Hexiamond Pair Full Oddities
A polyiamond oddity
is a symmetrical figure formed by an odd number of copies of
a polyiamond.
Symmetrical figures can also be formed with copies of two
different polyiamonds.
Here are the smallest known full-symmetry oddities
for the 66 pairs of hexiamonds.
See also
Johann Schwenke and Carl Schwenke provided many new and improved solutions.
6AE 21 | 6AF 15 | 6AH 15 | 6AI 9 | 6AL 9 | 6AO 19 |
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6AP 19 | 6AS 21 | 6AU 15 | 6AV 15 | 6AX 81 | 6EF 15 |
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| 6EH 9 | 6EI 17 | 6EL 9 | 6EO 25 | 6EP 23 | 6ES 17 |
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| 6EU 9 | 6EV 9 | 6EX — | 6FH 9 | 6FI 9 | 6FL 9 |
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| 6FO 7 | 6FP • | 6FS 21 | 6FU 7 | 6FV 15 | 6FX 15 |
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| 6HI 21 | 6HL 9 | 6HO 7 | 6HP 9 | 6HS 9 | 6HU 9 |
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| 6HV 7 | 6HX 15 | 6IL 9 | 6IO 15 | 6IP 9 | 6IS 21 |
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| 6IU 15 | 6IV 9 | 6IX 15 | 6LO 7 | 6LP 9 | 6LS 7 |
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| 6LU 9 | 6LV 9 | 6LX 9 | 6OP 7 | 6OS 7 | 6OU 7 |
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| 6OV 7 | 6OX 19 | 6PS 9 | 6PU 9 | 6PV 9 | 6PX 9 |
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| 6SU 9 | 6SV 9 | 6SX 33 | 6UV 7 | 6UX 9 | 6VX 9 |
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Solutions shown above that are holeless are not shown here.
11 Tiles
15 Tiles
17 Tiles
19 Tiles
21 Tiles
23 Tiles
25 Tiles
27 Tiles
33 Tiles
37 Tiles
55 Tiles
63 Tiles
Last revised 2024-06-24.
Back to Polyiamond and Polyming Oddities
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Polyform Oddities
<
Polyform Curiosities
Col. George Sicherman
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