[1] Behl, R., Kanwar, V. and Sharma, K.K. Optimal equi-scaled familie of Jarratt’s method for solving equations, Int. J. Comput. Math. 90 (2013) 408–422.
[2] Cordero, A., Segura, E. and Terregrosa, J.R. Behind Jarratt’s Steps: Is Jarratt’s scheme the Best version of itself?, Discrete Dynamics in Nature and Society, 2013.
[3] Grosan, C. and Abraham, A. A new approach for solving nonlinear equations systems, IEEE Trans. Syst. Man Cybern. A Syst. Hum. 38 (2008) 698–714.
[4] Jarratt, P. Some fourth-order multipoint iterative methods for solving equations, Math. Comput. 20 (1966) 434–437.
[5] Kanwar, V., Kumar, S. and Behl, R. Several new families of Jarratt’s method for for solving systems of nonlinear equations, Appl. Appl. Math. 8 (2013) 701–716.
[6] Lin, Y., Bao, L. and Jia, X. Convergence analysis of a variant of the Newton method for solving nonlinear equations, Comput. Math. Appl. 59 (2010) 2121–2127.
[7] Meintjes, K. and Morgan, A.P. Chemical equilibrium systems as numer-ical test problems, ACM Trans. Math. Softw. 16 (1990) 143–151.
[8] More, J.J. A collection of nonlinear model problems, Computational solution of nonlinear systems of equations (Fort Collins, CO, 1988), 723–762, Lectures in Appl. Math., 26, Amer. Math. Soc., Providence, RI, 1990.
[9] Morgan, A.P. Solving polynomial systems using continuation for scien-tific and engineering problems, Englewood Cliffs, Prentice-Hall, 1987.
[10] Ogbereyivwe, O. and Izevbizua, O. A three-parameter class of power series based iterative method for approximation of nonlinear equations, Iran. J. Numer. Anal. Optim. 13(2) (2023) 157–169.
[11] Ogbereyivwe, O. and Ojo-Orobosa, V. Family of optimal two-step fourth order iterative method and its extension for solving nonlinear equations, J. Interdiscip. Math. 24(5) (2022) 1347–1365.
[12] Ogbereyivwe, O., Umar, S.S. and Izevbizua, O. Some high-order conver-gence modifications of the Housedholder method for nonlinear equations, Commun. Nonlinear Anal. 5 (2023) 1–16.
[13] Ortega, J.M. and Rheinboldt, W.C. Iterative solution of nonlinear equa-tions in several variables, Academic Press, New York, 1970.
[14] Petkovic, M.S. Remarks on “On a general class of multipoint root-finding methods of high computational efficiency” , SIAM J. Numer. Anal. 49(3) (2011) 1317–1319.
[15] Shacham, M. and Kehat, E. An iteration method with memory for the solution of a non-linear equation, Chem. Eng. Sci. 27(11) (1972) 2099–2101.
[16] Sharma, R., Kumar, S. and Singh, H. A new class of derivative-free root solvers with increasing optimal convergence order and their complex dynamics, SeMA J. 80 (2) (2023) 333–352.
[17] Sivakumar, P. and Jayaraman, J. Some new higher order weighted New-ton methods for solving nonlinear equations with applications, Comput. Math. Appl. 24(2) (2023) 59.
[18] Traub. J.F. Iterative methods for the solution of equations, Prentice-Hall, New Jersey, 1964.
[19] Yaseen, S., Zafar, F. and Alsulami, H.A. An efficient Jarratt-type iter-ative method for solving nonlinear Global Positioning System problem, Axioms, 12(6) (2023) 562.