Fundamentals of Differential Equations (8th Edition)

by: R. Kent Nagle (Author),Edward B. Saff(Author),Arthur David Snider(Author)&1more

Publisher: Pearson

Edition: 8th

Publication Date: 2011/3/31

Language: English

Print Length: 720 pages

ISBN-10: 9780321747730

ISBN-13: 9780321747730

Book Description

Fundamentals of Differential Equations presents the basic theory of differential equations and offers a variety of mode applications in science and engineering. Available in two versions, these flexible texts offer the instructor many choices in syllabus design, course emphasis (theory, methodology, applications, and numerical methods), and in using commercially available computer software. Fundamentals of Differential Equations, Eighth Edition is suitable for a one-semester sophomore- or junior-level course. Fundamentals of Differential Equations with Boundary Value Problems, Sixth Edition, contains enough material for a two-semester course that covers and builds on boundary value problems. The Boundary Value Problems version consists of the main text plus three additional chapters (Eigenvalue Problems and Sturm-Liouville Equations; Stability of Autonomous Systems; and Existence and Uniqueness Theory).

About the Author

Fundamentals of Differential Equations presents the basic theory of differential equations and offers a variety of mode applications in science and engineering. Available in two versions, these flexible texts offer the instructor many choices in syllabus design, course emphasis (theory, methodology, applications, and numerical methods), and in using commercially available computer software. Fundamentals of Differential Equations, Eighth Edition is suitable for a one-semester sophomore- or junior-level course. Fundamentals of Differential Equations with Boundary Value Problems, Sixth Edition, contains enough material for a two-semester course that covers and builds on boundary value problems. The Boundary Value Problems version consists of the main text plus three additional chapters (Eigenvalue Problems and Sturm-Liouville Equations; Stability of Autonomous Systems; and Existence and Uniqueness Theory).