These 216 exams are from previous semesters. They are provided for
informational purposes only; please note that exams for this semester
will most closely resemble more recent exams.
| First Exam from Winter 2013 |
First Exam - Solutions Winter 2013 |
| First Exam from Fall 2012 |
First Exam - Solutions Fall 2012 |
| First Exam from Winter 2012 |
First Exam - Solutions Winter 2012 |
| First Exam from Fall 2011 |
First Exam - Solutions Fall 2011
(note that there is a reported error in the answer to #5b: the
solution should be y = c1 exp(2x) +
exp(-2x)(c2 cos(2x) + c3 sin(2x)).)
|
| First Exam from Winter 2010 |
First Exam - Solutions Winter 2010 |
| First Exam from Fall 2009 |
First Exam - Solutions Fall 2009
(note that there is an algebraic error in the solution to problem
#3c: 200 - 50/16 = 196 7/8, not 193 3/4.)
|
| First Exam from Winter 2009 |
First Exam - Solutions Winter 2009
(note that there are errors in the solutions to problems #3b and #3c:
in #3b, 10 - v2 is factored incorrectly, dropping a square
root; and in #3c the solution uses Euler's method rather than Improved
Euler.)
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| Second Exam from Winter 2013 |
Second Exam - Solutions Winter 2013 |
Second Exam from Fall 2012 |
Second Exam - Solutions Fall 2012 |
| Second Exam from Winter 2012 |
Second Exam - Solutions Winter 2012 |
| Second Exam from Winter 2010 |
Second Exam - Solutions Winter 2010
(note in #7b, last line, 0.1 + 0.1(1.2) = 0.22, not 0.202 as
written.) |
| Second Exam from Fall 2009 |
Second Exam - Solutions Fall 2009
(note that there are reported errors in these solutions: in
#3 the term c_3 e^(-x) is omitted in the final general solution; in
#6 the initial conditions change; in #7 the solution uses a
different forcing term) |
| Second Exam from Winter 2009 |
Second Exam - Solutions Winter 2009 |
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| Final Exam from Fall 2012 |
Final Exam - Solutions Fall 2012 |
| Final Exam from Winter 2012 |
Final Exam - Solutions Winter 2012 |
| Final Exam from Winter 2010 |
Final Exam - Solutions Winter 2010
(note that there are reported errors in these solutions: in
#1 the coefficient of sin(2t) in y should be 3; in
#2 the eigenvalues of the matrix [[0,-5],[1,6]] are 1 and 5, so that
the critical point is unstable; and in
#5 the transform of t x'' is incorrect) |
| Final Exam from Fall 2009 |
Final Exam - Solutions Fall
2009
(note that there is a reported error in these solutions: in
#5 the transform of t x'' is incorrect) |
| Final Exam from Winter 2009 |
Final Exam - Solutions Winter 2009 |
