Name (Last, First) Signature Lecturer
ID #
Section #
university of massachusetts amherst department of mathematics and statistics
Math 132
Exam 1
February 21, 2008 7:00-8:30 p.m.
Instructions Turn off all cell phones and watch alarms! Put away iPods, etc.
Name (Last, First)
ID #
Signature
Lecturer
Section (A, B, C, etc.)
university of massachusetts amherst
department of mathematics and statistics
Math 132
Exam 1
February 29, 2012
7:00-9:00 p.m.
Turn o all cell phones and watch alarms! Put away iPods, etc.
Name (Last, First)
ID #
Signature
Lecturer
Section (A, B, C, etc.)
university of massachusetts amherst
department of mathematics and statistics
Math 132
DRAFT Exam 2
April 7, 2011
7:00-9:00 p.m.
Turn o all cell phones and watch alarms! Put away iPods, et
Name (Last, First)
ID #
Signature
Lecturer
Section (A, B, C, etc.)
university of massachusetts amherst
department of mathematics and statistics
Math 132
DRAFT Exam 1
February 24, 2011
7:00-9:00 p.m.
Turn o all cell phones and watch alarms! Put away iPods
Name (Last, First)
ID #
Signature
Lecturer
Section #
university of massachusetts amherst
department of mathematics and statistics
Math 132
DRAFT Exam 2
March 26, 2009
7:00-8:30 p.m.
Instructions
Turn o all cell phones and watch alarms! Put away iPods, et
Name (Last, First)
ID #
Signature
Lecturer
Section #
university of massachusetts amherst
department of mathematics and statistics
Math 132
DRAFT Exam 3
April 23, 2009
7:00-8:30 p.m.
Instructions
Turn o all cell phones and watch alarms! Put away iPods, et
Name (Last, First)
ID #
Signature
Lecturer
Section #
university of massachusetts amherst
department of mathematics and statistics
Math 132
DRAFT Exam 1
February 19, 2009
7:00-8:30 p.m.
Instructions
Turn o all cell phones and watch alarms! Put away iPods,
Exam 2 Fall 2013: Problem 1(a)
ex
dx is convergent or
x
3/2
(3e + 1)
divergent. If the integral converges, nd what it converges to.
Determine whether the integral
Solution:
We have
f (x ) dx = limt
Using u = 3e x + 1,
ex
dx =
(3e x + 1)3/2
t
t
t
f (x )
Exam 1 Fall 2013: Problem 1(a)
A particle moves along a line L so that its velocity at time t is
v (t ) = t 2 + 2t 8.
Find the displacement of the particle between t = 1 and t = 3.
Solution:
Let s (t ) denote the position at time t along the line L, where
Name (Last, First)
ID #
Signature
Lecturer
Section (A, B, C, etc.)
university of massachusetts amherst
department of mathematics and statistics
Math 132
DRAFT Final Exam
May 19, 2008
8:00-10:00 a.m.
Instructions
Turn o cell phones and watch alarms! Put a
Name (Last, First)
ID #
Signature
Lecturer
Section (A, B, C, etc.)
university of massachusetts amherst
department of mathematics and statistics
Math 132
DRAFT Exam 3
April 23, 2008
7:00-8:30 p.m.
Instructions
Turn o cell phones and watch alarms! Put away
Name (Last, First)
ID #
Signature
Lecturer
Section (A, B, C, etc.)
university of massachusetts amherst
department of mathematics and statistics
Math 132
Exam 2
April 5, 2012
7:00-9:00 p.m.
Turn o all cell phones and watch alarms! Put away iPods, etc.
Yo