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circumcircle
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(Definition)
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For any triangle  there is always a circle passing through its three vertices.
Such circle is called a circumcircle. Its radius is the circumradius, and its center is the circumcenter. The circumcenter lies at the intersection of the perpendicular bisectors of the sides of the triangle.
Since the perpendicular bisector of a segment is the locus of points at the same distance from the segment endpoints, the points on the perpendicular bisector of  are equidistant to  and  . The points in
the perpendicular bisector of  are equidistant to and  , and thus the intersection point  is at the same distance from  and .
In a more general setting, if  is any polygon, its circumcircle would be a circle passing through all vertices, and circumradius and circumcenter are defined similarly. However, unlike triangles, circumcircles need not to exist for any polygon. For instance, a non-rectangular parallelogram has no circumcircle, for no circle passes through the four vertices. A quadrilateral that does possess a circumcircle is called a cyclic quadrilateral.
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"circumcircle" is owned by yark. [ full author list (2) | owner history (2) ]
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(view preamble)
Cross-references: cyclic quadrilateral, quadrilateral, parallelogram, polygon, endpoints, distance, points, locus, segment, sides, perpendicular bisectors, intersection, center, radius, vertices, passing through, circle, triangle
There are 18 references to this entry.
This is version 5 of circumcircle, born on 2005-02-05, modified 2007-04-22.
Object id is 6714, canonical name is Circumcircle.
Accessed 6661 times total.
Classification:
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Pending Errata and Addenda
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