Acronym qrothat
Name quasirhombitrihexagonal tiling
 
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Vertex figure [3/2,4,6/5,4]
External
links
mcneill

As abstract polytope qrothat is isomorphic to rothat, 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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