Refinements of the Egyptian Fraction Finite Difference Scheme for First and Second Order Initial Value Problems.

Please use this identifier to cite or link to this item: http://ir.futminna.edu.ng:8080/jspui/handle/123456789/6915

Title:	Refinements of the Egyptian Fraction Finite Difference Scheme for First and Second Order Initial Value Problems.
Authors:	Etuk, Stella Oluyemi Adeboye, Kayode Rufus
Keywords:	Refinement, Egyptian fraction, Runge-Kutta, Obrechkoff method
Issue Date:	Mar-2017
Publisher:	JOSTMED Publisher
Citation:	Etuk, S. O. & adeboye, K. R. (2017). Refinements of the Egyptian Fraction Finite Difference Scheme for First and Second Order Initial Value Problems. Journal of Science, Technology, Mathematics and Education. 13(1). 118-124. Published by the Department of Science Education, School of Science and Science Education, Federal University of Technology, Minna.
Abstract:	In this paper, new methods, which are akin to both Runge-Kutta methods and Quasi-Runge- Kutta methods, through a refinement process by Taylor’s series expansion of the error term of the existing Egyptian fraction method, were derived. They are less cumbersome than the Hybrid methods while maintaining high accuracy of the numerical results. The methods are used to solve both first and second order differential equations with initial conditions and the results obtained are very favourable because they produced lower absolute error when compared with the existing similar methods.
URI:	http://repository.futminna.edu.ng:8080/jspui/handle/123456789/6915
ISSN:	0748-4710
Appears in Collections:	Information and Media Technology

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