Abstract
An integral formulation for the solution of a class of second order boundary value problems which are described by the equation d 2yy/dx 2 + P(x,y, dy/dx, d 2yy/dx 2)) = 0, x ε (0,a), is presented. The resulting integral equations are then solved by expressing the dependent variable y as a power series which made the computation of various integrals possible. The proposed method is tested through some examples to show the applicability of the method to solve a wide range of second order differential equations including the nonlinear ones.
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