A new volume of Symmetry brings a paper authored by D. Strzalka. A. Włoch and S. Wolski about Distance Fibonacci Polynomials by Graph Methods. This paper is a study of a new generalization of Fibonacci polynomials which generalize Fibonacci, Jacobsthal and Narayana numbers, simultaneously is given. A graph interpretation of these polynomials is shown and a binomial formula for them was obtained. Moreover, by modification of Pascal’s triangle, which has a symmetric structure, matrices generated by coefficients of generalized Fibonacci polynomials were given. As a consequence, the direct formula for generalized Fibonacci polynomials was shown. In addition, matrix generators for generalized Fibonacci polynomials, using the symmetric matrix of initial conditions, were obtained.
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