METODE BERTIPE SCHRODER ORDE TIGA UNTUK MENCARI AKAR GANDA DENGAN MULTIPLISITAS TAK DIKETAHUI

Abstract

This article discusses a new Schroder-type method for finding a multiple root of nonlinear equations. The method has a third order convergence and requires four function evaluations per iteration. Through computational tests, it is shown that the method converges to the root of the nonlinear equations faster than those of the comparison methods