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Theorem (The First Sylow Theorem)
Suppose $G$ is a finite group and $p^k$ divides $|G|$ for some prime $p$ and integer $k$. Then $G$ contains a subgroup of order $p^k$.
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Please Login to access more options. Theorem (The First Sylow Theorem)Suppose $G$ is a finite group and $p^k$ divides $|G|$ for some prime $p$ and integer $k$. Then $G$ contains a subgroup of order $p^k$. The following pages link to this page. |
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