Multiple Compatibility for Polyhexes
Introduction
A set of polyforms is compatible
if there exists a figure that each of them can tile.
Here are minimal figures that can be tiled by a given number of
n-hexes.
If you find a smaller solution or one that can be tiled by more
n-hexes, please write.
For polyominoes see Multiple Compatibility
for Polyominoes.
For polyiamonds see Multiple Compatibility
for Polyiamonds.
Trihexes
3 Trihexes
Tetrahexes
4 Tetrahexes
6 Tetrahexes
Pentahexes
5 Pentahexes
7 Pentahexes
5A, 5D, 5H, 5J, 5P, 5Q, 5X
Solutions Using Other Pentahexes
5E, 5K, 5R, 5Y
5I, 5L, 5N
5C, 5V
8 Pentahexes
5E, 5F, 5H, 5K, 5P, 5Q, 5W, 5X
Solutions Using Other Pentahexes
5A, 5D, 5L, 5R, 5T, 5Y
5N, 5Z
5C, 5V
5J, 5S, 5U
See below.
10 Pentahexes
5D, 5J, 5K, 5N, 5P, 5Q, 5S, 5U, 5Y, 5Z
Solutions Using Other Pentahexes
5A, 5F, 5H, 5R
5A, 5E, 5H, 5L, 5X
5I, 5V
11 Pentahexes
5D, 5E, 5F, 5H, 5K, 5N, 5P, 5Q, 5W, 5X, 5Z
Solutions Using Other Pentahexes
5J, 5L, 5S, 5U, 5Y, 5Z
12 Pentahexes
13 Pentahexes
Hexahexes
10 Hexahexes
15 Hexahexes
20 Hexahexes
24 Hexahexes
Last revised 2013-11-25.
Back to Multiple Compatibility
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Polyform Curiosities
Col. George Sicherman
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