The $\thera$-congruent numbers elliptic curves via a Fermat-type theorem

Abstract: A positive integer N is called a θ-congruent number if there is a θ-triangle (a, b, c) with rational sides for which the angle between a and b is equal to θ and its area is N √ r 2 − s 2 , where θ ∈ (0, π), cos(θ) = s/r, and 0 ≤ |s| < r are coprime integers. It is attributed to Fujiwara [4] that N is a θ-congruent number if and only if the elliptic curve) has a point of order greater than 2 in its group of rational points. Moreover, a natural number N = 1, 2, 3, 6 is a θ-congruent number if and only if rank o… Show more