(d)
By definition, yis a function of xif every value of xleads to exactly one value
of y. Here, a particular value of x, say, 1, corresponds to many values of y. The or-
dered pairs
and so on
all satisfy the inequality. Thus, this relation does not define a function. Any number
can be used for x, so the domain is the set of all real numbers,
(e)
Given any value of xin the domain, we find yby subtracting 1 and then dividing
the result into 5. This process produces exactly one value of yfor each value in the
domain, so the given equation defines a function.
The domain includes all real numbers except those which make the denominator 0.
We find these numbers by setting the denominator equal to 0 and solving for x.
Add 1.The domain includes all real numbers except1, written 1 - q, 1 2 ́ 1 1, q 2.
x= 1
x- 1 = 0
y=
5
x- 1
1 - q, q 2.
1 1, 0 2 , 1 1, - 12 , 1 1, - 22 , 1 1, - 32 ,
y...x- 1
SECTION 3.5 Introduction to Relations and Functions 187
Concept Check Express each relation using a different form. There is more than one cor-
rect way to do this. See Objective 2.- 51 0, 2 2 , 1 2, 4 2 , 1 4, 6 26 6. 7.
In summary, we give three variations of the definition of a function.
Variations of the Definition of a Function1. A functionis a relation in which, for each value of the first component of the
ordered pairs, there is exactly one value of the second component.
2. A functionis a set of distinct ordered pairs in which no first component is
repeated.
3. A functionis a correspondence or rule that assigns exactly one range value
to each domain value.
Complete solution available
on the Video Resources on DVD
3.5 EXERCISES
1.In your own words, define a function and give an example.
2.In your own words, define the domain of a function and give an example.
3.Concept Check In an ordered pair of a relation, is the first element the independent or
the dependent variable?
4.Concept Check Give an example of a relation that is not a function and that has domain
5 - 3, 2, 6 6 and range 5 4, 6 6. (There are many possible correct answers.)NOW TRY
EXERCISE 5
Decide whether each relation
defines yas a function of x,
and give the domain.
(a)
(b)
(c)
(d)y 63 x+ 1
y=1
x- 2y= 22 x- 4y= 4 x- 3NOW TRY ANSWERS
- (a)yes;
(b)yes;
(c)yes;
(d)no; 1 - q, q 2
1 - q, 2 2 ́ 1 2, q 23 2, q 21 - q, q 2–32–4
1
0xy
13
01
11
33NOW TRY8.Concept Check Does the relation given in Exercise 7define a function? Why or why not?