Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

27.1 ALGEBRAIC AND TRANSCENDENTAL EQUATIONS


errors introduced as a result of approximations made in setting up the numerical


procedures (truncation errors). For this scale of application, books specifically


devoted to numerical analysis, data analysis and computer programming should


be consulted.


So far as is possible, the method of presentation here is that of indicating

and discussing in a qualitative way the main steps in the procedure, and then


of following this with an elementary worked example. The examples have been


restricted in complexity to a level at which they can be carried out with a pocket


calculator. Naturally it will not be possible for the student to check all the


numerical values presented, unless he or she has a programmable calculator or


computer readily available, and even then it might be tedious to do so. However,


it is advisable to check the initial step and at least one step in the middle of


each repetitive calculation given in the text, so that how the symbolic equations


are used with actual numbers is understood. Clearly the intermediate step should


be chosen to be at a point in the calculation at which the changes are still


sufficiently large that they can be detected by whatever calculating device is


used.


Where alternative methods for solving the same type of problem are discussed,

for example in finding the roots of a polynomial equation, we have usually


taken the same example to illustrate each method. This could give the mistaken


impression that the methods are very restricted in applicability, but it is felt by


the authors that using the same examples repeatedly has sufficient advantages, in


terms of illustrating therelativecharacteristics of competing methods, to justify


doing so. Once the principles are clear, little is to be gained by using new


examples each time, and, in fact, having some prior knowledge of the ‘correct


answer’ should allow the reader to judge the efficiency and dangers of particular


methods as the successive steps are followed through.


One other point remains to be mentioned. Here, in contrast with every other

chapter of this book, the value of a large selection of exercises is not clear cut.


The reader with sufficient computing resources to tackle them can easily devise


algebraic or differential equations to be solved, or functions to be integrated


(which perhaps have arisen in other contexts). Further, the solutions of these


problems will be self-checking, for the most part. Consequently, although a


number of exercises are included, no attempt has been made to test the full range


of ideas treated in this chapter.


27.1 Algebraic and transcendental equations

The problem of finding the real roots of an equation of the formf(x)=0,where


f(x) is an algebraic or transcendental function ofx, is one that can sometimes


be treated numerically, even if explicit solutions in closed form are not feasible.

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