Knowledge (XXG)

177: 199: 301: 29: 290: 312: 279: 404: 165: 445: 152: 119: 94: 89: 84: 99: 145: 438: 220: 176: 294: 264: 464: 469: 330: 133: 431: 300: 198: 28: 39: 377: 316: 283: 268: 256: 46: 186: 240: 236: 252: 138: 373: 289: 415: 260: 76: 311: 278: 107: 381: 458: 351: 411: 386: 232: 228: 208: 403: 196: 267:(having the triangular and pentagonal faces in common) and the 419: 239:), 120 edges, and 60 vertices. Its vertex figure is an 203: 273: 18: 439: 352:"42: great ditrigonal dodecicosidodecahedron" 166:Great ditrigonal dodecacronic hexecontahedron 8: 446: 432: 271:(having the decagrammic faces in common). 22:Great ditrigonal dodecicosidodecahedron 378:Great ditrigonal dodecicosidodecahedron 342: 306:Great ditrigonal dodecicosidodecahedron 213:great ditrigonal dodecicosidodecahedron 7: 400: 398: 418:. You can help Knowledge (XXG) by 217:great dodekified icosidodecahedron 14: 402: 310: 299: 288: 277: 175: 97: 92: 87: 82: 27: 1: 259:. It additionally shares its 221:nonconvex uniform polyhedron 295:Great icosicosidodecahedron 265:great icosicosidodecahedron 486: 397: 331:List of uniform polyhedra 26: 21: 16:Polyhedron with 44 faces 40:Uniform star polyhedron 414:-related article is a 317:Great dodecicosahedron 284:Truncated dodecahedron 269:great dodecicosahedron 257:truncated dodecahedron 227:. It has 44 faces (20 204: 202: 71:20{3}+12{5}+12{10/3} 63:= 60 (χ = −16) 241:isosceles trapezoid 114:5/4 3/2 | 5/3 382:Uniform polyhedron 374:Weisstein, Eric W. 253:vertex arrangement 205: 465:Uniform polyhedra 427: 426: 322: 321: 247:Related polyhedra 195: 194: 477: 470:Polyhedron stubs 448: 441: 434: 406: 399: 391: 360: 359: 347: 314: 303: 292: 281: 274: 261:edge arrangement 201: 179: 134:Index references 102: 101: 100: 96: 95: 91: 90: 86: 85: 31: 19: 485: 484: 480: 479: 478: 476: 475: 474: 455: 454: 453: 452: 395: 372: 369: 364: 363: 350:Maeder, Roman. 349: 348: 344: 339: 327: 315: 304: 293: 282: 249: 226: 197: 180: 162:Dual polyhedron 157: 150: 143: 127: 113: 98: 93: 88: 83: 81: 77:Coxeter diagram 59: 17: 12: 11: 5: 483: 481: 473: 472: 467: 457: 456: 451: 450: 443: 436: 428: 425: 424: 407: 393: 392: 368: 367:External links 365: 362: 361: 341: 340: 338: 335: 334: 333: 326: 323: 320: 319: 308: 297: 286: 251:It shares its 248: 245: 224: 223:, indexed as U 193: 192: 189: 187:Bowers acronym 183: 182: 181:3.10/3.5.10/3 173: 169: 168: 163: 159: 158: 155: 148: 141: 136: 130: 129: 125: 122: 120:Symmetry group 116: 115: 112:3 5 | 5/3 110: 108:Wythoff symbol 104: 103: 79: 73: 72: 69: 68:Faces by sides 65: 64: 49: 43: 42: 37: 33: 32: 24: 23: 15: 13: 10: 9: 6: 4: 3: 2: 482: 471: 468: 466: 463: 462: 460: 449: 444: 442: 437: 435: 430: 429: 423: 421: 417: 413: 408: 405: 401: 396: 389: 388: 383: 379: 375: 371: 370: 366: 357: 353: 346: 343: 336: 332: 329: 328: 324: 318: 313: 309: 307: 302: 298: 296: 291: 287: 285: 280: 276: 275: 272: 270: 266: 262: 258: 254: 246: 244: 242: 238: 234: 230: 222: 218: 214: 210: 200: 190: 188: 185: 184: 178: 174: 172:Vertex figure 171: 170: 167: 164: 161: 160: 154: 147: 140: 137: 135: 132: 131: 123: 121: 118: 117: 111: 109: 106: 105: 80: 78: 75: 74: 70: 67: 66: 62: 57: 53: 50: 48: 45: 44: 41: 38: 35: 34: 30: 25: 20: 420:expanding it 409: 394: 385: 355: 345: 305: 250: 216: 212: 206: 60: 55: 51: 356:MathConsult 459:Categories 412:polyhedron 337:References 191:Gidditdid 387:MathWorld 263:with the 255:with the 237:decagrams 235:, and 12 233:pentagons 229:triangles 128:, , *532 325:See also 209:geometry 47:Elements 219:) is a 384:") at 211:, the 54:= 44, 410:This 231:, 12 58:= 120 416:stub 380:" (" 215:(or 36:Type 376:, " 207:In 461:: 354:. 243:. 225:42 156:81 151:, 149:54 144:, 142:42 447:e 440:t 433:v 422:. 390:. 358:. 153:W 146:C 139:U 126:h 124:I 61:V 56:E 52:F