Uncertainty

Volume 1 - Issue 1 (Forthcoming) (5) | PP: 32 - 41 Language : English
DOI : https://doi.org/10.31559/uncertainty2024.1.1.5
73
7

Efficient One-Step Second Derivative Block Numerical Scheme for Solution of first-Order Integro-differential Equations

Mark I. Modebei ,
Olumide O. Olaiya ,
Olugbade E. Faniyi ,
Ikechukwu J. Otaide
Received Date Revised Date Accepted Date Publication Date
21/9/2024 20/10/2024 5/11/2024 12/11/2024
Abstract
In this work, a new class of one-step second derivative block hybrid numerical scheme is developed for the numerical solution of first-order integro-differential equations with the aid of Simpson's 1/3 quadrature method. The collocation techniques is used for the derivation of this new block method which gives high order of accuracy with very low error constants and its zero stable and convergent. The results from the numerical solution of the examples drawn from literature shows its efficiency in terms of the small errors obtained.


How To Cite This Article
, M. I. M.Olaiya , O. O.Faniyi , O. E. & Otaide , I. J. (2024). Efficient One-Step Second Derivative Block Numerical Scheme for Solution of first-Order Integro-differential Equations. Uncertainty, 1 (1), 32-41, 10.31559/uncertainty2024.1.1.5

Copyright © 2024, This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
Complex Bipolar Multi-Fuzzy Sets Abd Ulazeez Alkouri , Mo'men Bany Amer , Ibrahim Jawarneh :285
Complex Bipolar Multi-Fuzzy Sets Abd Ulazeez Alkouri , Mo'men Bany Amer , Ibrahim Jawarneh :27