Name
Section
MATH 253
Exam 2
Sections 201-202
1-8
/48
Fall 2012
9
/12
P. Yasskin
10
/20
11
/20
Total
/100
Multiple Choice: (6 points each. No part credit.)
1. Compute
3
3
0
y
4x 2 dx dy.
a. 81
b. 72
c. 60
d. 48
e. 32
2. Which of the following is the polar plot of r
cos 3 ?
y
a.
b.
c.
1
0
2
4
6
x
-1
d.
e.
1
3. Find the mass of a triangular plate whose vertices are
0, 0 ,
1, 0
and
1, 3 , if the density is
2x.
a. 1
b. 2
c. 3
d. 4
e. 5
4. Find the x-component of the center of mass of a triangular plate whose vertices are
and
1, 3 , if the density is
0, 0 ,
1, 0
2x.
a. 1
4
b. 1
2
c. 3
4
d. 3
2
e. 3
5.
The surface of an apple is given in spherical coordinates by
3
3 cos
Its volume is given by the integral:
a. V
b. V
c. V
d. V
e. V
2
/2
3 3 cos
1d d d
0
2
0
0
3 3 cos
0
2
0
0
0
2
0
0
3 3 cos
0
2
0
0
1
0
0
0
1d d d
/2
3 3 cos
3
2
2
sin d d d
sin d d d
3 cos
2
sin d d d
2
6.
Find the area inside the circle r
and outside the limacon r
a. 4
b.
5
3
c. 2
d.
5
3
e. 2
1
4 cos
3
3
2
3
2
3
2
3
2
x
7. Hyperbolic coordinates in quadrant I are given by u
So the area element is dA
a.
b.
c.
d.
e.
y
2 cos .
y
x
and v
yx .
dx dy
2 uv du dv
2 uv du dv
2 uv du dv
2 uv du dv
2
2 u2 du dv
v
3
8. If f
sin x
y , then
f
a. 2 sin x y
b. 2 sin x y
c. 2 cos x y
d. 2 cos x y
e. 0
Work Out: (Points indicated. Part credit possible. Show all work.)
9. (12 points) Determine whether or not each of these limits exists. If it exists, find its value.
a.
b.
lim
3x 2 y 2
x 6 3y 3
lim
xy 2
x2 y2
x,y
x,y
0,0
0,0
4
10. (20 points) Compute
z
9
x2
y2
for z
F dS for the vector field F
yz, xz, z 2
over the cone
5 oriented down and in.
Note: The cone may be parametrized as R r,
r cos , r sin , 9
r .
5
11. (20 points) Compute
below the paraboloid z
F dV for the vector field F
9
x
2
y
2
and above the plane z
x3, y3, x2z
y2z
over the solid region
5.
6