Abstract
In physics, propagation of sound, light and water waves is modeled by hyperbolic partial
differential equations. Linear second order hyperbolic partial differential equations describe various
phenomena in acoustics, electromagnetic and fluid dynamics. In this paper, a Galerkin based Finite
Element Model has been developed to solve linear second order one dimensional Inhomogeneous
wave equation numerically. Accuracy of the developed scheme has been analyzed by comparing the
numerical solution with exact solution.
Zain Ulabadin Zafar, A. Pervaiz, M.O. Ahmed, M. Rafiq. (2015) Finite Element Model for Linear Second Order One Dimensional Inhomogeneous Wave Equation, Pakistan Journal of Engineering and Applied Sciences, VOLUME 17, Issue 1.
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