A Special Representation of Fibonacci polynomials

Abstract

In this we shall we a special representation of this Fibonacci polynomials sequence which is defined by a recurrence relation with initial terms. A recurrence relation is very useful to solve many problems in mathematics. Fibonacci polynomials are very useful in mathematics as well as physics. Thinking of famous mathematician Carl Friedrich Gauss (1777– 1855) about number theory: “Mathematics is the queen of all sciences, and Number Theory is the queen of Mathematics.”Fibonacci polynomial is very important topic of mathematic many real life problems can be solved by Fibonacci polynomials and Fibonacci numbers.

In Number Theory [1,2 ] we work on numbers in mathematics many types of numbers for examples Even number, Odd number, prime number, complete square number etc. In Number Theory we want a solution in integers [2,3,7 ]. Many basic theorems have proved in Number Theory. There many representations of Fibonacci polynomials in number theory we are also giving a special representation of Fibonacci polynomials.