Q30.

Question

Example 3 Determine whether each relation is a function.

$x = 15$

Step-by-Step Solution

Verified

Answer

The given relation is not a function.

1Step 1. function.

A function is defined as the relation between two sets that maps elements of the first to a unique element of the second set.

2Step 2. Concept Used.

The function is denoted as $f : A \to B$ which shows that function f maps every element of set A to a unique element of set B.
Vertical line test: The graph of any relationship is a function if it satisfies the vertical line test, which states that if at any point of the graph, we draw a vertical line, then it must intersect the graph at only one point.

3Step 3. Explanation.

In the given relation $x = 15$ , observe that the graph of the relation is a vertical line. So, the vertical line $x = 15$ will intersect the line at many points.

Since the relation does not satisfy the vertical line test, the relation is not a function.

Thus, the given relation is not a function.

Q29.

Q31.

Other exercises in this chapter

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Example 3 Determine whether each relation is a function.y=3x−2

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Q32.

Determine whether each relation is a function.y=3x+2y

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