In this paper, we propose a three step algorithm using Householder’s method for finding an approximate root of the given non-linear equations in one variable. Several numerical examples are presented to illustrate and validation of the proposed method. Implementation of the proposed algorithm in Maple is also discussed with sample computations
AbstractIn this paper we consider a nonlinear equation f(x)=0 having finitely many roots in a bounde...
The place of numerical approaches in determining the roots of polynomials cannot be overlooked. This...
AbstractT. Ojika, S. Watanabe, and T. Mitsui (in preparation) have been developing a subroutine pack...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...
In this paper, we have developod an Algorithm of Difference Operator for finding the root of nonline...
Abstract Objectives The present paper describes a new algorithm to find a root of non-linear transce...
Abstract Objective In this paper, we develop a new root-finding algorithm to solve the given non-lin...
The paper describes a new technique for finding real roots of both algebraic and transcendental non-...
In this study, a new root-finding method for solving nonlinear equations is proposed. This method re...
Presently a direct analytical method is available for the digit-by-digit extraction of the square ro...
Abstract In this article, we construct a family of iterative methods for finding a single root of no...
In numerical methods, finding the root of an equation involves iterations to find an estimated root ...
This study deals with the Newton-type numerical method to estimating a single root of nonlinear equa...
This paper is dedicated to the study of continuous Newton’s method, which is a generic differential ...
This paper is dedicated to the study of continuous Newton's method, which is a generic differential ...
AbstractIn this paper we consider a nonlinear equation f(x)=0 having finitely many roots in a bounde...
The place of numerical approaches in determining the roots of polynomials cannot be overlooked. This...
AbstractT. Ojika, S. Watanabe, and T. Mitsui (in preparation) have been developing a subroutine pack...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...
In this paper, we have developod an Algorithm of Difference Operator for finding the root of nonline...
Abstract Objectives The present paper describes a new algorithm to find a root of non-linear transce...
Abstract Objective In this paper, we develop a new root-finding algorithm to solve the given non-lin...
The paper describes a new technique for finding real roots of both algebraic and transcendental non-...
In this study, a new root-finding method for solving nonlinear equations is proposed. This method re...
Presently a direct analytical method is available for the digit-by-digit extraction of the square ro...
Abstract In this article, we construct a family of iterative methods for finding a single root of no...
In numerical methods, finding the root of an equation involves iterations to find an estimated root ...
This study deals with the Newton-type numerical method to estimating a single root of nonlinear equa...
This paper is dedicated to the study of continuous Newton’s method, which is a generic differential ...
This paper is dedicated to the study of continuous Newton's method, which is a generic differential ...
AbstractIn this paper we consider a nonlinear equation f(x)=0 having finitely many roots in a bounde...
The place of numerical approaches in determining the roots of polynomials cannot be overlooked. This...
AbstractT. Ojika, S. Watanabe, and T. Mitsui (in preparation) have been developing a subroutine pack...