Generalized Fibonacci-Like Sequence and Some Identities
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Author(s)
Abstract
Sequences have been fascinating topic for mathematicians for centuries. The Fibonacci and Lucas sequences are examples of second order recursive sequences. Fibonacci sequence is defined by In recent years, few research scholars have been introduced Fibonacci-Like sequences which are similar to Fibonacci sequences in recurrence relation, but initial conditions are different. Due to this reason, these are known as Fibonacci-Like sequences. In this paper, we study a Generalized Fibonacci-Like sequence with initial condition R0=2b and R1= a+b, where a and b are non-zero real numbers. Some identities are established by Binet’s formula and generating function. Further, present connection formulae and some determinant identities.
Keywords
Fibonacci sequence; Lucas sequence; Fibonacci-Like sequence; Generalized Fibonacci-Like sequence.
Cite this paper
G.P.S. Rathore, Omprakash Sikhwal, Ritu Choudhary,
Generalized Fibonacci-Like Sequence and Some Identities
, SCIREA Journal of Mathematics.
Volume 1, Issue 1, October 2016 | PP. 107-118.
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