Use the first derivative to find all critical points and use the second derivative to find all inflection points. Use a graph to identify each critical point as a local maximum, a local minimum, or neither. f(x) = x* - 16xr + 11 Enter the exact answers in increasing order. If there are less than four critical points, enter NA in the remaining answer areas and select NA in the remaining dropdowns. The critical point at x = is neither a maximum nora minimum The critical point at x = is a local minimum 12 The critical point at x = is NA NA is NA The critical point at x = NA and x = 8 The inflection points are at x =

Use the first derivative to find all critical points and use the second derivative to find all inflection points. Use a graph to identify each critical point as a local maximum, a local minimum, or neither. f(x) = x* - 16xr + 11 Enter the exact answers in increasing order. If there are less than four critical points, enter NA in the remaining answer areas and select NA in the remaining dropdowns. The critical point at x = is neither a maximum nora minimum The critical point at x = is a local minimum 12 The critical point at x = is NA NA is NA The critical point at x = NA and x = 8 The inflection points are at x =

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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Question

can I have help with the other critical point besides 12, and the other inflection point besides 8???

Use the first derivative to find all critical points and use the second derivative to find all inflection points. Use a graph to identify each
critical point as a local maximum, a local minimum, or neither.
.3
f(x) = x* – 16x³ + 11
Enter the exact answers in increasing order. If there are less than four critical points, enter NA in the remaining answer areas and
select NA in the remaining dropdowns.
The critical point at x =
is
neither a maximum nor a minimum
The critical point at x =
12
is
a local minimum
is
NA
The critical point at x =
NA
NA
The critical point at x =
NA
and x =
8.
%3D
The inflection points are at x =
is

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