Introduction to Ordinary Differential Equations with Mathematica®: Solutions Manual
ISBN-13:
9780387982328
ISBN-10:
0387982329
Edition:
1
Author:
Alfred Gray, Mark Pinsky, Mike Mezzino
Publication date:
1998
Publisher:
Springer
Format:
Paperback
545 pages
Category:
Computer Science
,
Graphics & Multimedia
,
Programming
,
Mathematical Analysis
,
Mathematics
,
Pure Mathematics
FREE US shipping
Book details
ISBN-13:
9780387982328
ISBN-10:
0387982329
Edition:
1
Author:
Alfred Gray, Mark Pinsky, Mike Mezzino
Publication date:
1998
Publisher:
Springer
Format:
Paperback
545 pages
Category:
Computer Science
,
Graphics & Multimedia
,
Programming
,
Mathematical Analysis
,
Mathematics
,
Pure Mathematics
Summary
Introduction to Ordinary Differential Equations with Mathematica®: Solutions Manual (ISBN-13: 9780387982328 and ISBN-10: 0387982329), written by authors
Alfred Gray, Mark Pinsky, Mike Mezzino, was published by Springer in 1998.
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Description
The purpose of this companion volume to our text is to provide instructors (and eventu ally students) with some additional information to ease the learning process while further documenting the implementations of Mathematica and ODE. In an ideal world this volume would not be necessary, since we have systematically worked to make the text unambiguous and directly useful, by providing in the text worked examples of every technique which is discussed at the theoretical level. However, in our teaching we have found that it is helpful to have further documentation of the various solution techniques introduced in the text. The subject of differential equations is particularly well-suited to self-study, since one can always verify by hand calculation whether or not a given proposed solution is a bona fide solution of the differential equation and initial conditions. Accordingly, we have not reproduced the steps of the verification process in every case, rather content with the illustration of some basic cases of verification in the text. As we state there, students are strongly encouraged to verify that the proposed solution indeed satisfies the requisite equation and supplementary conditions.
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