ABSTRACT
A COMPREHENSIVE APPROACH TO EVALUATING SOLUTIONS OF DIFFERENTIAL EQUATIONS WITH BOUNDARY CONDITIONS USING LAPLACE TRANSFORM
Journal: Matrix Science Mathematic (MSMK)
Author: G. Bello, and D. O. Akpootu
This is an open access article distributed under the Creative Commons Attribution License CC BY 4.0, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited
DOI: 10.26480/msmk.02.2023.95.102
This paper employed the use of Laplace transform to obtain solutions of differential equations of the first and second order with given boundary conditions, also the study investigated the pattern of variation exhibited graphically by the various solutions of differential equations at x = 0 to 12. The results in this study revealed that the solutions obtained usually contain exponential functions, while the differential equations with sine and cosine functions has solution that contains exponential and sine function. Furthermore, the differential equations with cosine function has solution that contain sine function only while differential equations that contain a perfect square multiple of f(x) in which the differential equation is equated to zero may have a solution that contain a sine function only. The graphically representation shows different pattern of variation depending on the solutions of the evaluated differential equations.
Pages | 95-102 |
Year | 2023 |
Issue | 2 |
Volume | 7 |