#VRML V2.0 utf8 # plot3d Viewpoint { position 0 0 1000 orientation 0 0 1 0 } PROTO Node [ ] { Shape { geometry Sphere { radius 7 } appearance Appearance { material Material { diffuseColor 0 1 0 specularColor 1 1 1 transparency .1 } } } } PROTO Node0 [ ] { Shape { geometry Sphere { radius 7 } appearance Appearance { material Material { diffuseColor 0 0 1 specularColor 1 1 1 transparency .1 } } } } PROTO Node1 [ ] { Shape { geometry Sphere { radius 7 } appearance Appearance { material Material { diffuseColor 1 0 0 specularColor 1 1 1 transparency .1 } } } } PROTO Node2 [ ] { Shape { geometry Sphere { radius 7 } appearance Appearance { material Material { diffuseColor 0 1 0 specularColor 1 1 1 transparency .1 } } } } PROTO Node9 [ ] { Shape { geometry Sphere { radius 7 } appearance Appearance { material Material { diffuseColor 1 1 0 specularColor 1 1 1 transparency .1 } } } } Shape { geometry IndexedLineSet { coord DEF Nodes Coordinate { point [ 0 0 0, # 0 [0] 33 -51 4, # 1 [1] 72 -112 23, # 2 [2] 114 -165 50, # 3 [3] 161 -213 82, # 4 [4] 211 -255 117, # 5 [5] 265 -291 153, # 6 [6] 322 -320 190, # 7 [7] 383 -344 229, # 8 [8] 431 -359 265, # 9 [9] -51 -9 22, # 10 [10] -22 -71 39, # 11 [11] 20 -128 66, # 12 [12] 67 -177 99, # 13 [13] 117 -220 135, # 14 [14] 170 -259 172, # 15 [15] 226 -292 210, # 16 [16] 286 -319 248, # 17 [17] 348 -340 288, # 18 [18] 406 -355 322, # 19 [19] -108 -18 66, # 20 [20] -78 -77 91, # 21 [21] -33 -133 125, # 22 [22] 17 -179 161, # 23 [23] 70 -219 200, # 24 [24] 126 -255 239, # 25 [25] 185 -286 278, # 26 [26] 247 -311 317, # 27 [27] 313 -330 356, # 28 [28] 371 -343 389, # 29 [29] -152 -12 121, # 30 [30] -121 -68 151, # 31 [31] -75 -123 188, # 32 [32] -24 -168 226, # 33 [33] 30 -208 265, # 34 [34] 88 -243 305, # 35 [35] 149 -272 344, # 36 [36] 213 -295 383, # 37 [37] 280 -313 422, # 38 [38] 339 -325 455, # 39 [39] -186 5 183, # 40 [40] -153 -47 215, # 41 [41] -108 -101 253, # 42 [42] -57 -147 292, # 43 [43] -3 -188 331, # 44 [44] 55 -223 371, # 45 [45] 116 -252 410, # 46 [46] 181 -273 448, # 47 [47] 249 -290 487, # 48 [48] 308 -302 520, # 49 [49] -215 29 247, # 50 [50] -180 -21 280, # 51 [51] -135 -74 319, # 52 [52] -86 -121 358, # 53 [53] -33 -163 397, # 54 [54] 24 -199 436, # 55 [55] 85 -228 475, # 56 [56] 150 -250 513, # 57 [57] 218 -267 552, # 58 [58] 276 -279 585, # 59 [59] -240 56 311, # 60 [60] -204 8 345, # 61 [61] -160 -45 385, # 62 [62] -113 -93 424, # 63 [63] -62 -136 463, # 64 [64] -7 -174 502, # 65 [65] 53 -205 540, # 66 [66] 117 -228 578, # 67 [67] 185 -245 617, # 68 [68] 243 -256 650, # 69 [69] -265 83 376, # 70 [70] -228 37 411, # 71 [71] -184 -15 451, # 72 [72] -139 -63 490, # 73 [73] -90 -108 529, # 74 [74] -37 -148 568, # 75 [75] 21 -181 606, # 76 [76] 84 -205 643, # 77 [77] 151 -222 681, # 78 [78] 210 -233 714, # 79 [79] -290 111 443, # 80 [80] -252 66 478, # 81 [81] -209 16 519, # 82 [82] -165 -32 558, # 83 [83] -118 -78 597, # 84 [84] -67 -119 636, # 85 [85] -10 -153 674, # 86 [86] 52 -178 710, # 87 [87] 118 -196 745, # 88 [88] 177 -208 778, # 89 [89] -307 131 499, # 90 [90] -274 93 536, # 91 [91] -231 43 577, # 92 [92] -187 -5 616, # 93 [93] -140 -50 655, # 94 [94] -89 -90 694, # 95 [95] -33 -124 732, # 96 [96] 27 -150 768, # 97 [97] 92 -170 803, # 98 [98] 147 -185 827, # 99 [99] ] } coordIndex [ 33, 32, -1, # [33 -> 32] 33, 23, -1, # [33 -> 23] 33, 43, -1, # [33 -> 43] 33, 34, -1, # [33 -> 34] 32, 31, -1, # [32 -> 31] 32, 22, -1, # [32 -> 22] 32, 42, -1, # [32 -> 42] 32, 33, -1, # [32 -> 33] 90, 80, -1, # [90 -> 80] 90, 91, -1, # [90 -> 91] 63, 53, -1, # [63 -> 53] 63, 62, -1, # [63 -> 62] 63, 64, -1, # [63 -> 64] 63, 73, -1, # [63 -> 73] 21, 11, -1, # [21 -> 11] 21, 22, -1, # [21 -> 22] 21, 20, -1, # [21 -> 20] 21, 31, -1, # [21 -> 31] 71, 61, -1, # [71 -> 61] 71, 72, -1, # [71 -> 72] 71, 81, -1, # [71 -> 81] 71, 70, -1, # [71 -> 70] 7, 6, -1, # [7 -> 6] 7, 17, -1, # [7 -> 17] 7, 8, -1, # [7 -> 8] 80, 81, -1, # [80 -> 81] 80, 70, -1, # [80 -> 70] 80, 90, -1, # [80 -> 90] 26, 25, -1, # [26 -> 25] 26, 36, -1, # [26 -> 36] 26, 16, -1, # [26 -> 16] 26, 27, -1, # [26 -> 27] 99, 89, -1, # [99 -> 89] 99, 98, -1, # [99 -> 98] 18, 17, -1, # [18 -> 17] 18, 28, -1, # [18 -> 28] 18, 8, -1, # [18 -> 8] 18, 19, -1, # [18 -> 19] 72, 62, -1, # [72 -> 62] 72, 71, -1, # [72 -> 71] 72, 73, -1, # [72 -> 73] 72, 82, -1, # [72 -> 82] 16, 15, -1, # [16 -> 15] 16, 26, -1, # [16 -> 26] 16, 17, -1, # [16 -> 17] 16, 6, -1, # [16 -> 6] 44, 34, -1, # [44 -> 34] 44, 43, -1, # [44 -> 43] 44, 54, -1, # [44 -> 54] 44, 45, -1, # [44 -> 45] 55, 54, -1, # [55 -> 54] 55, 45, -1, # [55 -> 45] 55, 65, -1, # [55 -> 65] 55, 56, -1, # [55 -> 56] 84, 74, -1, # [84 -> 74] 84, 83, -1, # [84 -> 83] 84, 94, -1, # [84 -> 94] 84, 85, -1, # [84 -> 85] 27, 26, -1, # [27 -> 26] 27, 37, -1, # [27 -> 37] 27, 17, -1, # [27 -> 17] 27, 28, -1, # [27 -> 28] 74, 64, -1, # [74 -> 64] 74, 73, -1, # [74 -> 73] 74, 75, -1, # [74 -> 75] 74, 84, -1, # [74 -> 84] 95, 85, -1, # [95 -> 85] 95, 96, -1, # [95 -> 96] 95, 94, -1, # [95 -> 94] 57, 56, -1, # [57 -> 56] 57, 47, -1, # [57 -> 47] 57, 58, -1, # [57 -> 58] 57, 67, -1, # [57 -> 67] 61, 51, -1, # [61 -> 51] 61, 62, -1, # [61 -> 62] 61, 60, -1, # [61 -> 60] 61, 71, -1, # [61 -> 71] 20, 10, -1, # [20 -> 10] 20, 21, -1, # [20 -> 21] 20, 30, -1, # [20 -> 30] 92, 82, -1, # [92 -> 82] 92, 91, -1, # [92 -> 91] 92, 93, -1, # [92 -> 93] 89, 88, -1, # [89 -> 88] 89, 79, -1, # [89 -> 79] 89, 99, -1, # [89 -> 99] 10, 0, -1, # [10 -> 0] 10, 20, -1, # [10 -> 20] 10, 11, -1, # [10 -> 11] 31, 21, -1, # [31 -> 21] 31, 30, -1, # [31 -> 30] 31, 41, -1, # [31 -> 41] 31, 32, -1, # [31 -> 32] 35, 34, -1, # [35 -> 34] 35, 25, -1, # [35 -> 25] 35, 45, -1, # [35 -> 45] 35, 36, -1, # [35 -> 36] 11, 10, -1, # [11 -> 10] 11, 1, -1, # [11 -> 1] 11, 21, -1, # [11 -> 21] 11, 12, -1, # [11 -> 12] 91, 81, -1, # [91 -> 81] 91, 92, -1, # [91 -> 92] 91, 90, -1, # [91 -> 90] 78, 77, -1, # [78 -> 77] 78, 88, -1, # [78 -> 88] 78, 68, -1, # [78 -> 68] 78, 79, -1, # [78 -> 79] 48, 47, -1, # [48 -> 47] 48, 58, -1, # [48 -> 58] 48, 38, -1, # [48 -> 38] 48, 49, -1, # [48 -> 49] 87, 86, -1, # [87 -> 86] 87, 77, -1, # [87 -> 77] 87, 97, -1, # [87 -> 97] 87, 88, -1, # [87 -> 88] 93, 83, -1, # [93 -> 83] 93, 92, -1, # [93 -> 92] 93, 94, -1, # [93 -> 94] 77, 76, -1, # [77 -> 76] 77, 67, -1, # [77 -> 67] 77, 78, -1, # [77 -> 78] 77, 87, -1, # [77 -> 87] 29, 28, -1, # [29 -> 28] 29, 39, -1, # [29 -> 39] 29, 19, -1, # [29 -> 19] 65, 55, -1, # [65 -> 55] 65, 64, -1, # [65 -> 64] 65, 66, -1, # [65 -> 66] 65, 75, -1, # [65 -> 75] 50, 51, -1, # [50 -> 51] 50, 40, -1, # [50 -> 40] 50, 60, -1, # [50 -> 60] 39, 38, -1, # [39 -> 38] 39, 29, -1, # [39 -> 29] 39, 49, -1, # [39 -> 49] 64, 54, -1, # [64 -> 54] 64, 63, -1, # [64 -> 63] 64, 65, -1, # [64 -> 65] 64, 74, -1, # [64 -> 74] 97, 87, -1, # [97 -> 87] 97, 96, -1, # [97 -> 96] 97, 98, -1, # [97 -> 98] 58, 57, -1, # [58 -> 57] 58, 68, -1, # [58 -> 68] 58, 48, -1, # [58 -> 48] 58, 59, -1, # [58 -> 59] 41, 31, -1, # [41 -> 31] 41, 42, -1, # [41 -> 42] 41, 40, -1, # [41 -> 40] 41, 51, -1, # [41 -> 51] 12, 11, -1, # [12 -> 11] 12, 2, -1, # [12 -> 2] 12, 13, -1, # [12 -> 13] 12, 22, -1, # [12 -> 22] 15, 14, -1, # [15 -> 14] 15, 5, -1, # [15 -> 5] 15, 25, -1, # [15 -> 25] 15, 16, -1, # [15 -> 16] 81, 71, -1, # [81 -> 71] 81, 82, -1, # [81 -> 82] 81, 91, -1, # [81 -> 91] 81, 80, -1, # [81 -> 80] 52, 42, -1, # [52 -> 42] 52, 51, -1, # [52 -> 51] 52, 53, -1, # [52 -> 53] 52, 62, -1, # [52 -> 62] 60, 50, -1, # [60 -> 50] 60, 61, -1, # [60 -> 61] 60, 70, -1, # [60 -> 70] 56, 55, -1, # [56 -> 55] 56, 46, -1, # [56 -> 46] 56, 66, -1, # [56 -> 66] 56, 57, -1, # [56 -> 57] 66, 65, -1, # [66 -> 65] 66, 56, -1, # [66 -> 56] 66, 67, -1, # [66 -> 67] 66, 76, -1, # [66 -> 76] 73, 63, -1, # [73 -> 63] 73, 72, -1, # [73 -> 72] 73, 74, -1, # [73 -> 74] 73, 83, -1, # [73 -> 83] 45, 44, -1, # [45 -> 44] 45, 35, -1, # [45 -> 35] 45, 55, -1, # [45 -> 55] 45, 46, -1, # [45 -> 46] 86, 76, -1, # [86 -> 76] 86, 85, -1, # [86 -> 85] 86, 96, -1, # [86 -> 96] 86, 87, -1, # [86 -> 87] 19, 18, -1, # [19 -> 18] 19, 9, -1, # [19 -> 9] 19, 29, -1, # [19 -> 29] 76, 66, -1, # [76 -> 66] 76, 75, -1, # [76 -> 75] 76, 86, -1, # [76 -> 86] 76, 77, -1, # [76 -> 77] 62, 52, -1, # [62 -> 52] 62, 61, -1, # [62 -> 61] 62, 63, -1, # [62 -> 63] 62, 72, -1, # [62 -> 72] 54, 44, -1, # [54 -> 44] 54, 53, -1, # [54 -> 53] 54, 64, -1, # [54 -> 64] 54, 55, -1, # [54 -> 55] 67, 66, -1, # [67 -> 66] 67, 57, -1, # [67 -> 57] 67, 68, -1, # [67 -> 68] 67, 77, -1, # [67 -> 77] 70, 71, -1, # [70 -> 71] 70, 60, -1, # [70 -> 60] 70, 80, -1, # [70 -> 80] 68, 67, -1, # [68 -> 67] 68, 58, -1, # [68 -> 58] 68, 78, -1, # [68 -> 78] 68, 69, -1, # [68 -> 69] 2, 1, -1, # [2 -> 1] 2, 12, -1, # [2 -> 12] 2, 3, -1, # [2 -> 3] 17, 16, -1, # [17 -> 16] 17, 27, -1, # [17 -> 27] 17, 7, -1, # [17 -> 7] 17, 18, -1, # [17 -> 18] 1, 0, -1, # [1 -> 0] 1, 11, -1, # [1 -> 11] 1, 2, -1, # [1 -> 2] 88, 87, -1, # [88 -> 87] 88, 78, -1, # [88 -> 78] 88, 98, -1, # [88 -> 98] 88, 89, -1, # [88 -> 89] 30, 20, -1, # [30 -> 20] 30, 31, -1, # [30 -> 31] 30, 40, -1, # [30 -> 40] 82, 72, -1, # [82 -> 72] 82, 81, -1, # [82 -> 81] 82, 83, -1, # [82 -> 83] 82, 92, -1, # [82 -> 92] 25, 24, -1, # [25 -> 24] 25, 35, -1, # [25 -> 35] 25, 15, -1, # [25 -> 15] 25, 26, -1, # [25 -> 26] 28, 27, -1, # [28 -> 27] 28, 18, -1, # [28 -> 18] 28, 38, -1, # [28 -> 38] 28, 29, -1, # [28 -> 29] 40, 30, -1, # [40 -> 30] 40, 41, -1, # [40 -> 41] 40, 50, -1, # [40 -> 50] 83, 73, -1, # [83 -> 73] 83, 84, -1, # [83 -> 84] 83, 82, -1, # [83 -> 82] 83, 93, -1, # [83 -> 93] 75, 65, -1, # [75 -> 65] 75, 74, -1, # [75 -> 74] 75, 85, -1, # [75 -> 85] 75, 76, -1, # [75 -> 76] 14, 13, -1, # [14 -> 13] 14, 4, -1, # [14 -> 4] 14, 24, -1, # [14 -> 24] 14, 15, -1, # [14 -> 15] 69, 59, -1, # [69 -> 59] 69, 68, -1, # [69 -> 68] 69, 79, -1, # [69 -> 79] 59, 58, -1, # [59 -> 58] 59, 49, -1, # [59 -> 49] 59, 69, -1, # [59 -> 69] 49, 48, -1, # [49 -> 48] 49, 39, -1, # [49 -> 39] 49, 59, -1, # [49 -> 59] 24, 23, -1, # [24 -> 23] 24, 34, -1, # [24 -> 34] 24, 14, -1, # [24 -> 14] 24, 25, -1, # [24 -> 25] 53, 43, -1, # [53 -> 43] 53, 52, -1, # [53 -> 52] 53, 54, -1, # [53 -> 54] 53, 63, -1, # [53 -> 63] 79, 78, -1, # [79 -> 78] 79, 69, -1, # [79 -> 69] 79, 89, -1, # [79 -> 89] 42, 32, -1, # [42 -> 32] 42, 43, -1, # [42 -> 43] 42, 41, -1, # [42 -> 41] 42, 52, -1, # [42 -> 52] 22, 12, -1, # [22 -> 12] 22, 21, -1, # [22 -> 21] 22, 32, -1, # [22 -> 32] 22, 23, -1, # [22 -> 23] 0, 1, -1, # [0 -> 1] 0, 10, -1, # [0 -> 10] 46, 45, -1, # [46 -> 45] 46, 36, -1, # [46 -> 36] 46, 56, -1, # [46 -> 56] 46, 47, -1, # [46 -> 47] 23, 13, -1, # [23 -> 13] 23, 22, -1, # [23 -> 22] 23, 33, -1, # [23 -> 33] 23, 24, -1, # [23 -> 24] 13, 12, -1, # [13 -> 12] 13, 3, -1, # [13 -> 3] 13, 14, -1, # [13 -> 14] 13, 23, -1, # [13 -> 23] 96, 86, -1, # [96 -> 86] 96, 95, -1, # [96 -> 95] 96, 97, -1, # [96 -> 97] 6, 5, -1, # [6 -> 5] 6, 16, -1, # [6 -> 16] 6, 7, -1, # [6 -> 7] 85, 75, -1, # [85 -> 75] 85, 84, -1, # [85 -> 84] 85, 95, -1, # [85 -> 95] 85, 86, -1, # [85 -> 86] 3, 2, -1, # [3 -> 2] 3, 13, -1, # [3 -> 13] 3, 4, -1, # [3 -> 4] 36, 35, -1, # [36 -> 35] 36, 26, -1, # [36 -> 26] 36, 46, -1, # [36 -> 46] 36, 37, -1, # [36 -> 37] 94, 84, -1, # [94 -> 84] 94, 95, -1, # [94 -> 95] 94, 93, -1, # [94 -> 93] 9, 8, -1, # [9 -> 8] 9, 19, -1, # [9 -> 19] 51, 41, -1, # [51 -> 41] 51, 52, -1, # [51 -> 52] 51, 61, -1, # [51 -> 61] 51, 50, -1, # [51 -> 50] 47, 46, -1, # [47 -> 46] 47, 37, -1, # [47 -> 37] 47, 48, -1, # [47 -> 48] 47, 57, -1, # [47 -> 57] 38, 37, -1, # [38 -> 37] 38, 28, -1, # [38 -> 28] 38, 39, -1, # [38 -> 39] 38, 48, -1, # [38 -> 48] 8, 7, -1, # [8 -> 7] 8, 18, -1, # [8 -> 18] 8, 9, -1, # [8 -> 9] 98, 88, -1, # [98 -> 88] 98, 97, -1, # [98 -> 97] 98, 99, -1, # [98 -> 99] 4, 3, -1, # [4 -> 3] 4, 14, -1, # [4 -> 14] 4, 5, -1, # [4 -> 5] 34, 33, -1, # [34 -> 33] 34, 24, -1, # [34 -> 24] 34, 35, -1, # [34 -> 35] 34, 44, -1, # [34 -> 44] 37, 36, -1, # [37 -> 36] 37, 47, -1, # [37 -> 47] 37, 27, -1, # [37 -> 27] 37, 38, -1, # [37 -> 38] 43, 33, -1, # [43 -> 33] 43, 42, -1, # [43 -> 42] 43, 44, -1, # [43 -> 44] 43, 53, -1, # [43 -> 53] 5, 4, -1, # [5 -> 4] 5, 15, -1, # [5 -> 15] 5, 6, -1, # [5 -> 6] ] } } Transform { translation -24 -168 226 children Node2 { } } # 33 Transform { translation -75 -123 188 children Node2 { } } # 32 Transform { translation -307 131 499 children Node2 { } } # 90 Transform { translation -113 -93 424 children Node2 { } } # 63 Transform { translation -78 -77 91 children Node2 { } } # 21 Transform { translation -228 37 411 children Node2 { } } # 71 Transform { translation 322 -320 190 children Node2 { } } # 7 Transform { translation -290 111 443 children Node2 { } } # 80 Transform { translation 185 -286 278 children Node2 { } } # 26 Transform { translation 147 -185 827 children Node2 { } } # 99 Transform { translation 348 -340 288 children Node2 { } } # 18 Transform { translation -184 -15 451 children Node2 { } } # 72 Transform { translation 226 -292 210 children Node2 { } } # 16 Transform { translation -3 -188 331 children Node2 { } } # 44 Transform { translation 24 -199 436 children Node2 { } } # 55 Transform { translation -118 -78 597 children Node2 { } } # 84 Transform { translation 247 -311 317 children Node2 { } } # 27 Transform { translation -90 -108 529 children Node2 { } } # 74 Transform { translation -89 -90 694 children Node2 { } } # 95 Transform { translation 150 -250 513 children Node2 { } } # 57 Transform { translation -204 8 345 children Node2 { } } # 61 Transform { translation -108 -18 66 children Node2 { } } # 20 Transform { translation -231 43 577 children Node2 { } } # 92 Transform { translation 177 -208 778 children Node2 { } } # 89 Transform { translation -51 -9 22 children Node2 { } } # 10 Transform { translation -121 -68 151 children Node2 { } } # 31 Transform { translation 88 -243 305 children Node2 { } } # 35 Transform { translation -22 -71 39 children Node2 { } } # 11 Transform { translation -274 93 536 children Node2 { } } # 91 Transform { translation 151 -222 681 children Node2 { } } # 78 Transform { translation 249 -290 487 children Node2 { } } # 48 Transform { translation 52 -178 710 children Node2 { } } # 87 Transform { translation -187 -5 616 children Node2 { } } # 93 Transform { translation 84 -205 643 children Node2 { } } # 77 Transform { translation 371 -343 389 children Node2 { } } # 29 Transform { translation -7 -174 502 children Node2 { } } # 65 Transform { translation -215 29 247 children Node2 { } } # 50 Transform { translation 339 -325 455 children Node2 { } } # 39 Transform { translation -62 -136 463 children Node2 { } } # 64 Transform { translation 27 -150 768 children Node2 { } } # 97 Transform { translation 218 -267 552 children Node2 { } } # 58 Transform { translation -153 -47 215 children Node2 { } } # 41 Transform { translation 20 -128 66 children Node2 { } } # 12 Transform { translation 170 -259 172 children Node2 { } } # 15 Transform { translation -252 66 478 children Node2 { } } # 81 Transform { translation -135 -74 319 children Node2 { } } # 52 Transform { translation -240 56 311 children Node2 { } } # 60 Transform { translation 85 -228 475 children Node2 { } } # 56 Transform { translation 53 -205 540 children Node2 { } } # 66 Transform { translation -139 -63 490 children Node2 { } } # 73 Transform { translation 55 -223 371 children Node2 { } } # 45 Transform { translation -10 -153 674 children Node2 { } } # 86 Transform { translation 406 -355 322 children Node2 { } } # 19 Transform { translation 21 -181 606 children Node2 { } } # 76 Transform { translation -160 -45 385 children Node2 { } } # 62 Transform { translation -33 -163 397 children Node2 { } } # 54 Transform { translation 117 -228 578 children Node2 { } } # 67 Transform { translation -265 83 376 children Node2 { } } # 70 Transform { translation 185 -245 617 children Node2 { } } # 68 Transform { translation 72 -112 23 children Node2 { } } # 2 Transform { translation 286 -319 248 children Node2 { } } # 17 Transform { translation 33 -51 4 children Node2 { } } # 1 Transform { translation 118 -196 745 children Node2 { } } # 88 Transform { translation -152 -12 121 children Node2 { } } # 30 Transform { translation -209 16 519 children Node2 { } } # 82 Transform { translation 126 -255 239 children Node2 { } } # 25 Transform { translation 313 -330 356 children Node2 { } } # 28 Transform { translation -186 5 183 children Node2 { } } # 40 Transform { translation -165 -32 558 children Node2 { } } # 83 Transform { translation -37 -148 568 children Node2 { } } # 75 Transform { translation 117 -220 135 children Node2 { } } # 14 Transform { translation 243 -256 650 children Node2 { } } # 69 Transform { translation 276 -279 585 children Node2 { } } # 59 Transform { translation 308 -302 520 children Node2 { } } # 49 Transform { translation 70 -219 200 children Node2 { } } # 24 Transform { translation -86 -121 358 children Node2 { } } # 53 Transform { translation 210 -233 714 children Node2 { } } # 79 Transform { translation -108 -101 253 children Node2 { } } # 42 Transform { translation -33 -133 125 children Node2 { } } # 22 Transform { translation 0 0 0 children Node9 { } } # 0 Transform { translation 116 -252 410 children Node2 { } } # 46 Transform { translation 17 -179 161 children Node2 { } } # 23 Transform { translation 67 -177 99 children Node2 { } } # 13 Transform { translation -33 -124 732 children Node2 { } } # 96 Transform { translation 265 -291 153 children Node2 { } } # 6 Transform { translation -67 -119 636 children Node2 { } } # 85 Transform { translation 114 -165 50 children Node2 { } } # 3 Transform { translation 149 -272 344 children Node2 { } } # 36 Transform { translation -140 -50 655 children Node2 { } } # 94 Transform { translation 431 -359 265 children Node2 { } } # 9 Transform { translation -180 -21 280 children Node2 { } } # 51 Transform { translation 181 -273 448 children Node2 { } } # 47 Transform { translation 280 -313 422 children Node2 { } } # 38 Transform { translation 383 -344 229 children Node2 { } } # 8 Transform { translation 92 -170 803 children Node2 { } } # 98 Transform { translation 161 -213 82 children Node2 { } } # 4 Transform { translation 30 -208 265 children Node2 { } } # 34 Transform { translation 213 -295 383 children Node2 { } } # 37 Transform { translation -57 -147 292 children Node2 { } } # 43 Transform { translation 211 -255 117 children Node2 { } } # 5