Fill This Form To Receive Instant Help

Help in Homework
trustpilot ratings
google ratings


Homework answers / question archive / Show that the product of a polynomial and its reciprocal polynomial is a palindromic polynomial

Show that the product of a polynomial and its reciprocal polynomial is a palindromic polynomial

Math

Show that the product of a polynomial and its reciprocal polynomial is a palindromic polynomial.
Hint Consider the zeros.

Definition of reciprocal polynomial of f(x) for the book Introduction to the Theory of Error-Correcting Codes, by Vera Pless, 3rd edition Page 58 and 59.

If f(x) is a polynomial of degree m, the reciprocal polynomial of f(x) is defined to be .
If , its reciprocal polynomial equals ; that is, the coefficients are written in reverse order.

Theorem: If is a root of is a root of g(x), reciprocal polynomial of f(x). Also f(x) is irreducible if its reciprocal polynomial is irreducible, and f(x) is primitive iff its reciprocal polynomial is primitive.

Option 1

Low Cost Option
Download this past answer in few clicks

2.89 USD

PURCHASE SOLUTION

Already member?


Option 2

Custom new solution created by our subject matter experts

GET A QUOTE