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Adkins / Davidson

Ordinary Differential Equations

2012 2015. Buch. xiii, 799 S.: 121 s/w-Abbildungen, 28 s/w-Tabelle, Bibliographien. Softcover
Springer ISBN 978-1-4899-8767-9
Format (B x L): 15,5 x 23,5 cm
Gewicht: 1229 g
In englischer Sprache
Das Werk ist Teil der Reihe:
Unlike most texts in differential equations, this textbook gives an early presentation of the Laplace transform, which is then used to motivate and develop many of the remaining differential equation concepts for which it is particularly well suited. For example, the standard solution methods for constant coefficient linear differential equations are immediate and simplified, and solution methods for constant coefficient systems are streamlined. By introducing the Laplace transform early in the text, students become proficient in its use while at the same time learning the standard topics in differential equations. The text also includes proofs of several important theorems that are not usually given in introductory texts. These include a proof of the injectivity of the Laplace transform and a proof of the existence and uniqueness theorem for linear constant coefficient differential equations.

Along with its unique traits, this text contains all the topics needed for a standard three- or four-hour, sophomore-level differential equations course for students majoring in science or engineering. These topics include: first order differential equations, general linear differential equations with constant coefficients, second order linear differential equations with variable coefficients, power series methods, and linear systems of differential equations. It is assumed that the reader has had the equivalent of a one-year course in college calculus.

Audience

Upper undergraduate

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Webcode: beck-shop.de/bhuzlf
Contains numerous helpful examples and exercises that provide motivation for the reader Presents the Laplace transform early in the text and uses it to motivate and develop solution methods for differential equations Takes a streamlined approach to linear systems of differential equations Protected instructor solution manual is available on springer.com