Linear Sentences in One Variable
Relations and Functions
The horizontal coordinates of a set of ordered pairs constitutes the domain of a relation, while the range is determined by the vertical coordinates. A relation in which none of the domain numbers appear more than once is called a “function.” If two functions have a common domain, they can be acted upon arithmetically.
Following are definitions with which you should be familiar as you work with relations and functions.
Relation
A
relation is a set of ordered pairs that can be represented by a diagram, graph, or sentence. Figure
1 shows several examples of relations.
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Domain and range
The set of all first numbers of the ordered pairs in a relation is called the domain of the relation. The set of all second numbers of the ordered pairs in a relation is called the range of the relation. The values in the domain and range are usually listed from least to greatest.
Example 1: Find the domain and range of item (a) in Figure
1 .
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Example 2: Find the domain and range in item (b) of Figure
1 .
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Example 3: Find the domain and range in item (c) of Figure
1 .
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Example 4: Find the domain and range in item (d) of Figure 1 .
The domain and range cannot be listed as in the previous examples. In order to visualize the domain, imagine each point of the graph going vertically to the
x-axis. The points on the
x-axis become the domain (see Figure
2 ).
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The domain can now be expressed as domain = { x|−3 < x ≤ 4}, which is read as “the set of x's such that x is greater than −3 and x is less than or equal to 4.”
To visualize the range, have all the points move horizontally to the
y-axis. The points on the
y-axis become the range (see Figure
3 ).
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The range can be expressed as range = { y|−1 ≤ y ≤ 2}, which is read as “the set of y's such that y is greater than or equal to −1 and y is less than or equal to 2.”
Example 5: Find the domain and range in item (e) of Figure 1 .
Since any value for
x produces a
y-value and any value for
y produces an
x-value,
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Function
A relation in which none of the domain values are repeated is called a function.
Example 6: Which of the examples given in Figure 1 are functions?
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{(4,1),(3,2),(−1,6)
This is a function, since domain values are not repeated.
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The example, shown in Figure 4 , is not a function.
Figure 4 This is not a function.
The diagram represents the set of ordered pairs {(1,4), (1,5), (3,4), (2,5)} and (1,4) and (1,5) repeat domain values.
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The example, shown in Figure 5 , is not a function.
Figure 5 Like Figure 4 , this is also not a function.
The graph represents the set of ordered pairs {(−2,−2), (−1,−2), (−1,1), (0,−1), (1,1), (2,3)}, and (−1,−2) and (−1,1) repeat domain values.
Notice that the vertical line x = −1 would pass through two points of the graph, as shown in Figure 6 .
Figure 6 Functions have no repeated x values.
A vertical line that passes through (intersects) a graph in more than one point indicates ordered pairs that have repeated domain values and eliminates the relation from being called a function. This test for functions is called the vertical line test.
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The example shown in Figure 7 is also not a function. It fails the vertical line test.
Figure 7 This fails the vertical line test and is, therefore, not a function.
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y = 2 x + 3.
This is a function, since domain values are not repeated. When y = 2 x + 3 is graphed, it can be seen that the graph passes the vertical line test.
