Triangular Dominoes

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Triangular Dominoes is a variant of dominoes using equilateral triangle tiles, patented by Franklin H. Richards in 1885. Two versions were made: a starter set of 35 unique tiles, with each side numbered from zero to four pips, and an advanced set of 56 unique tiles, with each side numbered from zero to five pips. In both versions, a wild card "boss" tile was included, making 36 and 57 tiles in each complete set, respectively.

Equipment

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In his patent, Richards used a three-digit notation, referring to the pips in clockwise order from the side(s) with the lowest value. Richards illustrated the tiles as two unique sets, with pip values subject to the following restrictions:[1]

  • Pip counts may be repeated
  • Starting from the side with the lowest value and proceeding clockwise, the number of pips on a side is equal to or greater than the prior side

In addition to this marking scheme, Richards added the sum of all pips to the center of the tile.[1]

Richards Triangular Domino sets
Triples Doubles Singles
File:TriDominoes Richards 000.svg File:TriDominoes Richards 001.svg File:TriDominoes Richards 002.svg File:TriDominoes Richards 003.svg File:TriDominoes Richards 004.svg File:TriDominoes Richards 005.svg
000 001 002 003 004 005
File:TriDominoes Richards 111.svg File:TriDominoes Richards 011.svg File:TriDominoes Richards 112.svg File:TriDominoes Richards 113.svg File:TriDominoes Richards 114.svg File:TriDominoes Richards 115.svg   File:TriDominoes Richards 021.svg File:TriDominoes Richards 031.svg File:TriDominoes Richards 041.svg File:TriDominoes Richards 051.svg  
111 011 112 113 114 115 012 013 014 015
File:TriDominoes Richards 222.svg File:TriDominoes Richards 022.svg File:TriDominoes Richards 122.svg File:TriDominoes Richards 223.svg File:TriDominoes Richards 224.svg File:TriDominoes Richards 225.svg File:TriDominoes Richards 032.svg File:TriDominoes Richards 042.svg File:TriDominoes Richards 052.svg File:TriDominoes Richards 132.svg File:TriDominoes Richards 142.svg File:TriDominoes Richards 152.svg
222 022 122 223 224 225 023 024 025 123 124 125
File:TriDominoes Richards 333.svg File:TriDominoes Richards 033.svg File:TriDominoes Richards 133.svg File:TriDominoes Richards 233.svg File:TriDominoes Richards 334.svg File:TriDominoes Richards 335.svg File:TriDominoes Richards 043.svg File:TriDominoes Richards 053.svg File:TriDominoes Richards 143.svg File:TriDominoes Richards 153.svg File:TriDominoes Richards 243.svg File:TriDominoes Richards 253.svg
333 033 133 233 334 335 034 035 134 135 234 235
File:TriDominoes Richards 444.svg File:TriDominoes Richards 044.svg File:TriDominoes Richards 144.svg File:TriDominoes Richards 244.svg File:TriDominoes Richards 344.svg File:TriDominoes Richards 445.svg   File:TriDominoes Richards 054.svg File:TriDominoes Richards 154.svg File:TriDominoes Richards 254.svg File:TriDominoes Richards 354.svg  
444 044 144 244 344 445 045 145 245 345
File:TriDominoes Richards 555.svg File:TriDominoes Richards 055.svg File:TriDominoes Richards 155.svg File:TriDominoes Richards 255.svg File:TriDominoes Richards 355.svg File:TriDominoes Richards 455.svg
555 055 155 255 355 455

Percy Alexander MacMahon showed there were 24 possible combinations when each of the three edges of an equilateral triangle are assigned one of four values, and showed the number of unique pieces that can be made in this way is n3(n2+2) for n unique values.[2]: 2  For n=5, there are 45 unique combinations possible, and for n=6, there are 76 unique combinations; the reduced set of 35 and 56 in Triangular Dominoes, for 0–4 and 0–5 pips, respectively, result from the additional restriction for increasing values around each side of the tiles when counting clockwise. This can be demonstrated by examination of the "singles" tiles: where 012 is a valid sequence in Triangular Dominoes, 021 is not, and so the mirror image of each "singles" pattern is excluded; there are ten excluded patterns for the set of 0–4 pips and twenty for the set of 0–5 pips. By examination, mirror images of the triples and doubles are identical to the original tiles and so these patterns already adhere to the counting-up restriction.

These restrictions and resulting tile set of Triangular Dominoes were retained, with markings moved to the corners using Arabic numerals for Triominoes, which was published in 1965.

Gameplay

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File:TriDominoes Richards boss.svg
"Boss" wild card tile

Richards proposed several games that could be played in the patent.[1]

Points

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For this variant, the "boss" tile may be included or left out. The tiles are distributed evenly between the players. Play is led by the player holding the highest triple tile. Each player takes a turn, placing one tile on the table; each tile must be added next to the tile that was placed in the preceding turn, matching the number of pips on adjacent sides. Once one player exhausts their hand, the game is over and the winner's score is determined by the sum of the pips on the tiles remaining in their opponents' hands.[1]

Muggins

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This variant is similar to "points", except the matching criterion is the sum of pips on adjacent sides must be a multiple of five.[1]

This variant allows players to lay tiles side-to-side or corner-to-corner. Corner-to-corner plays are allowed when the player is able to match the number on both sides of the corner. If a corner-to-corner match is created, that player can take another turn. Scoring in this variant is accomplished when the sum of all the pips on both dominoes (whether matched side-to-side or corner-to-corner) is a multiple of five;[1] for example, if the 233 and 334 tiles are laid next to each other, the total sum is (2+3+3)+(3+3+4)=18, not divisible by five and hence no score is awarded. Alternatively, if the 233 and 133 tiles are laid next to each other, the total sum is 15, divisible by five, and the player is awarded 15 points.

When the "boss" tile is played, the tile is assumed to have enough pips to bring the sum of it and adjacent tile(s) to a multiple of five. Subsequent tiles played next to the "boss" tile assume the value is zero.[1]

References

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  1. ^ a b c d e f g US 331652A, Franklin H. Richards, "Domino", published Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value). 
  2. ^ Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value).
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