Subject: QA Mathematics
Year: 2022
Type: Article
Type: NonPeerReviewed
Title: USING EULER'S METHOD TO APPROACH THE SOLUTION OF A FIRST-ORDER DIFFERENTIAL EQUATION
Author: SHAQIRI, Mirlinda
Author: KAMBERI, Lazim
Author: BAJRAMI, Merita
Abstract: The objective of studying this paper is the use of Euler's method to approach the solution of a first-order differential equation at the interval between x_0 and x_F. Euler's method was the most fundamental and simplest of procedures used to find approximate numerical solutions of a ordinary first-order differential equation, provided his initial value is known. In Euler’s method, we can approximate the curve of the solution by the tangent in each interval (that is, by sequence of short line segment) at steps of h. In general, if we use small step size, the accuracy of approximation increases.
Publisher: Faculty of Natural Sciences and Mathematics
Relation: https://eprints.unite.edu.mk/1069/
Identifier: oai:eprints.unite.edu.mk:1069
Identifier: https://eprints.unite.edu.mk/1069/1/JNSM%2013-14%20e%20formatuar-140-142.pdfIdentifier: SHAQIRI, Mirlinda and KAMBERI, Lazim and BAJRAMI, Merita (2022) USING EULER'S METHOD TO APPROACH THE SOLUTION OF A FIRST-ORDER DIFFERENTIAL EQUATION. Journal of Natural Sciences and Mathematics of UT, 7 (13-14). pp. 140-142. ISSN 2671-3039