Triangular Numbers in Quadratic Functions Form, Generating Functions and Continued Fractions​

  • Tilahun Muche Savannah State University
DOI: https://doi.org/10.53555/m.v4i8.2205
Keywords: Triangular Numbers, Quadratic functions, Sequences and Factorials

Abstract

The triangular number denoted by Tn is defined as the sum of the first consecutive positive integers, and a positive integer is a triangular number if and only if  Tn= n(n+1)/2. In this paper we represent a triangular number by a quadratic function i.e., for each m  the necessary and sufficient condition for a quadratic function f(x)= x2 +x - 2m to be triangular is proved. We also prove, a theorem associated to a rational root d of a quadratic function f(x)  to be a triangular number Tn. We also use Generating function to represent the sets of Quotients of triangular numbers.

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Vol. 4, No. 4,
Published
2018-08-31
How to Cite
Muche, T. (2018). Triangular Numbers in Quadratic Functions Form, Generating Functions and Continued Fractions​. IJRDO -JOURNAL OF MATHEMATICS, 4(8), 01-10. https://doi.org/10.53555/m.v4i8.2205
Issue
Vol. 4 No. 8 (2018): IJRDO-Journal of Mathematics
Section
Articles

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