Symmetry *n32 [1+,2n,3] = [(n,3,3)] |
Spherical | Euclidean | Compact Hyperbolic | Paracompact | ||
---|---|---|---|---|---|---|
*233 [1+,4,3] = [3,3] |
*333 [1+,6,3] = [(3,3,3)] |
*433 [1+,8,3] = [(4,3,3)] |
*533 [1+,10,3] = [(5,3,3)] |
*633... [1+,12,3] = [(6,3,3)] |
*∞33 [1+,∞,3] = [(∞,3,3)] | |
Coxeter Schläfli |
= h2{4,3} |
= h2{6,3} |
= h2{8,3} |
= h2{10,3} |
= h2{12,3} |
= h2{∞,3} |
Cantic figure |
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Vertex | 3.6.2.6 | 3.6.3.6 | 3.6.4.6 | 3.6.5.6 | 3.6.6.6 | 3.6.∞.6 |
Domain |
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Wythoff | 2 3 | 3 | 3 3 | 3 | 4 3 | 3 | 5 3 | 3 | 6 3 | 3 | ∞ 3 | 3 |
Dual figure |
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Face | V3.6.2.6 | V3.6.3.6 | V3.6.4.6 | V3.6.5.6 | V3.6.6.6 | V3.6.∞.6 |
Tables:
Symmetry *n32 [1+,2n,3] = [(n,3,3)] |
Spherical | Euclidean | Compact Hyperbolic | Paracompact | ||
---|---|---|---|---|---|---|
*233 [1+,4,3] = [3,3] |
*333 [1+,6,3] = [(3,3,3)] |
*433 [1+,8,3] = [(4,3,3)] |
*533 [1+,10,3] = [(5,3,3)] |
*633... [1+,12,3] = [(6,3,3)] |
*∞33 [1+,∞,3] = [(∞,3,3)] | |
Coxeter Schläfli |
= h2{4,3} |
= h2{6,3} |
= h2{8,3} |
= h2{10,3} |
= h2{12,3} |
= h2{∞,3} |
Cantic figure |
||||||
Vertex | 3.6.2.6 | 3.6.3.6 | 3.6.4.6 | 3.6.5.6 | 3.6.6.6 | 3.6.∞.6 |
Domain |
||||||
Wythoff | 2 3 | 3 | 3 3 | 3 | 4 3 | 3 | 5 3 | 3 | 6 3 | 3 | ∞ 3 | 3 |
Dual figure |
||||||
Face | V3.6.2.6 | V3.6.3.6 | V3.6.4.6 | V3.6.5.6 | V3.6.6.6 | V3.6.∞.6 |
Tables: