Note that the in-class exams are on Wednesday, February 14; Friday, March 10; Friday, April 7; and Friday, April 28. The final exam is on Tuesday, May 9.

Date	Section
1/17	12.1 3D coordinate systems
1/18	12.2 Vectors
1/20	Classwork and quiz
1/23	12.3 Dot products
1/24	12.4 Cross products
1/25	12.5 Lines and planes in space
1/27	Classwork and quiz
1/30	10.1 Conics, 12.6 Cylinders and quadrics
1/31	12.6 Cylinders and quadrics
2/1	13.1 Vector functions
2/3	Classwork and quiz
2/6	13.3 Arc length and unit tangent vector
2/7	13.4 Curvature and unit normal vector
2/8	13.5 Torsion and unit binormal vector
2/10	Classwork and quiz
2/13	Exam review
2/14	Chapter 12 and 13 exam
2/15	14.1 Multivariable functions, 14.2 Limits and continuity
2/17	Classwork and quiz
2/20	14.3 Partial derivatives
2/21	(continued)
2/22	14.4 Chain rule
2/24	Classwork and quiz
2/27	14.5 Directional derivatives and gradients
2/28	14.6 Tangent planes and differentials
3/1	14.7 Extreme values and saddle points
3/3	Classwork and quiz
3/6	14.8 Lagrange multipliers
3/7	14.10 Taylor's formula
3/8	Exam review
3/10	Chapter 14 exam
3/20	15.1 Double integrals
3/21	(continued)
3/22	15.2 Area, moments, centers of mass
3/24	Classwork and quiz
3/27	15.3 Double integrals in polar form
3/28	15.4 Triple integrals in rectangular form
3/29	15.5 Masses and moments in 3D.
3/31	Classwork and quiz
4/3	15.6 Triple integrals in cylindrial and spherical form
4/4	(continued)
4/5	Exam review
4/7	Chapter 15 exam
4/10	16.1 Line integrals
4/11	16.2 Vector fields, work, circulation, flux
4/12	16.3 Path independence, potential functions, conservative fields
4/14	Classwork and quiz
4/17	16.4 Green's theorem
4/18	16.6 Parametrized surfaces
4/19	16.5 Surface area and integrals
4/21	Classwork and quiz
4/24	Stokes' theorem
4/25	(continued) Quiz
4/26	Exam review
4/28	Chapter 16 exam (through Stokes' theorem)
5/1	16.8 Divergence theorem
5/2	(continued) Quiz
5/3	Final review
5/5	Final review
5/9	Final exam 7am-9am