Newton's Method

Versión 1.0.0.0 (9,17 KB) por Farhad Sedaghati
Newton's Method to find the roots of a polynomial
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This function can be used to perform Newton-Raphson method to detect the root of a polynomial. It starts from an initial guess by user and iterates until satisfy the required convergence criterion.
It should be noted that the “root” function in the MATLAB library can find all the roots of a polynomial with arbitrary order. But this method, gives the one the roots based on the initial guess and it gives the number of iteration required to converge.
% Example:
% f(x)=(x^3)-6(X^2)-72(x)-27=0
% therefore
% vector=[1 -6 -72 -27]
% initial=300;
% tolerance=10^-2;
% maxiteration=10^4;
% [root,number_of_iteration] = newton(vector,initial,tolerance,maxiteration)
% or
% [root,number_of_iteration] = newton([1 -6 -72 -27],300,10^-2,10^4)
% root=
% 12.1229
% number_of_iteration=
% 13
% This means that the detected root based on the initial
% guess (300) is 12.1229 and it converges after 13 iterations.

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Farhad Sedaghati (2024). Newton's Method (https://www.mathworks.com/matlabcentral/fileexchange/52362-newton-s-method), MATLAB Central File Exchange. Recuperado .

Compatibilidad con la versión de MATLAB
Se creó con R2013a
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Más información sobre Polynomials en Help Center y MATLAB Answers.
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Newton's Method to find the roots of a polynomail/

Versión Publicado Notas de la versión
1.0.0.0

Updated description
Updated description