2 Algebraic functions
2.1 Concepts
When the equation of state (1.1) of the ideal gas is written in the form
it is implied that the value of the volumeV(the dependent variable) is determined by
the values of the pressure p, temperatureT, and amount of substancen(the independent
variables). In general, a dependent variable is said to be a function of the variable or
variables on which it depends.
1In this example,Vis a function of the three variables
p, T, and n. In the present chapter we are concerned with functions of only one
variable; the case of more than one independent variable is discussed in Chapter 9.
Let the variable ybe a function of the variable x. For example, in equation
y 1 = 12 x
21 − 13 x 1 + 11 (2.1)
the expression on the right of the equal sign defines the function f,
f(x) 1 = 12 x
21 − 13 x 1 + 11 (2.2)
whose value for any given value of xis to be assigned to the variable y(readf(x)as
‘f of x’). The function fis the rulefor calculating yfrom x.
A function has a numerical value when numerical values are assigned to the
variables.
EXAMPLE 2.1The values of the function (2.2) whenx 1 = 1 2,x 1 = 11 ,andx 1 = 10 are
f(2) 1 = 121 × 12
21 − 131 × 121 + 111 = 13
f(1) 1 = 121 × 11
21 − 131 × 111 + 111 = 10
f(0) 1 = 121 × 10
21 − 131 × 101 + 111 = 11
0 Exercises 1–3
The concept of function is more general than this however, because the variable xcan
be replaced by another variable, by a function, or by a more complicated quantity
such as a differential operator or a matrix.
V
nRT
p
=
1The word ‘function’ was first used in this context by the German mathematician Gottfried Wilhelm Leibniz
(1646–1716).