Physical Chemistry Third Edition

1.1 Introduction 5

need to be able to apply mathematical methods. There are several books that cover the

application of mathematics to problems in physical chemistry.^1

Arithmeticis the principal branch ofnumerical mathematics. It involves carrying

out operations such as addition, subtraction, multiplication, and division on actual

numbers. Geometry, algebra, and calculus are parts ofsymbolic mathematics, in which

symbols that represent numerical quantities and operations are manipulated without

doing the numerical operations. Both kinds of mathematics are applied in physical

chemistry.

Mathematical Functions

A mathematical function involves two kinds of variables: Anindependent variableis

one to which we can assign a value. Amathematical functionis a rule that delivers the

value of adependent variablewhen values are assigned to the independent variable or

variables. A function can be represented by a formula, a graph, a table, a mathematical

series, and so on. Consider theideal gas law:

PVnRT (1.1-1)

In this equationPrepresents the pressure of the gas,Vrepresents its volume,nrep-

resents the amount of substance in moles,Trepresents the absolute temperature, and

Rstands for theideal gas constant. The ideal gas law does a good but not perfect

job of representing the equilibrium behavior of real gases under ordinary conditions.

It is more nearly obeyed if the pressure of the gas is made smaller. A gas that is at a

sufficiently low pressure that it obeys the ideal gas law to an adequate approximation

is called adilute gas.Anideal gasis defined to obey this equation for all pressures

and temperatures. An ideal gas does not exist in the real world, and we call it amodel

system. A model system is an imaginary system designed to resemble some real system.

A model system is useful only if its behavior mimics that of a real system to a useful

degree and if it can be more easily analyzed than the real system.

We can solve the ideal gas law forVby symbolically dividing byP:

V

nRT

P

(1.1-2)

The right-hand side of Eq. (1.1-2) is a formula that represents a mathematical function.

The variablesT,P, andnare independent variables, andVis the dependent variable.

If you have the numerical values ofT,P, andn, you can now carry out the indicated

arithmetic operations to find the value ofV. We can also solve Eq. (1.1-1) forPby

symbolically dividing byV:

P

nRT

V

(1.1-3)

We have now reassignedVto be one of the independent variables andPto be the

dependent variable. This illustrates a general fact:If you have an equation containing

(^1) Robert G. Mortimer,Mathematics for Physical Chemistry, 3rd ed., Academic Press, San Diego, CA,
U.S.A., 2005; James R. Barrante,AppliedMathematicsforPhysicalChemistry, 3rd ed., Pearson Prentice Hall,
Upper Saddle River, NJ, 2004; Donald A. McQuarrie,Mathematical Methods for Scientists and Engineers,
University Science Books, 2003.