Problem 2. A function f is continuous on the closed interval [3, 3] such that f(-3) = 4 and f(3) = 1. The function f' and f" have the properties given in the table below. –3 < x < -1 positive positive I = -1 fails to exist negative -1 < x < 1] x =11

Advanced Engineering Mathematics
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Chapter2: Second-order Linear Odes
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Problem 2. A function f is continuous on the closed interval [3,3] such
that f(-3) = 4 and f(3) = 1. The function f' and f" have the properties
given in the table below.
f'(x)
f"(x)
-3 < x < –1
positive
positive
x = -1
fails to exist
fails to exist
-1 < x < 1 ] x =11<x<3
negative
positive
negative
negative
(a) What are the r-coordinates of all absolute maximum and absolute
minimum points of f on the interval (3, 3] ? Justify your answer.
(b) What are the x-coordinates of all points of inflection of f on the interval
[3, 3]? Justify your answer.
(c) On the axes provided, sketch a graph that satisfies the given properties
of f.
8
5
4
3
2
1
Transcribed Image Text:Problem 2. A function f is continuous on the closed interval [3,3] such that f(-3) = 4 and f(3) = 1. The function f' and f" have the properties given in the table below. f'(x) f"(x) -3 < x < –1 positive positive x = -1 fails to exist fails to exist -1 < x < 1 ] x =11<x<3 negative positive negative negative (a) What are the r-coordinates of all absolute maximum and absolute minimum points of f on the interval (3, 3] ? Justify your answer. (b) What are the x-coordinates of all points of inflection of f on the interval [3, 3]? Justify your answer. (c) On the axes provided, sketch a graph that satisfies the given properties of f. 8 5 4 3 2 1
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