Mathematics for Physical Chemistry
Title | Mathematics for Physical Chemistry PDF eBook |
Author | Robert G. Mortimer |
Publisher | Elsevier |
Pages | 406 |
Release | 2005-06-10 |
Genre | Science |
ISBN | 0080492886 |
Mathematics for Physical Chemistry, Third Edition, is the ideal text for students and physical chemists who want to sharpen their mathematics skills. It can help prepare the reader for an undergraduate course, serve as a supplementary text for use during a course, or serve as a reference for graduate students and practicing chemists. The text concentrates on applications instead of theory, and, although the emphasis is on physical chemistry, it can also be useful in general chemistry courses. The Third Edition includes new exercises in each chapter that provide practice in a technique immediately after discussion or example and encourage self-study. The first ten chapters are constructed around a sequence of mathematical topics, with a gradual progression into more advanced material. The final chapter discusses mathematical topics needed in the analysis of experimental data. - Numerous examples and problems interspersed throughout the presentations - Each extensive chapter contains a preview, objectives, and summary - Includes topics not found in similar books, such as a review of general algebra and an introduction to group theory - Provides chemistry specific instruction without the distraction of abstract concepts or theoretical issues in pure mathematics
Mathematical Methods for Physical and Analytical Chemistry
Title | Mathematical Methods for Physical and Analytical Chemistry PDF eBook |
Author | David Z. Goodson |
Publisher | John Wiley & Sons |
Pages | 408 |
Release | 2011-11-14 |
Genre | Science |
ISBN | 1118135172 |
Mathematical Methods for Physical and Analytical Chemistry presents mathematical and statistical methods to students of chemistry at the intermediate, post-calculus level. The content includes a review of general calculus; a review of numerical techniques often omitted from calculus courses, such as cubic splines and Newton’s method; a detailed treatment of statistical methods for experimental data analysis; complex numbers; extrapolation; linear algebra; and differential equations. With numerous example problems and helpful anecdotes, this text gives chemistry students the mathematical knowledge they need to understand the analytical and physical chemistry professional literature.
Applied Mathematics for Physical Chemistry
Title | Applied Mathematics for Physical Chemistry PDF eBook |
Author | James R. Barrante |
Publisher | Waveland Press |
Pages | 256 |
Release | 2016-02-10 |
Genre | Science |
ISBN | 147863300X |
By the time chemistry students are ready to study physical chemistry, they’ve completed mathematics courses through calculus. But a strong background in mathematics doesn’t necessarily equate to knowledge of how to apply that mathematics to solving physicochemical problems. In addition, in-depth understanding of modern concepts in physical chemistry requires knowledge of mathematical concepts and techniques beyond introductory calculus, such as differential equations, Fourier series, and Fourier transforms. This results in many physical chemistry instructors spending valuable lecture time teaching mathematics rather than chemistry. Barrante presents both basic and advanced mathematical techniques in the context of how they apply to physical chemistry. Many problems at the end of each chapter test students’ mathematical knowledge. Designed and priced to accompany traditional core textbooks in physical chemistry, Applied Mathematics for Physical Chemistry provides students with the tools essential for answering questions in thermodynamics, atomic/molecular structure, spectroscopy, and statistical mechanics.
Physical Chemistry: Statistical Mathematics
Title | Physical Chemistry: Statistical Mathematics PDF eBook |
Author | Ke. Ḍī Jhā |
Publisher | Discovery Publishing House |
Pages | 320 |
Release | 2009 |
Genre | Chemistry, Physical and theoretical |
ISBN | 9788183564458 |
Physical Chemistry
Title | Physical Chemistry PDF eBook |
Author | Andrew Cooksy |
Publisher | |
Pages | 0 |
Release | 2014 |
Genre | Chemical kinetics |
ISBN | 9780321814159 |
In the phase transitions among the solid, liquid, and gaseous forms of water, we see a profound demonstration of how properties at the molecular scale dictate the behavior of the bulk material. As ice is heated beyond its melting point, new avenues for molecular motion become open to the energy being added. Upon entering the gas phase, the water molecules can explore new territory, unavailable to the liquid or solid. These transformations can be seen as a shifting balance between the forces that bind the molecules and the thermal energy that excites these motions--a window through thermodynamics on the intricate mechanisms that drive chemistry.
Mathematics for Physical Chemistry: Opening Doors
Title | Mathematics for Physical Chemistry: Opening Doors PDF eBook |
Author | Donald A. McQuarrie |
Publisher | University Science Books |
Pages | 372 |
Release | 2008-07-21 |
Genre | Mathematics |
ISBN | 9781891389566 |
This text provides students with concise reviews of mathematical topics that are used throughout physical chemistry. By reading these reviews before the mathematics is applied to physical chemical problems, a student will be able to spend less time worrying about the math and more time learning the physical chemistry.
Introduction to Mathematical Statistical Physics
Title | Introduction to Mathematical Statistical Physics PDF eBook |
Author | Robert Adolʹfovich Minlos |
Publisher | American Mathematical Soc. |
Pages | 114 |
Release | 2000 |
Genre | Mathematics |
ISBN | 0821813374 |
This book presents a mathematically rigorous approach to the main ideas and phenomena of statistical physics. The introduction addresses the physical motivation, focusing on the basic concept of modern statistical physics, that is the notion of Gibbsian random fields. Properties of Gibbsian fields are analysed in two ranges of physical parameters: "regular" (corresponding to high-temperature and low-density regimes) where no phase transition is exhibited, and "singular" (low temperature regimes) where such transitions occur. Next, a detailed approach to the analysis of the phenomena of phase transitions of the first kind, the Pirogov-Sinai theory, is presented. The author discusses this theory in a general way and illustrates it with the example of a lattice gas with three types of particles. The conclusion gives a brief review of recent developments arising from this theory. The volume is written for the beginner, yet advanced students will benefit from it as well. The book will serve nicely as a supplementary textbook for course study. The prerequisites are an elementary knowledge of mechanics, probability theory and functional analysis.