The problem of obtaining optimal starting values for the calculation of square root using Newton-Raphson's Method is considered. This paper presents the best starting values theory in order to optimize the maximum absolute error after a given number of iterations. Two different methods are shown, and a third, which can be considered as a mixture of the previous two, is briefly discussed. The approach combines analytical and numerical methodologies, which gives more interesting results on the main characteristics of the behavior of the absolute error for different initializations. A comparison table between the traditional optimal relative error results and the absolute error ones is provided
In this lesson you'll learn about how to apply Newton Raphson Root finding Technique to find Minimum...
Includes bibliographical references.Includes illustrations.The application of Newton's Method to det...
An introduction to the Newton-Raphson method for finding a numerical solution of f(x) = 0, explainin...
We aim at finding the best possible seed values when computing reciprocals, square-roots and square-...
(eng) We aim at finding the best possible seed values when computing reciprocals, square-roots and s...
Many problems in mathematics or statistics involve, at some point or another, solving an equation fo...
The initial value of Newton - Raphson method has been used the bisection method.In the present paper...
Adresse de la revue : http://www.elsevier.com/wps/find/journaldescription.cws_home/505625/descriptio...
Abstract: New iterative algorithms for finding the nth root of a positive number m, to any degree of...
The initialization of equation-based differential-algebraic system models, and more in general the s...
Abstract The square root operation is indispensable in a myriad of computational science and enginee...
Rationale- For this project I chose to research and analyse the Newton-Raphson method, where calculu...
This paper describes a study of a class of algorithms for the floating-point divide and square root ...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...
AbstractWe aim at finding the best possible seed values when computing a1/p using the Newton–Raphson...
In this lesson you'll learn about how to apply Newton Raphson Root finding Technique to find Minimum...
Includes bibliographical references.Includes illustrations.The application of Newton's Method to det...
An introduction to the Newton-Raphson method for finding a numerical solution of f(x) = 0, explainin...
We aim at finding the best possible seed values when computing reciprocals, square-roots and square-...
(eng) We aim at finding the best possible seed values when computing reciprocals, square-roots and s...
Many problems in mathematics or statistics involve, at some point or another, solving an equation fo...
The initial value of Newton - Raphson method has been used the bisection method.In the present paper...
Adresse de la revue : http://www.elsevier.com/wps/find/journaldescription.cws_home/505625/descriptio...
Abstract: New iterative algorithms for finding the nth root of a positive number m, to any degree of...
The initialization of equation-based differential-algebraic system models, and more in general the s...
Abstract The square root operation is indispensable in a myriad of computational science and enginee...
Rationale- For this project I chose to research and analyse the Newton-Raphson method, where calculu...
This paper describes a study of a class of algorithms for the floating-point divide and square root ...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...
AbstractWe aim at finding the best possible seed values when computing a1/p using the Newton–Raphson...
In this lesson you'll learn about how to apply Newton Raphson Root finding Technique to find Minimum...
Includes bibliographical references.Includes illustrations.The application of Newton's Method to det...
An introduction to the Newton-Raphson method for finding a numerical solution of f(x) = 0, explainin...