This article introduces a novel approach resulting from the adaptation of Trapezoidal-Newton method variants. The iterative process is enhanced through the incorporation of a numerical integral strategy derived from two-partition Trapezoidal method. Through rigorous error analysis, the study establishes a third order convergence for this method. It emerges as a viable alternative for solving nonlinear equations, a conclusion substantiated by computational costs conducted on diverse nonlinear equation forms. Furthermore, an exploration of basin of attraction analyses that this method exhibits faster convergence compared to other Newton-type methods, albeit with a slightly expanded divergent region with a variant of Newton Simpson’s method
The iterative problem of solving nonlinear equations is studied. A new Newton like iterative method ...
Fundamental insight into the solution of systems of nonlinear equations was provided by Powell. It w...
In this work we introduce a technique for solving nonlinear systems that improves the order of conve...
This study has been discussed a trapezoidal iterated method for estimating a single root of nonlinea...
In this paper, we suggest and analyze two new predictor-corrector iterative methods with third and n...
An alternative strategy for solving systems of nonlinear equations when the classical Newton's metho...
Finding roots of equations is at the heart of most computational science. A well-known and widely us...
Finding roots of equations is at the heart of most computational science. A well-known and widely us...
Nonlinear equations are known to be difficult to solve, and numerical methods are used to solve syst...
We have made an effort to design an accurate numerical strategy to be applied in the vast computing ...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
A nonlinear system of equations is said to be reducible if it can be divided into m blocks (m>1) in ...
Iterative methods have been a very important area of study in numerical analysis since the inception...
In this paper , an efficient new procedure is proposed to modify third –order iterative method obtai...
Nonlinear algebraic equations (NAEs) occur in many areas of science and engineering. The process of ...
The iterative problem of solving nonlinear equations is studied. A new Newton like iterative method ...
Fundamental insight into the solution of systems of nonlinear equations was provided by Powell. It w...
In this work we introduce a technique for solving nonlinear systems that improves the order of conve...
This study has been discussed a trapezoidal iterated method for estimating a single root of nonlinea...
In this paper, we suggest and analyze two new predictor-corrector iterative methods with third and n...
An alternative strategy for solving systems of nonlinear equations when the classical Newton's metho...
Finding roots of equations is at the heart of most computational science. A well-known and widely us...
Finding roots of equations is at the heart of most computational science. A well-known and widely us...
Nonlinear equations are known to be difficult to solve, and numerical methods are used to solve syst...
We have made an effort to design an accurate numerical strategy to be applied in the vast computing ...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
A nonlinear system of equations is said to be reducible if it can be divided into m blocks (m>1) in ...
Iterative methods have been a very important area of study in numerical analysis since the inception...
In this paper , an efficient new procedure is proposed to modify third –order iterative method obtai...
Nonlinear algebraic equations (NAEs) occur in many areas of science and engineering. The process of ...
The iterative problem of solving nonlinear equations is studied. A new Newton like iterative method ...
Fundamental insight into the solution of systems of nonlinear equations was provided by Powell. It w...
In this work we introduce a technique for solving nonlinear systems that improves the order of conve...