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- Harary's_generalized_tic-tac-toe abstract "Harary's generalized tic-tac-toe is an even broader generalization of tic-tac-toe than m,n,k-games are. Instead of the goal being limited to "in a row" constructions, the goal can be any polyomino (Note that when this generalization is made diagonal constructions are not considered a win). It was devised by Frank Harary in March 1977.Like many other games, the second player cannot win (the reason is detailed on the m,n,k-game page). All that is left to study then is to determine if the first player can win, on what board sizes he may do so, and in how many moves it will take.".
- Harary's_generalized_tic-tac-toe wikiPageID "9701714".
- Harary's_generalized_tic-tac-toe wikiPageRevisionID "467902920".
- Harary's_generalized_tic-tac-toe hasPhotoCollection Harary's_generalized_tic-tac-toe.
- Harary's_generalized_tic-tac-toe subject Category:Recreational_mathematics.
- Harary's_generalized_tic-tac-toe subject Category:Tic-tac-toe.
- Harary's_generalized_tic-tac-toe comment "Harary's generalized tic-tac-toe is an even broader generalization of tic-tac-toe than m,n,k-games are. Instead of the goal being limited to "in a row" constructions, the goal can be any polyomino (Note that when this generalization is made diagonal constructions are not considered a win). It was devised by Frank Harary in March 1977.Like many other games, the second player cannot win (the reason is detailed on the m,n,k-game page).".
- Harary's_generalized_tic-tac-toe label "Harary's generalized tic-tac-toe".
- Harary's_generalized_tic-tac-toe sameAs m.02pplpl.
- Harary's_generalized_tic-tac-toe sameAs Q5654223.
- Harary's_generalized_tic-tac-toe sameAs Q5654223.
- Harary's_generalized_tic-tac-toe wasDerivedFrom Harary's_generalized_tic-tac-toe?oldid=467902920.
- Harary's_generalized_tic-tac-toe isPrimaryTopicOf Harary's_generalized_tic-tac-toe.