George, S.Gopal, M.Bhide, S.Argyros, I.K.2026-02-032025Algorithms, 2025, 18, 8, pp. -https://doi.org/10.3390/a18080483https://idr.nitk.ac.in/handle/123456789/20137A multi-step method introduced by Raziyeh and Masoud for solving nonlinear systems with convergence order five has been considered in this paper. The convergence of the method was studied using Taylor series expansion, which requires the function to be six times differentiable. However, our convergence study does not depend on the Taylor series. We use the derivative of F up to two only in our convergence analysis, which is presented in a more general Banach space setting. Semi-local analysis is also discussed, which was not given in earlier studies. Unlike in earlier studies (where two sets of assumptions were used), we used the same set of assumptions for semi-local analysis and local convergence analysis. We discussed the dynamics of the method and also gave some numerical examples to illustrate theoretical findings. © 2025 by the authors.Banach spacesConvergence of numerical methodsNonlinear equationsNonlinear simulationsTaylor seriesConvergence analysisConvergence orderEfficiency indexFrechet derivativeHigher efficiencyImproved convergenceLocal analysisMulti step methodsNon-linear equationsTaylor's series expansionIterative methods