Int. J. Contemp. Math. Sciences, Vo

Int. J. Contemp. Math. Sciences, Vol. 7, 2012, no. 42, 2053 - 2059

Fibonacci Identities as Binomial Sums II

Mohammad K. Azarian

Department of Mathematics
University of Evansville
1800 Lincoln Avenue, Evansville, IN 47722, USA
azarian@evansville.edu

Abstract

As in [2], our goal in this article is to write some more prominent and
fundamental identities regarding Fibonacci numbers as binomial sums.

Mathematics Subject Classification: 05A10, 11B39

Keywords: Fibonacci numbers, Fibonacci sequence, Fibonacci identities

1. Introduction

The most well-known linear homogeneous recurrence relation of order two
with constant coefficients is

Fn+2 = Fn+1 + Fn , where F0 = 0, F1 = 1, and n ≥ 0.

This recurrence relation produces the most popular and widely-used integer
sequence 0, 1, 1, 2, 3, 5, 8, 13, ..., namely, the famous Fibonacci sequence. As
in [2], to facilitate rapid numerical calculations of identities pertaining to Fi-
bonacci numbers we write some of these fundamental identities as binomial
sums.
Hundreds of Fibonacci identities have been developed over the centuries
by numerous mathematicians and number enthusiasts. They have been pub-
lished in various journals and books for at least the past two centuries. The
Fibonacci Quarterly is a good source for those Fibonacci identities that have
been published since 1962. An impressive collection of over 200 known Fi-
bonacci identities, and in most cases along with the name of the original author,
can be found in [15], by Thomas Koshy. Another source for some well-known
Fibonacci identities is [4], by Marjorie Bicknel and Verner E. Hoggatt. Like
many ideas in mathematics it may not be possible to find the true and genuine