A note on the high power Diophantine equations

Abstract

In this paper, we solve the simultaneous Diophantine equations(SDE) x1u+...+xnu=k(y1u+...+yn/k); u=1,3, where n >3, and k< n, is a divisor of n , and obtain nontrivial parametric solution for them. Furthermore we present a method for producing another solution for the above Diophantine equation (DE) for the case u = 3, when a solution is given. We work out some examples and find nontrivial parametric solutions for each case in nonzero integers. Also we prove that the other DE p1x1a1+....+pnxnan=q1y1b1+...+qmymbm , has parametric solution and infinitely many solutions in nonzero integers with the condition that: there is a i such that pi=1, and (ai,a1....ai-1ai+1...b1...bm)=1, or there is a j such that qj=1, and (bj,a1...anb1...bj-1bj+1..bm)=1. Finally we study the DE xayb=zc.