Nonlinear systems is one of the mathematical models that is commonly used in the engineering and science fields and it is quite complicated to determine the root especially when the problem is singular. This study is conducted in order to study the performance of Broyden’s and Thomas’ method, which are parts of Quasi-Newton method in solving singular nonlinear systems. By applying the algorithm of each methods, we conduct the calculation to achieve the approximate solutions. MATLAB software is used to compute and present the solutions. Some of useful test problems would describe the properties and usage of the methods. Hence, both methods that have been considered in this study give well approximate solution but Thomas’ method gives better ...
A new iterative method based on the quasi-Newton approach for solving systems of nonlinear equations...
This article discusses a new method for finding roots of nonlinear equations. The process of formin...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...
Nonlinear systems is one of the mathematical models that is commonly used in the engineering and sci...
Broyden’s method is a quasi-Newton iterative method used to find roots of non-linear systems of equa...
We suggested a Broyden's-Like method in which the Jacobian of the system has some special structure...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
In this study, we suggest and analyze a new and wide general class of Jarratt’s method for solving s...
summary:We propose a new Broyden method for solving systems of nonlinear equations, which uses the f...
We propose in this paper a Broyden- like method using the trapezoidal rule to solve system of nonli...
U ovome radu ukratko smo se upoznali s Newtonovom metodom tangente i metodom sekante za rješavanje n...
Nonlinear equations /systems appear in most science and engineering models. For example, when solvin...
AbstractThe Behavior of the Newton-Raphson method at the singular roots has been studied by a number...
This paper presents a survey on recent applications of quasi-Newton methods to solve nonlinear syste...
This paper presents Quasi Newton’s (QN) approach for solving fuzzy nonlinear equations. The method c...
A new iterative method based on the quasi-Newton approach for solving systems of nonlinear equations...
This article discusses a new method for finding roots of nonlinear equations. The process of formin...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...
Nonlinear systems is one of the mathematical models that is commonly used in the engineering and sci...
Broyden’s method is a quasi-Newton iterative method used to find roots of non-linear systems of equa...
We suggested a Broyden's-Like method in which the Jacobian of the system has some special structure...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
In this study, we suggest and analyze a new and wide general class of Jarratt’s method for solving s...
summary:We propose a new Broyden method for solving systems of nonlinear equations, which uses the f...
We propose in this paper a Broyden- like method using the trapezoidal rule to solve system of nonli...
U ovome radu ukratko smo se upoznali s Newtonovom metodom tangente i metodom sekante za rješavanje n...
Nonlinear equations /systems appear in most science and engineering models. For example, when solvin...
AbstractThe Behavior of the Newton-Raphson method at the singular roots has been studied by a number...
This paper presents a survey on recent applications of quasi-Newton methods to solve nonlinear syste...
This paper presents Quasi Newton’s (QN) approach for solving fuzzy nonlinear equations. The method c...
A new iterative method based on the quasi-Newton approach for solving systems of nonlinear equations...
This article discusses a new method for finding roots of nonlinear equations. The process of formin...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...