维塔斯定理的扩展

The Mathematical Gazette Pub Date : 2024-02-15 DOI:10.1017/mag.2024.9

N. Dergiades, Quang Hung Tran

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摘要

希腊建筑师科斯塔斯-维塔斯（Kostas Vittas）于 2006 年发表了一个关于循环四边形的优美定理（[1]）：定理 1（科斯塔斯-维塔斯，2006 年）：如果 ABCD 是一个循环四边形，P 是两条对角线 AC 和 BD 的交点，那么三角形 PAB、PBC、PCD 和 PDA 的四条欧拉线是平行的。

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Extensions of Vittas’ Theorem

The Greek architect Kostas Vittas published in 2006 a beautiful theorem ([1]) on the cyclic quadrilateral as follows:Theorem 1 (Kostas Vittas, 2006): If ABCD is a cyclic quadrilateral with P being the intersection of two diagonals AC and BD, then the four Euler lines of the triangles PAB, PBC, PCD and PDA are concurrent.

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The Mathematical Gazette

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