Last updated 15 August, 2005
| Date Assigned | Date Due | Section | Problems to Do |
|---|---|---|---|
| 24 Aug | 7 Sept | Section 1.1, 1.2 | Homework 1 |
| 29 Aug | 7 Sept | Suppose $S$ is an ordered set with the lub-property, $B \subset S$, $B \neq \emptyset$ and $B$ is bounded below. Let $L$ be the set of all lower bounds of $B$. Then $\alpha=\sup L$ exists in $S$ and $\alpha=\inf B$. In particular, $\inf B$ exists in $S$. | |
| 31 Aug | 19 Sept | Section 1.3 | Homework 2 |
| 7 Sept | 19 Sept | Section 1.4 - 1.5 | Homework 3 |
| 19 Sept | 26 Sept | Section 1.6 - 1.7 | Homework 4 |
| 21 Sept | Section 1.8 | Homework 5 | |
| Homework 6 | |||
| Homework 7 | |||
| Homework 8 | |||
| Homework 8, part 2 | |||
| Homework 9 | |||
| Homework 10 |