Difference between revisions of "Wilson Prime"
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In [[Number Theory]], a '''Wilson Prime''' is a prime number <math>N</math> such that <math>N^2</math> divides <math>(N-1)!-1</math>. It bears a striking resemblance to [[Wilson's Theorem]]. Although conjectured to be infinite in number, no other Wilson primes have been discovered besides 5,13, and 563. | In [[Number Theory]], a '''Wilson Prime''' is a prime number <math>N</math> such that <math>N^2</math> divides <math>(N-1)!-1</math>. It bears a striking resemblance to [[Wilson's Theorem]]. Although conjectured to be infinite in number, no other Wilson primes have been discovered besides 5,13, and 563. | ||
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[[Category: Number Theory]] | [[Category: Number Theory]] | ||
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Revision as of 11:36, 6 August 2013
In Number Theory, a Wilson Prime is a prime number 
such that 
divides 
. It bears a striking resemblance to Wilson's Theorem. Although conjectured to be infinite in number, no other Wilson primes have been discovered besides 5,13, and 563.
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