We investigate more initial value problems of difference equations of first and second order whose solutions are transcendental sequences using the method of the discrete Laplace transform and its inverse.
Generally a range of equation solvers for estimating the solution of an equation contain the derivative of first or higher order. Such solvers are difficult to apply in the instances of complicated functional relationship. The equation... more
Generally a range of equation solvers for estimating the solution of an equation contain the derivative of first or higher order. Such solvers are difficult to apply in the instances of complicated functional relationship. The equation solver proposed in this paper meant to solve many of the involved complicated problems and establishing a process tending towards a higher ordered by alloying the already proved conventional methods like Newton-Raphson method (N-R), Regula Falsi method (R-F) & Bisection method (BIS). The present method is good to solve those nonlinear and transcendental equations that cannot be solved by the basic algebra. Comparative analysis are also made with the other racing formulas of this group and the result shows that present method is faster than all such methods of the class.
