TY - JOUR AU - Chowdhury, Toukir Ahmed AU - Islam, Towhedul AU - Mujahid, Ahmad Abdullah AU - Ahmed, Md. Bayazid PY - 2021/12/23 Y2 - 2024/03/28 TI - The Periodicity of the Accuracy of Numerical Integration Methods for the Solution of Different Engineering Problems JF - Journal of Engineering Advancements JA - J. Eng. Adv. VL - 2 IS - 04 SE - Research Articles DO - 10.38032/jea.2021.04.006 UR - https://scienpg.com/jea/index.php/jea/article/view/jea-2021-04-006 SP - 203-216 AB - <p>Newton-Cotes integration formulae have been researched for a long time, but the topic is still of interest since the correctness of the techniques has not yet been explicitly defined in a sequence for diverse engineering situations. The purpose of this paper is to give the readers an overview of the four numerical integration methods derived from Newton-Cotes formula, namely the Trapezoidal rule, Simpson's 1/3rd rule, Simpson's 3/8th rule, and Weddle's rule, as well as to demonstrate the periodicity of the most accurate methods for solving each engineering integral equation by varying the number of sub-divisions. The exact expressions by solving the numerical integral equations have been determined by Maple program and comparisons have been done using Python version 3.8.</p> ER -