Determine whether the Mean Value Theorem can be applied to the function f(x) = |x−2| on the closed interval [0, 4]. If the MVT can be applied, find all point(s) c in the in the open interval such that f′(c) = f(4)−f(0) 4−0. The Mean Value Theorem does apply; c = 0. The Mean Value Theorem does apply; c = 1. The Mean Value Theorem does apply; c = 14. The Mean Value Theorem does not apply. The Mean Value Theorem does apply; c = 12.

Determine whether the Mean Value Theorem can be applied to the function f(x) = |x−2| on the closed interval [0, 4]. If the MVT can be applied, find all point(s) c in the in the open interval such that f′(c) = f(4)−f(0) 4−0. The Mean Value Theorem does apply; c = 0. The Mean Value Theorem does apply; c = 1. The Mean Value Theorem does apply; c = 14. The Mean Value Theorem does not apply. The Mean Value Theorem does apply; c = 12.

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Determine whether the Mean Value Theorem can be applied to the function f ( x ) = | x 2 | on the closed interval [ 0 , 4 ] . If the MVT can be applied, find all point(s) c in the in the open interval such that f ( c ) = f ( 4 ) f ( 0 ) 4 0 . The Mean Value Theorem does apply; c = 0 . The Mean Value Theorem does apply; c = 1 . The Mean Value Theorem does apply; c = 1 4 . The Mean Value Theorem does not apply. The Mean Value Theorem does apply; c = 1 2 .

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