Vector Calculus (Textbooks in Mathematics)
Author: Steven G. Krantz (Author), Harold Parks (Author)
Publisher finelybook 出版社: Chapman and Hall/CRC
Edition 版次: 1st
Publication Date 出版日期: 2024-05-28
Language 语言: English
Print Length 页数: 659 pages
ISBN-10: 1032302666
ISBN-13: 9781032302669
Book Description
Using meaningful examples, credible applications, and incisive technology, Vector Ca1culus strives to empower students, enhance their critical thinking skills, and equip them with the knowledge and skills to succeed in the major or discipline they ultimately choose to study. This text is intended to be a cornerstone of that process. An engaging style and clear writing make the language of mathematics accessible, understandable, and enjoyable, with a high standard for mathematical rigor.
A calculus book must tell the truth. This book is carefully written in the accepted language of mathematics in a readable exposition. It includes useful and fascinating applications, acquaints students with the history of the subject, and offers a sense of what mathematics is all about.
Technique is presented, yet so are ideas. The authors help students to master basic methods and discover and build their own concepts in a scientific subject. There is an emphasis on using modeling and numerical calculation.
Additional features include:
- A Quick Quiz and Problems for Practice, Further Theory and Practice, and Calculator/Computer Exercises appear at the end of each section.
- All exercise sets are step laddered.
- A Look Back and A Look Forward help students put the ideas in context.
- Every chapter ends with a Genesis and Development section, giving history and perspective on key topics in the evolution of calculus.
- Boxed Insights clear up points or answer commonly asked questions.
- The text has an extra-large offering of examples.
- Examples are illustrated with meaningful and useful graphics.
The pedagogical features make the subject more interesting and accessible to students than other texts, while maintaining an appropriate rigor. ―Daniel Cunningham, CSU-Fresno
This text is truly well written and organized. I do like the fact the book is quite rigorous, yet full of illustrative examples. ―Bob Devaney, Boston University
About the Author
Steven G. Krantz is a professor of mathematics at Washington University in St. Louis. He has previously taught at UCLA, Princeton University, and Pennsylvania State University. He has written more than 75 books and more than 175 scholarly papers and is the founding editor of the Journal of Geometric Analysis. An AMS Fellow, Dr. Krantz has been a recipient of the Chauvenet Prize, Beckenbach Book Award, and Kemper Prize. He received a Ph.D. from Princeton University.
Harold Parks obtained his Ph.D. from Princeton University and is a professor emeritus of mathematics at Oregon State University. In 2012, he became a fellow of the American Mathematical Society. Parks has discovered, and characterized, a type of minimal surface with surprising properties, defined in terms of the Jacobi elliptic functions.