Given the function f(x) = 5(1 + 2x)^(1/2)f(x)=5(1+2x)12, how do you determine whether f satisfies the hypotheses of the Mean Value Theorem on the interval [0,4] and find the c?

1 Answer
Jim H
Dec 1, 2016

See below.

Explanation:

You determine whether it satisfies the hypotheses by determining whether f(x) = 5(1+2x)^(1/2)f(x)=5(1+2x)12 is continuous on the interval [0,4][0,4] and differentiable on the interval (0,4)(0,4).

You find the cc mentioned in the conclusion of the theorem by solving f'(x) = (f(4)-f(0))/(4-0) on the interval (0,4).

f is continuous on its domain, which includes [0,4]

f'(x) = 5/sqrt(1+2x) which exists for all x > -1/2 so it exists for all x in (0,4)

Therefore this function satisfies the hypotheses of the Mean Value Theorem on this interval.

To find c solve the equation f'(x) = (f(4)-f(0))/(4-0). Discard any solutions outside (0,4).

I believe that you should get c = 3/2.

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