MathDB

Let

ABC

be a triangle inscribed in a circle and let

l_a = \frac{m_a}{M_a} \ , \ \ l_b = \frac{m_b}{M_b} \ , \ \ l_c = \frac{m_c}{M_c} \ ,

where

m_a

m_b

m_c

are the lengths of the angle bisectors (internal to the triangle) and

M_a

M_b

M_c

are the lengths of the angle bisectors extended until they meet the circle. Prove that

\frac{l_a}{\sin^2 A} + \frac{l_b}{\sin^2 B} + \frac{l_c}{\sin^2 C} \geq 3

and that equality holds iff

ABC

is an equilateral triangle.

Problem Statement