Abstract
In this paper, we propose a simple modification over Chun's method for constructing iterative methods with at least cubic convergence [5]. Using iteration formulas of order two, we now obtain several new interesting families of cubically or quartically convergent iterative methods. The fourth-order family of Ostrowski's method is the main finding of the present work. Per iteration, this family of Ostrowski's method requires two evaluations of the function and one evaluation of its first-order derivative. Therefore, the efficiency index of this Ostrowski's family is E = 3 root 4 approximate to 1.587, which is better than those of most third-order iterative methods E = 3 root 3 approximate to 1.442 and Newton's method E = 2 root approximate to 1.414. The performance of Ostrowski's family is compared with its closest competitors, namely Ostrowski's method, Jarratt's method and King's family in a series of numerical experiments. (C) 2011 Elsevier Ltd. All rights reserved.