CONTINUOUS FORM OF MULTISTEP METHODS FOR SOLVING FIRST ORDER ORDINARY DIFFERENTIAL EQUATION

Abstract

The study aims to develop the theory of numerical methods used for the numerical solution of first order ordinary differential equations (ODEs). The linear multistep backward differentiation formulae (BDF) was reformulated for applications in the continuous form. The suggested approach eliminates requirement for a starting value and its speed proved to be up when computations with the block discrete schemes were used. The test problem was solved with the proposed numerical method and obtained numerical and analytical solutions were compared