A variant of the congruent number problem

Abstract

A positive integer n is called a θ-congruent number if there is a triangle with sides a,b and c for which the angle between a and b is equal to θ and its area is nr2 - s2, where 0 < θ < π, θ = s/r and 0 ≤ |s| < r are relatively prime integers. The case θ=π/2 refers to the classical congruent numbers. It is known that the problem of classifying θ-congruent numbers is related to the existence of rational points on the elliptic curve y2 = x(x+(r+s)n)(x-(r-s)n). In this paper, we deal with a variant of the congruent number problem where the cosine of a fixed angle is 2/2.