A Pair of Diophantine Equations and Fibonacci-Like Sequences
Abstract
Given two relatively prime numbers a and b, it is known that exactly one of the two Diophantine equations has a nonnegative integral solution (x,y): ax + by \ =\ (a-1)(b-1)2 and 1 + ax + by \ =\ (a-1)(b-1)2. Furthermore, the solution is unique. This paper surveys recent results on finding the solution and determining which equation is used when a and b are taken from certain sequences. We contribute to the literature by finding (x,y) when a and b are consecutive terms of sequences having the Fibonacci recurrence and arbitrary initial terms.
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