Instructor: Kameron McCombs

Course on canvas.dartmouth.edu.

## Syllabus

Day Lectures Sections in Text Brief Description
1 11 Sept(M) 4.1-4.2 Review of functions of several variables and definite integrals
2 13 Sept (W) 5.1 Double integrals over rectangular regions
3 15 Sept (F) 5.2 Double Integrals over general regions
4 18 Sept (M) 5.3 Integration in polar coordinates
5 20 Sept (W) 5.3-5.4 Integration in polar coordinates and triple integrals
6 22 Sept (F) 5.4-5.5 Triple integration, cylindrical coordinates
7 25 Sept (M) 5.5 Spherical coordinates
8 27 Sept (W) 2.3, 2.5, 4.3 Review of vectors, dot product, cross product, determinants, planes
9 29 Sept (F) 5.7 Change of variables, the Jacobian
10 2 Oct (M) 5.7 Change of variables, the Jacobian (continued)
11 4 Oct (W) 3.1-3.2 Review of vector functions
4 Oct (W) Midterm Exam (4:00pm-6:00pm)
12 6 Oct (F) 4.3-4.4, 4.6 Review of partial and directional derivatives, gradients, tangent planes
13 9 Oct (M) Vector Fields
14 11 Oct (W) 6.1 Line integrals of vector fields
15 13 Oct (F) 6.2 Line Integrals, The Fundamental Theorem of Calculus for line integrals
16 16 Oct (M) 6.3 Line Integrals, The Fundamental Theorem of Calculus for line integrals (continued)
17 18 Oct (W) 6.3 The Fundamental Theorem of Calculus for line integrals (continued)
18 20 Oct (F) 6.4 Green's Theorem
19 23 Oct (M) 6.4 Green's Theorem (continued)
20 25 Oct (W) 6.5 Curl and Divergence
21 27 Oct (F) 6.5 Curl and Divergence (continued), Parametrizing surfaces
27 Oct (F) Midterm Exam (4:00pm-6:00pm)
22 30 Oct (M) 6.6 Parameterizing a surface and surface area
23 1 Nov (W) 6.6 Surface integrals of scalar functions
24 3 Nov (F) 6.7 Stokes' Theorem
25 6 Nov (M) 6.7 Stokes' Theorem (continued)
26 8 Nov (W) 6.8 The Divergence Theorem
27 10 Nov (F) 6.8 The Divergence Theorem (continued)
28 13 Nov (M) Wrap up
19 Nov (Sun) Final Exam (3:00pm-6:00pm)