Difference between revisions of "Circumcircle"
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The '''circumcircle''' of a [[triangle]] or other [[polygon]] is the [[circle]] which passes through all of its [[vertex|vertices]]. Every triangle has one (and only one) circumcircle, but most other polygons do not. Regular polygons are some of which that do have circumcircles. Also, for instance, those [[quadrilateral]]s with circumcircles form a special class, known as [[cyclic quadrilateral]]s. | The '''circumcircle''' of a [[triangle]] or other [[polygon]] is the [[circle]] which passes through all of its [[vertex|vertices]]. Every triangle has one (and only one) circumcircle, but most other polygons do not. Regular polygons are some of which that do have circumcircles. Also, for instance, those [[quadrilateral]]s with circumcircles form a special class, known as [[cyclic quadrilateral]]s. | ||
Revision as of 15:27, 17 October 2008
The circumcircle of a triangle or other polygon is the circle which passes through all of its vertices. Every triangle has one (and only one) circumcircle, but most other polygons do not. Regular polygons are some of which that do have circumcircles. Also, for instance, those quadrilaterals with circumcircles form a special class, known as cyclic quadrilaterals.
The center of the circumcircle is known as the circumcenter. It is the intersection of the perpendicular bisectors of the sides of the polygon.
The radius of the circumcircle is known as the circumradius. For triangles, the circumradius appears in a number of significant roles, such as in the Law of Sines.