Solutions to Math 1411- Test 2
1.
a. Using the definition of
derivative, find 
if 
.
Answer:
b. Find the
equation of the tangent line at 
Answer:
The equation
of the tangent line is 
or 
.
2.
Given the function 
, find .
Answer:
3. Find the derivatives of
a. 
Answer:
b.
Answer:
c.
Answer:
4. Given the following function,
a. Indicate intervals where the function is increasing, decreasing, concave up, concave down.
Answer:
It appears the function is increasing on the intervals 
and 
.
It appears the function is decreasing on the intervals 
and 
.
It appears the function is concave up on the intervals 
and 
.
It appears the function is concave down on the interval 
b. Indicate the location of inflections points (if any)
Answer:
It appears that the inflection points are located at 
.
c. Sketch the graph of the derivative function.
Answer:
Note that 
at 
and 
. 
on the intervals and and 
on the intervals and . The location of the
maximum and minimum points on are the locations of the inflection points of 
. The are located
at 
.
d. What is the equation of the function.
Answer: It appears to be a fourth-degree
polynomial with x-intercepts at 
. The equation is 
.
Use the fact that the y-intercept is 8 to find the value of a.
where 
and 
Note: for
part c, the deriviative is 
.
The zeros for
the graph of the derivative are 
.
The local maxima and minima points are when the derivative
of equals
zero. The derivative equals zero when 
when 
. The inflection points are
