Numerical Methods for Roots of Polynomials

This book PDF is perfect for those who love Mathematics genre, written by J.M. McNamee and published by Newnes which was released on 19 July 2013 with total hardcover pages 728. You could read this book directly on your devices with pdf, epub and kindle format, check detail and related Numerical Methods for Roots of Polynomials books below.

Numerical Methods for Roots of Polynomials
Author : J.M. McNamee
File Size : 42,8 Mb
Publisher : Newnes
Language : English
Release Date : 19 July 2013
ISBN : 9780080931432
Pages : 728 pages
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Numerical Methods for Roots of Polynomials by J.M. McNamee Book PDF Summary

Numerical Methods for Roots of Polynomials - Part II along with Part I (9780444527295) covers most of the traditional methods for polynomial root-finding such as interpolation and methods due to Graeffe, Laguerre, and Jenkins and Traub. It includes many other methods and topics as well and has a chapter devoted to certain modern virtually optimal methods. Additionally, there are pointers to robust and efficient programs. This book is invaluable to anyone doing research in polynomial roots, or teaching a graduate course on that topic. First comprehensive treatment of Root-Finding in several decades with a description of high-grade software and where it can be downloaded Offers a long chapter on matrix methods and includes Parallel methods and errors where appropriate Proves invaluable for research or graduate course

Numerical Methods for Roots of Polynomials

Numerical Methods for Roots of Polynomials - Part II along with Part I (9780444527295) covers most of the traditional methods for polynomial root-finding such as interpolation and methods due to Graeffe, Laguerre, and Jenkins and Traub. It includes many other methods and topics as well and has a chapter devoted to

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Numerical Methods for Roots of Polynomials   Part I

Numerical Methods for Roots of Polynomials - Part I (along with volume 2 covers most of the traditional methods for polynomial root-finding such as Newton’s, as well as numerous variations on them invented in the last few decades. Perhaps more importantly it covers recent developments such as Vincent’s method,

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Numerical Methods for Roots of Polynomials   Part II

Download or read online Numerical Methods for Roots of Polynomials Part II written by J.M. McNamee,V.Y. Pan, published by Elsevier Inc. Chapters which was released on 2013-07-19. Get Numerical Methods for Roots of Polynomials Part II Books now! Available in PDF, ePub and Kindle.

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Numerical Methods for Roots of Polynomials   Part II

The zeros of a polynomial can be readily recovered from its linear factors. The linear factors can be approximated by first splitting a polynomial numerically into the product of its two nonconstant factors and then recursively splitting every computed nonlinear factor in similar fashion. For both the worst and average

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Numerical Methods for Roots of Polynomials

This book (along with volume 2 covers most of the traditional methods for polynomial root-finding such as Newtons, as well as numerous variations on them invented in the last few decades. Perhaps more importantly it covers recent developments such as Vincents method, simultaneous iterations, and matrix methods. There is an extensive

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Numerical Methods for Roots of Polynomials   Part II

We consider proofs that every polynomial has one zero (and hence n) in the complex plane. This was proved by Gauss in 1799, although a flaw in his proof was pointed out and fixed by Ostrowski in 1920, whereas other scientists had previously made unsuccessful attempts. We give details of Gauss’ fourth (

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Numerical Methods for Roots of Polynomials   Part II

This chapter treats several topics, starting with Bernoulli’s method. This method iteratively solves a linear difference equation whose coefficients are the same as those of the polynomial. The ratios of successive iterates tends to the root of largest magnitude. Special versions are used for complex and/or multiple roots.

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Numerical Methods for Roots of Polynomials   Part II

We deal here with low-degree polynomials, mostly closed-form solutions. We describe early and modern solutions of the quadratic, and potential errors in these. Again we give the early history of the cubic, and details of Cardan’s solution and Vieta’s trigonometric approach. We consider the discriminant, which decides what

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