International Journal of Science and Research (IJSR)

International Journal of Science and Research (IJSR)
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ISSN: 2319-7064


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Research Paper | Mathematics | India | Volume 4 Issue 12, December 2015


An Interesting Generalization of Fibonacci & Lucas Sequence

Vandana R. Patel | Devbhadra V. Shah [2]


Abstract: In this paper, we consider the generalisation of classical Fibonacci sequence and Lucas sequence. We consider the sequence{H_n }defined by the recurrence relation H_n= H_ (n-1) +H_ (n-2), for all n-2, with H_0=2m, H_1=k+m, where m, k are fixed integers. The initial conditions are the sum ofk times the initial conditions of Fibonacci sequence and m times the initial conditions of Lucas sequence. Using the technique of generating functions, we obtain the extended Binet formula for H_n. We obtain some fascinating properties for this sequence. We also establish some amusing identities for this sequence displaying the relation betweenH_n, Fibonacci sequence and Lucas sequence


Keywords: Fibonacci sequence, Lucas sequence, generating function, Generalized Fibonacci sequence


Edition: Volume 4 Issue 12, December 2015,


Pages: 1942 - 1945


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How to Cite this Article?

Vandana R. Patel, Devbhadra V. Shah, "An Interesting Generalization of Fibonacci & Lucas Sequence", International Journal of Science and Research (IJSR), Volume 4 Issue 12, December 2015, pp. 1942-1945, https://www.ijsr.net/get_abstract.php?paper_id=NOV152456

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