In this paper, a new fifth-order family of methods free from second derivative is obtained. The new iterative family contains the King’s, which is one of the most well-known family of methods for solving nonlinear equations, and some other known methods as its particular case. To illustrate the efficiency and performance of proposed family, several numerical examples are presented. Numerical results illustrate better efficiency and performance of the presented methods in comparison with the other compared fifth-order methods. Therefore, the proposed family can be effectively used for solving nonlinear equations
In this paper, we want to construct a new high-order and efficient iterative technique for solving a...
In this paper, we present a new family of methods for finding simple roots of nonlinear equations. T...
[[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....
This paper presents a fifth-order iterative method as a new modification of Newton's method for find...
This paper presents a fifth-order iterative method as a new modification of Newton's method for...
In this work, two iterative methods, based on Newton’s method, to obtain the numerical solutions of ...
A three-step iterative method with fifth-order convergence as a new modification of Newton’s method ...
In this paper, we present an efficient Newton-like method with fifth-order convergence for nonlinear...
This paper based on King’s fourth order methods. A class of eighth-order methods is presented for so...
This paper based on King’s fourth order methods. A class of eighth-order methods is presented for so...
Construction of higher-order optimal and globally convergent methods for computing simple roots of n...
Abstract. In this paper, a new technique called variational iteration method-II (VIM-II) is applied ...
AbstractSchröder’s methods of the first and second kind for solving a nonlinear equation f(x)=0, ori...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
In this paper, we want to construct a new high-order and efficient iterative technique for solving a...
In this paper, we present a new family of methods for finding simple roots of nonlinear equations. T...
[[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....
This paper presents a fifth-order iterative method as a new modification of Newton's method for find...
This paper presents a fifth-order iterative method as a new modification of Newton's method for...
In this work, two iterative methods, based on Newton’s method, to obtain the numerical solutions of ...
A three-step iterative method with fifth-order convergence as a new modification of Newton’s method ...
In this paper, we present an efficient Newton-like method with fifth-order convergence for nonlinear...
This paper based on King’s fourth order methods. A class of eighth-order methods is presented for so...
This paper based on King’s fourth order methods. A class of eighth-order methods is presented for so...
Construction of higher-order optimal and globally convergent methods for computing simple roots of n...
Abstract. In this paper, a new technique called variational iteration method-II (VIM-II) is applied ...
AbstractSchröder’s methods of the first and second kind for solving a nonlinear equation f(x)=0, ori...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
In this paper, we want to construct a new high-order and efficient iterative technique for solving a...
In this paper, we present a new family of methods for finding simple roots of nonlinear equations. T...
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...