If f(x) is differentiable for the closed interval [−4, 0] such that f(−4) = 5 and f(0) = 9, then there exists a value c, −4 < c < 0 such that f(c) = 0 f '(c) = 0 f (c) = 1 f '(c) = 1

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asked May 15, 2018 29.8k views

1 vote

If f(x) is differentiable for the closed interval [−4, 0] such that f(−4) = 5 and f(0) = 9, then there exists a value c, −4 < c < 0 such that

f(c) = 0
f '(c) = 0
f (c) = 1
f '(c) = 1

Mathematics
high-school

Rano asked

by Rano

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1 Answer

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$\bf \textit{mean value theorem}\\\\ f'(c)=\cfrac{f(b)-f(a)}{b-a}\qquad \begin{cases} a=-4\\ b=0 \end{cases}\implies f'(c)=\cfrac{f(0)-f(-4)}{0-(-4)} \\\\\\ f'(c)=\cfrac{9-5}{0+4}\implies f'(c)=\cfrac{4}{4}\implies f'(c)=1$