IMO 1970 LL ROM44
If a, b, c are side lengths of a triangle, prove that
IMO 1970 LL ROM44
Origin: ROM
Problem
If a, b, c are side lengths of a triangle, prove that (a + b)(b + c)(c + a) \geq8(a + b −c)(b + c −a)(c + a −b).
If a, b, c are side lengths of a triangle, prove that
Origin: ROM
If a, b, c are side lengths of a triangle, prove that (a + b)(b + c)(c + a) \geq8(a + b −c)(b + c −a)(c + a −b).