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Suppose that Un (P, Q) and Vn (P, Q) are respectively the Lucas sequences of the first and second kinds with P≠0, Q≠0 and gcd (P, Q) =1. In this paper, we introduce an approach for studying the solutions (x, n) of the diophantine equation ±1Vn (P2, Q2) =∑k=1∞Uk−1 (P1, Q1) xk, in the cases of (P1, Q1) ≠ (P2, Q2) and (P1, Q1) = (P2, Q2). Moreover, we apply the procedure of this approach with which −3≤P1, P2≤3, −2≤Q1≤2 and −1≤Q2≤1. Our approach is mainly based on transferring this equation into either an elliptic curve equation that can be solved easily using the Magma software, or a quadratic equation that can be solved using the quadratic formula.
Abdulzahra et al. (Thu,) studied this question.