MATH 234
FINAL EXAM
April 30, 2001
Name(print)_ Student Number_ Section Number_ Page Points 1 2 3 4 5 6 Total
Instructions: 1.Since grading will be based on method you must show all work . 2.Boldfaced
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ID Number:
TA:
Section Time:
No calculators or any other devices allowed.
If any question is not clear, ask for clarication.
No credit will be given for illegible solutions.
If you present diere
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MTH 234
Exam 4: Practice
December 7, 2010
50 minutes
Sects: 16.1-16.5,
16.7, 16.8.
1.
No calculators or any other devices allowed.
If any question is not clear, ask
MATH 234
FINAL EXAM
December 11, 2001
Name(print)_ Student Number_ Section Number_ Page Points 1 2 3 4 5 6 Total
Instructions: 1.Since grading will be based on method you must show all work . r 2.Bold
Name:
ID Number:
TA:
Section Time:
MTH 234
Exam 1: Practice
September 21, 2010
50 minutes
Sects: 12.1-12.6.
1.
No calculators or any other devices allowed.
If any question is not clear, ask for claric
Math 234, Practice Test #3
Show your work in all the problems.
1. Find the volume of the region bounded above by the paraboloid z = 9
x2 y 2 , below by the xy-plane and lying outside the cylinder x2
Math 234, Practice Test #4
Show your work in all the problems.
1. Evaluate the line integral
C
2xy dx + (x2 + y 2) dy
where C is the circular arc given by
r(t) = (x(t), y (t) = (cos t, sin t) , 0 t
2
Name:
TEST 1
answers
No Calculators
1 (48 points) A hummingbird starts at a feeder located at F (0, 0, 10) (distances in
feet) and ies straight toward a point B (10, 20, 30) on a branch with a speed 3
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Section Time:
MTH 234
Exam 2: Practice
October 19, 2010
50 minutes
Sects: 13.1, 13.3,
14.1-14.7.
1.
No calculators or any other devices allowed.
If any question is not clear, ask
Math 234, Practice Test #2
Show your work in all the problems.
1. In what directions is the derivative of
f (x, y ) =
x2 y 2
x2 + y 2
at P = (1, 1) equal to zero ?
2. Find an equation for the level su
Math 234, Practice Test #1
Show your work in all the problems. 1. Find parametric equations for the line in which the planes x +2y + z = 1 and x y + 2z = 8 intersect. 2. Compute the distance from the