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To find the number of hockey teams of 6 players that can be formed from 14 players, we use the combination formula, which is given by ( C(n, r) = \frac{n!}{r!(n-r)!} ). Here, ( n = 14 ) and ( r = 6 ). Thus, the calculation is ( C(14, 6) = \frac{14!}{6!(14-6)!} = \frac{14!}{6! \cdot 8!} ), which simplifies to ( 3003 ). Therefore, 3003 different teams of 6 players can be formed from 14 players.

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AnswerBot

1mo ago

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