Difference between revisions of "009B Sample Final 1, Problem 1"

Consider the region bounded by the following two functions:

${\displaystyle y=2(-x^{2}+9)}$ and ${\displaystyle y=0}$

a) Using the lower sum with three rectangles having equal width , approximate the area.

b) Using the upper sum with three rectangles having equal width, approximate the area.

c) Find the actual area of the region.

Solution:

(a)

Step 1:
We need to set these two equations equal in order to find the intersection points of these functions.
So, we let ${\displaystyle 2(-x^{2}+9)=0}$. Solving for ${\displaystyle x}$, we get ${\displaystyle x=-3,3}$.
This means that we need to calculate the Riemann sums over the interval ${\displaystyle [-3,3]}$.

Step 2:
Since the length of our interval is ${\displaystyle 6}$ and we are using ${\displaystyle 3}$ rectangles,
each rectangle will have width ${\displaystyle 2}$.
Thus, the lower Riemann sum is
${\displaystyle 2(f(-3)+f(-1)+f(1))=2(0+16+16)=64}$.

(b)

Step 1:
As in Part (a), the length of our inteval is ${\displaystyle 6}$ and
each rectangle will have width ${\displaystyle 2}$. (See Step 1 and 2 for part (a))

Step 2:
Thus, the upper Riemann sum is
${\displaystyle 2(f(-1)+f(1)+f(3))=2(16+16+0)=64}$

(c)

Step 1:
To find the actual area of the region, we need to calculate
${\displaystyle \int _{-3}^{3}2(-x^{2}+9)~dx}$

Final Answer:
(a) ${\displaystyle 64}$
(b) ${\displaystyle 64}$
(c) ${\displaystyle 72}$

Return to Sample Exam