Acronym | qrothat |
Name | quasirhombitrihexagonal tiling |
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Vertex figure | [3/2,4,6/5,4] |
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As abstract polytope qrothat is isomorphic to srothat, therby making both the triangles and the hexagons prograde again.
Incidence matrix according to Dynkin symbol
x3/2o6x (N → ∞) . . . | 6N | 2 2 | 1 2 1 --------+----+-------+-------- x . . | 2 | 6N * | 1 1 0 . . x | 2 | * 6N | 0 1 1 --------+----+-------+-------- x3/2o . | 3 | 3 0 | 2N * * x . x | 4 | 2 2 | * 3N * . o6x | 6 | 0 6 | * * N
x3o6/5x (N → ∞) . . . | 6N | 2 2 | 1 2 1 --------+----+-------+-------- x . . | 2 | 6N * | 1 1 0 . . x | 2 | * 6N | 0 1 1 --------+----+-------+-------- x3o . | 3 | 3 0 | 2N * * x . x | 4 | 2 2 | * 3N * . o6/5x | 6 | 0 6 | * * N
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