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- ...w.math.nus.edu.sg/aslaksen/papers/Demiregular.pdf In Search of Demiregular Tilings] #1</ref><ref>Chavey (1989)</ref> ...exists in this 2-uniform tiling. There are 2 [[#Related tilings|3-uniform tilings]] that contain both of these vertex figures among one more. ...6 KB (884 words) - 17:49, 7 November 2024
- ...at [[Giza]]. A sphinx can be [[dissection (geometry)|dissected]] into any square number of copies of itself,<ref>{{citation ==General tilings== ...3 KB (433 words) - 06:31, 28 August 2024
- ...[[plane (mathematics)|plane]] made of two equal-sized [[square (geometry)|square]]s connected edge-to-edge.<ref>{{cite book |last=Golomb |first=Solomon W. | ...s can tile the plane in a countably infinite number of ways. The number of tilings of a 2×''n'' rectangle with dominoes is <math>F_n</math>, the ''n''th [[Fib ...4 KB (501 words) - 23:59, 20 January 2025
- ...satisfy |''x''| + |''y''| ≤ ''n''. Here ''n'' is a fixed integer, and the square lattice consists of unit squares with the origin as a vertex of 4 of them, [[File:Diamant azteque plein.svg|thumb|One of 1024 possible domino tilings of an order 4 Aztec diamond]] ...11 KB (1,770 words) - 20:36, 24 December 2022
- * [[Truncated square tiling]] ...loid Tetracombs'', Manuscript (2006) ''(Complete list of 11 convex uniform tilings, 28 convex uniform honeycombs, and 143 convex uniform tetracombs)'' ...3 KB (355 words) - 03:29, 1 March 2024
- {{See also|Order-3 square tiling honeycomb}} !bgcolor=#e7dcc3 colspan=2|Order-4 square tiling honeycomb ...20 KB (2,773 words) - 16:01, 8 December 2024
- |bgcolor=#e7dcc3|[[Vertex figure]]||irr. [[square pyramid pyramid]] ...loid Tetracombs'', Manuscript (2006) ''(Complete list of 11 convex uniform tilings, 28 convex uniform honeycombs, and 143 convex uniform tetracombs)'' ...3 KB (389 words) - 20:24, 31 December 2020
- ...o Grünbaum |first1=B. |last1=Grünbaum |first2=G. C. |last2=Shephard |title=Tilings and Patterns |publisher=Freeman |location=New York |year=1986 |isbn=0-7167- The Ammann–Beenker tilings have many properties similar to the more famous [[Penrose tiling]]s: ...12 KB (1,801 words) - 18:34, 3 January 2025
- |bgcolor=#e7dcc3|[[Vertex figure]]||Square double pyramid ...loid Tetracombs'', Manuscript (2006) ''(Complete list of 11 convex uniform tilings, 28 convex uniform honeycombs, and 143 convex uniform tetracombs)'' ...3 KB (410 words) - 01:50, 17 January 2025
- ...ex figure]]||[[File:Bitruncated tesseractic honeycomb verf.png|80px]]<BR>[[Square-pyramidal pyramid]] ...loid Tetracombs'', Manuscript (2006) ''(Complete list of 11 convex uniform tilings, 28 convex uniform honeycombs, and 143 convex uniform tetracombs)'' ...4 KB (487 words) - 01:52, 17 January 2025
- |bgcolor=#e7dcc3|Face type||[[Square (geometry)|Square]]<BR>[[Triangle]] ...loid Tetracombs'', Manuscript (2006) ''(Complete list of 11 convex uniform tilings, 28 convex uniform honeycombs, and 143 convex uniform tetracombs)'' Model 9 ...6 KB (784 words) - 19:38, 26 December 2017
- {{See also|Order-4 square tiling honeycomb}} !bgcolor=#e7dcc3 colspan=2|Square tiling honeycomb ...26 KB (3,482 words) - 20:50, 16 January 2025
- ...ode|6|node_g|3sg|node_g}}, which alternates 3 types (colors) of triangular tilings around every edge. In [[Coxeter notation]], the removal of the 3rd and 4th == Related Tilings == ...18 KB (2,379 words) - 03:03, 10 January 2025
- ...d six not usable planigon triangles which cannot take part in dual uniform tilings; all to scale.]] ...st of Euclidean uniform tilings|semiregular]] planigons; and 4 [[Euclidean tilings by convex regular polygons|demiregular]] planigons which can tile the plane ...31 KB (4,441 words) - 08:29, 24 September 2024
- ...of this honeycomb is a triangular tiling. Thus, infinitely many hexagonal tilings meet at each vertex of this honeycomb.<ref>Coxeter ''The Beauty of Geometry == Related tilings == ...24 KB (3,253 words) - 10:02, 4 September 2024
- |bgcolor=#e7dcc3|[[Edge figure]]||[[square (geometry)|square]] {4} ...vertex figure]] of this honeycomb is an octahedron. Thus, eight hexagonal tilings meet at each vertex of this honeycomb, and the six edges meeting at each ve ...27 KB (3,638 words) - 20:49, 16 January 2025
- ...[vertex figure]] of this honeycomb is a tetrahedron. Thus, four hexagonal tilings meet at each vertex of this honeycomb, six hexagons meet at each vertex, an ...splitcross|branch_11}}, representing different types (colors) of hexagonal tilings in the [[Wythoff construction]]. ...21 KB (2,783 words) - 10:49, 9 January 2025
- |bgcolor=#e7dcc3|Face type||[[Triangle|{3}]]<BR>[[Square|{4}]] |bgcolor=#e7dcc3|[[Edge figure]]||[[File:Square pyramid.png|40px]]<BR>[[Square pyramid]] ...4 KB (595 words) - 01:51, 17 January 2025
- ...splitcross|branch_hh}}, representing different types (colors) of hexagonal tilings in the [[Wythoff construction]]. |bgcolor=#e7dcc3|Faces||[[triangle]] {3}<BR>[[square]] {4}<BR>[[hexagon]] {6} ...10 KB (1,293 words) - 19:45, 8 January 2025
- [[File:Distance countours in a square grid.svg|thumb|A square grid, shaded by distance from the central blue point. The number of grid po ...h> steps away from the origin. Therefore, the coordination sequence of the square grid is the sequence ...5 KB (641 words) - 15:04, 3 March 2024