# Difference between revisions of "Composite number"

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Note that the number one is neither prime nor composite. It follows that two is the only even [[prime number]], three is the only multiple of three that is prime, and so on. | Note that the number one is neither prime nor composite. It follows that two is the only even [[prime number]], three is the only multiple of three that is prime, and so on. | ||

− | Every positive integer is prime, composite, or 1. | + | Every positive integer either is prime, composite, or 1 or 0. |

==See also== | ==See also== | ||

* [[Number Theory]] | * [[Number Theory]] | ||

+ | * [[Prime]] | ||

+ | |||

+ | {{stub}} |

## Revision as of 11:48, 26 October 2007

A **composite number** is a positive integer with at least one divisor different from 1 and itself. Some composite numbers are and .

Note that the number one is neither prime nor composite. It follows that two is the only even prime number, three is the only multiple of three that is prime, and so on.

Every positive integer either is prime, composite, or 1 or 0.

## See also

*This article is a stub. Help us out by expanding it.*