Unified Functional Method for Solving General Polynomial Equations of Degree Less Than Five

Autor: Odilichukwu Christian Okoli, Dozie Felix Nwosu, Amaka Monica Ezeonyebuchi, Ababu Teklemariam Tiruneh
Rok vydání: 2021
Předmět:
Zdroj: MALAYSIAN JOURNAL OF COMPUTING. 6:924
ISSN: 2600-8238
2231-7473
DOI: 10.24191/mjoc.v6i2.11922
Popis: A unified method for solving that incorporate a computational formula that relate the coefficients of the depressed equation and the coefficients of the standard polynomial equation is proposed in this study. This is to ensure that this method is valid for all It shall apply the undetermined parameter method of auxiliary function to obtain solutions to these polynomial equations of degree less than five in one variable. In particular, the result of our work is a unification and improvement on the work of several authors in the sense that only applicable for the case of polynomial equation of degree one. Finally, our results improve and generalize the result by applying standard formula methods for solving higher degree polynomials. It is recommended that the effort should be made toward providing other variant methods that are simpler and friendly.
Databáze: OpenAIRE