George, S.Bate, I.M, M.Godavarma, C.Senapati, K.2026-02-042024Journal of Complexity, 2024, 83, , pp. -0885064Xhttps://doi.org/10.1016/j.jco.2024.101854https://idr.nitk.ac.in/handle/123456789/20997Ezquerro and Hernandez (2009) studied a modified Chebyshev's method to solve a nonlinear equation approximately in the Banach space setting where the convergence analysis utilizes Taylor series expansion and hence requires the existence of at least fourth-order Fréchet derivative of the involved operator. No error estimate on the error distance was given in their work. In this paper, we obtained the convergence order and error estimate of the error distance without Taylor series expansion. We have made assumptions only on the involved operator and its first and second Fréchet derivative. So, we extend the applicability of the modified Chebyshev's method. Further, we compare the modified Chebyshev method's efficiency index and dynamics with other similar methods. Numerical examples validate the theoretical results. © 2024 Elsevier Inc.Banach spacesErrorsTaylor seriesChebyshevChebyshev's methodsConvergence analysisError distanceError estimatesFatou setsFrechet derivativeJulia setTaylor's expansionTaylor's series expansionNonlinear equations