The final exam is scheduled for 8 -
11 A.M. on Wednesday May
2. It will be comprehensive.
There were three hour exams during the term.
The first, held on February
12, covered Sections 1.2 thru 1.6 and 2.1 thru 2.5. The median,
including test correstions, was 70.
The second hour test, covering through
Section 6.1, was held on
Friday, March 23. The
median was 75.
The third hour test was distributed on April 23 and handed in on April 27. It covered thruough Section 6.6 and the first three sections of Chapter 7. The median was 82. Notes on the test can be found at http://www.math.uga.edu/%7Eazoff/courses/4050t3n.pdf
|
|
Due |
Section |
Exercises for Class Discussion |
|
|
| 1 |
F 19 Jan |
1.2 |
1, 5, 7, 9, 12, 21 |
10, 18 |
|
| 1.3 |
1, 5, 10, 11, 15, 21, 25 |
8, 13, 20, 30 |
19, 28, 31 |
||
| 1.4 |
1, 2, 4ace, 5gh, 10, 14, 15 |
8, 11, 12, 13 |
17 |
||
| 2 |
F
26 Jan |
1.5 |
1,
2c, 6, 8, 10, 11, 13a, 17, 20 |
5, 9,
15, 16, 19 |
|
| 1.6 |
1, 3,
7, 9, 12, 22, 24, 30 |
4,
13, 17, 20, 32 |
25,
29, 35 |
||
| 1.7 |
1 |
3,
7 |
|||
| 3 |
F 2 Feb |
2.1 |
11, 17, 19, 24, 28, 38 | 4, 5, 9de, 13, 16, 18 | 27,
37, 40 |
| 2.2 |
4, 9, 10, 13 |
3, 5bf, 8, 11 |
12,
16 |
||
| 4 |
F 9 Feb |
2.3 |
3,
11, 15 |
4b,
12, 14a |
9,
16a |
| 2.4 |
2, 6,
13, 15 |
4, 9,
17 |
22,
25 |
||
| 2.5 |
4,
10, 11, 13 |
2b,
3c, 6a, 9 |
|||
| optional |
F 9 Feb |
2.6 |
2, 5 |
||
| 2.7 |
3, 13 |
||||
| 5 |
F 23 Feb |
3.1 |
1, 5,
6 |
||
| 3.2 |
1, 5,
7, 11 |
6a |
14,
21 |
||
| 3.3 |
1,
3dg, 4, 6 |
5, 8,
10 |
14 |
||
| 3.4 |
1, 5,
9, 12 |
2e, 8 |
|||
| 4.1 |
1, 3,
5, 6, 7, 8 |
4a,
9, 11 |
|||
| 4.2 |
1,
19, 23, 29 |
20, 26 |
30 |
||
| 4.3 |
5, 9,
11, 19, 21 |
10,
12, 15, 16 |
22 |
||
| 4.4 |
1, 4ae |
||||
| 6 |
F 2 Mar |
5.1 |
1, 2bf, 3d, 4f, 6, 9, 12, 15, 22ab |
3ac, 4e, 7abd, 8ab, 11, 14 |
16, 19 |
| 5.2 |
1, 2d, 8 |
3d, 7, 12, 13, 18 |
20 |
||
| 5.3. |
1, 6 |
11 |
|||
| 7 |
F
9 Mar |
5.4 |
1, 3,
7, 13, 33 |
2acd,
5, 17, 19, 36 |
16,
23, 27, 41 |
| 6.1 |
1, 2,
5, 11, 19, 21 |
3, 8,
9, 10, 12, 17, 20 |
15,
24 |
||
| 8 |
M 2 Apr |
6.2 |
1,3,6,11,12,16,19c |
2c,4,7,9,13,14,17,20a |
18, 21,23 |
| 6.3 |
1,2c,6,10,18,19,,21 |
3ac,7,8,11,12,14,22b |
9,13 |
||
| 9 |
F 13 Apr |
6.4 |
1,6,7,12 |
2ad,4,9 |
11,14,18 |
| 6.5 |
1,4,10,11,13,17 |
2c,3,5ce,7,9,12 |
6,23,27d |
||
| 6.6 |
1,3,6 |
4,8 |
5,10 |
||
| 10 |
F 20 Apr |
7.3 |
1,2ac,4ac,8 | 2bd,3bd,4bd,10,14 | 15 |
| 7.1 |
1,2bd,3bd,5 |
2ac,3a,4 |
7abcd,8 |
||
| 7.2 |
1,2,4bd,5bd,10 |
3,4ac,5c,15a |
7,17,21 |
1Graduate students are required to include at least two problems in this category in each homework assignment.
| Web Page | http://www.math.uga.edu/~azoff/courses/4050.html | |
| Call Numbers | 12-568 for MATH 4050; 32-569 for MATH 6050 |
|
| Time & Place | 9:05-9:55 AM MWF |
|
| Course Objectives |
Rigorous treatment of topics like subspaces and
independence introduced in elementary linear algebra courses, Proof and applications of the Spectral Theorem Proof and applications of Jordan Canonical Forms |
|
| Text | Linear Algebra, 4th Edition,
by S. Friedberg, A. Insel, & L., Prentice Hall, 2003, ISBN
0-13-0084514. We will spend two weeks on each of Chapters 1 and 2, one week on each of Chapters 3 and 4, and three weeks on each of Chapters 5, 6, and 7 |
|
| Prerequisites |
MATH
3000 (Elementary Linear Algebra) MATH 4000 (Abstract Algebra) |
|
| Grading | Homework Hour Tests (3 @ 100 pts) Comprehensive Final Exam (8 - 11 A.M. on Wednesday May 2) |
300 points 200 points |
| Homework will be collected about once a week; no late work will be accepted. | ||
| Instructor | E. Azoff | |
| e-mail Phone Office |
azoff@math.uga.edu 542-2608 443 Boyd |
|
| Office Hours |
2:30 - 3:30 PM daily (tentative) |
No office hours on: Tuesday April 3 - Wedneday April 4 Monday April 9 - Tuesday April 10 |
|
|
Due |
Section |
Exercises for Class Discussion |
|
|
| 1 |
W 17 Jan |
1.2 |
1, 5, 7, 9, 12, 21 |
10, 18 |
|
| 1.3 |
1, 5, 10, 11, 15, 21, 25 |
8, 13, 20, 30 |
19, 28, 31 |
||
| 1.4 |
1, 2, 4ace, 5gh, 10, 14, 15 |
8, 11, 12, 13 |
17 |
||
| 2 |
W
24 Jan |
1.5 |
1,
2c, 6, 8, 10, 11, 13a, 17, 20 |
5, 9,
15, 16, 19 |
|
| 1.6 |
1, 3,
7, 9, 12, 22, 24, 30 |
4,
13, 17, 20, 32 |
25,
29, 35 |
||
| 1.7 |
1 |
3,
7 |
Graduate students are required to include at least two problems in the Grad/Bonus category in each homework assignment.