
|
|
-0.985073 -0.0966192 0.142466
|
|
-0.96122 -0.231694 0.149579
|
|
-0.966359 -0.24208 0.0868727
|
|
-0.987721 0.0273474 0.153818
|
|
-0.864207 -0.0623324 0.499261
|
|
-0.870293 -0.376794 0.317199
|
|
-0.386541 -0.420645 0.820758
|
|
-0.412162 -0.542401 0.732068
|
|
-0.261617 0.479714 0.837515
|
|
-0.0481595 0.482712 0.874454
|
|
0.00122983 0.527646 0.849464
|
|
-0.032448 0.544311 0.838256
|
|
-0.131964 0.521809 -0.842794
|
|
-0.450982 0.512433 -0.730773
|
|
0.75846 -0.203186 0.619236
|
|
0.621069 -0.290996 0.727732
|
|
0.682166 -0.216609 0.698376
|
|
0.555828 -0.278199 0.783365
|
|
0.327495 -0.379179 0.865431
|
|
-0.46544 0.829813 -0.307856
|
|
-0.803274 0.532737 -0.266351
|
|
-0.541908 0.828406 -0.141703
|
|
-0.582151 0.778538 -0.234473
|
|
-0.0370116 0.148692 0.988191
|
|
-0.0539335 0.11905 0.991422
|
|
-0.0581155 0.229542 0.971562
|
|
-0.731146 0.505351 -0.458307
|
|
-0.784204 0.417604 -0.458944
|
|
0.0426025 -0.32027 0.946368
|
|
0.0355218 -0.260356 0.964859
|
|
-0.960652 0.234154 0.149395
|
|
-0.941234 0.080157 0.328105
|
|
-0.969697 0.193113 0.149653
|
|
-0.107265 0.403456 -0.90869
|
|
-0.154417 -0.752624 -0.640088
|
|
-0.1403 -0.922163 -0.36046
|
|
0.0836461 -0.917364 -0.389162
|
|
-0.20086 -0.255042 -0.945837
|
|
0 -0.138858 -0.990312
|
|
-0.0834442 -0.275227 -0.957751
|
|
-0.254951 0.689656 0.677772
|
|
-0.194987 0.722414 0.663399
|
|
-0.642835 -0.741672 -0.191536
|
|
-0.438861 -0.8191 -0.369427
|
|
-0.107996 -0.894535 -0.433756
|
|
-0.266799 -0.869943 -0.41475
|
|
0.959131 0.279003 -0.0471802
|
|
0.89023 0.443058 0.105781
|
|
0.91427 0.391005 -0.105949
|
|
0.854617 0.519094 0.0131093
|
|
0.760651 0.327012 0.560779
|
|
0.693227 0.151157 0.70469
|
|
0.76302 0.0327625 0.645544
|
|
0.973608 0.123654 -0.191828
|
|
0.89546 0.364042 -0.256173
|
|
0.988672 0.146738 0.0315619
|
|
0.978539 0.201868 0.041352
|
|
0.9932 -0.106792 0.0463547
|
|
0.970942 0.171757 -0.166644
|
|
0.982551 0.146616 -0.114447
|
|
0.916592 0.0272648 0.398893
|
|
0.940303 0.135838 0.312056
|
|
0.851523 0.109712 0.512711
|
|
0.59359 0.0686779 -0.801831
|
|
0.364121 0.179397 -0.913911
|
|
0.437838 0.011357 -0.898982
|
|
0.515502 0.344262 0.784692
|
|
0.227329 0.415709 0.880629
|
|
0.177152 0.556974 0.811417
|
|
0.328314 0.94161 -0.0747053
|
|
0.391299 0.89064 -0.231617
|
|
0.367818 0.406986 -0.836105
|
|
0.777709 -0.405372 0.480461
|
|
0.826457 -0.407672 0.388293
|
|
0.862878 -0.255912 0.435833
|
|
0.415285 0.642936 -0.643561
|
|
0.549631 0.693324 -0.466055
|
|
0.776297 0.442298 -0.44915
|
|
0.332134 -0.275339 0.90215
|
|
0.342881 -0.289362 0.893702
|
|
0.698109 0.561642 -0.444075
|
|
0.544244 0.771935 -0.328505
|
|
0.133689 0.749909 -0.647892
|
|
0 0.629862 -0.776707
|
|
-0.169135 -0.475054 0.863549
|
|
-0.124941 -0.682195 0.720417
|
|
3.65013e-007 -0.660144 0.751139
|
|
0.0268016 0.689163 0.72411
|
|
-0.0135725 0.0878761 0.996039
|
|
-0.13118 0.224534 0.965596
|
|
1.14098e-008 0.0881175 0.99611
|
|
0.141071 -0.91614 -0.375215
|
|
0.0672659 -0.873527 -0.482106
|
|
0.977924 -0.208936 0.00322263
|
|
0.168954 -0.829113 0.532941
|
|
0.398397 -0.660073 0.636854
|
|
0.591181 -0.430296 0.682166
|
|
-0.985625 -0.168376 -0.0138531
|
|
-0.742454 -0.28 0.608574
|
|
-0.974713 0.220567 -0.0358499
|
|
-0.942821 0.314778 -0.109561
|
|
-0.815509 0.564319 0.128411
|
|
-0.548134 -0.572222 0.610009
|
|
-0.737483 -0.186883 0.648995
|
|
-0.736838 -0.338486 0.585233
|
|
-0.889444 -0.131924 0.437591
|
|
0.690012 0.00253255 0.723794
|
|
0.641217 0.0529792 0.765529
|
|
-0.60259 -0.420142 0.678503
|
|
-0.116955 -0.580375 0.805907
|
|
-0.380076 -0.525001 0.761522
|
|
-0.0211389 -0.57111 0.820601
|
|
-0.176247 -0.586087 0.790847
|
|
-0.669739 -0.461668 0.581646
|
|
-0.721127 -0.490965 0.488803
|
|
-0.64207 -0.377268 0.667394
|
|
-0.674992 0.644714 -0.358789
|
|
-0.678813 0.348324 -0.646439
|
|
-0.621082 0.273028 -0.734651
|
|
-0.330191 -0.113902 0.937017
|
|
-0.326076 -0.200696 0.923794
|
|
-0.331096 -0.24048 0.912439
|
|
-0.81002 0.321811 -0.49021
|
|
-0.469777 0.436486 -0.767326
|
|
0.0460845 -0.349756 0.935707
|
|
-0.049205 0.97177 0.230742
|
|
0.231864 -0.382123 0.894551
|
|
0.0409477 -0.421659 0.905829
|
|
-0.117715 0.638957 0.760182
|
|
-0.0598279 -0.888286 -0.455378
|
|
-0.0737696 -0.883298 -0.462972
|
|
0.98342 0.10888 0.145021
|
|
0.984004 0.138184 0.112431
|
|
0.996159 0.0787001 0.0383817
|
|
0.979644 0.194975 0.0477811
|
|
0.976046 0.185094 -0.114345
|
|
0.708088 0.706091 0.00682826
|
|
0.846684 0.494441 -0.196606
|
|
0.75243 0.333096 0.568239
|
|
0.780153 0.225448 0.583554
|
|
0.809183 0.293226 0.509158
|
|
0.997694 0.0667853 -0.0121169
|
|
0.461509 -0.865645 -0.194083
|
|
0.455475 -0.869133 -0.192743
|
|
0.312967 -0.908695 -0.276268
|
|
0.187846 -0.913944 -0.359751
|
|
-0.828816 0.307919 0.467173
|
|
-0.692593 0.433653 0.57642
|
|
-0.806515 0.248358 0.536518
|
|
-0.442042 0.191446 0.876326
|
|
-0.452395 0.242923 0.858095
|
|
-0.60587 0.221399 0.764136
|
|
0.136624 0.488701 -0.861688
|
|
-0.225022 -0.8954 -0.384217
|
|
-0.517763 -0.763796 -0.385404
|
|
0.312216 -0.287609 -0.905429
|
|
0.456436 -0.415922 -0.786559
|
|
0.25855 -0.409207 -0.875044
|
|
0.702397 0.180629 -0.688485
|
|
0.460417 0.595544 -0.658288
|
|
0.644803 -0.233844 0.727699
|
|
0 0.486414 -0.873728
|
|
0 -0.876341 -0.481691
|
|
0 -0.876741 -0.480962
|
|
0 0.56234 -0.826906
|
|
-0.0235626 0.752132 0.658592
|
|
-0.0481513 0.759825 0.648342
|
|
-1.49421e-008 0.753748 0.657163
|
|
0 0.746184 0.66574
|
|
0.0900097 0.763138 0.639937
|
|
0.442281 0.546895 0.71084
|
|
0.1734 0.746317 0.642606
|
|
0.823001 -0.534772 -0.191541
|
|
0.908718 -0.385308 -0.160527
|
|
0.978127 -0.194704 -0.073202
|
|
0.994131 -0.0644215 -0.0869079
|
|
-0.95913 0.279004 -0.0471801
|
|
-0.91427 0.391005 -0.105948
|
|
-0.760651 0.327012 0.560779
|
|
-0.76302 0.0327609 0.645545
|
|
-0.973608 0.123654 -0.191828
|
|
-0.9932 -0.106792 0.0463547
|
|
-0.978539 0.201868 0.041352
|
|
-0.891445 -0.0109274 0.452998
|
|
-0.77659 0.0278886 0.629389
|
|
-0.851523 0.109712 0.512711
|
|
-0.437838 0.0113567 -0.898982
|
|
-0.593591 0.0686778 -0.801831
|
|
-0.364121 0.179397 -0.913911
|
|
-0.22733 0.415708 0.880629
|
|
-0.177153 0.556974 0.811417
|
|
-0.328314 0.94161 -0.0747053
|
|
-0.391299 0.89064 -0.231617
|
|
-0.367819 0.406986 -0.836105
|
|
-0.780242 -0.242476 0.576565
|
|
-0.854788 0.0338601 0.517872
|
|
-0.549631 0.693324 -0.466055
|
|
-0.415285 0.642936 -0.643561
|
|
-0.662177 0.496563 -0.561201
|
|
-0.332134 -0.275339 0.90215
|
|
-0.34288 -0.289361 0.893702
|
|
-0.698109 0.561642 -0.444075
|
|
-0.544244 0.771935 -0.328505
|
|
0.169135 -0.475054 0.863549
|
|
0.124942 -0.682195 0.720417
|
|
-0.0268018 0.689163 0.72411
|
|
0.0135725 0.0878761 0.996039
|
|
-0.977924 -0.208936 0.00322263
|
|
-0.168954 -0.829113 0.532941
|
|
-0.398398 -0.660072 0.636855
|
|
-0.591182 -0.430293 0.682167
|
|
0.99747 0.040624 -0.0583391
|
|
0.996988 -0.0510595 0.058369
|
|
0.956199 0.234119 -0.175704
|
|
0.954981 0.293272 -0.0447598
|
|
0.966696 0.20787 -0.149297
|
|
0.912657 0.408602 -0.0100449
|
|
0.984998 -0.130011 0.113473
|
|
0.790595 -0.370646 0.487423
|
|
0.631136 -0.631472 0.450456
|
|
0.635958 -0.573447 0.516445
|
|
0.693737 -0.550352 0.464588
|
|
-0.879945 0.0548255 0.471901
|
|
-0.90453 0.0124355 0.426229
|
|
0.696265 -0.253914 0.671374
|
|
0.297792 -0.358111 0.884916
|
|
-0.0422193 0.765364 0.642212
|
|
-0.0594791 0.913613 0.40221
|
|
0.00641008 0.996348 0.0851408
|
|
0.354403 -0.174513 -0.918664
|
|
0.315778 -0.0157927 -0.948702
|
|
0.558606 0.0308282 -0.82886
|
|
0.591785 -0.321772 -0.73909
|
|
0.608653 -0.33873 -0.717498
|
|
0.543551 -0.235307 -0.805719
|
|
0.668113 0.0643197 -0.741275
|
|
0.782105 0.228633 -0.579688
|
|
0.691018 0.105465 -0.715102
|
|
0.594526 0.404746 -0.69478
|
|
0.517982 0.25868 -0.81534
|
|
0.710187 0.613955 0.34452
|
|
0.818123 0.570631 0.0710942
|
|
0.828175 0.352365 0.43585
|
|
0.684563 0.72661 0.0584059
|
|
-2.43545e-007 0.555479 0.83153
|
|
0 0.0311814 0.999514
|
|
0.00297 -0.219098 0.975698
|
|
0 -0.156293 0.987711
|
|
-0.0467695 -0.342313 0.938421
|
|
-0.934522 0.266926 0.235413
|
|
-0.793846 0.439795 0.419987
|
|
-0.302621 0.713474 0.631962
|
|
-0.57105 0.608318 0.551227
|
|
0.243825 0.280369 -0.928409
|
|
0.0703186 0.121032 -0.990155
|
|
-0.107358 -0.0454827 -0.99318
|
|
-0.976046 0.185094 -0.114344
|
|
-0.708088 0.706091 0.00682826
|
|
-0.846684 0.494441 -0.196606
|
|
-0.75243 0.333096 0.568239
|
|
-0.780153 0.225448 0.583554
|
|
-0.809183 0.293226 0.509158
|
|
-0.997694 0.0667853 -0.0121169
|
|
-0.821379 0.367414 -0.436283
|
|
-0.46151 -0.865645 -0.19408
|
|
-0.312969 -0.908695 -0.276267
|
|
-0.455477 -0.869133 -0.19274
|
|
-0.187847 -0.913944 -0.35975
|
|
0.828816 0.307918 0.467173
|
|
0.806515 0.248357 0.536518
|
|
0.692593 0.433653 0.57642
|
|
0.54549 0.079256 0.834362
|
|
0.547502 0.297354 0.782191
|
|
0.452395 0.242922 0.858095
|
|
-0.136624 0.488701 -0.861688
|
|
0.225022 -0.8954 -0.384217
|
|
0.517762 -0.763797 -0.385404
|
|
-0.312216 -0.287609 -0.905429
|
|
-0.210506 -0.390076 -0.896397
|
|
-0.456437 -0.415922 -0.786559
|
|
-0.702397 0.180629 -0.688485
|
|
-0.721503 0.441113 -0.533716
|
|
-0.460417 0.595544 -0.658288
|
|
-0.644803 -0.233843 0.727699
|
|
0.0235589 0.752131 0.658592
|
|
0.0481489 0.759825 0.648342
|
|
-0.173401 0.746316 0.642607
|
|
-0.442282 0.546892 0.710842
|
|
-0.822997 -0.534777 -0.191545
|
|
-0.978127 -0.194701 -0.0731998
|
|
-0.908717 -0.385311 -0.160529
|
|
-0.994132 -0.0644196 -0.0869056
|
|
0.852587 0.487744 0.187618
|
|
0.992087 -0.0272152 0.122571
|
|
0.982495 0.122738 -0.140142
|
|
0.702779 -0.317609 0.636574
|
|
0.564423 -0.539319 0.624949
|
|
0.539644 -0.578582 0.611577
|
|
0.945501 0.308099 -0.105371
|
|
0.953219 0.223628 -0.203381
|
|
0.938896 0.318327 -0.130926
|
|
0.351925 0.685582 -0.63728
|
|
0.587982 0.18383 0.787708
|
|
0.727001 0.274026 0.629587
|
|
0.624168 0.193924 0.756841
|
|
0.614738 0.381723 0.690206
|
|
0.156411 0.396165 0.904759
|
|
-0.0450914 0.599453 0.799139
|
|
0.406132 0.784867 0.468019
|
|
0.248502 0.647956 0.72
|
|
0.467185 -0.0416263 0.883179
|
|
-0.209412 0.202139 0.956706
|
|
0.186173 -0.114331 -0.975842
|
|
0.21693 0.278037 -0.935755
|
|
0.139855 0.77979 0.61022
|
|
0.41348 -0.878369 -0.239797
|
|
-0.99747 0.040624 -0.0583384
|
|
-0.954981 0.293272 -0.0447598
|
|
-0.966696 0.20787 -0.149297
|
|
-0.676982 -0.559998 0.477596
|
|
-0.635958 -0.573448 0.516444
|
|
0.879945 0.0548241 0.471901
|
|
0.90453 0.0124339 0.426229
|
|
-0.395064 -0.404603 0.824755
|
|
0.0422194 0.765364 0.642212
|
|
0.0594793 0.913613 0.40221
|
|
-0.00641008 0.996348 0.0851408
|
|
-0.624471 -0.0260596 -0.780613
|
|
-0.252328 -0.226503 -0.940759
|
|
-0.315778 -0.0157926 -0.948702
|
|
-0.558606 0.030828 -0.82886
|
|
-0.591785 -0.321771 -0.73909
|
|
-0.608653 -0.338729 -0.717498
|
|
-0.543551 -0.235307 -0.805719
|
|
-0.668113 0.0643195 -0.741275
|
|
-0.691018 0.105466 -0.715102
|
|
-0.782105 0.228633 -0.579688
|
|
-0.594526 0.404746 -0.69478
|
|
-0.517982 0.25868 -0.81534
|
|
-0.710186 0.613955 0.344522
|
|
-0.818122 0.570632 0.071098
|
|
-0.684563 0.72661 0.0584069
|
|
-0.828174 0.352365 0.435851
|
|
0.793832 0.43981 0.419997
|
|
0.934518 0.266934 0.235418
|
|
0.302615 0.713476 0.631963
|
|
0.571038 0.608325 0.551232
|
|
0.107358 -0.0454827 -0.99318
|
|
-0.070319 0.121033 -0.990155
|
|
-0.243826 0.28037 -0.928408
|
|
</float_array>
|
|
<technique_common>
|
|
<accessor count="568" source="#Geometry-Ashoka_Lion-normals-array" stride="3">
|
|
<param name="X" type="float" />
|
|
<param name="Y" type="float" />
|
|
<param name="Z" type="float" />
|
|
</accessor>
|
|
</technique_common>
|
|
</source>
|
|
<source id="Geometry-Ashoka_Lion-Ashoka_Lion_UV" name="Ashoka_Lion_UV">
|
|
<float_array id="Geometry-Ashoka_Lion-Ashoka_Lion_UV-array" count="618">
|
|
0.358272 0.342081
|
|
0.361283 0.268046
|
|
0.42856 0.348465
|
|
0.45657 0.271929
|
|
0.260798 0.714259
|
|
0.216173 0.719254
|
|
0.233311 0.654103
|
|
0.174317 0.641564
|
|
0.487669 0.0810666
|
|
0.609902 0.087174
|
|
0.495388 0.138723
|
|
0.604236 0.143793
|
|
0.56933 0.271908
|
|
0.34515 0.503203
|
|
0.237571 0.620538
|
|
0.272061 0.527583
|
|
0.22272 0.595371
|
|
0.535019 0.347809
|
|
0.434913 0.510702
|
|
0.124566 0.758562
|
|
0.107224 0.772407
|
|
0.0940155 0.734607
|
|
0.0736077 0.749602
|
|
0.496252 0.718585
|
|
0.462056 0.768263
|
|
0.475881 0.702807
|
|
0.446623 0.751811
|
|
0.157367 0.278052
|
|
0.216606 0.278932
|
|
0.169895 0.341845
|
|
0.207938 0.341824
|
|
0.355666 0.830152
|
|
0.27805 0.822163
|
|
0.340385 0.765029
|
|
0.284925 0.764057
|
|
0.239162 0.0586424
|
|
0.249469 0.117698
|
|
0.111082 0.11506
|
|
0.14707 0.167637
|
|
0.399158 0.680994
|
|
0.388438 0.730514
|
|
0.169804 0.605131
|
|
0.166671 0.567619
|
|
0.193786 0.570694
|
|
0.189616 0.606184
|
|
0.802259 0.393539
|
|
0.86571 0.320944
|
|
0.847899 0.445724
|
|
0.925165 0.361882
|
|
0.87241 0.166833
|
|
0.892464 0.045687
|
|
0.98914 0.183539
|
|
0.98914 0.0603717
|
|
0.88709 0.245711
|
|
0.967535 0.275199
|
|
0.435371 0.825106
|
|
0.455175 0.858521
|
|
0.486166 0.798511
|
|
0.705833 0.837791
|
|
0.667306 0.859086
|
|
0.662934 0.832053
|
|
0.647297 0.857399
|
|
0.801206 0.87148
|
|
0.763846 0.86036
|
|
0.807184 0.869537
|
|
0.723866 0.844071
|
|
0.47937 0.0223173
|
|
0.39944 0.0239559
|
|
0.48767 0.0810666
|
|
0.40223 0.0993738
|
|
0.28365 0.351724
|
|
0.35827 0.342081
|
|
0.28228 0.269235
|
|
0.36128 0.268046
|
|
0.23331 0.654103
|
|
0.2608 0.714259
|
|
0.34336 0.662824
|
|
0.33714 0.732076
|
|
0.6099 0.087174
|
|
0.60251 0.01
|
|
0.37095 0.603838
|
|
0.23757 0.620538
|
|
0.72522 0.771133
|
|
0.70675 0.781031
|
|
0.72712 0.803717
|
|
0.70558 0.815098
|
|
0.64375 0.342021
|
|
0.53502 0.347809
|
|
0.50452 0.504945
|
|
0.43491 0.510702
|
|
0.72387 0.844071
|
|
0.70583 0.837791
|
|
0.71842 0.881425
|
|
0.70789 0.892003
|
|
0.42185 0.806688
|
|
0.43537 0.825106
|
|
0.44662 0.751811
|
|
0.46206 0.768263
|
|
0.80226 0.393539
|
|
0.75961 0.36802
|
|
0.62179 0.552386
|
|
0.59795 0.532688
|
|
0.15322 0.741182
|
|
0.13279 0.713245
|
|
0.12457 0.758562
|
|
0.09402 0.734607
|
|
0.2378 0.808377
|
|
0.24468 0.763998
|
|
0.14707 0.167637
|
|
0.20056 0.210987
|
|
0.24947 0.117698
|
|
0.28644 0.180678
|
|
0.20794 0.341824
|
|
0.22123 0.536512
|
|
0.16516 0.518078
|
|
0.36011 0.860859
|
|
0.36435 0.912138
|
|
0.45518 0.858521
|
|
0.15298 0.238518
|
|
0.09613 0.185485
|
|
0.09199 0.24413
|
|
0.04836 0.180826
|
|
0.15737 0.278052
|
|
0.08839 0.282944
|
|
0.88709 0.245711
|
|
0.96753 0.275199
|
|
0.92516 0.361882
|
|
0.66731 0.859086
|
|
0.66625 0.885882
|
|
0.81486 0.909059
|
|
0.80718 0.869537
|
|
0.80031 0.901735
|
|
0.80121 0.87148
|
|
0.405595 0.143711
|
|
0.117223 0.649874
|
|
0.132794 0.713245
|
|
0.730127 0.114527
|
|
0.724323 0.180285
|
|
0.22123 0.536512
|
|
0.200558 0.210987
|
|
0.152979 0.238518
|
|
0.0770317 0.663102
|
|
0.034895 0.673804
|
|
0.42185 0.806688
|
|
0.360111 0.860859
|
|
0.109048 0.555242
|
|
0.165156 0.518078
|
|
0.14487 0.496526
|
|
0.805325 0.299296
|
|
0.75961 0.36802
|
|
0.689697 0.277941
|
|
0.643747 0.342021
|
|
0.283647 0.351724
|
|
0.282285 0.269235
|
|
0.521867 0.621337
|
|
0.437084 0.600915
|
|
0.727121 0.803717
|
|
0.705579 0.815098
|
|
0.01 0.684096
|
|
0.046446 0.771282
|
|
0.277321 0.856507
|
|
0.274956 0.898024
|
|
0.364354 0.912138
|
|
0.12163 0.341781
|
|
0.110492 0.491819
|
|
0.214728 0.839075
|
|
0.19789 0.869425
|
|
0.0903589 0.799279
|
|
0.718423 0.881425
|
|
0.751913 0.889294
|
|
0.854225 0.727207
|
|
0.865276 0.705009
|
|
0.891113 0.74132
|
|
0.911825 0.730656
|
|
0.45657 0.271929
|
|
0.42856 0.348465
|
|
0.21617 0.719254
|
|
0.17432 0.641564
|
|
0.49539 0.138723
|
|
0.60424 0.143793
|
|
0.27206 0.527583
|
|
0.22272 0.595371
|
|
0.10722 0.772407
|
|
0.0736099 0.749602
|
|
0.49625 0.718585
|
|
0.47588 0.702807
|
|
0.1699 0.341845
|
|
0.21661 0.278932
|
|
0.35567 0.830152
|
|
0.34038 0.765029
|
|
0.27805 0.822163
|
|
0.28493 0.764057
|
|
0.23916 0.0586424
|
|
0.11108 0.11506
|
|
0.38844 0.730514
|
|
0.39916 0.680994
|
|
0.1698 0.605131
|
|
0.18962 0.606184
|
|
0.19379 0.570694
|
|
0.16667 0.567619
|
|
0.8479 0.445724
|
|
0.87241 0.166833
|
|
0.98914 0.183539
|
|
0.89246 0.045687
|
|
0.98914 0.0603717
|
|
0.48617 0.798511
|
|
0.6473 0.857399
|
|
0.66293 0.832053
|
|
0.76385 0.86036
|
|
0.399443 0.0239559
|
|
0.402226 0.0993738
|
|
0.244678 0.763998
|
|
0.153224 0.741182
|
|
0.337136 0.732076
|
|
0.343359 0.662824
|
|
0.370952 0.603838
|
|
0.82198 0.225892
|
|
0.237798 0.808377
|
|
0.597949 0.532688
|
|
0.504519 0.504945
|
|
0.286444 0.180678
|
|
0.384941 0.762409
|
|
0.621788 0.552386
|
|
0.651506 0.588709
|
|
0.0862567 0.548847
|
|
0.056068 0.127499
|
|
0.0961335 0.185485
|
|
0.0139209 0.13048
|
|
0.0483645 0.180826
|
|
0.800313 0.901735
|
|
0.814856 0.909059
|
|
0.84214 0.685611
|
|
0.833046 0.722206
|
|
0.4056 0.143711
|
|
0.11722 0.649874
|
|
0.73013 0.114527
|
|
0.72432 0.180285
|
|
0.0770299 0.663102
|
|
0.0348901 0.673804
|
|
0.10905 0.555242
|
|
0.14487 0.496526
|
|
0.6897 0.277941
|
|
0.80533 0.299296
|
|
0.43708 0.600915
|
|
0.52187 0.621337
|
|
0.00999999 0.684096
|
|
0.04645 0.771282
|
|
0.27732 0.856507
|
|
0.27496 0.898024
|
|
0.12163 0.341781
|
|
0.11049 0.491819
|
|
0.21473 0.839075
|
|
0.19789 0.869425
|
|
0.09036 0.799279
|
|
0.75191 0.889294
|
|
0.85422 0.727207
|
|
0.89111 0.74132
|
|
0.86528 0.705009
|
|
0.91182 0.730656
|
|
0.725219 0.771133
|
|
0.763898 0.796302
|
|
0.787739 0.838448
|
|
0.545227 0.637583
|
|
0.783085 0.0502843
|
|
0.810666 0.146074
|
|
0.574507 0.665841
|
|
0.713482 0.915985
|
|
0.810666 0.933
|
|
0.523152 0.745713
|
|
0.617288 0.883047
|
|
0.707886 0.892003
|
|
0.621825 0.911148
|
|
0.706038 0.914723
|
|
0.630257 0.881858
|
|
0.932972 0.757122
|
|
0.939287 0.797988
|
|
0.906811 0.765445
|
|
0.902234 0.78684
|
|
0.38494 0.762409
|
|
0.65151 0.588709
|
|
0.08626 0.548847
|
|
0.05607 0.127499
|
|
0.0139199 0.13048
|
|
0.84214 0.685611
|
|
0.83305 0.722206
|
|
0.699664 0.0287213
|
|
0.602513 0.01
|
|
0.0883906 0.282944
|
|
0.7639 0.796302
|
|
0.78774 0.838448
|
|
0.54523 0.637583
|
|
0.78309 0.0502843
|
|
0.81067 0.146074
|
|
0.57451 0.665841
|
|
0.71348 0.915985
|
|
0.81067 0.933
|
|
0.52315 0.745713
|
|
0.61729 0.883047
|
|
0.62182 0.911148
|
|
0.70604 0.914723
|
|
0.63026 0.881858
|
|
0.93297 0.757122
|
|
0.90681 0.765445
|
|
0.93929 0.797988
|
|
0.90223 0.78684
|
|
0.479373 0.0223173
|
|
0.706748 0.781031
|
|
0.0919908 0.24413
|
|
0.69966 0.0287213
|
|
</float_array>
|
|
<technique_common>
|
|
<accessor count="309" source="#Geometry-Ashoka_Lion-Ashoka_Lion_UV-array" stride="2">
|
|
<param name="S" type="float" />
|
|
<param name="T" type="float" />
|
|
</accessor>
|
|
</technique_common>
|
|
</source>
|
|
<source id="Geometry-Ashoka_Lion-UV_Distortion" name="UV_Distortion">
|
|
<float_array id="Geometry-Ashoka_Lion-UV_Distortion-array" count="498">
|
|
0.534515 0.513133 0.46915
|
|
0.507869 0.542507 0.496006
|
|
0.489705 0.535615 0.514121
|
|
0.506271 0.544268 0.497617
|
|
0.460325 0.50348 0.543272
|
|
0.484859 0.530315 0.518929
|
|
0.484789 0.530238 0.518999
|
|
0.509509 0.540699 0.494353
|
|
0.558043 0.487197 0.445437
|
|
0.550139 0.49591 0.453403
|
|
0.553033 0.49272 0.450486
|
|
0.51823 0.531086 0.485564
|
|
0.543391 0.503348 0.460204
|
|
0.45724 0.500107 0.546332
|
|
0.49745 0.544086 0.506437
|
|
0.429864 0.470164 0.573494
|
|
0.494316 0.540658 0.509546
|
|
0.518075 0.531256 0.48572
|
|
0.520967 0.528068 0.482805
|
|
0.460503 0.503675 0.543095
|
|
0.500703 0.547644 0.503208
|
|
0.527141 0.521262 0.476583
|
|
0.467721 0.51157 0.535933
|
|
0.530877 0.517143 0.472817
|
|
0.540591 0.506435 0.463026
|
|
0.493881 0.540182 0.509978
|
|
0.516819 0.532641 0.486986
|
|
0.52386 0.524878 0.479889
|
|
0.486458 0.532063 0.517343
|
|
0.576885 0.466426 0.426447
|
|
0.554518 0.491083 0.44899
|
|
0.516561 0.532925 0.487246
|
|
0.5284 0.519874 0.475313
|
|
0.493966 0.540275 0.509893
|
|
0.507702 0.542691 0.496175
|
|
0.507702 0.542691 0.496174
|
|
0.541534 0.505395 0.462076
|
|
0.469306 0.513304 0.53436
|
|
0.519492 0.529694 0.484291
|
|
0.512965 0.536889 0.49087
|
|
0.513578 0.536214 0.490253
|
|
0.462385 0.505734 0.541227
|
|
0.480348 0.525381 0.523404
|
|
0.498948 0.545724 0.50495
|
|
0.468542 0.512468 0.535118
|
|
0.529325 0.518854 0.474381
|
|
0.519708 0.529455 0.484074
|
|
0.473831 0.518253 0.529871
|
|
0.566989 0.477335 0.43642
|
|
0.508231 0.542108 0.495642
|
|
0.525755 0.52279 0.47798
|
|
0.553084 0.492663 0.450435
|
|
0.494984 0.541389 0.508883
|
|
0.533675 0.514059 0.469997
|
|
0.439602 0.480815 0.563832
|
|
0.517574 0.531808 0.486225
|
|
0.52421 0.524493 0.479537
|
|
0.544707 0.501898 0.458878
|
|
0.493381 0.539636 0.510473
|
|
0.486318 0.53191 0.517482
|
|
0.460324 0.50348 0.543272
|
|
0.484789 0.530237 0.518999
|
|
0.553033 0.492719 0.450486
|
|
0.518229 0.531086 0.485564
|
|
0.543391 0.503349 0.460205
|
|
0.457241 0.500107 0.546332
|
|
0.502934 0.547947 0.50098
|
|
0.518072 0.531259 0.485723
|
|
0.539752 0.50736 0.463872
|
|
0.521675 0.527287 0.482091
|
|
0.535707 0.511819 0.467948
|
|
0.519551 0.529629 0.484232
|
|
0.511102 0.538943 0.492748
|
|
0.50171 0.548745 0.50221
|
|
0.532219 0.515665 0.471465
|
|
0.494058 0.540376 0.509802
|
|
0.498646 0.545394 0.50525
|
|
0.488488 0.534283 0.515329
|
|
0.490519 0.536506 0.513313
|
|
0.543258 0.503495 0.460338
|
|
0.476503 0.521175 0.52722
|
|
0.53685 0.510559 0.466797
|
|
0.547629 0.498677 0.455933
|
|
0.48443 0.529845 0.519355
|
|
0.514505 0.535191 0.489317
|
|
0.555485 0.490017 0.448015
|
|
0.513577 0.536214 0.490253
|
|
0.480349 0.525381 0.523404
|
|
0.519709 0.529455 0.484073
|
|
0.473831 0.518252 0.529871
|
|
0.566989 0.477335 0.436421
|
|
0.508231 0.542108 0.495641
|
|
0.494984 0.541388 0.508883
|
|
0.544706 0.501899 0.458879
|
|
0.493381 0.539635 0.510474
|
|
0.486318 0.53191 0.517481
|
|
0.50733 0.543101 0.49655
|
|
0.51931 0.529894 0.484475
|
|
0.545878 0.500607 0.457697
|
|
0.492811 0.539012 0.511039
|
|
0.486215 0.531798 0.517583
|
|
0.344926 0.377263 0.657768
|
|
0.499174 0.545972 0.504725
|
|
0.475657 0.52025 0.528059
|
|
0.510674 0.539415 0.493179
|
|
0.492484 0.538654 0.511364
|
|
0.491121 0.537164 0.512716
|
|
0.499354 0.546169 0.504547
|
|
0.475042 0.519577 0.528669
|
|
0.558068 0.487169 0.445412
|
|
0.489637 0.535541 0.514188
|
|
0.510953 0.539107 0.492898
|
|
0.493534 0.539802 0.510322
|
|
0.527423 0.520951 0.476298
|
|
0.55234 0.493484 0.451185
|
|
0.484804 0.530255 0.518983
|
|
0.535708 0.511818 0.467948
|
|
0.511101 0.538943 0.492748
|
|
0.532218 0.515665 0.471465
|
|
0.494057 0.540375 0.509803
|
|
0.490519 0.536505 0.513313
|
|
0.514504 0.535193 0.489319
|
|
0.555484 0.490017 0.448016
|
|
0.518842 0.530411 0.484947
|
|
0.486929 0.532578 0.516875
|
|
0.519755 0.529404 0.484027
|
|
0.470898 0.515045 0.532781
|
|
0.49534 0.541779 0.50853
|
|
0.436871 0.477828 0.566542
|
|
0.473823 0.518244 0.529878
|
|
0.517711 0.531657 0.486086
|
|
0.487283 0.532965 0.516524
|
|
0.472728 0.517046 0.530966
|
|
0.471489 0.515691 0.532195
|
|
0.495162 0.541583 0.508707
|
|
0.505712 0.544885 0.49818
|
|
0.457579 0.500477 0.545996
|
|
0.52382 0.524923 0.479929
|
|
0.453785 0.496328 0.54976
|
|
0.521702 0.527258 0.482064
|
|
0.497569 0.544216 0.506318
|
|
0.547902 0.498376 0.455658
|
|
0.488273 0.534049 0.515541
|
|
0.545879 0.500606 0.457697
|
|
0.492812 0.539013 0.511039
|
|
0.344927 0.377264 0.657768
|
|
0.491122 0.537164 0.512715
|
|
0.558068 0.487169 0.445411
|
|
0.510953 0.539106 0.492897
|
|
0.552342 0.493482 0.451183
|
|
0.484805 0.530255 0.518983
|
|
0.460502 0.503675 0.543095
|
|
0.500704 0.547645 0.503208
|
|
0.527141 0.521262 0.476582
|
|
0.467722 0.51157 0.535933
|
|
0.540592 0.506434 0.463026
|
|
0.516818 0.532641 0.486986
|
|
0.523861 0.524878 0.479889
|
|
0.469306 0.513303 0.534361
|
|
0.519755 0.529404 0.484026
|
|
0.495341 0.541779 0.508529
|
|
0.436871 0.477827 0.566542
|
|
0.487283 0.532966 0.516524
|
|
0.495161 0.541583 0.508707
|
|
0.521701 0.527259 0.482065
|
|
0.488273 0.534048 0.515542
|
|
</float_array>
|
|
<technique_common>
|
|
<accessor count="166" source="#Geometry-Ashoka_Lion-UV_Distortion-array" stride="3">
|
|
<param name="R" type="float" />
|
|
<param name="G" type="float" />
|
|
<param name="B" type="float" />
|
|
</accessor>
|
|
</technique_common>
|
|
</source>
|
|
<source id="Geometry-Ashoka_Lion-Falloff" name="Falloff">
|
|
<float_array id="Geometry-Ashoka_Lion-Falloff-array" count="4">
|
|
0
|
|
0.294289
|
|
0.944788
|
|
0.899643
|
|
</float_array>
|
|
<technique_common>
|
|
<accessor count="4" source="#Geometry-Ashoka_Lion-Falloff-array" stride="1">
|
|
<param name="WEIGHT" type="float" />
|
|
</accessor>
|
|
</technique_common>
|
|
</source>
|
|
<vertices id="Geometry-Ashoka_Lion-vertices">
|
|
<input semantic="POSITION" source="#Geometry-Ashoka_Lion-positions" />
|
|
</vertices>
|
|
<polylist count="476" material="Material-Ashoka_Lion_Mat">
|
|
<input semantic="VERTEX" source="#Geometry-Ashoka_Lion-vertices" offset="0" />
|
|
<input semantic="NORMAL" source="#Geometry-Ashoka_Lion-normals" offset="1" />
|
|
<input semantic="TEXCOORD" source="#Geometry-Ashoka_Lion-Ashoka_Lion_UV" offset="2" set="0" />
|
|
<input semantic="COLOR" source="#Geometry-Ashoka_Lion-UV_Distortion" offset="3" set="0" />
|
|
<input semantic="WEIGHT" source="#Geometry-Ashoka_Lion-Falloff" offset="4" set="0" />
|
|
<vcount>3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3</vcount>
|
|
<p>46 0 0 0 0 52 1 1 0 0 10 2 2 0 0 51 3 3 0 0 10 2 2 0 0 52 1 1 0 0 54 4 4 1 0 55 5 5 1 0 21 6 6 1 0 53 7 7 1 0 21 8 6 1 0 55 5 5 1 0 47 9 8 2 0 61 10 9 2 0 13 11 10 2 0 59 12 11 2 0 13 11 10 2 0 61 13 9 2 0 59 14 11 3 0 65 15 12 3 0 13 16 10 3 0 51 3 3 3 0 13 16 10 3 0 65 15 12 3 0 4 17 13 4 0 67 18 14 4 0 45 19 15 4 0 71 20 16 4 0 45 21 15 4 0 67 22 14 4 0 64 23 17 5 0 63 24 18 5 0 10 2 2 5 0 4 17 13 5 0 10 2 2 5 0 63 25 18 5 0 17 26 19 6 0 84 27 20 6 0 33 28 21 6 0 83 29 22 6 0 33 30 21 6 0 84 27 20 6 0 95 31 23 7 0 94 32 24 7 0 20 33 25 7 0 31 34 26 7 0 20 33 25 7 0 94 32 24 7 0 82 35 27 8 0 35 36 28 8 0 87 37 29 8 0 26 38 30 8 0 87 39 29 8 0 35 36 28 8 0 62 40 31 9 0 15 41 32 9 0 57 42 33 9 0 7 43 34 9 0 57 42 33 9 0 15 41 32 9 0 2 44 35 10 0 39 45 36 10 0 29 46 37 10 0 40 47 38 10 0 29 46 37 10 0 39 45 36 10 0 20 33 25 11 0 31 34 26 11 0 19 48 39 11 0 32 49 40 11 0 19 48 39 11 0 31 34 26 11 0 76 50 41 12 0 72 50 42 12 0 70 51 43 12 0 76 52 41 12 0 70 53 43 12 0 74 54 44 12 0 101 55 45 13 0 80 56 46 13 0 103 57 47 13 0 102 58 48 13 0 103 57 47 13 0 80 56 46 13 0 98 59 49 14 0 99 60 50 14 0 113 61 51 14 0 112 62 52 14 0 113 61 51 14 0 99 63 50 14 0 98 64 49 15 0 113 65 51 15 0 81 66 53 15 0 121 67 54 15 0 81 66 53 15 0 113 65 51 15 0 96 68 55 16 0 94 32 24 16 0 104 69 56 16 0 124 70 57 16 0 104 69 56 16 0 94 32 24 16 0 76 71 58 17 0 128 72 59 17 0 72 73 60 17 0 127 74 61 17 0 72 73 60 17 0 128 72 59 17 0 131 75 62 18 0 132 76 63 18 0 24 77 64 18 0 75 78 65 18 0 24 77 64 18 0 132 79 63 18 0 136 80 66 19 0 184 81 67 19 0 182 82 68 19 0 185 83 69 19 0 182 82 68 19 0 184 81 67 19 0 146 84 70 20 0 181 85 71 20 0 171 86 72 20 0 187 87 73 20 0 171 86 72 20 0 181 85 71 20 0 156 88 74 21 0 189 89 75 21 0 191 90 76 21 0 193 91 77 21 0 191 90 76 21 0 189 89 75 21 0 196 92 78 22 0 195 93 79 22 0 182 82 68 22 0 136 80 66 22 0 182 82 68 22 0 195 93 79 22 0 204 94 80 23 0 202 95 81 23 0 191 90 76 23 0 156 96 74 23 0 191 90 76 23 0 202 95 81 23 0 156 97 82 24 0 202 98 83 24 0 208 99 84 24 0 209 100 85 24 0 208 99 84 24 0 202 98 83 24 0 144 101 86 25 0 199 102 87 25 0 138 103 88 25 0 198 104 89 25 0 138 105 88 25 0 199 102 87 25 0 210 106 90 26 0 211 107 91 26 0 221 108 92 26 0 220 109 93 26 0 221 108 92 26 0 211 107 91 26 0 151 110 94 27 0 231 111 95 27 0 166 112 96 27 0 229 113 97 27 0 166 112 96 27 0 231 111 95 27 0 236 114 98 28 0 160 115 99 28 0 226 116 100 28 0 153 117 101 28 0 226 116 100 28 0 160 115 99 28 0 143 118 102 29 0 169 119 103 29 0 152 120 104 29 0 168 121 105 29 0 152 120 104 29 0 169 119 103 29 0 178 122 106 30 0 179 123 107 30 0 152 120 104 30 0 143 124 102 30 0 152 120 104 30 0 179 125 107 30 0 175 126 108 31 0 165 127 109 31 0 174 128 110 31 0 149 129 111 31 0 174 130 110 31 0 165 130 109 31 0 146 131 70 32 0 161 132 112 32 0 140 133 113 32 0 158 134 114 32 0 140 135 113 32 0 161 132 112 32 0 235 136 115 33 0 105 137 116 33 0 231 111 95 33 0 104 69 117 33 0 231 111 95 33 0 105 137 116 33 0 214 138 118 34 0 213 139 119 34 0 114 140 120 35 1 115 141 121 35 0 114 140 120 35 1 213 139 119 34 0 214 142 118 36 0 114 140 120 36 1 217 143 122 36 0 107 144 123 36 2 217 143 122 36 0 114 140 120 36 1 216 145 124 37 0 215 146 46 37 0 121 67 125 37 0 102 58 126 37 0 121 67 125 37 0 215 146 46 37 0 211 147 91 38 0 238 148 127 38 0 220 149 93 38 0 239 150 128 38 0 220 149 93 38 0 238 148 127 38 0 228 151 129 39 0 159 152 130 39 0 244 153 131 39 0 241 154 132 39 0 244 153 131 39 0 159 152 130 39 0 13 16 10 40 0 51 3 3 40 0 48 155 133 40 0 52 1 1 40 0 48 155 133 40 0 51 3 3 40 0 22 156 134 41 0 53 7 7 41 0 34 157 135 41 0 55 5 5 41 0 34 157 135 41 0 53 7 7 41 0 42 158 136 42 0 12 159 137 42 0 61 160 9 42 0 59 12 11 42 0 61 13 9 42 0 12 161 137 42 0 10 2 2 43 0 51 3 3 43 0 64 23 17 43 0 65 15 12 43 0 64 23 17 43 0 51 3 3 43 0 45 162 15 44 0 71 163 16 44 0 5 164 138 44 0 70 165 43 44 0 5 164 138 44 0 71 166 16 44 0 10 2 2 45 0 4 17 13 45 0 46 0 0 45 0 45 19 15 45 0 46 0 0 45 0 4 17 13 45 0 35 36 28 46 0 82 35 27 46 0 30 167 139 46 0 79 168 140 46 0 30 167 139 46 0 82 35 27 46 0 24 169 141 47 0 33 170 21 47 0 93 171 142 47 0 83 172 22 47 0 93 171 142 47 0 33 173 21 47 0 62 40 31 48 0 16 174 143 48 0 100 175 144 48 0 96 68 55 48 0 100 175 144 48 0 16 174 143 48 0 72 176 42 49 0 89 177 145 49 0 23 178 146 49 0 88 179 147 49 0 23 178 146 49 0 89 177 145 49 0 37 180 148 50 0 25 181 149 50 0 38 182 150 50 0 9 183 151 50 0 38 182 150 50 0 25 181 149 50 0 26 184 30 51 0 35 185 28 51 0 11 186 152 51 0 36 187 153 51 0 11 186 152 51 0 35 185 28 51 0 66 188 154 52 0 20 33 25 52 0 68 189 155 52 0 19 48 39 52 0 68 189 155 52 0 20 33 25 52 0 73 190 156 53 0 75 191 65 53 0 74 54 157 53 0 76 52 58 53 0 74 54 157 53 0 75 191 65 53 0 93 171 142 54 0 83 172 22 54 0 111 192 158 54 0 110 193 159 54 0 111 192 158 54 0 83 172 22 54 0 97 194 160 55 0 100 175 144 55 0 120 195 161 55 0 105 137 162 55 0 120 195 161 55 0 100 175 144 55 0 87 196 29 56 0 88 197 147 56 0 106 198 163 56 0 119 199 164 56 0 106 198 163 56 0 88 197 147 56 0 92 200 165 57 0 125 201 166 57 0 84 27 20 57 0 116 202 167 57 0 84 27 20 57 0 125 201 166 57 0 75 78 65 58 0 132 79 63 58 0 86 203 168 58 0 133 204 169 58 0 86 203 168 58 0 132 79 63 58 0 130 205 170 59 0 134 206 171 59 0 129 207 172 59 0 133 208 173 59 0 129 207 172 59 0 134 206 171 59 0 186 209 174 0 0 187 87 73 0 0 145 210 175 0 0 181 85 71 0 0 145 210 175 0 0 187 87 73 0 0 189 89 75 1 0 156 88 74 1 0 190 211 176 1 0 188 212 177 1 0 190 211 176 1 0 156 213 74 1 0 182 82 68 2 0 148 214 178 2 0 196 215 78 2 0 194 216 179 2 0 196 217 78 2 0 148 214 178 2 0 186 209 174 3 0 200 218 12 3 0 148 219 178 3 0 194 220 179 3 0 148 219 178 3 0 200 218 12 3 0 139 221 13 60 0 180 222 180 60 0 202 223 81 60 0 206 224 181 60 0 202 225 81 60 0 180 224 180 60 0 199 102 87 5 0 145 210 175 5 0 198 104 89 5 0 139 221 13 5 0 198 104 89 5 0 145 210 175 5 0 152 120 104 61 0 168 226 105 61 0 219 227 182 61 0 218 228 183 61 0 219 227 182 61 0 168 229 105 61 0 230 230 184 7 0 155 231 185 7 0 229 113 97 7 0 166 112 96 7 0 229 113 97 7 0 155 231 185 7 0 217 232 122 8 0 222 233 186 8 0 170 234 187 8 0 161 235 112 8 0 170 234 187 8 0 222 236 186 8 0 197 237 188 9 0 192 238 189 9 0 150 239 190 9 0 142 240 191 9 0 150 239 190 9 0 192 238 189 9 0 137 241 192 62 0 164 242 193 62 0 174 243 110 62 0 175 126 108 62 0 174 243 110 62 0 164 242 193 62 0 167 244 194 63 0 166 112 96 63 0 154 245 195 63 0 155 231 185 63 0 154 245 195 63 0 166 112 96 63 0 211 107 196 64 0 209 246 197 64 0 205 247 198 64 0 211 248 196 64 0 205 249 198 64 0 207 250 199 64 0 236 114 98 65 0 103 57 200 65 0 215 251 46 65 0 102 58 126 65 0 215 251 46 65 0 103 57 200 65 0 233 252 201 14 0 113 61 202 14 0 234 253 203 14 0 112 62 204 14 0 234 254 203 14 0 113 61 202 14 0 113 65 202 15 0 233 255 201 15 0 121 67 125 15 0 216 256 124 15 0 121 67 125 15 0 233 257 201 15 0 231 111 95 16 0 104 69 117 16 0 229 113 97 16 0 124 70 205 16 0 229 113 97 16 0 104 69 117 16 0 237 258 206 17 0 238 148 127 17 0 207 259 207 17 0 211 147 91 17 0 207 259 207 17 0 238 148 127 17 0 241 260 132 18 0 159 152 130 18 0 242 261 208 18 0 210 262 90 18 0 242 263 208 18 0 159 152 130 18 0 2 264 35 66 0 49 265 209 66 0 39 266 36 66 0 50 267 210 66 0 39 266 36 66 0 49 265 209 66 0 44 268 211 67 0 8 269 212 67 0 55 5 5 67 0 34 157 135 67 0 55 5 5 67 0 8 270 212 67 0 7 271 34 68 0 54 4 4 68 0 57 42 33 68 0 58 272 213 68 0 57 42 33 68 0 54 4 4 68 0 64 273 17 69 0 65 15 12 69 0 9 274 151 69 0 38 275 150 69 0 9 274 151 69 0 65 15 12 69 0 56 276 214 70 0 69 277 215 70 0 19 48 39 70 0 68 189 155 70 0 19 48 39 70 0 69 277 215 70 0 46 0 0 71 0 45 278 15 71 0 11 279 152 71 0 5 164 138 71 0 11 280 152 71 0 45 19 15 71 0 37 180 148 72 0 28 281 216 72 0 80 282 46 72 0 81 283 53 72 0 80 282 46 72 0 28 281 216 72 0 43 284 217 73 0 92 285 165 73 0 17 26 19 73 0 84 27 20 73 0 17 26 19 73 0 92 286 165 73 0 15 287 32 74 0 62 288 31 74 0 97 194 160 74 0 100 175 144 74 0 97 194 160 74 0 62 40 31 74 0 80 289 46 75 0 101 55 45 75 0 37 180 148 75 0 25 181 149 75 0 37 180 148 75 0 101 55 45 75 0 72 176 42 76 0 23 290 146 76 0 70 291 43 76 0 5 164 138 76 0 70 292 43 76 0 23 178 146 76 0 25 181 149 77 0 18 293 218 77 0 9 294 151 77 0 3 295 219 77 0 9 294 151 77 0 18 293 218 77 0 35 185 28 78 0 30 296 139 78 0 36 187 153 78 0 14 297 220 78 0 36 187 153 78 0 30 296 139 78 0 57 42 33 79 0 6 298 221 79 0 62 299 31 79 0 16 174 143 79 0 62 299 31 79 0 6 298 221 79 0 101 55 45 80 0 103 57 47 80 0 91 300 222 80 0 108 301 223 80 0 91 300 222 80 0 103 57 47 80 0 88 302 147 81 0 89 303 145 81 0 119 199 164 81 0 118 304 224 81 0 119 199 164 81 0 89 303 145 81 0 92 305 165 82 0 97 194 160 82 0 125 201 166 82 0 120 195 161 82 0 125 201 166 82 0 97 194 160 82 0 77 306 225 83 0 78 307 226 83 0 126 308 227 83 0 115 141 228 83 0 126 308 227 83 0 78 307 226 83 0 133 204 169 84 0 134 309 229 84 0 93 310 230 84 0 93 311 230 84 0 86 311 168 84 0 133 311 169 84 0 131 312 231 85 0 134 313 171 85 0 127 313 232 85 0 130 314 170 85 0 127 313 232 85 0 134 313 171 85 0 148 219 178 86 0 183 315 233 86 0 186 209 174 86 0 187 87 73 86 0 186 209 174 86 0 183 315 233 86 0 157 316 234 41 0 169 119 103 41 0 188 212 177 41 0 190 211 176 41 0 188 212 177 41 0 169 119 103 41 0 177 317 235 87 0 196 92 78 87 0 147 318 236 87 0 194 216 179 87 0 147 319 236 87 0 196 217 78 87 0 145 210 175 43 0 199 102 87 43 0 186 209 174 43 0 200 218 12 43 0 186 209 174 43 0 199 102 87 43 0 206 320 181 44 0 180 321 180 44 0 205 322 198 44 0 140 135 113 44 0 205 323 198 44 0 180 222 180 44 0 145 210 175 45 0 181 85 71 45 0 139 221 13 45 0 180 222 180 45 0 139 221 13 45 0 181 85 71 45 0 217 232 122 88 0 170 234 187 88 0 214 324 118 88 0 165 325 109 88 0 214 324 118 88 0 170 234 187 88 0 159 326 237 89 0 228 327 238 89 0 168 328 105 89 0 218 329 183 89 0 168 330 105 89 0 228 327 238 89 0 197 237 188 90 0 235 136 115 90 0 151 110 94 90 0 231 111 95 90 0 151 110 94 90 0 235 136 115 90 0 224 331 239 91 0 207 332 199 91 0 223 333 240 91 0 158 134 114 91 0 223 333 240 91 0 207 332 199 91 0 144 334 86 50 0 160 115 99 50 0 173 335 241 50 0 172 336 242 50 0 173 335 241 50 0 160 115 99 50 0 161 132 112 51 0 146 337 70 51 0 170 338 187 51 0 171 339 72 51 0 170 338 187 51 0 146 337 70 51 0 154 245 195 92 0 155 231 185 92 0 203 340 243 92 0 201 341 244 92 0 203 340 243 92 0 155 231 185 92 0 208 342 84 53 0 209 246 85 53 0 210 106 90 53 0 211 107 91 53 0 210 106 90 53 0 209 246 85 53 0 228 327 238 54 0 111 192 245 54 0 218 329 183 54 0 110 193 246 54 0 218 329 183 54 0 111 192 245 54 0 232 343 247 55 0 120 195 248 55 0 235 136 115 55 0 105 137 116 55 0 235 136 115 55 0 120 195 248 55 0 222 344 186 56 0 106 198 249 56 0 223 345 240 56 0 119 199 250 56 0 223 345 240 56 0 106 198 249 56 0 227 346 251 93 0 219 227 182 93 0 125 201 252 93 0 116 202 253 93 0 125 201 252 93 0 219 227 182 93 0 210 262 90 94 0 221 347 92 94 0 242 263 208 94 0 243 348 254 94 0 242 263 208 94 0 221 347 92 94 0 240 349 255 95 0 239 350 256 95 0 244 351 257 95 0 243 352 258 95 0 244 351 257 95 0 239 350 256 95 0 39 266 36 96 0 50 267 210 96 0 14 353 220 96 0 48 354 133 96 0 14 355 220 96 0 50 267 210 96 0 7 356 34 97 0 44 357 211 97 0 54 4 4 97 0 55 5 5 97 0 54 4 4 97 0 44 358 211 97 0 57 42 33 98 0 58 272 213 98 0 6 298 221 98 0 32 49 40 98 0 6 298 221 98 0 58 272 213 98 0 65 15 12 99 0 59 14 11 99 0 38 275 150 99 0 12 359 137 99 0 38 275 150 99 0 59 14 11 99 0 69 277 215 100 0 63 25 18 100 0 68 189 155 100 0 3 295 219 100 0 68 189 155 100 0 63 25 18 100 0 21 360 259 101 0 53 361 260 101 0 73 362 156 101 0 22 363 261 101 0 73 362 156 101 0 53 361 260 101 0 40 364 38 102 0 30 365 139 102 0 78 366 226 102 0 79 367 140 102 0 78 368 226 102 0 30 369 139 102 0 91 300 222 103 0 90 370 262 103 0 18 293 218 103 0 66 188 154 103 0 18 293 218 103 0 90 370 262 103 0 99 371 50 104 0 98 372 49 104 0 27 372 263 104 0 41 373 264 104 0 27 374 263 104 0 98 375 49 104 0 90 370 262 105 0 95 31 23 105 0 66 188 154 105 0 20 33 25 105 0 66 188 154 105 0 95 31 23 105 0 73 362 156 106 0 22 363 261 106 0 75 78 65 106 0 24 77 64 106 0 75 78 65 106 0 22 363 261 106 0 38 182 150 107 0 12 376 137 107 0 37 180 148 107 0 28 281 216 107 0 37 180 148 107 0 12 376 137 107 0 18 377 218 108 0 66 188 154 108 0 3 295 219 108 0 68 189 155 108 0 3 295 219 108 0 66 188 154 108 0 33 378 21 109 0 24 169 141 109 0 34 157 135 109 0 22 156 134 109 0 34 157 135 109 0 24 169 141 109 0 91 300 222 110 0 108 301 223 110 0 90 370 262 110 0 109 379 265 110 0 90 370 262 110 0 108 301 223 110 0 86 203 168 111 0 93 310 230 111 0 117 380 266 111 0 111 381 267 111 0 117 380 266 111 0 93 310 230 111 0 95 31 23 112 0 123 382 268 112 0 94 32 24 112 0 124 70 57 112 0 94 32 24 112 0 123 382 268 112 0 89 383 269 113 0 85 384 270 113 0 118 385 271 113 0 122 386 272 113 0 118 385 271 113 0 85 387 270 113 0 127 74 61 114 0 130 388 273 114 0 89 389 269 114 0 89 389 269 114 0 72 73 60 114 0 127 74 61 114 0 132 390 274 115 0 131 391 275 115 0 128 392 276 115 0 127 393 277 115 0 128 392 276 115 0 131 392 275 115 0 137 394 192 66 0 174 395 110 66 0 184 81 67 66 0 185 83 69 66 0 184 81 67 66 0 174 395 110 66 0 179 396 107 67 0 190 211 176 67 0 143 118 102 67 0 169 119 103 67 0 143 397 102 67 0 190 211 176 67 0 142 398 191 68 0 192 238 189 68 0 189 89 75 68 0 193 91 77 68 0 189 89 75 68 0 192 238 189 68 0 173 399 241 69 0 200 218 12 69 0 144 400 86 69 0 199 102 87 69 0 144 400 86 69 0 200 218 12 69 0 203 340 243 116 0 204 94 80 116 0 154 245 195 116 0 191 90 76 116 0 154 245 195 116 0 204 94 80 116 0 181 85 71 71 0 146 84 70 71 0 180 401 180 71 0 140 402 113 71 0 180 222 180 71 0 146 403 70 71 0 216 404 124 117 0 163 405 216 117 0 215 406 46 117 0 172 336 242 117 0 215 406 46 117 0 163 405 216 117 0 178 122 106 73 0 152 120 104 73 0 227 407 251 73 0 219 227 182 73 0 227 408 251 73 0 152 120 104 73 0 150 409 190 118 0 232 343 247 118 0 197 410 188 118 0 235 136 115 118 0 197 237 188 118 0 232 343 247 118 0 215 411 46 119 0 172 336 242 119 0 236 114 98 119 0 160 115 99 119 0 236 114 98 119 0 172 336 242 119 0 158 134 114 76 0 207 332 199 76 0 140 412 113 76 0 205 249 198 76 0 140 413 113 76 0 207 250 199 76 0 160 115 99 77 0 144 414 86 77 0 153 415 101 77 0 138 416 88 77 0 153 415 101 77 0 144 414 86 77 0 170 338 187 120 0 171 339 72 120 0 165 417 109 120 0 149 418 111 120 0 165 417 109 120 0 171 339 72 120 0 151 110 94 79 0 141 419 278 79 0 197 420 188 79 0 192 238 189 79 0 197 420 188 79 0 141 419 278 79 0 236 114 98 80 0 226 116 100 80 0 103 57 200 80 0 108 301 279 80 0 103 57 200 80 0 226 116 100 80 0 223 421 240 81 0 119 199 250 81 0 224 422 239 81 0 118 304 280 81 0 224 422 239 81 0 119 199 250 81 0 227 423 251 82 0 125 201 252 82 0 232 343 247 82 0 120 195 248 82 0 232 343 247 82 0 125 201 252 82 0 212 424 281 83 0 126 308 282 83 0 213 139 119 83 0 115 141 121 83 0 213 139 119 83 0 126 308 282 83 0 228 151 129 121 0 244 153 131 121 0 243 348 254 121 0 228 425 129 121 0 243 425 254 121 0 221 425 92 121 0 241 426 283 122 0 237 427 284 122 0 244 427 257 122 0 240 428 255 122 0 244 427 257 122 0 237 427 284 122 0 13 11 10 123 0 48 354 133 123 0 47 9 8 123 0 50 267 210 123 0 47 9 8 123 0 48 354 133 123 0 48 155 133 124 0 52 1 1 124 0 14 429 220 124 0 36 430 153 124 0 14 429 220 124 0 52 1 1 124 0 19 48 39 125 0 32 49 40 125 0 56 431 214 125 0 58 272 213 125 0 56 276 214 125 0 32 49 40 125 0 42 158 136 126 0 61 432 9 126 0 0 433 285 126 3 60 434 286 126 0 0 433 285 126 3 61 432 9 126 0 63 25 18 127 0 69 277 215 127 0 4 17 13 127 0 67 435 14 127 0 4 17 13 127 0 69 277 215 127 0 70 436 43 128 0 71 163 16 128 0 74 437 44 128 0 67 438 14 128 0 74 437 44 128 0 71 439 16 128 0 40 364 38 129 0 78 366 226 129 0 29 440 37 129 0 77 441 225 129 0 29 440 37 129 0 78 366 226 129 0 87 39 29 130 0 26 38 30 130 0 88 302 147 130 0 23 442 146 130 0 88 443 147 130 0 26 184 30 130 0 92 444 165 131 0 43 445 217 131 0 97 194 160 131 0 15 446 32 131 0 97 194 160 131 0 43 445 217 131 0 81 447 53 132 0 28 281 216 132 0 98 64 49 132 0 41 448 264 132 0 98 64 49 132 0 28 449 216 132 0 0 450 285 133 3 27 374 263 133 0 42 451 136 133 0 41 452 264 133 0 42 451 136 133 0 27 374 263 133 0 31 34 26 134 0 16 174 143 134 0 32 49 40 134 0 6 298 221 134 0 32 49 40 134 0 16 174 143 134 0 28 453 216 135 0 12 454 137 135 0 41 455 264 135 0 42 456 136 135 0 41 457 264 135 0 12 376 137 135 0 7 356 34 136 0 15 458 32 136 0 44 268 211 136 0 43 459 217 136 0 44 460 211 136 0 15 461 32 136 0 82 143 27 137 0 87 196 29 137 0 107 144 287 137 2 106 198 163 137 0 107 144 287 137 2 87 196 29 137 0 84 27 20 138 0 116 202 167 138 0 83 29 22 138 0 110 462 159 138 0 83 29 22 138 0 116 202 167 138 0 122 463 272 139 0 85 464 270 139 0 117 465 266 139 0 86 466 168 139 0 117 465 266 139 0 85 464 270 139 0 90 370 262 140 0 109 379 265 140 0 95 31 23 140 0 123 382 268 140 0 95 31 23 140 0 109 379 265 140 0 130 205 273 141 0 129 467 128 141 0 89 468 269 141 0 85 469 270 141 0 89 470 269 141 0 129 468 128 141 0 132 471 274 142 0 128 472 276 142 0 133 472 173 142 0 129 473 172 142 0 133 472 173 142 0 128 472 276 142 0 174 395 110 96 0 149 474 111 96 0 185 83 69 96 0 183 475 233 96 0 185 83 69 96 0 149 476 111 96 0 142 477 191 97 0 189 89 75 97 0 179 478 107 97 0 190 211 176 97 0 179 479 107 97 0 189 89 75 97 0 192 238 189 143 0 141 419 278 143 0 193 91 77 143 0 167 244 194 143 0 193 91 77 143 0 141 419 278 143 0 200 218 12 144 0 173 399 241 144 0 194 220 179 144 0 147 480 236 144 0 194 220 179 144 0 173 399 241 144 0 204 94 80 100 0 203 340 243 100 0 198 104 89 100 0 138 481 88 100 0 198 104 89 100 0 203 340 243 100 0 156 482 82 145 0 208 483 84 145 0 188 484 288 145 0 157 485 289 145 0 188 484 288 145 0 208 483 84 145 0 175 486 108 102 0 213 487 119 102 0 165 488 109 102 0 214 489 118 102 0 165 490 109 102 0 213 491 119 102 0 226 116 100 103 0 153 415 101 103 0 225 492 290 103 0 201 341 244 103 0 225 492 290 103 0 153 415 101 103 0 234 493 203 104 0 162 494 291 104 0 233 494 201 104 0 176 495 292 104 0 233 496 201 104 0 162 497 291 104 0 225 492 290 105 0 201 341 244 105 0 230 230 184 105 0 155 231 185 105 0 230 230 184 105 0 201 341 244 105 0 208 483 84 146 0 210 262 90 146 0 157 485 289 146 0 159 152 130 146 0 157 485 289 146 0 210 262 90 146 0 173 335 241 107 0 172 336 242 107 0 147 498 236 107 0 163 405 216 107 0 147 498 236 107 0 172 336 242 107 0 203 340 243 108 0 201 341 244 108 0 138 499 88 108 0 153 500 101 108 0 138 499 88 108 0 201 341 244 108 0 168 501 105 147 0 169 119 103 147 0 159 326 237 147 0 157 316 234 147 0 159 326 237 147 0 169 119 103 147 0 226 116 100 110 0 225 492 290 110 0 108 301 279 110 0 109 379 293 110 0 108 301 279 110 0 225 492 290 110 0 221 347 92 148 0 117 380 294 148 0 228 151 129 148 0 111 381 295 148 0 228 151 129 148 0 117 380 294 148 0 230 230 184 112 0 229 113 97 112 0 123 382 296 112 0 124 70 205 112 0 123 382 296 112 0 229 113 97 112 0 224 502 297 113 0 118 385 298 113 0 220 503 93 113 0 122 386 299 113 0 220 149 93 113 0 118 385 298 113 0 224 504 297 149 0 240 505 300 149 0 237 258 206 149 0 224 504 297 149 0 237 258 206 149 0 207 259 207 149 0 242 506 301 150 0 238 507 302 150 0 241 508 303 150 0 237 509 304 150 0 241 507 303 150 0 238 507 302 150 0 1 510 305 151 0 47 9 8 151 0 49 265 209 151 0 50 267 210 151 0 49 265 209 151 0 47 9 8 151 0 11 279 152 152 0 36 430 153 152 0 46 0 0 152 0 52 1 1 152 0 46 0 0 152 0 36 430 153 152 0 21 6 6 153 0 56 276 214 153 0 54 4 4 153 0 58 272 213 153 0 54 4 4 153 0 56 276 214 153 0 61 160 9 154 0 47 9 8 154 0 60 434 286 154 0 1 510 305 154 0 60 434 286 154 0 47 9 8 154 0 69 277 215 23 0 56 276 214 23 0 67 435 14 23 0 21 511 6 23 0 67 435 14 23 0 56 512 214 23 0 21 513 259 155 0 73 514 156 155 0 67 515 306 155 0 74 437 157 155 0 67 515 306 155 0 73 514 156 155 0 9 516 151 25 0 3 295 219 25 0 64 273 17 25 0 63 517 18 25 0 64 518 17 25 0 3 295 219 25 0 75 191 65 156 0 86 466 168 156 0 76 52 58 156 0 85 464 270 156 0 76 52 58 156 0 86 466 168 156 0 16 174 143 157 0 31 34 26 157 0 96 68 55 157 0 94 32 24 157 0 96 68 55 157 0 31 34 26 157 0 101 55 45 28 0 91 300 222 28 0 25 181 149 28 0 18 519 218 28 0 25 181 149 28 0 91 300 222 28 0 8 269 212 29 0 17 26 19 29 0 34 157 135 29 0 33 520 21 29 0 34 157 135 29 0 17 26 19 29 0 43 284 217 30 0 17 26 19 30 0 44 521 211 30 0 8 522 212 30 0 44 523 211 30 0 17 26 19 30 0 40 47 38 31 0 39 524 36 31 0 30 525 139 31 0 14 526 220 31 0 30 527 139 31 0 39 527 36 31 0 11 528 152 32 0 5 164 138 32 0 26 184 30 32 0 23 442 146 32 0 26 184 30 32 0 5 164 138 32 0 100 175 144 33 0 96 68 55 33 0 105 137 162 33 0 104 69 56 33 0 105 137 162 33 0 96 68 55 33 0 79 529 140 35 0 114 140 307 35 1 78 307 226 35 0 115 141 228 35 0 78 307 226 35 0 114 140 307 35 1 79 142 140 36 0 82 143 27 36 0 114 140 307 36 1 107 144 287 36 2 114 140 307 36 1 82 143 27 36 0 81 530 53 158 0 121 67 54 158 0 80 531 46 158 0 102 58 48 158 0 80 531 46 158 0 121 67 54 158 0 76 71 58 38 0 85 387 270 38 0 128 72 59 38 0 129 532 128 38 0 128 72 59 38 0 85 387 270 38 0 93 310 230 39 0 134 309 229 39 0 24 77 64 39 0 131 533 62 39 0 24 77 64 39 0 134 309 229 39 0 148 214 178 123 0 182 82 68 123 0 183 475 233 123 0 185 83 69 123 0 183 475 233 123 0 182 82 68 123 0 171 86 72 124 0 187 87 73 124 0 149 534 111 124 0 183 315 233 124 0 149 534 111 124 0 187 87 73 124 0 154 245 195 159 0 191 90 76 159 0 167 244 194 159 0 193 91 77 159 0 167 244 194 159 0 191 90 76 159 0 195 93 79 126 0 196 535 78 126 0 135 536 308 126 3 177 317 235 126 0 135 536 308 126 3 196 535 78 126 0 202 95 81 160 0 204 94 80 160 0 139 221 13 160 0 198 104 89 160 0 139 221 13 160 0 204 94 80 160 0 205 322 198 161 0 209 100 197 161 0 206 537 181 161 0 202 538 81 161 0 206 537 181 161 0 209 100 197 161 0 175 486 108 129 0 164 539 193 129 0 213 487 119 129 0 212 540 281 129 0 213 487 119 129 0 164 539 193 129 0 222 236 186 130 0 223 421 240 130 0 161 235 112 130 0 158 134 114 130 0 161 132 112 130 0 223 541 240 130 0 227 542 251 162 0 232 343 247 162 0 178 543 106 162 0 150 544 190 162 0 178 543 106 162 0 232 343 247 162 0 216 545 124 132 0 233 546 201 132 0 163 405 216 132 0 176 547 292 132 0 163 548 216 132 0 233 255 201 132 0 135 549 308 133 3 177 550 235 133 0 162 497 291 133 0 176 551 292 133 0 162 497 291 133 0 177 550 235 133 0 166 112 96 163 0 167 244 194 163 0 151 110 94 163 0 141 419 278 163 0 151 110 94 163 0 167 244 194 163 0 163 552 216 135 0 176 553 292 135 0 147 554 236 135 0 177 555 235 135 0 147 498 236 135 0 176 556 292 135 0 142 477 191 136 0 179 396 107 136 0 150 557 190 136 0 178 558 106 136 0 150 559 190 136 0 179 560 107 136 0 217 143 122 137 0 107 144 123 137 2 222 344 186 137 0 106 198 249 137 0 222 344 186 137 0 107 144 123 137 2 219 227 182 138 0 218 228 183 138 0 116 202 253 138 0 110 462 246 138 0 116 202 253 138 0 218 228 183 138 0 122 463 299 164 0 117 465 294 164 0 220 109 93 164 0 221 108 92 164 0 220 109 93 164 0 117 465 294 164 0 225 492 290 140 0 230 230 184 140 0 109 379 293 140 0 123 382 296 140 0 109 379 293 140 0 230 230 184 140 0 240 349 300 141 0 224 561 297 141 0 239 562 128 141 0 220 563 93 141 0 239 561 128 141 0 224 564 297 141 0 239 565 256 165 0 238 566 302 165 0 243 566 258 165 0 242 567 301 165 0 243 566 258 165 0 238 566 302 165 0</p>
|
|
</polylist>
|
|
<extra>
|
|
<technique profile="modo401">
|
|
<param sid="render" name="Render" type="Name">default</param>
|
|
<param sid="dissolve" name="Dissolve" type="float">0</param>
|
|
<param sid="curves" name="Render_Curves" type="bool">false</param>
|
|
<param sid="radius" name="Curve_Radius" type="float">0.05</param>
|
|
</technique>
|
|
</extra>
|
|
</mesh>
|
|
</geometry>
|
|
</library_geometries>
|
|
<library_lights>
|
|
<light id="Light-Render" name="Render">
|
|
<technique_common>
|
|
<ambient>
|
|
<color sid="ambient_light_rgb">0.05 0.05 0.05</color>
|
|
</ambient>
|
|
</technique_common>
|
|
</light>
|
|
<light id="Light-Directional_Light" name="Directional_Light">
|
|
<technique_common>
|
|
<directional>
|
|
<color sid="directional_light_rgb">1 1 1</color>
|
|
</directional>
|
|
</technique_common>
|
|
<extra>
|
|
<technique profile="modo401">
|
|
<param sid="lightType" name="Light_Type" type="Name">sun_light</param>
|
|
<param sid="render" name="Render" type="Name">default</param>
|
|
<param sid="visible" name="Display_Visible" type="Name">default</param>
|
|
<param sid="size" name="Display_Size" type="float">1</param>
|
|
<param sid="dissolve" name="Dissolve" type="float">0</param>
|
|
<param sid="radiance" name="Radiant_Intensity" type="float">3</param>
|
|
<param sid="samples" name="Samples" type="int">64</param>
|
|
<param sid="shadType" name="Shadow_Type" type="Name">raytrace</param>
|
|
<param sid="shadRes" name="Shadow_Resolution" type="int">1024</param>
|
|
<param sid="fast" name="Simple_Shading" type="bool">true</param>
|
|
<param sid="azimuth" name="Azimuth" type="float">0</param>
|
|
<param sid="clamp" name="Clamp_Intensity" type="bool">true</param>
|
|
<param sid="day" name="Day" type="int">2009172</param>
|
|
<param sid="elevation" name="Elevation" type="float">0</param>
|
|
<param sid="haze" name="Haze" type="float">2</param>
|
|
<param sid="height" name="Height" type="float">10</param>
|
|
<param sid="lat" name="Latitude" type="float">0.655057</param>
|
|
<param sid="lon" name="Longitude" type="float">-2.13456</param>
|
|
<param sid="mapSize" name="Map_Size" type="float">2</param>
|
|
<param sid="north" name="North" type="float">0</param>
|
|
<param sid="radius" name="Radius" type="float">0.5</param>
|
|
<param sid="spread" name="Spread" type="float">0</param>
|
|
<param sid="sunPos" name="Sun_Position" type="bool">false</param>
|
|
<param sid="time" name="Time" type="float">12</param>
|
|
<param sid="timeZone" name="Time_Zone" type="float">-8</param>
|
|
<param sid="volumetrics" name="Volumetrics" type="bool">false</param>
|
|
<param sid="vdissolve" name="Volumetrics_Dissolve" type="float">0</param>
|
|
<param sid="vsamples" name="Volumetric_Samples" type="int">40</param>
|
|
</technique>
|
|
</extra>
|
|
</light>
|
|
</library_lights>
|
|
<library_nodes id="shader_tree" name="Shader_Tree">
|
|
<node sid="shader_tree_render" name="Render">
|
|
<extra>
|
|
<technique profile="modo401">
|
|
<param sid="first" name="Frame_Range_First" type="int">1</param>
|
|
<param sid="last" name="Frame_Range_Last" type="int">120</param>
|
|
<param sid="dpi" name="Frame_DPI" type="float">300</param>
|
|
<param sid="resUnit" name="Resolution_Unit" type="Name">pixels</param>
|
|
<param sid="pAspect" name="Frame_Pixel_Aspect_Ratio" type="float">1</param>
|
|
<param sid="bucketX" name="Bucket_Width" type="int">32</param>
|
|
<param sid="bucketY" name="Bucket_Height" type="int">32</param>
|
|
<param sid="bktOrder" name="Bucket_Order" type="Name">hilbert</param>
|
|
<param sid="bktSkip" name="Skip_Existing_Buckets" type="bool">false</param>
|
|
<param sid="region" name="Render_Region" type="bool">false</param>
|
|
<param sid="regX0" name="Render_Region_Left" type="float">0</param>
|
|
<param sid="regX1" name="Render_Region_Right" type="float">1</param>
|
|
<param sid="regY0" name="Render_Region_Top" type="float">0</param>
|
|
<param sid="regY1" name="Render_Region_Bottom" type="float">1</param>
|
|
<param sid="aa" name="Render_Antialiasing" type="Name">s8</param>
|
|
<param sid="aaFilter" name="Render_Antialiasing_Filter" type="Name">gaussian</param>
|
|
<param sid="fineRate" name="Refinement_Shading_Rate" type="float">0.25</param>
|
|
<param sid="fineThresh" name="Refinement_Threshold" type="float">0.1</param>
|
|
<param sid="bktRefine" name="Refine_Bucket_Borders" type="bool">false</param>
|
|
<param sid="dof" name="Render_Depth_of_Field" type="bool">false</param>
|
|
<param sid="mBlur" name="Render_Motion_Blur" type="bool">false</param>
|
|
<param sid="stereo" name="Render_Stereoscopic" type="bool">false</param>
|
|
<param sid="rayShadow" name="Ray_Tracing_Shadows" type="bool">true</param>
|
|
<param sid="reflDepth" name="Reflection_Depth" type="int">8</param>
|
|
<param sid="refrDepth" name="Refraction_Depth" type="int">8</param>
|
|
<param sid="rayThresh" name="Ray_Threshold" type="float">0.001</param>
|
|
<param sid="subdAdapt" name="Adaptive_Subdivision" type="bool">false</param>
|
|
<param sid="subdRate" name="Subdivision_Rate" type="float">10</param>
|
|
<param sid="dispEnable" name="Micropoly_Displacement" type="bool">true</param>
|
|
<param sid="dispRate" name="Displacement_Rate" type="float">1</param>
|
|
<param sid="dispRatio" name="Displacement_Ratio" type="float">4</param>
|
|
<param sid="edgeMin" name="Minimum_Edge_Length" type="float">0.0001</param>
|
|
<param sid="dispSmooth" name="Smooth_Positions" type="bool">true</param>
|
|
<param sid="ambRad" name="Ambient_Intensity" type="float">0.05</param>
|
|
<param sid="ambColor" name="Ambient_Color" type="color">1 1 1</param>
|
|
<param sid="globEnable" name="Enable_Indirect_Illumination" type="bool">false</param>
|
|
<param sid="globScope" name="Indirect_Illumination_Scope" type="Name">all</param>
|
|
<param sid="globRays" name="Indirect_Rays" type="int">64</param>
|
|
<param sid="globLimit" name="Indirect_Bounces" type="int">1</param>
|
|
<param sid="globRange" name="Indirect_Range" type="float">0</param>
|
|
<param sid="globSubs" name="Subsurface_Scattering" type="int">0</param>
|
|
<param sid="globVols" name="Volumetrics_Affect_Indirect" type="bool">false</param>
|
|
<param sid="irrCache" name="Enable_Irradiance_Caching" type="bool">true</param>
|
|
<param sid="irrRays" name="Irradiance_Rays" type="int">256</param>
|
|
<param sid="globSuper" name="Indirect_Supersampling" type="bool">true</param>
|
|
<param sid="irrRate" name="Irradiance_Rate" type="float">2.5</param>
|
|
<param sid="irrRatio" name="Irradiance_Ratio" type="float">6</param>
|
|
<param sid="irrVals" name="Interpolation_Values" type="int">1</param>
|
|
<param sid="irrGrads" name="Irradiance_Gradients" type="Name">both</param>
|
|
<param sid="irrWalk" name="Walkthrough_Mode" type="bool">false</param>
|
|
<param sid="irrLEnable" name="Load_Irradiance_before_Render" type="bool">false</param>
|
|
<param sid="irrLName" name="Load_Irradiance_File" type="Name"></param>
|
|
<param sid="irrSEnable" name="Save_Irradiance_after_Render" type="bool">false</param>
|
|
<param sid="irrSName" name="Save_Irradiance_File" type="Name"></param>
|
|
<param sid="causEnable" name="Enable_Direct_Caustics" type="bool">false</param>
|
|
<param sid="causTotal" name="Caustics_Total_Photons" type="int">100000</param>
|
|
<param sid="causLocal" name="Caustics_Local_Photons" type="int">32</param>
|
|
<param sid="globCaus" name="Indirect_Caustics" type="Name">refraction</param>
|
|
</technique>
|
|
</extra>
|
|
</node>
|
|
<node sid="shader_tree_environment" name="Environment">
|
|
<extra>
|
|
<technique profile="modo401">
|
|
<param sid="radiance" name="Environment_Intensity" type="float">1</param>
|
|
<param sid="visCam" name="Environment_Visible_to_Camera" type="bool">true</param>
|
|
<param sid="visInd" name="Environment_Visible_to_Indirect_Rays" type="bool">true</param>
|
|
<param sid="visRefl" name="Environment_Visible_to_Reflection_Rays" type="bool">true</param>
|
|
<param sid="visRefr" name="Environment_Visible_to_Refraction_Rays" type="bool">true</param>
|
|
</technique>
|
|
</extra>
|
|
</node>
|
|
</library_nodes>
|
|
<library_visual_scenes>
|
|
<visual_scene id="DefaultScene">
|
|
<node id="RenderNode" name="Render" type="NODE">
|
|
<instance_light url="#Light-Render" />
|
|
</node>
|
|
<node id="Texture_GroupNode" name="Texture_Group" type="NODE">
|
|
<node id="ashoka_lion__Image___Texture_Node" name="ashoka_lion__Image___Texture_" type="NODE">
|
|
<translate sid="Position">0 0 0</translate>
|
|
<rotate sid="RotationY">0 1 0 0</rotate>
|
|
<rotate sid="RotationX">1 0 0 0</rotate>
|
|
<rotate sid="RotationZ">0 0 1 0</rotate>
|
|
<scale sid="Scale">1 1 1</scale>
|
|
</node>
|
|
</node>
|
|
<node id="Geometry-Ashoka_LionNode" name="Ashoka_Lion" type="NODE">
|
|
<instance_geometry url="#Geometry-Ashoka_Lion">
|
|
<bind_material>
|
|
<technique_common>
|
|
<instance_material symbol="Material-Ashoka_Lion_Mat" target="#Material-Ashoka_Lion_Mat" />
|
|
</technique_common>
|
|
</bind_material>
|
|
</instance_geometry>
|
|
</node>
|
|
<node id="Camera-CameraNode" name="Camera" type="NODE">
|
|
<translate sid="Position__2_">0 0.75 4</translate>
|
|
<rotate sid="Rotation__2_Y">0 1 0 0</rotate>
|
|
<rotate sid="Rotation__2_X">1 0 0 -5</rotate>
|
|
<rotate sid="Rotation__2_Z">0 0 1 0</rotate>
|
|
<instance_camera url="#Camera-Camera" />
|
|
</node>
|
|
<node id="Light-Directional_LightNode" name="Directional_Light" type="NODE">
|
|
<translate sid="Position__3_">-2 2 2</translate>
|
|
<rotate sid="Rotation__3_Y">0 1 0 -45</rotate>
|
|
<rotate sid="Rotation__3_X">1 0 0 -30</rotate>
|
|
<rotate sid="Rotation__3_Z">0 0 1 0</rotate>
|
|
<instance_light url="#Light-Directional_Light" />
|
|
</node>
|
|
<extra>
|
|
<technique profile="modo401">
|
|
<param sid="fps" name="Scene_FPS" type="float">24</param>
|
|
<param sid="sceneS" name="Scene_Start_Time" type="float">0</param>
|
|
<param sid="sceneE" name="Scene_End_Time" type="float">5</param>
|
|
<param sid="currentS" name="Scene_Current_Start_Time" type="float">0</param>
|
|
<param sid="currentE" name="Scene_Current_End_Time" type="float">5</param>
|
|
<param sid="timeSys" name="Scene_Time_System" type="Name">frames</param>
|
|
</technique>
|
|
</extra>
|
|
<extra>
|
|
<technique profile="MAX3D">
|
|
<frame_rate>24</frame_rate>
|
|
</technique>
|
|
</extra>
|
|
<extra>
|
|
<technique profile="MAYA">
|
|
<start_time>0</start_time>
|
|
<end_time>5</end_time>
|
|
</technique>
|
|
</extra>
|
|
<extra>
|
|
<technique profile="OKINO" />
|
|
</extra>
|
|
<extra>
|
|
<technique profile="XSI">
|
|
<SI_Scene>
|
|
<frame_rate>24</frame_rate>
|
|
</SI_Scene>
|
|
</technique>
|
|
</extra>
|
|
</visual_scene>
|
|
</library_visual_scenes>
|
|
<scene>
|
|
<instance_visual_scene url="#DefaultScene" />
|
|
</scene>
|
|
</COLLADA>
|