- Used Books
- Staff Picks
- Gifts & Gift Cards
- Sell Books
- Stores & Events
- Let's Talk Books
Special Offers see all
More at Powell's
Recently Viewed clear list
Used Trade Paper
Ships in 1 to 3 days
Other titles in the Schaum's Easy Outlines series:
Schaum's Easy Outline of Calculus, Second Edition (Schaum's Easy Outlines)by Elliott Mendelson
Synopses & Reviews
When you need just the essentials of calculus, this Easy Outlines book is there to help
If you are looking for a quick nuts-and-bolts overview of calculus, its got to be Schaum's Easy Outline. This book is a pared-down, simplified, and tightly focused version of its Schaums Outline cousin, with an emphasis on clarity and conciseness.
Graphic elements such as sidebars, reader-alert icons, and boxed highlights stress selected points from the text, illuminate keys to learning, and give you quick pointers to the essentials.
Topics include: Functions, Sequences, Limits, and Continuity, Differentiation, Maxima and Minima, Differentiation of Special Functions, The Law of the Mean, Indeterminate Forms, Differentials, and Curve Sketching, Fundamental Integration Techniques and Applications, The Definite Integral, Plane Areas by Integration, Improper Integrals, Differentiation Formulas for Common Mathematical Functions, Integration Formulas for Common Mathematical Functions
About the Author
Frank Ayres, Jr., Ph.D. (deceased) was formerly Professor and Head of the Department of Mathematics at Dickinson College, Carlisle, Pennsylvania. He is the coauthor of Schaums Outline of Calculus, Schaums Outline of Trigonometry, and Schaums Outline of Mathematics. Elliott Mendelson (Roslyn, NY) is Professor of Mathematics at Queens College, CUNY. He is the coauthor of Schaums Outline of Calculus and author of Schaums Outline of Beginning Calculus.
Table of Contents
1. Functions, Sequences, Limits, and Continuity; 2. Differentiation; 3. Maxima and Minima; 4. Differentiation of Special Functions; 5. The Law of the Mean, Indeterminate Forms, Differentials, and Curve Sketching; 6. Fundamental Integration Techniques and Applications; 7. The Definite Integral, Plane Areas by Integration, Improper Integrals; Appendix A: Differentiation Formulas for Common Mathematical Functions; Appendix B: Integration Formulas for Common Mathematical Functions; Index
What Our Readers Are Saying
Health and Self-Help » Health and Medicine » General