AbstractIn this paper, based on Ostrowski’s method, a new family of eighth-order methods for solving nonlinear equations is derived. In terms of computational cost, each iteration of these methods requires three evaluations of the function and one evaluation of its first derivative, so that their efficiency indices are 1.682, which is optimal according to Kung and Traub’s conjecture. Numerical comparisons are made to show the performance of the new family
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
ABSTRACT. In this note, we present an eighth-order derivative-free family of itera-tive methods for ...
This paper based on King’s fourth order methods. A class of eighth-order methods is presented for so...
In this paper, based on Ostrowski's method, a new family of eighth-order methods for solving nonline...
In this paper, a new family of optimal eighth-order iterative methods are presented. The new family ...
AbstractA family of eighth-order iterative methods for the solution of nonlinear equations is presen...
Abstract In this paper we established a new eighth-order iterative method, consisting of three steps...
AbstractIn this paper, we derive a new family of eighth-order methods for obtaining simple roots of ...
The prime objective of this paper is to design a new family of optimal eighth-order iterative method...
The primary goal of this work is to provide a general optimal three-step class of iterative methods ...
AbstractIn this paper, three new families of eighth-order iterative methods for solving simple roots...
Abstract. In this paper, modification of Steffensen’s method with eight-order convergence is present...
In this paper, we derive a new family of eighth-order methods for obtaining simple roots of nonlinea...
We propose a family of eighth-order iterative methods without memory for solving nonlinear equations...
We develop a new families of optimal eight--order methods for solving nonlinear equations. We also e...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
ABSTRACT. In this note, we present an eighth-order derivative-free family of itera-tive methods for ...
This paper based on King’s fourth order methods. A class of eighth-order methods is presented for so...
In this paper, based on Ostrowski's method, a new family of eighth-order methods for solving nonline...
In this paper, a new family of optimal eighth-order iterative methods are presented. The new family ...
AbstractA family of eighth-order iterative methods for the solution of nonlinear equations is presen...
Abstract In this paper we established a new eighth-order iterative method, consisting of three steps...
AbstractIn this paper, we derive a new family of eighth-order methods for obtaining simple roots of ...
The prime objective of this paper is to design a new family of optimal eighth-order iterative method...
The primary goal of this work is to provide a general optimal three-step class of iterative methods ...
AbstractIn this paper, three new families of eighth-order iterative methods for solving simple roots...
Abstract. In this paper, modification of Steffensen’s method with eight-order convergence is present...
In this paper, we derive a new family of eighth-order methods for obtaining simple roots of nonlinea...
We propose a family of eighth-order iterative methods without memory for solving nonlinear equations...
We develop a new families of optimal eight--order methods for solving nonlinear equations. We also e...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
ABSTRACT. In this note, we present an eighth-order derivative-free family of itera-tive methods for ...
This paper based on King’s fourth order methods. A class of eighth-order methods is presented for so...