On the Diophantine equation (5pn2-1)x+(p(p-5)n2+1)y=(pn)z

Abstract

Let p be a prime number with p>3, p 34 and let n be a positive integer. In this paper, we prove that the Diophantine equation (5pn2-1)x+(p(p-5)n2+1)y=(pn)z has only the positive integer solution (x,y,z)=(1,1,2) where pn 1 5. As an another result, we show that the Diophantine equation (35n2-1)x+(14n2+1)y=(7n)z has only the positive integer solution (x,y,z)=(1,1,2) where n 3% 5 or 5 n. On the proofs, we use the properties of Jacobi symbol and Baker's method.