Knowledge

26: 220: 179: 122: 240: 298: 231: 339: 97: 25: 332: 266: 256: 363: 282: 33: 368: 325: 261: 78: 168: 171: 85: 278: 148: 358: 183: 164: 139: 209: 219: 113: 309: 224: 205: 352: 178: 121: 305: 239: 144: 52: 230: 297: 152: 47: 313: 15: 143:, is a convex polyhedron with 30 faces: 8 sets of 3 333: 8: 18: 340: 326: 214: 173: 23: 7: 294: 292: 198:order-8 truncated triakis octahedron 279:George Hart's Polyhedron generator 14: 296: 238: 229: 218: 177: 120: 24: 109: 96: 84: 74: 66: 58: 42: 32: 1: 267:Truncated triakis icosahedron 257:Truncated triakis tetrahedron 19:Truncated triakis octahedron 312:. You can help Knowledge by 216: 134:truncated triakis octahedron 385: 291: 283:Conway polyhedron notation 163:It is constructed from a 119: 212:augmented to the faces. 262:Truncated tetrakis cube 235:Octakis truncated cube 136:, or more precisely an 308:-related article is a 204:. It can be seen as a 202:octakis truncated cube 192:Octakis truncated cube 79:Octakis truncated cube 151:arrangement, with 6 86:Vertex configuration 210:octagonal pyramids 184:Triakis octahedron 165:triakis octahedron 159:Triakis octahedron 140:triakis octahedron 138:order-8 truncated 364:Truncated tilings 321: 320: 248: 247: 189: 188: 130: 129: 376: 369:Polyhedron stubs 342: 335: 328: 300: 293: 242: 233: 222: 215: 196:The dual of the 181: 174: 124: 28: 16: 384: 383: 379: 378: 377: 375: 374: 373: 349: 348: 347: 346: 289: 275: 253: 243: 234: 223: 194: 182: 161: 147:arranged in an 125: 105: 91: 50: 34:Conway notation 12: 11: 5: 382: 380: 372: 371: 366: 361: 351: 350: 345: 344: 337: 330: 322: 319: 318: 301: 287: 286: 274: 273:External links 271: 270: 269: 264: 259: 252: 249: 246: 245: 236: 227: 225:Truncated cube 206:truncated cube 193: 190: 187: 186: 160: 157: 128: 127: 117: 116: 111: 107: 106: 103: 100: 98:Symmetry group 94: 93: 88: 82: 81: 76: 72: 71: 68: 64: 63: 60: 56: 55: 44: 40: 39: 36: 30: 29: 21: 20: 13: 10: 9: 6: 4: 3: 2: 381: 370: 367: 365: 362: 360: 357: 356: 354: 343: 338: 336: 331: 329: 324: 323: 317: 315: 311: 307: 302: 299: 295: 290: 284: 280: 277: 276: 272: 268: 265: 263: 260: 258: 255: 254: 250: 241: 237: 232: 228: 226: 221: 217: 213: 211: 207: 203: 199: 191: 185: 180: 176: 175: 172: 170: 166: 158: 156: 155:in the gaps. 154: 150: 146: 142: 141: 135: 123: 118: 115: 112: 108: 101: 99: 95: 89: 87: 83: 80: 77: 73: 69: 65: 61: 57: 54: 49: 45: 41: 38:t8kO = dk8tC 37: 35: 31: 27: 22: 17: 314:expanding it 303: 288: 201: 200:is called a 197: 195: 162: 137: 133: 131: 92:48 (5.5.8) 353:Categories 306:polyhedron 281:- "t8kO" ( 169:truncating 149:octahedral 110:Properties 359:Polyhedra 145:pentagons 90:8 (5.5.5) 53:pentagons 251:See also 153:octagons 67:Vertices 48:octagons 114:convex 304:This 208:with 59:Edges 43:Faces 310:stub 244:Net 132:The 126:Net 75:Dual 167:by 70:56 62:84 51:24 355:: 46:6 341:e 334:t 327:v 316:. 285:) 104:h 102:O