Tic-tac-toe variants

Many board games share the element of trying to be the first to get n-in-a-row, including Three Men's Morris, Nine Men's Morris, pente, gomoku, Qubic, Connect Four, Quarto, Gobblet, Order and Chaos, Toss Across, and Mojo. Tic-tac-toe is an instance of an m,n,k-game, where two players alternate taking turns on an m×n board until one of them gets k in a row. Harary's generalized tic-tac-toe is an even broader generalization.

Variants of tic-tac-toe can date back several millennia.[1]

Variations of tic-tac-toe include:

Historic

An early variation of tic-tac-toe was played in the Roman Empire, around the first century BC. It was called Terni Lapilli and instead of having any number of pieces, each player only had three, thus they had to move them around to empty spaces to keep playing. The game's grid markings have been found chalked all over Rome.[2] However, according to Claudia Zaslavsky's book Tic Tac Toe: And Other Three-In-A Row Games from Ancient Egypt to the Modern Computer, Tic-tac-toe could be traced back to ancient Egypt.[3][4] Another closely related ancient game is Three Men's Morris which is also played on a simple grid and requires three pieces in a row to finish.[5]

Variants in higher dimensions

3-dimensional tic-tac-toe on a 3×3×3 board. In this game, the first player has an easy win by playing in the centre if 2 people are playing.

One can play on a board of 4x4 squares, winning in several ways. Winning can include: 4 in a straight line, 4 in a diagonal line, 4 in a diamond, or 4 to make a square. Another variant, Qubic, is played on a 4×4×4 board; it was solved by Oren Patashnik in 1980 (the first player can force a win).[6] Higher dimensional variations are also possible.[7]

Misere games

This is an incomplete game of Notakto.

In misère tic-tac-toe, also known as avoidance tic-tac-toe or toe-tac-tic, the player wins if the opponent gets n in a row.[8][9] A 3×3 game is a draw. More generally, the first player can draw or win on any board (of any dimension) whose side length is odd, by playing first in the central cell and then mirroring the opponent's moves.[7]

Notakto is a misere and impartial form of tic tac toe. This means unlike in misere tic tac toe, in Notakto, both players play as the symbol X.[10]

Isomorphic games

There is a game that is isomorphic to tic-tac-toe, but on the surface appears completely different. Two players in turn say a number between one and nine. A particular number may not be repeated. The game is won by the player who has said three numbers whose sum is 15. Plotting these numbers on a 3×3 magic square shows that the game exactly corresponds with tic-tac-toe, since three numbers will be arranged in a straight line if and only if they total 15.

eat bee less e
air bits lip i
soda book lot o

s  


a


b


l


  t

Another isomorphic game uses a list of nine carefully chosen words, for instance "eat", "bee", "less", "air", "bits", "lip", "soda", "book", and "lot". Each player picks one word in turn and to win, a player must select three words with the same letter. The words may be plotted on a tic-tac-toe grid in such a way that a three in a row line wins.[11]

Numerical Tic Tac Toe is a variation invented by the mathematician Ronald Graham.[12] The numbers 1 to 9 are used in this game. The first player plays with the odd numbers, the second player plays with the even numbers. All numbers can be used only once. The player who puts down 15 points in a line wins (sum of 3 numbers).[13] This game can be generalized to a n by n board.[13]

Other variants

In the 1970s, there was a two player game made by Tri-ang Toys & Games called Check Lines, in which the board consisted of eleven holes arranged in a geometrical pattern of twelve straight lines each containing three of the holes. Each player had exactly five tokens and played in turn placing one token in any of the holes. The winner was the first player whose tokens were arranged in two lines of three (which by definition were intersecting lines). If neither player had won by the tenth turn, subsequent turns consisted of moving one of one's own tokens to the remaining empty hole, with the constraint that this move could only be from an adjacent hole.[14]

Quantum tic tac toe allows players to place a quantum superposition of numbers on the board, i.e. the players' moves are "superpositions" of plays in the original classical game. This variation was invented by Allan Goff of Novatia Labs.[15]

For main article see Wild tic-tac-toe.

In "wild" tic-tac-toe, players can choose to place either X or O on each move.[4][16][17][18] It can be played as a normal game where the player who makes three in a row wins or a misere game where they would loose.[4]

For main article see SOS (game)

In the game SOS, the players on each turn choose to play a S or an O in an empty square.[19] If a player creates the sequence, SOS vertically, horizontally or diagonally they get a point and also take another turn.[20] The player with the most points (SOSs) is the winner.[20][19]

References

  1. Epstein, Richard A. (2014-06-28). The Theory of Gambling and Statistical Logic, Revised Edition. Gulf Professional Publishing. ISBN 9780080571843.
  2. "Roman Board Games -- Terni Lapilli". www.aerobiologicalengineering.com. Retrieved 2016-12-03.
  3. Zaslavsky, Claudia (1982). Tic Tac Toe: And Other Three-In-A Row Games from Ancient Egypt to the Modern Computer. Crowell. ISBN 0-690-04316-3.
  4. 1 2 3 Epstein, Richard A. (2012-12-28). The Theory of Gambling and Statistical Logic. Academic Press. ISBN 9780123978707.
  5. Canisius College – Morris Games
  6. Oren Patashnik, Qubic: 4 x 4 x 4 Tic-Tac-Toe, Mathematical Magazine 53 (1980) 202–216.
  7. 1 2 Golomb, Solomon W.; Hales, Alfred W. (2002), "Hypercube tic-tac-toe", More games of no chance (Berkeley, CA, 2000), Math. Sci. Res. Inst. Publ., 42, Cambridge: Cambridge Univ. Press, pp. 167–182, MR 1973012.
  8. Averbach, Bonnie; Chein, Orin (1980), Problem Solving Through Recreational Mathematics, Dover, p. 252, ISBN 9780486131740.
  9. "Tic-tac-toe (Math Lair)". mathlair.allfunandgames.ca. Retrieved 2016-12-03.
  10. Cram, Scott. "How to Play and Win Notakto". Retrieved 2016-12-02.
  11. Schumer, Peter D. (2004), Mathematical Journeys, John Wiley & Sons, pp. 71–72, ISBN 9780471220664.
  12. Markowsky, George. "Numerical Tic-Tac-Toe" (PDF). Retrieved December 3, 2016.
  13. 1 2 Sandlund, Bryce; Staley, Kerrick; Dixon, Michael; Butler, Steve. "Numerical Tic-Tac-Toe on the 4 × 4 Board" (PDF).
  14. Check Lines, BoardGameGeek, retrieved 2013-09-13.
  15. Goff, Allan (November 2006). "Quantum tic-tac-toe: A teaching metaphor for superposition in quantum mechanics". American Journal of Physics. College Park, MD: American Association of Physics Teachers. 74 (11): 962–973. doi:10.1119/1.2213635. ISSN 0002-9505.
  16. "Puzzles in Education - Wild Tic-Tac-Toe". puzzles.com. Retrieved 2016-11-29.
  17. Mendelson, Elliott (2016-02-03). Introducing Game Theory and its Applications. CRC Press. ISBN 9781482285871.
  18. "Variations of Tic Tac Toe" (PDF). Retrieved December 3, 2016.
  19. 1 2 Harrelson, Angie (2007-07-01). Patterns - Literature, Arts, and Science. Prufrock Press Inc. ISBN 9781593632618.
  20. 1 2 "SoS Game". SlideME. Retrieved 2016-12-04.
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