Announcements:

• Solutions to Exams 1 and 2 are posted on the Exams page. Follow the link above.

Lectures	Sections in Text	Brief Description
1/5	1.1 - 1.6	Vectors, Dot and Cross products, lines, planes, matrices
1/8	1.7	Polar, cylindrical, and spherical coordinates (no standard bases)
1/10	2.1-2.3	Functions of several variables, graphing surfaces, limits, continuuity, partial derivatives
1/11 (x-hour)	2.4 - 2.5	Properties of the derivative and the chain rule (brief higher order partials)
1/12	2.6	Directional Derivatives and the Gradient
1/17	3.1	Parametrized Curves
1/18 (x-hour)	3.2	Arclength (no curvature)
1/19	3.3	Vector Fields
1/22	3.4	Gradient, Divergence, Curl and the Del operator
1/24	5.1/5.2	Areas and Volumes, Double Integrals
1/26	5.2/5.3	Double Integrals, Changing the order of integration
1/29	5.4	Triple Integrals
1/31	5.5	Change of Variables
2/2	5.5	Change of Variables
2/5	5.6	Applications of Integration
2/7	5.6	Applications of Integration; review of problems from Chapter 5
2/12	6.1	Scalar and Vector line integrals
2/14	6.1	Scalar and Vector line integrals
2/16	6.2	Green's theorem
2/19	6.3	Conservative Vector Fields
2/21	7.1	Parametrized surfaces
2/23	7.1/7.2	Areas of surfaces; surface integrals
2/26	7.2	Surface Integrals
2/28	7.2	Stokes's and Gauss's theorems
3/2	7.3	Stokes's and Gauss's theorems
3/5	7.3	Stokes's and Gauss's theorems
3/7		Course summary/review

Stephanie Treneer

Last updated June 25, 2009 14:48:58 EDT