Advanced
Calculus
II MA 3832 D02
Joseph Fehribach
Syllabus of Homework
Assignments
|
| 1 | | pp. 108-110 |
| Due 19 March 2002 |
| # 1, 2, 3a, 4, 6, 9a, 14 |
| 2 | | pp. 132-133 |
| Due 28 March 2002 |
| # 1, 4, 7 |
| 3 | | pp. 133-134 |
| Due 8 April 2002 |
| # 8, 9, 12, 23, A |
| 4 | | pp. 134-135 |
| Due 12 April 2002 |
| # 22, 24a,b,c,d, 26 |
| 5 | | pp. 160-161 |
| Due 22 April 2002 |
| # 1, 2, 3, 8a, 9, 11 |
| 6 | | pp. 162-166 |
| Due 26 April 2002 |
| # 20, 21, 35, 36, 40 |
|
# A. Suppose |f| is integrable on [a,b] .
Please give a counter example to show that
this does not imply that f is integrable.