Intersecting secants theorem

In Euclidean geometry, the intersecting secants theorem or just secant theorem describes the relation of line segments created by two intersecting secants and the associated circle.

For two lines $AD$ and $BC$ that intersect each other at $P$ and for which $A, B, C, D$ all lie on the same circle, the following equation holds:

|PA|\cdot |PD|=|PB|\cdot |PC|

The theorem follows directly from the fact that the triangles $△ PAC$ and $△ PBD$ are similar. They share $∠ DPC$ and $∠ ADB = ∠ ACB$ as they are inscribed angles over $AB$ . The similarity yields an equation for ratios which is equivalent to the equation of the theorem given above:

{\frac {PA}{PC}}={\frac {PB}{PD}}\Leftrightarrow |PA|\cdot |PD|=|PB|\cdot |PC|

Next to the

tangent-secant theorem, the intersecting secants theorem represents one of the three basic cases of a more general theorem about two intersecting lines and a circle - the power of point theorem

.

References

S. Gottwald: The VNR Concise Encyclopedia of Mathematics. Springer, 2012,
ISBN 9789401169820, pp. 175-176

Michael L. O'Leary: Revolutions in Geometry. Wiley, 2010,
ISBN 9780470591796, p. 161

Schülerduden - Mathematik I. Bibliographisches Institut & F.A. Brockhaus, 8. Auflage, Mannheim 2008,
ISBN 978-3-411-04208-1
, pp. 415-417 (German)

External links

Secant Secant Theorem at proofwiki.org
Power of a Point Theorem auf cut-the-knot.org
Weisstein, Eric W. "Chord". MathWorld.