On the Family of Elliptic Curves y2=x3-5pqx
Abstract
This article considers the family of elliptic curves given by Epq: y2=x3-5pqx and certain conditions on odd primed p and q. More specifically, we have proved that if p 33 40 and q 7 40, then the rank of Epq is zero over both Q and Q(i) . Furthermore, if the primes p and q are of the form 40k + 33 and 40l + 27, where k,l ∈ Z such that (25k+ 5l +21) is a perfect square, then the given family of elliptic curves has rank one over Q and rank two over Q(i). Finally, we have shown that torsion of Epq over Q is isomorphic to Z/ 2Z.
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