Syllabus

Math 13
Multivariable Calculus
Last updated June 27, 2016 13:25:43 EDT

Syllabus

The following is a tentative syllabus for the course.
Check also the Homework Assignments page.

Lectures Sections in Text Brief Description

1/7 Basic concepts Reveiw and course overview

1/9 15.1 Introduction to integration, iterated integrals

1/11 15.2, 15.3 Fubini's Theorem, integration over non-rectangular regions

1/14 15.4 Integration in polar coordinates

1/16 15.4, 15.5 Integration in polar coordinates, applications of double integrals

1/18 15.7, 15.8 Triple integration, cylindrical coordinates

1/21 MLK Day - NO CLASS

1/23 15.8, 15.9 Spherical coordinates

1/24 (x-hour) Ch 12 Vectors, dot product, cross product, determinants, planes

1/25 15.10 Change of variables, the Jacobian

1/28 15.10 Change of variables, the Jacobian (continued)

1/30 Ch 12, 13 Projections, vector functions

2/1 Ch 14 Partial and directional derivatives, gradients, tangent planes

2/4 16.2 Line integrals of scalar functions

2/4 Exam 1 from 4:00 pm to 6:00 pm

2/6 16.1, 16.2 Vector fields, line integrals of vector fields

2/7 (x-hour) 16.3 The Fundamental Theorem of Calculus for line integrals

2/8 NO CLASS - Winter Carnival

2/11 16.3 The Fundamental Theorem of Calculus for line integrals (continued)

2/13 16.4 Green's Theorem

2/15 16.4, 16.5 Green's Theorem (continued), Curl and Divergence

2/18 16.5, 16.6 Curl and Divergence (continued)

2/20 16.6 Parametrizing surfaces, tangent planes

2/22 16.6, 15.6 Surface area

2/25 16.7 Surface integrals of scalar functions

2/25 Exam 2 from 4:00 pm to 6:00 pm

2/27 16.7 Surface integrals of vector fields

3/1 16.9 The Divergence Theorem

3/4 16.9,16.8 The Divergence Theorem (continued), Stokes' Theorem

3/6 16.8 Stokes' Theorem, continued

3/8 Course Wrap-up

3/12 Final Exam - 3:00 pm to 6:00 pm

Lectures	Sections in Text	Brief Description
1/7	Basic concepts	Reveiw and course overview
1/9	15.1	Introduction to integration, iterated integrals
1/11	15.2, 15.3	Fubini's Theorem, integration over non-rectangular regions
1/14	15.4	Integration in polar coordinates
1/16	15.4, 15.5	Integration in polar coordinates, applications of double integrals
1/18	15.7, 15.8	Triple integration, cylindrical coordinates
1/21		MLK Day - NO CLASS
1/23	15.8, 15.9	Spherical coordinates
1/24 (x-hour)	Ch 12	Vectors, dot product, cross product, determinants, planes
1/25	15.10	Change of variables, the Jacobian
1/28	15.10	Change of variables, the Jacobian (continued)
1/30	Ch 12, 13	Projections, vector functions
2/1	Ch 14	Partial and directional derivatives, gradients, tangent planes
2/4	16.2	Line integrals of scalar functions
2/4		Exam 1 from 4:00 pm to 6:00 pm
2/6	16.1, 16.2	Vector fields, line integrals of vector fields
2/7 (x-hour)	16.3	The Fundamental Theorem of Calculus for line integrals
2/8		NO CLASS - Winter Carnival
2/11	16.3	The Fundamental Theorem of Calculus for line integrals (continued)
2/13	16.4	Green's Theorem
2/15	16.4, 16.5	Green's Theorem (continued), Curl and Divergence
2/18	16.5, 16.6	Curl and Divergence (continued)
2/20	16.6	Parametrizing surfaces, tangent planes
2/22	16.6, 15.6	Surface area
2/25	16.7	Surface integrals of scalar functions
2/25		Exam 2 from 4:00 pm to 6:00 pm
2/27	16.7	Surface integrals of vector fields
3/1	16.9	The Divergence Theorem
3/4	16.9,16.8	The Divergence Theorem (continued), Stokes' Theorem
3/6	16.8	Stokes' Theorem, continued
3/8		Course Wrap-up
3/12		Final Exam - 3:00 pm to 6:00 pm

Dana P. Williams
Last updated June 27, 2016 13:25:43 EDT