An Algorithm to Generalize the Pascal and Fibonacci Matrices - Applied Mathematics

AM > Vol.6 No.6, June 2015

Applied Mathematics

Volume 6, Issue 6 (June 2015)

ISSN Print: 2152-7385 ISSN Online: 2152-7393

Google-based Impact Factor: 0.58 Citations

An Algorithm to Generalize the Pascal and Fibonacci Matrices ()

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Download as PDF (Size: 274KB) PP. 1107-1114

DOI: 10.4236/am.2015.66101 6,044 Downloads 7,281 Views Citations

Author(s)

Ilhan M. Izmirli

Affiliation(s)

George Mason University, Fairfax, USA.

ABSTRACT

The Pascal matrix and the Fibonacci matrix are among the most well-known and the most widely-used tools in elementary algebra. In this paper, after a brief introduction where we give the basic definitions and the historical backgrounds of these concepts, we propose an algorithm that will generate the elements of these matrices. In fact, we will show that the indicated algorithm can be used to construct the elements of any power series matrix generated by any polynomial

(see Definition 1), and hence, it is a generalization of the specific algorithms that give us the Pascal and the Fibonacci matrices.

KEYWORDS

Pascal Triangle, Fibonacci Triangle

Share and Cite:

Izmirli, I. (2015) An Algorithm to Generalize the Pascal and Fibonacci Matrices. Applied Mathematics, 6, 1107-1114. doi: 10.4236/am.2015.66101.

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