Category:Wilson's Theorem
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This category contains pages concerning Wilson's Theorem:
A (strictly) positive integer $p$ is a prime if and only if:
- $\paren {p - 1}! \equiv -1 \pmod p$
Source of Name
This entry was named for John Wilson.
Pages in category "Wilson's Theorem"
The following 15 pages are in this category, out of 15 total.
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- Wilson's Theorem
- Wilson's Theorem/Also known as
- Wilson's Theorem/Corollary 1
- Wilson's Theorem/Corollary 2
- Wilson's Theorem/Corollary 2/Proof 1
- Wilson's Theorem/Corollary 2/Proof 2
- Wilson's Theorem/Examples
- Wilson's Theorem/Examples/10 does not divide (n-1)! 1
- Wilson's Theorem/Examples/5 divides (5-1)! 1
- Wilson's Theorem/Necessary Condition
- Wilson's Theorem/Necessary Condition/Proof 1
- Wilson's Theorem/Necessary Condition/Proof 2
- Wilson's Theorem/Necessary Condition/Proof 3
- Wilson's Theorem/Sufficient Condition
- Wilson-Lagrange Theorem