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Suggest a strategy such that player A will always win, no matter how player B will play?

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Suppose two player, player A and player B have the infinite number of coins. Now they are sitting near a perfectly round table and going to play a game. The game is, in each turn, a player will put one coin anywhere on the table (not on the top of coin already placed on the table, but on the surface of the table). And the player who places the last coin on the table will win the game. Given player A will always move first. Suggest a strategy such that player A will always win, no matter how player B will play?

posted Jul 31, 2017 by Ajoy Garang

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1 Answer

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Player 'A' place a coin right in the center of the table. After that, whenever the Player 'B' places a coin on the table, mimic his placement on the opposite side of the table. If Player'B' has a place to place a coin, so will Player 'B' . The Player 'B' will run out of places to put a coin before Player'A' do.
so, player A will always win, no matter how player B will play,by following this strategy

answer Sep 21, 2017 by Mogadala Ramana



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