Concyclic points

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In geometry, a set of points is said to be concyclic (or cocyclic) if they lie on a common circle.

Concyclic points, showing that the perpendicular bisectors of pairs are concurrent

Four concyclic points showing that angles

α

are the same. Points are the vertices of a cyclic quadrilateral

A circle can be drawn around any triangle. A quadrilateral that can be inscribed inside a circle is said to be a cyclic quadrilateral.

In general the centre O of a circle on which points P and Q lie must be such that OP and OQ are equal distances. Therefore O must lie on the perpendicular bisector of the line segment PQ. For n distinct points there are n(n− 1)/2 such lines to draw, and the concyclic condition is that they all meet in a single point.

A quadrilateral in which the four vertices are concyclic is called a cyclic quadrilateral. More generally, a polygon in which all vertices are concyclic is called a cyclic polygon. Three noncollinear points A, B, and C are concyclic to a single circle. Four different points A, B, C, and D are cyclic if and only if (see diagram):

$\alpha \equiv \angle CAD = \angle CBD. \!\,$

This condition is equivalent to the condition that opposite angles in the quadrilateral be supplementary. Four points in the complex plane are either concyclic or collinear if and only if their cross-ratio is real.