Heron triangles and a family of elliptic curves with rank zero

Abstract

Given any positive integer n, it is well-known that there always exists a triangle with rational sides a,b and c such that the area of the triangle is n. For a given prime p 1 modulo 8 such that p2+1=2q for a prime q, we look into the possibility of the existence of the triangles with rational sides with p as the area and 1p as θ2 for one of the angles θ. We also discuss the relation of such triangles with the solutions of certain Diophantine equations.