26:
220:
179:
122:
240:
298:
231:
339:
97:
25:
332:
266:
256:
363:
282:
33:
368:
325:
261:
78:
168:
171:
the order-8 vertices. This creates 6 regular octagon faces, and leaves 24 mirror-symmetric pentagons.
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
Text is available under the Creative Commons Attribution-ShareAlike License. Additional terms may apply.