The **perimeter** of a polygon is the distance around it, the sum of the lengths of all its sides.

A **perimeter** is a path that surrounds an area. The word comes from the Greek *peri* (around) and *meter* (measure). The term may be used either for the path or its length. The perimeter of a circular area is called circumference.

## Practical uses

Calculating the perimeter has considerable practical applications. The perimeter can be used to calculate the length of fence required to surround a yard or garden. The perimeter of a wheel (its circumference) describes how far it will roll in one revolution. Similarly, the amount of string wound around a spool is related to the spool's perimeter.

## Formulas

shape | formula | variables |
---|---|---|

circle | where is the radius. | |

triangle | where , and are the lenghts of the sides of the triangle. | |

equilateral polygon | where is the number of sides and is the length of one of the sides. | |

regular polygon | where is the number of sides and is the distance between center of the polygon and one of the vertices of the polygon. | |

general polygon | where is the length of the -th (1st, 2nd, 3rd ... n-th) side of an n-sided polygon. |

Perimeters for more general shapes can be calculated as any path with where is the length of the path and is an infinitesimal line element. Both of these must be replaced with other algebraic forms in order to be solved: an advanced notion of perimeter, which includes hypersurfaces bounding volumes in -dimensional euclidean spaces can be found in the theory of Caccioppoli sets.

## See also

The Wikibook Geometry has a page on the topic of: Perimeters, areas and volumes |

The Wikibook Geometry has a page on the topic of: Arcs |

The Wikibook Geometry has a page on the topic of: Perimeter and Arclength |

Look up in Wiktionary, the free dictionary.perimeter |