Approximate solution of a second-order linear differential equation with variable coefficients

A closed form solution of a second order linear homogeneous difference equation with variable coefficients is presented. As an application of this solution, Ž . we obtain expressions for cos n and sin n q 1 rsin as polynomials in cos .

This paper deals with a Dirichlet boundary value problem for a linear second order ordinary differential operator, whose coefficients belong to certain L p -spaces. Its solution is to be understood in the sense of Sobolev, so that the Fredholm alternative holds. The main purpose of this paper is, in

## Two approximations are developed to the solution of an important nonlinear, nonautonomous second-order differential equation that arises in various fields of science and technology such as operations research, mathematical ecology and epidemiology. The origin of the second-order differential equa