In this paper, we deal with the study of convergence analysis of modified parameter based family of second derivative free continuation method for solving nonlinear equations. We obtain the order of convergence is at least five and especially, for parameter (Formula presented.) sixth order convergence. Some application such as Max Planck’s conservative law, multi-factor effect are discussed and demonstrate the efficiency and performance of the new method (for (Formula presented.)). We compare the absolutely value of function at each iteration (Formula presented.) and (Formula presented.) with our method and Potra and Pták method , Kou et al. method . We observed that our method is more efficient than existing methods. Also, the Dynamics of the method are studied for a special case of the parameter in convergence. © 2018 Springer International Publishing AG, part of Springer Nature
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P. Maroju, Magreñán, Á. A., Motsa, S. S., and Sarría, Í., “Second derivative free sixth order continuation method for solving nonlinear equations with applications”, Journal of Mathematical Chemistry, pp. 1-18, 2018.