AbstractIn this work, we develop a new two-parameter family of iterative methods for solving nonlinear scalar equations. One of the parameters is defined through an infinite power series consisting of real coefficients while the other parameter is a real number. The methods of the family are fourth-order convergent and require only three evaluations during each iteration. It is shown that various fourth-order iterative methods in the published literature are special cases of the developed family. Convergence analysis shows that the methods of the family are fourth-order convergent which is also verified through the numerical work. Computations are performed to explore the efficiency of various methods of the family
We develop a family of fourth-order iterative methods using the weighted harmonic mean of two deriva...
In this paper, we suggest and analyze two new algorithm of fourth and fifth order convergence. We re...
We present a new fourth order method for finding simple roots of a nonlinear equation f(x)=0. In ter...
AbstractIn this work, we develop a new two-parameter family of iterative methods for solving nonline...
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...
AbstractIn this paper, a new fourth-order family of methods free from second derivative is obtained....
Abstract – In this paper, we suggest an iterative method of order four for solving nonlinear equatio...
The object of the present work is to give the new class of third- and fourth-order iterative methods...
In this paper, we want to construct a new high-order and efficient iterative technique for solving a...
AbstractIn this paper, we investigate the construction of some two-step without memory iterative cla...
Two new algorithms of fourth and fifth order convergence have been introduced. We have used Modified...
A new family of two-steps fourth-order iterative methods for solving nonlinear equations is introduc...
In this paper, we present some new modification of Newton’s method for solving nonlinear equations. ...
The family of fourth-order Steffensen-type methods proposed by Zheng et al. (Appl. Math. Comput. 217...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
We develop a family of fourth-order iterative methods using the weighted harmonic mean of two deriva...
In this paper, we suggest and analyze two new algorithm of fourth and fifth order convergence. We re...
We present a new fourth order method for finding simple roots of a nonlinear equation f(x)=0. In ter...
AbstractIn this work, we develop a new two-parameter family of iterative methods for solving nonline...
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...
AbstractIn this paper, a new fourth-order family of methods free from second derivative is obtained....
Abstract – In this paper, we suggest an iterative method of order four for solving nonlinear equatio...
The object of the present work is to give the new class of third- and fourth-order iterative methods...
In this paper, we want to construct a new high-order and efficient iterative technique for solving a...
AbstractIn this paper, we investigate the construction of some two-step without memory iterative cla...
Two new algorithms of fourth and fifth order convergence have been introduced. We have used Modified...
A new family of two-steps fourth-order iterative methods for solving nonlinear equations is introduc...
In this paper, we present some new modification of Newton’s method for solving nonlinear equations. ...
The family of fourth-order Steffensen-type methods proposed by Zheng et al. (Appl. Math. Comput. 217...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
We develop a family of fourth-order iterative methods using the weighted harmonic mean of two deriva...
In this paper, we suggest and analyze two new algorithm of fourth and fifth order convergence. We re...
We present a new fourth order method for finding simple roots of a nonlinear equation f(x)=0. In ter...