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Solving damped wave equation using finite difference method and interpolation using cubic B-spline

机译：有限差分法求解阻尼波方程，三次B样条插值

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Damped wave equations have been used particularly in the natural sciences and engineering disciplines. The purpose of this study is to apply the technique of finite difference and cubic B-spline interpolation to solve one dimensional damped wave equation with Dirichlet boundary conditions. In this study, the accuracy of numerical methods are compared with exact solution by computing their absolute error and relative error. The computational experiments are conducted using Matlab 2008 and visualisation using Microsoft Excel 2010. As the result, finite difference method and cubic B-spline interpolation are found to give good approximation in solving damped wave equation. In addition, the smaller time step size, T gives better approximations for both finite difference and cubic B-spline interpolation

机译：阻尼波方程尤其在自然科学和工程学科中使用。这项研究的目的是应用有限差分和三次B样条插值技术来求解具有Dirichlet边界条件的一维阻尼波方程。在本研究中，通过计算数值方法的绝对误差和相对误差，将数值方法的精度与精确解进行比较。使用Matlab 2008进行了计算实验，并使用Microsoft Excel 2010进行了可视化。结果，发现有限差分法和三次B样条插值法可以很好地近似求解阻尼波方程。此外，较小的时间步长T可为有限差分和三次B样条插值提供更好的近似值

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Arzmi Nur Farahim;
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年度 2014
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Solving damped wave equation using finite difference method and interpolation using cubic B-spline

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