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Finite Difference Method for Solving Differential Equations
guaranteed if we use iterative methods such a-Siedel method). Solving the s the Gauss equations we get, − − = 0 0.5852 0.5852 0 4 3 2 1 y y y y. y(50) =y(x 2 ) ≈ y 2 = −0.5852" The exact solution of the ordinary differential equation is derived as follows. The homogeneous part of the solution is given by solving the characteristic ...
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