Calendar

The following schedule of what chapters will get covered when is tentative and subject to change. The actual specific topics for each day will be added to the calendar as we cover them.

Week Monday Tuesday Wednesday Thursday Friday
0
       Sep 24
(no discussion)
 Sep 25
Chap 1: ordered sets
1
 Sep 28
Chap 1: fields
 Sep 29
Sep 30
Chap 1: Real numbers
 Oct 1
Discussion
 Oct 2
Chap 1: Complex numbers
Homework 1
2
 Oct 5
Chap 1: Euclidean spaces
 Oct 6
Oct 7
Chap 2: Countability
 Oct 8
Discussion
 Oct 9
Chap 2: Metric Spaces I: definitions
Homework 2
3
 Oct 12
Chap 2: Metric Spaces II: open and closed sets
 Oct 13
Oct 14
Chap 2: Metric spaces III: closures and topology
 Oct 15
Discussion
 Oct 16
Chap 2: Compact sets I
Homework 3
4
 Oct 19
Midterm 1
 Oct 20
Oct 21
Chap 2: Compact sets II
 Oct 22
Discussion
 Oct 23
Chap 3: Convergent sequences
Homework 4
5
 Oct 26
Chap 3: Subsequences; monotonic sequences
 Oct 27
Oct 28
Chap 3: Cauchy sequences; lim sup and lim inf
 Oct 29
Discussion
 Oct 30
Chap 3: Some special sequences; series
Homework 5
6
 Nov 2
Chap 3: Series; series of nonnegative terms
 Nov 3
Nov 4
Chap 3: The number e; root and ratio tests; power series
 Nov 5
Discussion
 Nov 6
Chap 3: Absolute convergence; sum and product of series
Homework 6
7
 Nov 9
Midterm 2
 Nov 10
Nov 11
Veteran's Day (No class)
 Nov 12
Discussion
 Nov 13
Chap 4: Continuity
Homework 7
8
 Nov 16
Chap 4: Continuity and compactness
 Nov 17
Nov 18
Chap 4: Uniform continuity
 Nov 19
Discussion
 Nov 20
Chap 4: limits
Homework 8
9
 Nov 23
Chap 4: Continuity and connected sets
 Nov 24
Nov 25
Chap 4: left and right hand limits and types of discontinuities
 Nov 26
Thanksgiving Holiday (no discussion)
 Nov 27
Thanksgiving Holiday (no class)
10
 Nov 30
Chap 4: monotonic functions
 Dec 1
Dec 2
Chap 4: infinite limits and limits at infinity
 Dec 3
Discussion
 Dec 4
Review
Homework 9
11   Dec 8
Final Exam
11:30am-2:30pm