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Let $`N`$ be the number of pegs in the code and $`C`$ be the number of possible peg colors. We will call a game with these particular parameters a $`(N, C)`$-game. A *code* is a vector in $`\BbbC = \{0, \ldots, C - 1\}^N`$. The number of possible codes is $`M = C^N`$. The game is played as follows:
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Let $`N`$ be the number of pegs in the code and $`C`$ be the number of possible peg colors. We will call a game with these particular parameters a $`(N, C)`$-game. A *code* is a vector in $`\mathbb{C} = \{0, \ldots, C - 1\}^N`$. The number of possible codes is $`M = C^N`$. The game is played as follows:
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