Now in its third edition, Mathematical Concepts in the Physical Sciences, 3rd Edition provides a comprehensive introduction to the areas of mathematical physics. It combines all the essential math concepts into one compact, clearly written reference. This book is intended for students who have had a two-semester or three-semester introductory calculus course. Its purpose is to help students develop, in a short time, a basic competence in each of the many areas of mathematics needed in advanced courses in physics, chemistry, and engineering. Students are given sufficient depth to gain a solid foundation (this is not a recipe book). At the same time, they are not overwhelmed with detailed proofs that are more appropriate for students of mathematics. The emphasis is on mathematical methods rather than applications, but students are given some idea of how the methods will be used along with some simple applications.
Product Identifiers
Publisher
Wiley & Sons, Incorporated, John
ISBN-10
0471198269
ISBN-13
9780471198260
eBay Product ID (ePID)
975729
Product Key Features
Number of Pages
864 Pages
Language
English
Publication Name
Mathematical Methods in the Physical Sciences
Publication Year
2005
Subject
General, Physics / Mathematical & Computational
Features
Revised
Type
Textbook
Subject Area
Science
Author
Mary L. Boas
Format
Hardcover
Dimensions
Item Height
1.5 in
Item Weight
51.3 Oz
Item Length
10.1 in
Item Width
7.2 in
Additional Product Features
Edition Number
3
Intended Audience
College Audience
LCCN
2005-279918
Dewey Edition
22
Reviews
"Bottom line: a good choice for a first methods course for physics majors. Serious students will want to follow this with specialized math courses in some of these topics." ( MAA Reviews , 13 November 2015)
Illustrated
Yes
Dewey Decimal
510
Edition Description
Revised Edition
Lc Classification Number
Qa37.3.B63 2006
Table of Content
Chapter 1 Infinite Series, Power Series Chapter 2 Complex Numbers Chapter 3 Linear Algebra Chapter 4 Partial Differentiation Chapter 5 Multiple Integrals Chapter 6 Vector Analysis Chapter 7 Fourier Series and Transforms Chapter 8 Ordinary Differential Equations Chapter 9 Calculus of Variations Chapter 10 Tensor Analysis Chapter 11 Special Functions Chapter 12 Legendre, Bessel, Hermite, and Laguerre functions Chapter 13 Partial Differential Equations Chapter 14 Functions of a Complex Variable Chapter 15 Probability and Statistics