The Newton-Steffensen’s method is iterative method that using for solving a nonlinear equations
resulting from the modification of the Steffensen’s method. In this paper, the author developed the
Newton-Steffensen’s method written by Sharma [10] using by the quadratic interpolation. Based on the
study results obtained the new iteration equation with six-order convergence that involving five evaluation
functions with efficiency index 1,43097. Besides, numerical simulations performed on some functions with
different initial guess value and obtained that performance of the new method is better than the Newton’s
method, Steffensen’s method and Newton-Steffensen’s method.
Keywords: efficiency index, Newton-Steffensen method, orde of convergence, nonlinear equation

Chun, C., “Some Improvements of Jarrat’s Method with Sixth-order Convergence” , Applied Mathematics and Computation. 2007, 190: 1432 – 1437

Deghan, M. dan Hajarian, M., Some Derivative Free Quadratic and Cubic Convergence Iterative Formulas for Solving Nonlinear Equations, Computational and Applied Mathematics, 2010, 29(1): 19 – 30.

Epperson, J. F., An Introduction to Numerical Methods and Analysis, United States of America: Wiley, 2013,

Hafiz, M. A., Solving Nonlinear Equations Using Steffensen-Type Methods with Optimal Order of Convergence, Palestine Journal of Mathematics, 2014, 3(1): 113 – 119.

Hafiz, M. A dan Bahgat, M. S. M., Solving Nonsmooth Equations Using Family of Derivative-Free Optimal Methods, Journal of the Egyptian Mathematical Society, 2013, 21: 38 – 43.

Hajjah, A., Imran, M. dan Gamal, M.D.H., A Two-step Iterative Method Free from Derivative for Solving Nonlinear Equations, Applied Mathematical Sciences, 2014, 8(161): 8021 – 8027.

Jaiswal, J.P., 2013, “A New Third-order Derivative Free Method for Solving Nonlinier Equations”, Universal Journal of Applied Mathematics, 2013, 1(2), 31 – 135 .

Kou, J. dan Yitian Li, 2007, “An Improvement of the Jarrat Method”, Applied Mathematics and Computatio, No. 189, Hal. 1816-1821.

Liu, Z dan Zheng, Q., A One-step Steffensen-type Method with Super-cubic Convergence for Solving Nonlinear Equations, Procedia Computer Science, 2014, 29: 1870 – 1875.

Sharma, J.R, A Composite Third Order Newton-Steffensen Method for Solving Nonlinier Equations, Applied Mathematics and Computation, 2005, 169 : 242 – 246.

Soleymani, F dan Hosseinabadi, V., New-Third and Sixth-Order Derivative-Free Techniques for Nonlinear Equations, Journal of Mathematics Research, 2011, 3(2): 107 – 112.

Traub, J. F., Iterative Methods for the Solution of Equations, Prentice-Hall, Englewood Cliffs, 1964.