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tealsheep199Lv1
6 Jan 2023
Verify that f (x) = x ln x on [1, e] satisfies the hypotheses of the Mean Value Theorem. Then find the number c in the conclusion of the theorem. Let f (x) = e^-x sin x on [0, 2 pi]. Find f' (x) and f" (x). Simplify. Find the intervals of increase and of decrease of f, and all local extreme values of f. Find the intervals of concave upward and of concave downward of f, and all inflection points (x, y) of f. Using the above information, sketch the graph of f labeling the points found in parts (a) and (b) (and the x-intercepts).
Verify that f (x) = x ln x on [1, e] satisfies the hypotheses of the Mean Value Theorem. Then find the number c in the conclusion of the theorem. Let f (x) = e^-x sin x on [0, 2 pi]. Find f' (x) and f" (x). Simplify. Find the intervals of increase and of decrease of f, and all local extreme values of f. Find the intervals of concave upward and of concave downward of f, and all inflection points (x, y) of f. Using the above information, sketch the graph of f labeling the points found in parts (a) and (b) (and the x-intercepts).
skaramjeet12Lv6
9 Jan 2023
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pareekjay099Lv3
8 Jan 2023
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m7mdeljokerLv10
7 Jan 2023
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7 Jan 2023
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