(c)
The arrowheads indicate that the
line extends indefinitely left and right,
as well as up and down. Therefore, both
the domain and the range include all real
numbers, written
(d)
The graph extends indefinitely left and
right, as well as upward. The domain is
Because there is a least y-value,
the range includes all numbers greater
than or equal to -3,written 3 - 3, q 2.
- 3,
1 - q, q 2.
1 - q, q 2.
SECTION 3.5 Introduction to Relations and Functions 185
The graphs in (a), (c), and (d) satisfy the vertical line test and represent functions.
The graph in (b) fails the vertical line test, since the same x-value corresponds to two
different y-values, and is not the graph of a function. NOW TRY
xy0 xy(^02)
–3
NOW TRY
OBJECTIVE 4 Identify functions defined by graphs and equations. Since
each value of xin a function corresponds to only one value of y, any vertical line
drawn through the graph of a function must intersect the graph in at most one point.
Vertical Line TestIf every vertical line intersects the graph of a relation in no more than one point,
then the relation is a function.
FIGURE 46illustrates the vertical line test with the graphs of two relations.
xy0Not a function
The same x-value corresponds
to four different y-values.
FIGURE 46A vertical line
intersects the graph
more than once.Using the Vertical Line TestUse the vertical line test to determine whether each relation graphed in Example 3
is a function. (We repeat the graphs here.)
(a) (b) (c) (d)
EXAMPLE 4
xy0(4, –3)(–1, 1)(1, 2)(0, –1)Functionxy–4^0–664Not a functionxy0Functionxy(^02)
–3
Function
NOW TRY
EXERCISE 3
Give the domain and range of
the relation.
x
y
(^0) –2
–3
NOW TRY ANSWERS
3.domain: ;
range: 3 - 2, q 2
1 - q, q 2
Function
Each x-value corresponds
to only one y-value.
y
0 x
NOW TRY
EXERCISE 4
Use the vertical line test to
determine whether the rela-
tion is a function.
x
y
0 3
3
6
6
4.not a function
Any vertical line
intersects the
graph only once.