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Fall 2007 - Theory of Complex Variables
Homework Assignments
| Assigned | Assignment | Due | Solutions |
|---|
| Read | Do |
|---|
| 8/27 | 1.1 - 1.3 | 1.1: #2, 6, 18
1.2: #2 - 10 (evens), 14, 18, 24
1.3: #2, 4, 14, 24
| 9/5 |
Available |
| 9/5 | 1.3 |
1.3: #6, 8, 12 (you must prove that the identity
holds for any branch of the logarithm and any branch
of w1/2), 18, 26a and this
additional problem |
9/12 |
Available |
| 9/10 | 1.3, 1.4 |
1.3: #10, 34
1.4: #2 (don't worry about the very last part of (b);
we'll do it in class), 4, 8, 10, 14, 16(i), 20, 22 |
9/19 |
Available |
| 9/17 | 1.5 |
1.5: #2, 10, 14 (see #13), 16, 20 (induct on n) |
9/26 |
Available |
| 9/24 | 1.6, 2.1 |
1.5: #22, 32
1.6: #2, 4, 8, 10
2.1: #2, 4, 6, 8, 10, 12 |
10/3 |
Available |
| 10/8 | 2.2, 2.3 |
2.2: #2, 4, 6, 8
2.3: #7, 9, 10
| 10/17 |
Available |
| 10/15 | 2.4, 2.5 |
2.4: #2 (Hint: In part (a), try partial fractions
and think "winding numbers."), 5, 6, 8, 16
2.5: #5, 18 (Hint: Consider e -i f.)
| 10/24 |
Available |
| 10/22 | 2.5 |
2.R: #1, 3, 4, 11, 16
| 10/31 |
Available |
| 10/29 | 3.1, 3.2 |
3.1: #4, 12, 20
3.2: #2, 4, 6, 8, 14, 20, 24
| 11/9 |
Available |
| 11/7 | 3.3 |
3.3: #2, 4, 8, 18
3.R: #4, 12
| 11/14 |
Available |
| 11/12 | 4.1, 4.2 |
3.3: #16, 20(a)
3.R: #2, 6(a), 18, 20
4.1: #1, 2, 8
4.2: #2, 3, 4, 5, 6
| 11/26 |
Available |
| 11/19 | 4.3 |
4.3: #3, 20(a), 23
4.R: #1, 7
| 11/28 |
Not yet! |
| 11/26 | 4.3 |
4.3: #6, 7, 11, 12, 14, 17, 20(b)
| 12/3 |
Not yet! |
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