In this paper, we derive and analyze a new one-parameter family of modified Cauchy method free from second derivative for obtaining simple roots of nonlinear equations by using Padé approximant. The convergence analysis of the family is also considered, and the methods have convergence order three. Based on the family of third-order method, in order to increase the order of the convergence, a new optimal fourth-order family of modified Cauchy methods is obtained by using weight function. We also perform some numerical tests and the comparison with existing optimal fourth-order methods to show the high computational efficiency of the proposed scheme, which confirm our theoretical results. The basins of attraction of this optimal fourth-order...
In this paper, we present many new one-parameter families of classical Rall’s method (modified Newto...
[EN] There is a few number of optimal fourth-order iterative methods for obtaining the multiple root...
We develop a new families of optimal eight--order methods for solving nonlinear equations. We also e...
AbstractIn this paper, we present some variants of Cauchy's method for solving non-linear equations....
We present and analyze some variants of Cauchy's methods free from second derivative for obtaining s...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
We present a new fourth order method for finding simple roots of a nonlinear equation f(x)=0. In ter...
A new family of two-steps fourth-order iterative methods for solving nonlinear equations is introduc...
[EN] There are few optimal fourth-order methods for solving nonlinear equations when the multiplicit...
AbstractIn this paper, a new fourth-order family of methods free from second derivative is obtained....
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...
A new parametric family of iterative schemes for solving nonlinear systems is presented. Fourth-orde...
In this paper, a few single-step iterative methods, including classical Newton’s method and Ha...
[[abstract]]In this paper, we derive a one-parameter family of Chebyshev’s method for finding simple...
We develop a family of fourth-order iterative methods using the weighted harmonic mean of two deriva...
In this paper, we present many new one-parameter families of classical Rall’s method (modified Newto...
[EN] There is a few number of optimal fourth-order iterative methods for obtaining the multiple root...
We develop a new families of optimal eight--order methods for solving nonlinear equations. We also e...
AbstractIn this paper, we present some variants of Cauchy's method for solving non-linear equations....
We present and analyze some variants of Cauchy's methods free from second derivative for obtaining s...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
We present a new fourth order method for finding simple roots of a nonlinear equation f(x)=0. In ter...
A new family of two-steps fourth-order iterative methods for solving nonlinear equations is introduc...
[EN] There are few optimal fourth-order methods for solving nonlinear equations when the multiplicit...
AbstractIn this paper, a new fourth-order family of methods free from second derivative is obtained....
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...
A new parametric family of iterative schemes for solving nonlinear systems is presented. Fourth-orde...
In this paper, a few single-step iterative methods, including classical Newton’s method and Ha...
[[abstract]]In this paper, we derive a one-parameter family of Chebyshev’s method for finding simple...
We develop a family of fourth-order iterative methods using the weighted harmonic mean of two deriva...
In this paper, we present many new one-parameter families of classical Rall’s method (modified Newto...
[EN] There is a few number of optimal fourth-order iterative methods for obtaining the multiple root...
We develop a new families of optimal eight--order methods for solving nonlinear equations. We also e...