ABSTRACT
This research work is aimed at studying the application of convolution
theorem or integrals to solution of differential equation and .integral
equation (vçlterra) whose kernels is of the difference type.
We started by defining what a laplace transform is. And consequently we
built a table of the laplace transforms of most elementary functions.
The convolution theorem was applied to solve differential equation and
also to solve volterra integral equations whose kernel is of the difference
type.
ONWUGBUFOR, C (2021). Application Of The Convolution Integral To Solution O Volterra Integral Equation. Repository.mouau.edu.ng: Retrieved Nov 22, 2024, from https://repository.mouau.edu.ng/work/view/application-of-the-convolution-integral-to-solution-o-volterra-integral-equation-7-2
CHIGOZIE, ONWUGBUFOR. "Application Of The Convolution Integral To Solution O Volterra Integral Equation" Repository.mouau.edu.ng. Repository.mouau.edu.ng, 07 Jun. 2021, https://repository.mouau.edu.ng/work/view/application-of-the-convolution-integral-to-solution-o-volterra-integral-equation-7-2. Accessed 22 Nov. 2024.
CHIGOZIE, ONWUGBUFOR. "Application Of The Convolution Integral To Solution O Volterra Integral Equation". Repository.mouau.edu.ng, Repository.mouau.edu.ng, 07 Jun. 2021. Web. 22 Nov. 2024. < https://repository.mouau.edu.ng/work/view/application-of-the-convolution-integral-to-solution-o-volterra-integral-equation-7-2 >.
CHIGOZIE, ONWUGBUFOR. "Application Of The Convolution Integral To Solution O Volterra Integral Equation" Repository.mouau.edu.ng (2021). Accessed 22 Nov. 2024. https://repository.mouau.edu.ng/work/view/application-of-the-convolution-integral-to-solution-o-volterra-integral-equation-7-2