Acronym ..., 5Y4-4T-6P3-sq-para
Name para-staggered shear-elongated 10Y4-8T-0
 
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Confer
uniform relative:
octet  
related CRF honeycombs:
pextoh   10Y4-8T-0   5Y4-4T-4P4   5Y4-4T-6P3-sq-skew  
general polytopal classes:
scaliform  
External
links
mcneill

This scaliform honeycomb is derived from 10Y4-8T-0 by squeezing in shearing layers of trips (considered as wedges or digonal cupola, pointing up resp. down). Those layers furthermore are to be used with skew axes. (Using parallel axes this same construction would result in 5Y4-4T-6P3-sq-skew instead.)

(Because J. McNeill uses here gyro, to what in the original usage by N. Johnson would be ortho (and vice versa), I desided to avoid that naming conflict by using a corresponding english attribute instead.)


Incidence matrix

(N → ∞)

N |  4 2 2 2 |  6  6 3 4 4 | 4 5 6
--+----------+-------------+------
2 | 2N * * * |  2  2 0 0 0 | 2 2 0  pyr. lacings
2 |  * N * * |  0  0 2 2 0 | 0 0 4  wedge lacings
2 |  * * N * |  2  0 0 2 2 | 1 2 3  parallels
2 |  * * * N |  0  2 1 0 2 | 1 2 2  orthogonals
--+----------+-------------+------
3 |  2 0 1 0 | 2N  * * * * | 1 1 0  obl. triangles
3 |  2 0 0 1 |  * 2N * * * | 1 1 0  obl. triangles
3 |  0 2 0 1 |  *  * N * * | 0 0 2  upr. triangles
4 |  0 2 2 0 |  *  * * N * | 0 0 2  wedge latterals
4 |  0 0 2 2 |  *  * * * N | 0 1 1  square grid
--+----------+-------------+------
4 |  4 0 1 1 |  2  2 0 0 0 | N * *  tet
5 |  4 0 2 2 |  2  2 0 0 1 | * N *  squippy
6 |  0 4 3 2 |  0  0 2 2 1 | * * N  trip

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