Difference between revisions of "Convex polygon"

Revision as of 09:11, 23 September 2007

This is an AoPSWiki Word of the Week for Sep 20-26

A convex polygon is a polygon whose interior forms a convex set. That is, if any 2 points on the perimeter of the polygon are connected by a line segment, no point on that segment will be outside the polygon.

All internal angles of a convex polygon are less than $180^{\circ}$ . These internal angles sum to $180(n-2)$ degrees.

The convex hull of a set of points also turns out to be the convex polygon with some or all of the points as its vertices.

The area of a regular n-gon of side length s is $\frac{ns^2*\tan{(90-\frac{180}{n})}}{4}$

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 * [[Concave polygon]]
 * [[Convex polyhedron]]
-* [[Concave polyhedron]]
 {{stub}}
 [[Category:Definition]]

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Difference between revisions of "Convex polygon"

Revision as of 09:11, 23 September 2007

See also