Reuschle's theorem

Reuschle's theorem is a statement in elementary geometry. It describes a property of the cevians of a triangle intersecting in a common point and is named after the German mathematician Karl Gustav Reuschle (1812-1875).

In a triangle ${\displaystyle ABC}$ with its three cevians intersecting in a common point let ${\displaystyle P_{a}}$, ${\displaystyle P_{b}}$ and ${\displaystyle P_{c}}$ denote the intersection points of the extended triangle sides and the cevians. The circle defined by the three ${\displaystyle P_{a}}$ ${\displaystyle P_{b}}$ ${\displaystyle P_{c}}$ intersects the extended triangle sides in the points ${\displaystyle P'_{a}}$, ${\displaystyle P'_{b}}$ and ${\displaystyle P'_{c}}$. Reuschle's theorem now states that the three cevians ${\displaystyle AP'_{a}}$, ${\displaystyle BP'_{b}}$ and ${\displaystyle CP'_{c}}$ intersect in a comon point as well.

• Friedrich Riecke: Mathematische Unterhaltungen. Volume I, Stuttgart 1867, (reprint Wiesbaden 1973), ISBN 3-500-26010-1, p. 125 (German)

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