Mathematics: Example 5 suppose that f(0) = −8 and f (x) ≤ 9 for all values of x. how large can f(3) possibly be? solution we are given that f is differentiable (and therefore continuous) everywhere. in particular, we can apply the mean value theorem on the interval [0, 3] . there exists a number c such that f(3) − f(0) = f (c) − 0 so f(3) = f(0) + f (c) = −8 + f (c). we are given that f (x) ≤ 9 for all x, so in particular we know that f (c) ≤ . multiplying both sides of this inequality by 3, we have 3f (c) ≤

Example 5 suppose that f(0) = −8 and f (x) ≤

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HBBTRACO224

17.01.2022

f'(x) exists and is bounded for all . We're told that f(0)=-8 . Consider the interval [0, 3]. The mean value theorem says that there is some $c\in(0,3)$ such that

$f'(c)=\dfrac{f(3)-f(0)}{3-0}$

Since $f'(x)\le9$ , we have

$\dfrac{f(3)+8}3\le9\implies f(3)\le19$

so 19 is the largest possible value.

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chad65

16.02.2023

Mathematics

that seems like a hard question I hope you find the answer

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