Acronym	..., 10Y4-8T-1-alt
Name	alternating staggered 1×60°-gyrated 10Y4-8T-0
	©
Pattern (fundamental domain)	u Vertices: /|\ u = vertices within lower trat plane / c \ o = vertices within upper trat plane a _o_ b /_d/T\e_\ Edges: u--/-a-\--u a = {4}-inc. trat-edges |\a Y b/| b = not {4}-inc. trat-edges c/b Y a\c c = {4}-inc. lace-edges o-_--a--_-o d,e = not {4}-inc. lace-edges \ e\T/d / b u a Triangles: \ | / N = betw. T and Y4 \c/ Y = betw. Y4 and Y4 o T = betw. T and T
Confer	related CRF honeycombs: 10Y4-8T-0   10Y4-8T-1-hel (r/l)   10Y4-8T-2-alt   10Y4-8T-2-hel (r/l)   10Y4-8T-3   5Y4-4T-6P3-tri-1-alt   general polytopal classes: scaliform
External links

This scaliform honeycomb is derived from 5Y4-4T-6P3-tri-1-alt by withdrawing the elongating layers of trips.

Further it occurs as gyration at one set of parallel trat sections of 10Y4-8T-0 in steps of 1×60° using the 2-periodic alternating staggering mode.

Incidence matrix

(N→∞)

N |  4 2 2 2 2 | 3 3  6  6  6 4 |  8 10
--+------------+----------------+------
2 | 2N * * * * | 1 1  1  0  1 1 |  2  3  a
2 |  * N * * * | 1 1  0  2  0 0 |  2  2  b
2 |  * * N * * | 0 0  2  2  0 2 |  2  4  c
2 |  * * * N * | 0 0  2  0  2 0 |  2  2  d
2 |  * * * * N | 0 0  0  2  2 0 |  2  2  e
--+------------+----------------+------
3 |  2 1 0 0 0 | N *  *  *  * * |  2  0  aab-T
3 |  2 1 0 0 0 | * N  *  *  * * |  0  2  aab-Y
3 |  1 0 1 1 0 | * * 2N  *  * * |  1  1  acd
3 |  0 1 1 0 1 | * *  * 2N  * * |  1  1  bce
3 |  1 0 0 1 1 | * *  *  * 2N * |  1  1  ade
4 |  2 0 2 0 0 | * *  *  *  * N |  0  2  acac
--+------------+----------------+------
4 |  2 1 1 1 1 | 1 0  1  1  1 0 | 2N  *  tet
5 |  3 1 2 1 1 | 0 1  1  1  1 1 |  * 2N  squippy