• Title of article

    POLYNOMIALS THAT HAVE GOLDEN RATIO ZEROS

  • Author/Authors

    MAIER ، JACK , HE ، TIAN-XIAO - Wesleyan University , VANNESS ، KURT - Wesleyan University

  • Pages
    25
  • From page
    151
  • To page
    175
  • Abstract
    When the golden ratio and its conjugate are zeros to a polynomial, two of the coefficients are functions of the Fibonacci sequence in terms of the other coefficients, which characterize the polynomial completely. These functions are used to derive some Fn, Ln, and golden ratio identities. In many cases, this is generalized to the Lucas sequences Un and Vn, with an associated quadratic root pair. Horadam sequences are produced in the the series of linear and constant coefficients of the series of polynomials having ra and rb zeros when all of the other coefficients are equal.
  • Keywords
    Fibonacci sequence , Lucas sequence , Horadam sequence , golden ratio
  • Journal title
    Journal of Advanced Mathematical Studies
  • Serial Year
    2014
  • Journal title
    Journal of Advanced Mathematical Studies
  • Record number

    2477757