Squares in Euler triples from Fibonacci and Lucas numbers

Zvonko Cerin cerin@math.hr

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Abstract

In this paper we shall continue to study from [4], for k = âˆ’1 and k = 5, the infinite sequences of triples A = (F_2n+1, F_2n+3, F_2n+5), B = (F_2n+1, 5F_2n+3, F_2n+5), C = (L_2n+1, L_2n+3, L_2n+5), D = (L_2n+1, 5L_2n+3, L_2n+5) with the property that the product of any two different components of them increased by k are squares. The sequences A and B are built from the Fibonacci numbers F_n while the sequences C and D from the Lucas numbers L_n. We show some interesting properties of these sequences that give various methods how to get squares from them.

Keywords

D(k)-triple , Fibonacci numbers , Lucas numbers , square , symmetric sum , alternating sum , product , component

Zvonko Cerin University of Zagreb, Kopernikova 7, 10010 Zagreb, Croatia.

Pages: 79–88
Date Published: 2013-06-01
Vol. 15 No. 2 (2013): CUBO, A Mathematical Journal

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Published

2013-06-01

How to Cite

[1]

Z. Cerin, “Squares in Euler triples from Fibonacci and Lucas numbers”, CUBO, vol. 15, no. 2, pp. 79–88, Jun. 2013.

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Vol. 15 No. 2 (2013): CUBO, A Mathematical Journal

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