Wk
|
Date
|
Section |
Topics
|
|
1 |
1/7 |
|
Introduction |
|
|
1/9 |
16.1 |
Integration
in several variables |
|
|
1/11 |
|
Iterated
Integrals |
|
2 |
1/14 |
16.2 |
Double
integrals over general regions |
|
|
1/16 |
16.3 |
Triple integrals
|
|
|
1/18 |
|
Cont’d |
|
3 |
1/21 |
|
Martin Luther King Day |
|
|
1/23 |
16.4 |
Cylindrical
and spherical coordinates |
|
|
1/25 |
|
Integration
in polar, cylindrical, spherical coordinates |
|
4 |
1/28 |
16.5 |
General
Change of Variables Formula |
|
|
1/30 |
|
Cont’d. |
|
|
2/1 |
17.1 |
Vector Fields |
|
5 |
2/4 |
17.2 |
Line Integrals |
|
|
2/6 |
|
Cont’d Exam I 5:00 – 6:30 PM |
|
|
2/8 |
17.3 |
Conservative
Vector Fields |
|
6 |
2/11 |
|
Cont’d |
|
|
2/13 |
|
Fundamental Theorem for Line Integrals |
|
|
2/15 |
17.4 |
Parametrized
surfaces |
|
7 |
2/18 |
|
President’s
Day |
|
|
2/20 |
|
Surface
area, surface integrals |
|
|
2/22 |
17.5 |
Surface
integrals of vector fields |
|
8 |
2/25 |
|
Cont’d |
|
|
2/27 |
18.1 |
Green’s
Theorem Exam II 5:00 – 6:30 PM on 14.2-14.6, 15.1-15.2 |
|
|
2/29 |
|
Cont’d |
|
9 |
3/3 |
18.2 |
Stokes’
Theorem |
|
|
3/5 |
18.2 |
Cont’d |
|
|
3/7 |
18.2 |
Divergence
Theorem |
|
10 |
3/10 |
18.3 |
Cont’d |
|
|
3/12 |
|
Applications
of vector analysis |
|
|
3/14 |
|
Leeway |
|
|
3/20 |
Thursday |
Final
Exam 3:00 – 6:00 PM |