Concept explainers
To find: thecritical points and local extreme values and critical points that are not stationary points.
Answer to Problem 35E
Critical points | derivative | extremum | value |
Undefined | Local min | ||
Local min |
Explanation of Solution
Given information:
The function is
Calculation: to find the critical points and local extreme points, first derivate the function,
To find the critical points , equal the derivative of function to zero,
Now, substitute the value of critical points in the function and find the value of function so the critical points and extreme values can be following as:
Critical points | derivative | extremum | value |
Undefined | Local min | ||
Local min |
And
Chapter 5 Solutions
Calculus: Graphical, Numerical, Algebraic: Solutions Manual
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