Intersecting chords theorem

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In Euclidean geometry, the intersecting chords theorem, or just the chord theorem, is a statement that describes a relation of the four line segments created by two intersecting chords within a circle. It states that the products of the lengths of the line segments on each chord are equal. It is Proposition 35 of Book 3 of Euclid's Elements.

More precisely, for two chords Template:Mvar and Template:Mvar intersecting in a point Template:Mvar the following equation holds: $${\displaystyle |AS|\cdot |SC|=|BS|\cdot |SD|}$$

The converse is true as well. That is: If for two line segments Template:Mvar and Template:Mvar intersecting in Template:Mvar the equation above holds true, then their four endpoints Template:Math lie on a common circle. Or in other words, if the diagonals of a quadrilateral Template:Mvar intersect in Template:Mvar and fulfill the equation above, then it is a cyclic quadrilateral.

The value of the two products in the chord theorem depends only on the distance of the intersection point Template:Mvar from the circle's center and is called the absolute value of the [[power of a point|power of Template:Mvar]]; more precisely, it can be stated that: $${\displaystyle |AS|\cdot |SC|=|BS|\cdot |SD|=r^2-d^2,}$$ where Template:Mvar is the radius of the circle, and Template:Mvar is the distance between the center of the circle and the intersection point Template:Mvar. This property follows directly from applying the chord theorem to a third chord (a diameter) going through Template:Mvar and the circle's center Template:Mvar (see drawing).

The theorem can be proven using similar triangles (via the inscribed-angle theorem). Consider the angles of the triangles Template:Math and Template:Math: $${\displaystyle \begin{array}{cc}\mathrm{\angle }ADS& =\mathrm{\angle }BCS(\text{inscribed angles over AB})\\ \mathrm{\angle }DAS& =\mathrm{\angle }CBS(\text{inscribed angles over CD})\\ \mathrm{\angle }ASD& =\mathrm{\angle }BSC(\text{opposing angles})\end{array}}$$ This means the triangles Template:Math and Template:Math are similar and therefore

$${\displaystyle \frac{AS}{SD}=\frac{BS}{SC}\iff |AS|\cdot |SC|=|BS|\cdot |SD|}$$

Next to the tangent-secant theorem and the intersecting secants theorem, the intersecting chords 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.

• Paul Glaister: Intersecting Chords Theorem: 30 Years on. Mathematics in School, Vol. 36, No. 1 (Jan., 2007), p. 22 (JSTOR)
• Bruce Shawyer: Explorations in Geometry. World scientific, 2010, Template:ISBN, p. 14
• Hans Schupp: Elementargeometrie. Schöningh, Paderborn 1977, Template:ISBN, p. 149 (German).
• Schülerduden - Mathematik I. Bibliographisches Institut & F.A. Brockhaus, 8. Auflage, Mannheim 2008, Template:ISBN, pp. 415-417 (German)

• Intersecting Chords Theorem at cut-the-knot.org
• Intersecting Chords Theorem Template:Webarchive at proofwiki.org
• Template:MathWorld
• Two interactive illustrations: [1] and [2]

Template:Ancient Greek mathematics