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2. Hexagonal tiling - Wikipedia

   en.wikipedia.org/wiki/Hexagonal_tiling

   Hexagonal tiling. In geometry, the hexagonal tiling or hexagonal tessellation is a regular tiling of the Euclidean plane, in which exactly three hexagons meet at each vertex. It has Schläfli symbol of {6,3} or t{3,6} (as a truncated triangular tiling). English mathematician John Conway called it a hextille.

3. Penrose tiling - Wikipedia

   en.wikipedia.org/wiki/Penrose_tiling

   Penrose tiling. A Penrose tiling is an example of an aperiodic tiling. Here, a tiling is a covering of the plane by non-overlapping polygons or other shapes, and a tiling is aperiodic if it does not contain arbitrarily large periodic regions or patches. However, despite their lack of translational symmetry, Penrose tilings may have both ...

4. List of aperiodic sets of tiles - Wikipedia

   en.wikipedia.org/.../List_of_aperiodic_sets_of_tiles

   Dual to Ammann A2. Tilings MLD from the tilings by the Shield tiles. Tilings MLD from the tilings by the Socolar tiles. Tiling is MLD to Penrose P1, P2, P3, and Robinson triangles. Tiling is MLD to Penrose P1, P2, P3, and "Starfish, ivy leaf, hex". Date is for publication of matching rules.

5. Cairo pentagonal tiling - Wikipedia

   en.wikipedia.org/wiki/Cairo_pentagonal_tiling

   Properties. face-transitive. In geometry, a Cairo pentagonal tiling is a tessellation of the Euclidean plane by congruent convex pentagons, formed by overlaying two tessellations of the plane by hexagons and named for its use as a paving design in Cairo. It is also called MacMahon's net[1] after Percy Alexander MacMahon, who depicted it in his ...

6. Rhombille tiling - Wikipedia

   en.wikipedia.org/wiki/Rhombille_tiling

   Properties. edge-transitive, face-transitive. In geometry, the rhombille tiling, [ 1 ] also known as tumbling blocks, [ 2 ]reversible cubes, or the dice lattice, is a tessellation of identical 60° rhombi on the Euclidean plane. Each rhombus has two 60° and two 120° angles; rhombi with this shape are sometimes also called diamonds.

7. Euclidean tilings by convex regular polygons - Wikipedia

   en.wikipedia.org/wiki/Euclidean_tilings_by...

   Euclidean tilings by convex regular polygons. A regular tiling has one type of regular face. A semiregular or uniform tiling has one type of vertex, but two or more types of faces. A k -uniform tiling has k types of vertices, and two or more types of regular faces. A non-edge-to-edge tiling can have different-sized regular faces.