We say that a polygon P is inscribed in another polygon Q when all the vertices of P belong to the perimeter of Q. We also say in this case that Q is circumscribed to P. Given a triangle T, let ℓ be the largest side of a square inscribed in T and L is the shortest side of a square circumscribed to T . Find the smallest possible value of the ratio L/ℓ . geometryratioinscribedsquarecircumscribedGeometric Inequalities