2. Determine from the given graph whether the function has any absolute extreme values on (a, b). Then explain how your answer is consistent with the extreme value theorem. y y f(x) C Determine whether the function has any absolute extreme values on (a, b). Choose the correct choice below. A. The function has an absolute maximum value at x =c but does not have an absolute minimum value on (a, b). B. The function has an absolute maximum value at x =c and an absolute minimum value at x =b on (a, b) C. The function has an absolute minimum value at x = b but does not have an absolute maximum value on (a, b) D. The function does not have any absolute extreme values on (a, b) Explain the results in terms of the extreme value theorem. A. Since the function f is continuous on a closed interval, f attains both an absolute maximum value and an absolute minimum value on its domain. B. Since the function f is not continuous and the domain of f is a closed interval, f may or may not have any absolute extreme values on its domain C. Since the function f is continuous and the domain of f is not a closed interval, f may or may not have any absolute extreme values on its domain. O D. Since the function f is not continuous and the domain of f is not a closed interval, f may or may not attain any absolute extreme values on its domain

Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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2.
Determine from the given graph whether the function has any absolute extreme values on (a, b). Then explain how your answer is consistent with the extreme value theorem.
y
y f(x)
C
Determine whether the function has any absolute extreme values on (a, b). Choose the correct choice below.
A. The function has an absolute maximum value at x =c but does not have an absolute minimum value on (a, b).
B. The function has an absolute maximum value at x =c and an absolute minimum value at x =b on (a, b)
C. The function has an absolute minimum value at x = b but does not have an absolute maximum value on (a, b)
D. The function does not have any absolute extreme values on (a, b)
Explain the results in terms of the extreme value theorem.
A. Since the function f is continuous on a closed interval, f attains both an absolute maximum value and an absolute minimum value on its domain.
B. Since the function f is not continuous and the domain of f is a closed interval, f may or may not have any absolute extreme values on its domain
C. Since the function f is continuous and the domain of f is not a closed interval, f may or may not have any absolute extreme values on its domain.
O D. Since the function f is not continuous and the domain of f is not a closed interval, f may or may not attain any absolute extreme values on its domain
Transcribed Image Text:2. Determine from the given graph whether the function has any absolute extreme values on (a, b). Then explain how your answer is consistent with the extreme value theorem. y y f(x) C Determine whether the function has any absolute extreme values on (a, b). Choose the correct choice below. A. The function has an absolute maximum value at x =c but does not have an absolute minimum value on (a, b). B. The function has an absolute maximum value at x =c and an absolute minimum value at x =b on (a, b) C. The function has an absolute minimum value at x = b but does not have an absolute maximum value on (a, b) D. The function does not have any absolute extreme values on (a, b) Explain the results in terms of the extreme value theorem. A. Since the function f is continuous on a closed interval, f attains both an absolute maximum value and an absolute minimum value on its domain. B. Since the function f is not continuous and the domain of f is a closed interval, f may or may not have any absolute extreme values on its domain C. Since the function f is continuous and the domain of f is not a closed interval, f may or may not have any absolute extreme values on its domain. O D. Since the function f is not continuous and the domain of f is not a closed interval, f may or may not attain any absolute extreme values on its domain
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