Barrow's inequality

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In geometry, Barrow's inequality states the following: Let P be a point inside the triangle ABC, U, V, and W be the points where the angle bisectors of BPC, CPA, and APB intersect the sides BC, CA, AB, respectively. Then

$PA+PB+PC\geq 2(PU+PV+PW).\,$

[edit] See also

Euler's theorem in geometry
Erdős–Mordell inequality

[edit] External links

Hojoo Lee: Topics in Inequalities - Theorems and Techniques

Categories: Triangle geometry | Inequalities

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This page was last modified 00:00, 15 December 2007 by Wikipedia user Michael Hardy. Based on work by Wikipedia user(s) SmackBot, Mathbot, Tosha, Joseph Myers, Ideahitme, Charles Matthews and Matikkapoika.
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