The general case on the order of appearance of product of consecutive Fibonacci and Lucas numbers

Abstract

Let Fn and Ln be the nth Fibonacci and Lucas number, respectively. For each positive integer m, the order of appearance of m in the Fibonacci sequence, denoted by z(m), is the smallest positive integer k such that m divides Fk. Recently, D. Marques has obtained a formula for z(FnFn+1), z(FnFn+1Fn+2), and z(FnFn+1Fn+2Fn+3). In this paper, we extend Marques' result to the case z(FnFn+1·s Fn+k) for every 4≤ k ≤ 6. We also give a formula for z(LnLn+1·s Ln+k) when k = 5,6 which extends the recent result of Marques and Trojovsk\'y. Our method gives a general idea on how to obtain the formulas for z(FnFn+1·s Fn+k) and z(LnLn+1·s Ln+k) for every k≥ 1.