Knowledge (XXG)

175: 362: 197: 299: 353: 310: 29: 288: 323: 780: 466: 821: 459: 566: 150: 452: 684: 669: 654: 571: 117: 94: 89: 84: 699: 674: 659: 694: 689: 99: 649: 143: 483: 814: 679: 616: 606: 546: 536: 506: 496: 303: 277: 218: 611: 561: 840: 744: 734: 631: 626: 845: 749: 739: 378: 163: 131: 807: 759: 754: 541: 556: 551: 292: 273: 39: 664: 174: 46: 184: 591: 249: 230: 601: 596: 531: 501: 136: 425: 361: 298: 719: 511: 422: 352: 327: 309: 265: 196: 28: 791: 729: 724: 269: 475: 76: 287: 583: 245: 107: 834: 238: 234: 399: 331: 322: 261: 439: 787: 430: 444: 226: 206: 779: 194: 448: 795: 276:(having the triangular faces in common), and with the 347: 282: 18: 708: 640: 580: 520: 482: 815: 460: 8: 822: 808: 467: 453: 445: 280:(having the decagrammic faces in common). 201:3D model of a great icosihemidodecahedron 252:faces passing through the model center. 390: 567:nonconvex great rhombicosidodecahedron 7: 776: 774: 233:), 60 edges, and 30 vertices. Its 794:. You can help Knowledge (XXG) by 14: 685:great stellapentakis dodecahedron 670:medial pentagonal hexecontahedron 655:small stellapentakis dodecahedron 572:great truncated icosidodecahedron 400:"71: great icosihemidodecahedron" 778: 700:great pentagonal hexecontahedron 675:medial disdyakis triacontahedron 660:medial deltoidal hexecontahedron 360: 351: 321: 308: 297: 286: 173: 97: 92: 87: 82: 27: 695:great disdyakis triacontahedron 690:great deltoidal hexecontahedron 650:medial rhombic triacontahedron 1: 680:great rhombic triacontahedron 426:"Great icosihemidodecahedron" 617:great dodecahemidodecahedron 607:small dodecahemidodecahedron 547:truncated dodecadodecahedron 537:truncated great dodecahedron 507:great stellated dodecahedron 497:small stellated dodecahedron 359: 350: 320: 307: 304:Great dodecahemidodecahedron 296: 285: 278:great dodecahemidodecahedron 219:nonconvex uniform polyhedron 22:Great icosihemidodecahedron 622:great icosihemidodecahedron 612:small icosihemidodecahedron 562:truncated great icosahedron 440:Uniform polyhedra and duals 315:Great icosihemidodecahedron 215:great icosahemidodecahedron 211:great icosihemidodecahedron 862: 773: 745:great dodecahemidodecacron 735:small dodecahemidodecacron 632:small dodecahemicosahedron 627:great dodecahemicosahedron 750:great icosihemidodecacron 740:small icosihemidodecacron 379:List of uniform polyhedra 164:Great icosihemidodecacron 26: 21: 760:small dodecahemicosacron 755:great dodecahemicosacron 542:rhombidodecadodecahedron 476:Star-polyhedra navigator 16:Polyhedron with 26 faces 557:great icosidodecahedron 552:snub dodecadodecahedron 293:Great icosidodecahedron 274:great icosidodecahedron 40:Uniform star polyhedron 790:-related article is a 711:uniform polyhedra with 665:small rhombidodecacron 225:. It has 26 faces (20 202: 268:. It also shares its 239:crossed quadrilateral 200: 713:infinite stellations 521:Uniform truncations 357:Traditional filling 63:= 30 (χ = −4) 641:Duals of nonconvex 592:tetrahemihexahedron 709:Duals of nonconvex 602:octahemioctahedron 597:cubohemioctahedron 581:Nonconvex uniform 532:dodecadodecahedron 523:of Kepler-Poinsot 502:great dodecahedron 490:regular polyhedra) 423:Weisstein, Eric W. 203: 841:Uniform polyhedra 803: 802: 768: 767: 720:tetrahemihexacron 643:uniform polyhedra 512:great icosahedron 370: 369: 366:Modulo-2 filling 338: 337: 328:Icosidodecahedron 266:icosidodecahedron 256:Related polyhedra 193: 192: 112:3/2 3 | 5/3 853: 846:Polyhedron stubs 824: 817: 810: 782: 775: 730:octahemioctacron 725:hexahemioctacron 469: 462: 455: 446: 436: 435: 408: 407: 395: 364: 355: 348: 325: 312: 301: 290: 283: 270:edge arrangement 199: 179:3.10/3.3/2.10/3 177: 132:Index references 102: 101: 100: 96: 95: 91: 90: 86: 85: 31: 19: 861: 860: 856: 855: 854: 852: 851: 850: 831: 830: 829: 828: 771: 769: 764: 712: 710: 704: 642: 636: 582: 576: 524: 522: 516: 489: 485: 484:Kepler-Poinsot 478: 473: 421: 420: 417: 412: 411: 398:Maeder, Roman. 397: 396: 392: 387: 375: 365: 356: 345: 343: 326: 313: 302: 291: 258: 224: 195: 178: 160:Dual polyhedron 155: 148: 141: 125: 98: 93: 88: 83: 81: 77:Coxeter diagram 59: 17: 12: 11: 5: 859: 857: 849: 848: 843: 833: 832: 827: 826: 819: 812: 804: 801: 800: 783: 766: 765: 763: 762: 757: 752: 747: 742: 737: 732: 727: 722: 716: 714: 706: 705: 703: 702: 697: 692: 687: 682: 677: 672: 667: 662: 657: 652: 646: 644: 638: 637: 635: 634: 629: 624: 619: 614: 609: 604: 599: 594: 588: 586: 578: 577: 575: 574: 569: 564: 559: 554: 549: 544: 539: 534: 528: 526: 518: 517: 515: 514: 509: 504: 499: 493: 491: 480: 479: 474: 472: 471: 464: 457: 449: 443: 442: 437: 416: 415:External links 413: 410: 409: 389: 388: 386: 383: 382: 381: 374: 371: 368: 367: 358: 342: 339: 336: 335: 318: 317: 306: 295: 257: 254: 246:hemipolyhedron 222: 221:, indexed as U 191: 190: 187: 185:Bowers acronym 181: 180: 171: 167: 166: 161: 157: 156: 153: 146: 139: 134: 128: 127: 123: 120: 118:Symmetry group 114: 113: 110: 108:Wythoff symbol 104: 103: 79: 73: 72: 71:20{3}+6{10/3} 69: 68:Faces by sides 65: 64: 49: 43: 42: 37: 33: 32: 24: 23: 15: 13: 10: 9: 6: 4: 3: 2: 858: 847: 844: 842: 839: 838: 836: 825: 820: 818: 813: 811: 806: 805: 799: 797: 793: 789: 784: 781: 777: 772: 761: 758: 756: 753: 751: 748: 746: 743: 741: 738: 736: 733: 731: 728: 726: 723: 721: 718: 717: 715: 707: 701: 698: 696: 693: 691: 688: 686: 683: 681: 678: 676: 673: 671: 668: 666: 663: 661: 658: 656: 653: 651: 648: 647: 645: 639: 633: 630: 628: 625: 623: 620: 618: 615: 613: 610: 608: 605: 603: 600: 598: 595: 593: 590: 589: 587: 585: 584:hemipolyhedra 579: 573: 570: 568: 565: 563: 560: 558: 555: 553: 550: 548: 545: 543: 540: 538: 535: 533: 530: 529: 527: 519: 513: 510: 508: 505: 503: 500: 498: 495: 494: 492: 487: 481: 477: 470: 465: 463: 458: 456: 451: 450: 447: 441: 438: 433: 432: 427: 424: 419: 418: 414: 405: 401: 394: 391: 384: 380: 377: 376: 372: 363: 354: 349: 346: 340: 333: 329: 324: 319: 316: 311: 305: 300: 294: 289: 284: 281: 279: 275: 271: 267: 263: 255: 253: 251: 247: 242: 240: 236: 235:vertex figure 232: 228: 220: 216: 212: 208: 198: 188: 186: 183: 182: 176: 172: 170:Vertex figure 169: 168: 165: 162: 159: 158: 152: 145: 138: 135: 133: 130: 129: 121: 119: 116: 115: 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: 796:expanding it 785: 770: 621: 429: 403: 393: 344: 314: 259: 243: 214: 210: 204: 60: 55: 51: 488:(nonconvex 404:MathConsult 332:convex hull 262:convex hull 250:decagrammic 835:Categories 788:polyhedron 385:References 525:polyhedra 486:polyhedra 431:MathWorld 272:with the 231:decagrams 227:triangles 126:, , *532 373:See also 244:It is a 207:geometry 47:Elements 341:Gallery 264:is the 248:with 6 217:) is a 189:Geihid 229:and 6 209:, the 54:= 26, 786:This 237:is a 792:stub 260:Its 213:(or 58:= 60 36:Type 205:In 154:106 837:: 428:. 402:. 334:) 241:. 223:71 149:, 147:85 142:, 140:71 823:e 816:t 809:v 798:. 468:e 461:t 454:v 434:. 406:. 330:( 151:W 144:C 137:U 124:h 122:I 61:V 56:E 52:F