For the interval give the maximum and minimum value of the function ƒ(x) = |x|. [−7,−2]

A. maximum: −2; minimum: −7
B. maximum: 2; minimum: 7
C. maximum: −7; minimum: −2
D. maximum: 7; minimum: 2

Recall that the graph of the absolute value function y = |x| resembles a "V" that opens up and has its vertex at (0,0). Its range is [0, infinity), which is another way of saying that all values of y = |x| are either zero or positive.

|-7| = 7 and |-2| = 2.

The further from x = 0 that we move, the greater the output of the absolute value function will be. x = -7 is further from the origin than is x = -2. Thus,

the maximum of y = |x| on [-7, -2] is 7 and the minimum is 2.

For the interval give the maximum and minimum value of the function ƒ(x) = |x|. [−7,−2] A. maximum: −2; minimum: −7 B. maximum: 2; minimum: 7 C. maximum: −7; minimum: −2 D. maximum: 7; minimum: 2

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For the interval give the maximum and minimum value of the function ƒ(x) = |x|. [−7,−2]

A. maximum: −2; minimum: −7
B. maximum: 2; minimum: 7
C. maximum: −7; minimum: −2
D. maximum: 7; minimum: 2