CLEP Calculus - Relative Extremum

1

Determine the relative maxima for the function:

2

Determine the relative maxima for the function:

3

Determine the relative maxima for the function:

4

Where is the maximum value of the function

$f(x)=x^{5}-5x^{3}+10x-3$

on the interval ?

5

Where is the maximum value of the function

$f(x)=x^{5}-5x^{3}+10x-3$

on the interval ?

6

Where is the maximum value of the function

$f(x)=x^{5}-5x^{3}+10x-3$

on the interval ?

7

The following is a list of values at certain points for continuous . By mean-value theorem, how many zeroes must this function have?

8

The following is a list of values at certain points for continuous . By mean-value theorem, how many zeroes must this function have?

9

The following is a list of values at certain points for continuous . By mean-value theorem, how many zeroes must this function have?

10

A relative minimum of a function is all the points x, in the domain of the function, such that it is the smallest value for some neighborhood. These are points in which the first derivative is 0 or it does not exist.

Find the relative minimum of the function

using the following graph and the function.

Graph1

Relative Extremum

Practice Questions