Applied Mathematics for Physical Chemistry (2nd Edition) [Paperback]

James R. Barrante (Author)

Book Description

ISBN-10: 0137417373 | ISBN-13: 978-0137417377 | Publication Date: August 11, 1997 | Edition: 2nd

An ideal supplementary text for any physical chemistry course. This includes junior/senior level undergraduate courses in introductory chemistry as well as graduate courses in quantum chemistry, kinetics, statistical mechanics, thermodynamics, or spectroscopy. Many of today's students find themselves poorly prepared mathematically for their physical chemistry courses. This unique text is for them. This text helps students to recall the math they have learned, to apply mathematics to solve chemical problems, and to acquire a fuller set of mathematical skills necessary for such applications. Using an abundance of fully-worked examples, it shows step-by-step how to directly apply mathematics to physical chemistry problems. It offers full-chapter coverage of many important topics relegated to appendices in other texts, provides a full chapter on numerical methods and computer programming, and covers key areas of advanced mathematics.

Editorial Reviews

From the Back Cover

Unique in its approach, content, and perspective, this book helps readers bridge the application gap between mathematics and chemistry and to acquire a fuller set of mathematical tools necessary for such applications. Using an abundance of fully-worked examples, it shows step-by-step how to directly apply mathematics to physical chemistry problems. It features numerous problems, many multi-part, that use the symbolism found in standard physical chemistry books or involve actual physical chemistry equations. It offers full-chapter coverage of many important topics relegated to appendices in other books. It also provides a full chapter on numerical methods and computer programming showing step-by-step how to write programs to do numerical integration, and covers areas of advanced mathematics — e.g., differential equations and operator mechanics.

Excerpt. © Reprinted by permission. All rights reserved.

A perusal of many modern physical chemistry texts demonstrates that most authors of these texts and the professors who use them, such as myself, expect students to know a great deal more mathematics than is covered in the calculus courses normally required for physical chemistry courses. Moreover, we honestly expect that our students will know how to apply the mathematics they have learned to physical problems. Unfortunately, many of my colleagues and I have found that this generally is not the case. It was this observation, along with the fact that I was spending a great deal of lecture time teaching mathematics rather than physical chemistry in my physical chemistry course, that inspired me to write the first edition of this text some 30 years ago.

It is my intention, therefore, that this third edition be used as a supplement along with the student's physical chemistry textbook, to help students either review or, perhaps, learn for the first time those areas of mathematics that are essential to an understanding of physical chemistry, and, more importantly, to apply that mathematics to physical problems. The purpose of the book is not to replace the mathematics courses that are prerequisite to the physical chemistry course, but to be a how to do it review mathematics textbook. Consequently, the problems at the end of each chapter are designed to test the reader's mathematical skills, not his or her skills in solving physical chemistry problems.

Like the first two editions, the first five chapters concentrate on subject matter normally covered in prerequisite mathematics courses and should be a review. Again, an emphasis in the chapter on integral calculus has been placed an using integral tables, and, in keeping with the original intent of the book, mathematical rigor was kept at a minimum, giving way to intuition where possible.

The latter half of the text covers important material normally not covered in prerequisite courses, but, for the most part, at an introductory level. For example, the chapter on differential equations emphasizes the solution of second-order linear differential equations with constant coefficients, common to many simple problems in wave mechanics. Also, as in the second edition, sections on the series method of solving differential equations are included. The sections on Fourier series and Fourier transforms have been expanded in this edition to include discrete Fourier transforms and well as continuous Fourier transforms. Discrete Fourier transforms are important in many areas of spectroscopy, since they can be handled by digital computers.

Finally, the chapter on numerical methods has been completely revised. In the second edition, we concentrated on writing programs using BASIC to do the numerical calculations. Over the recent years, however, there has been a move away from using compiled programs for doing scientific computations toward the use of spreadsheets, such as Microsoft Excel^®, for such computations. Thus, the new chapter concentrates on using a spreadsheet to do many standard numerical calculations, such as numerical integration, fitting curves to experimental data, and finding discrete Fourier transforms of functions.

As I mentioned in the Preface to the second edition, a text such as this could not be a success without the contributions of a number of people. I especially wish to thank Professor John Bopp, Nazareth College; Professor Wayne Bosma, Bradley University; and Professor Greg Peters, University of Memphis for their careful and critical review of the second edition and their many helpful comments and suggestions. I also would like to thank Professor John Wheeler of the University of California, San Diego, for finding a serious error in one of the examples in the chapter on infinite series in the second edition that survived from the first edition.

I thank my editor John Challice, Project Manager Kristen Kaiser, Production Editor Donna Young, and all those individuals at Prentice Hall ESM and Write With, Inc. who helped to improve immensely the quality of the text.

Finally, I wish to thank my son, Stephen Barrante, who designed the cover for this edition, my wife Marlene, and our family for their patience and encouragement during the preparation of this book.

I welcome comments on the text and ask that any comments or errors found be sent to me at jrbarrante@aol.com.

JAMES R. BARRANTE

--This text refers to an alternate Paperback edition.

Product Details

• Paperback: 227 pages
• Publisher: Prentice Hall; 2nd edition (August 11, 1997)
• Language: English
• ISBN-10: 0137417373
• ISBN-13: 978-0137417377
• Product Dimensions: 8.9 x 5.9 x 0.5 inches
• Shipping Weight: 10.4 ounces
• Average Customer Review: 4.8 out of 5 stars  See all reviews (6 customer reviews)
• Amazon Best Sellers Rank: #1,058,693 in Books (See Top 100 in Books)

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Customer Reviews

Most Helpful Customer Reviews

30 of 30 people found the following review helpful:

5.0 out of 5 stars Great math companion for the physical chemistry student, June 17, 1999

By A Customer

This review is from: Applied Mathematics for Physical Chemistry (2nd Edition) (Paperback)

As a graduate student in the pharmaceutical sciences, I found this book to be a comprehensive and easy-to-use study companion. It reviews fundamental mathematical concepts and relationships (i.e. integration and differential calculus, vectors etc.) along with applied examples encountered in physical chemistry. The book is very useful if the student pursues development of mathematical models for his/her research.

A.Higuera, Arnold & Marie Schwartz College of Pharmacy

25 of 26 people found the following review helpful:

4.0 out of 5 stars A very nice refresher book..., November 16, 2000

By 

Les Kismartoni (Park Ridge, IL USA) - See all my reviews
(REAL NAME)   

This review is from: Applied Mathematics for Physical Chemistry (2nd Edition) (Paperback)

The truth is that many US chemists (hell, all chemists) are lazy when it comes to math. (Ok, so maybe some theory guys aren't, but they all dress in black and have bad attitudes or big egos so they aren't your garden variety chemist...) Well, the good news is that this book can really help to remedy some of those situations... Many of the very useful topics are presented in a concise manner and therefore in a non-threatening and appealing way... Very good as a first reference and also helps with some radial function transforms and the like (Jacobians and etc...) My only major problem with the book is that it doesn't have anything on statistics, but then again, most analytical books give a good appendix on that subject anyway, so you can find it there...

9 of 9 people found the following review helpful:

5.0 out of 5 stars Still a Standard, December 30, 2007

By 

Been there, done that - See all my reviews

This review is from: Applied Mathematics for Physical Chemistry (3rd Edition) (Paperback)

I used this book as an undergrad Chem Major 30 years ago. It was helpful then and it helps my kids now. I would recommend this book to anybody serious about Physical Chemistry.