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A First Course in Differential Equations: The Classic Fifth Edition | 
 enlarge | Author: Dennis G. Zill
Publisher: Brooks Cole
Category: Book
List Price: $171.95
Buy New: $84.13
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New (27) Used (25) from $63.69
Rating:  4 reviews
Sales Rank: 380548
Media: Hardcover
Edition: 5
Number Of Items: 1
Pages: 544
Shipping Weight (lbs): 2.6
Dimensions (in): 9.9 x 8 x 1.1
ISBN: 0534373887
Dewey Decimal Number: 515.35
EAN: 9780534373887
Publication Date: December 8, 2000
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Shipping: International shipping available
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Product Description
The CLASSIC EDITION of Zill's respected book was designed for instructors who prefer not to emphasize technology, modeling, and applications, but instead want to focus on fundamental theory and techniques. Zill's CLASSIC EDITION, a reissue of the fifth edition, offers his excellent writing style, a flexible organization, an accessible level of presentation, and a wide variety of examples and exercises, all of which make it easy to teach from and easy for readers to understand and use.
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| Customer Reviews:
 A good text on ordinary differential equations with good examples December 7, 2007
2 out of 2 found this review helpful
This particular textbook concerns ordinary differential equations. There are plenty of examples, and they are worked in steps that should make the solution strategy clear to any student with at least two previous semesters of calculus. One of the unusual features of the book are essays written by mathematicians present at the end of chapters 3, 4, 5, and 9. Each essay concerns applications of concepts learned in the previous chapter. The book is well illustrated, and motivations for study are included by making the examples solve practical problems such as the charge on a capacitor, solving orthogonal trajectories of the family of a rectangular hyperbola, or even determining the half-life of a radioactive substance. This makes it ideal for engineering students. There are numerous exercises at the end of each chapter and the solutions to odd numbered problems can be found in the back of the book. The following is the table of contents:
1. INTRODUCTION TO DIFFERENTIAL EQUATIONS
Basic Definitions and Terminology / Some Mathematical Models / Review / Exercises
2. FIRST-ORDER DIFFERENTIAL EQUATIONS
Preliminary Theory / Separable Variables / Homogeneous Equations / Exact Equations / Linear Equations / Equations of Bernoulli, Ricatti, and Clairaut / Substitutions / Picard's Method / Review / Exercises
3. APPLICATIONS OF FIRST-ORDER DIFFERENTIAL EQUATIONS
Orthogonal Trajectories / Applications of Linear Equations / Applications of Nonlinear Equations / Review / Exercises / Essay: Population Dynamics
4. LINEAR DIFFERENTIAL EQUATIONS OF HIGHER-ORDER
Preliminary Theory / Constructing a Second Solution from a Know Solution / Homogeneous Linear Equations with Constant Coefficients / Undetermined Coefficients: Superposition Approach / Differential Operators / Undetermined Coefficients: Annihilator Approach / Variation of Parameters / Review / Exercises / Essay: Chaos
5. APPLICATIONS OF SECOND-ORDER DIFFERENTIAL EQUATIONS: VIBRATIONAL MODELS
Simple Harmonic Motion / Damped Motion / Forced Motion / Electric Circuits and Other Analogous Systems / Review / Exercises / Essay: Tacoma Narrows Suspension Bridge Collapse
6. DIFFERENTIAL EQUATIONS WITH VARIABLE COEFFICIENTS
Cauchy-Euler Equation / Review of Power Series; Power Series Solutions / Solutions About Ordinary Points / Solutions About Singular Points / Two Special Equations / Review / Exercises
7. LAPLACE TRANSFORM
Laplace Transform / Inverse Transform / Translation Theorems and Derivatives of a Transform / Transforms of Derivatives, Integrals, and Periodic Functions / Applications / Dirac Delta Function / Review / Exercises
8. SYSTEMS OF LINEAR DIFFERENTIAL EQUATIONS
Operator Method / Laplace Transform Method / Systems of Linear First-Order Equations / Introduction to Matrices / Matrices and Systems of Linear First-Order Equations / Homogeneous Linear Systems / Undetermined Coefficients / Variation of Parameters / Matrix Exponential / Review / Exercises
9. NUMERICAL METHODS FOR ORDINARY DIFFERENTIAL EQUATIONS
Direction Fields / The Euler Methods / The Three-Term Taylor Method / The Runge-Kutta Methods / Multistep Methods / Errors and Stability / Higher-Order Equations and Systems / Second-Order Boundary-Value Problems / Review / Exercises / Essay: Nerve Impulse Models / APPENDIX I: GAMMA FUNCTION / APPENDIX II: LAPLACE TRANSFORMS / APPENDIX III: REVIEW OF DETERMINANTS / APPENDIX IV: COMPLEX NUMBERS / ANSWERS TO ODD-NUMBERED PROBLEMS
I had a good deal on this text boook March 12, 2007
0 out of 3 found this review helpful
It was at a good price, and also it was what I was looking for.
Beware of the "Example" Problems October 4, 2006
1 out of 2 found this review helpful
Overall, the textbook is decent. However, when it comes to reading the example problems in the text, one can, and probably will, become very confused. In my opinion, the purpose of an example problem in the text is to completely break down all the steps towards finding the solution to the problem for the reader, especially one that is a first-timer in DE. This book fails to do so. As a first-timer in DE, I became more confused reading the example problems than I was when perusing the text. The explanations were neither lucid nor thorough enough for my liking. But do not be discouraged first-timers! It is possible to earn your A using this textbook. With the right amount of motivation and study sessions, your A will come. If I could get an A in this class as a college freshman, then anyone could.
 too much theory June 6, 2003
2 out of 12 found this review helpful
they prove EVERY single theorem in the most grating way... good chapters on applications though.
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