Mathematics, 19.11.2019 02:31 annabelle2516
Example 5 suppose that f(0) = β7 and f '(x) β€ 8 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) β f(0) = f '(c) 3 correct: your answer is correct. β 0 so f(3) = f(0) + 3 correct: your answer is correct. f '(c) = β7 + 3 correct: your answer is correct. f '(c). we are given that f '(x) β€ 8 for all x, so in particular we know that f '(c) β€ 8 correct: your answer is correct. multiplying both sides of this inequality by 3, we have 3f '(c) β€ 24 correct: your answer is correct. , so f(3) = β7 + incorrect: your answer is incorrect. f '(c) β€ β7 + incorrect: your answer is incorrect. = incorrect: your answer is incorrect. the largest possible value for f(3) is .
Answers: 2
Mathematics, 21.06.2019 15:00
When you arrive at the lake, your friend realises he hasnβt got any swimming trunks. you need to ride to a sports shop. the sports shop is 8350 metres away. how many metres is it to cycle there and back?
Answers: 1
Mathematics, 21.06.2019 18:10
Drag the tiles to the boxes to form correct pairs. not all tiles will be used. match each set of vertices with the type of quadrilateral they form.
Answers: 1
Mathematics, 21.06.2019 18:40
20 points for the brainliest? drag each tile to the correct box. not all tiles will be used. arrange the steps to solve the equation . plz
Answers: 2
Example 5 suppose that f(0) = β7 and f '(x) β€ 8 for all values of x. how large can f(3) possibly be?...
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