# Factorizing Polynomial Functions Using the Sum and Differences of Two Powers or Index

This research findings involves factorization of polynomial functions without using the popular or regular factor theorem, long division or remainder theorem but makes use of the sum and difference of two powers; e.g x2 – 1, x3 + 1, x3 – 1, x4 – 1 e.t.c

A constant term is usually added and subtracted from the polynomial thereby resulting to sum and differences of two powers. Further simplifications will completely factorize the polynomials to the given factors.

This research work contains over twenty theorems on polynomial functions that are systematically proven with lists of worked examples to buttress the theorems. It is a research that will be beneficial to the world at large, adding value to the body of knowledge. It is my hope that this theorem will soon be adopted into the school curriculum worldwide.

Subscribe to access this work and thousands more
Overall Rating

## 0

5 Star
(0)
4 Star
(0)
3 Star
(0)
2 Star
(0)
1 Star
(0)
APA

Ehimetalor, H. (2023). Factorizing Polynomial Functions Using the Sum and Differences of Two Powers or Index. Afribary. Retrieved from https://afribary.com/books/new-method-of-factorizing-polynomial-functions

MLA 8th

Ehimetalor, Henry "Factorizing Polynomial Functions Using the Sum and Differences of Two Powers or Index" Afribary. Afribary, 18 Jul. 2023, https://afribary.com/books/new-method-of-factorizing-polynomial-functions. Accessed 12 Aug. 2024.

MLA7

Ehimetalor, Henry . "Factorizing Polynomial Functions Using the Sum and Differences of Two Powers or Index". Afribary, Afribary, 18 Jul. 2023. Web. 12 Aug. 2024. < https://afribary.com/books/new-method-of-factorizing-polynomial-functions >.

Chicago

Ehimetalor, Henry . "Factorizing Polynomial Functions Using the Sum and Differences of Two Powers or Index" Afribary (2023). Accessed August 12, 2024. https://afribary.com/books/new-method-of-factorizing-polynomial-functions

##### Document Details
Field: Mathematics Type: Text Book 54 PAGES (14886 WORDS) (docx)