## Class Schedule

This class schedule is approximate. That is, it is the plan for future classes, and a brief summary of past classes. You should attend class and do the homework for a better understanding of what is covered.

Week Monday Wednesday Friday
1
February 2

§9.1: Coordinates & Distances
February 4

§9.2: Vectors
§9.3: The Dot Product
February 6

§9.4: The Cross Product & Planes
2
February 9

§9.5: Lines & Planes,
Distance formulas
February 11

§9.6: Functions & Graphs
February 13

3
February 16

President's Day
No Class
February 18

§10.1: Curves in Space
§10.2: Velocity & Acceleration
February 20

§10.3: Arc Length
§10.4: Curvature
4
February 23

§9.7: Spherical & Cylindrical Coordinates
February 25

§10.5: Parametric Surfaces
February 27

§11.1: Functions
§11.2: Continuity
5
March 2

§11.3 Partial Derivatives
PDE's and Solutions
March 4

Review for First Exam
March 6

§11.4: Linear Approximation
6
March 9

§11.5: The Gradient, the Chain Rule, & Implicit Differentiation
March 11

§11.6 The Gradient & Tangent Spaces
March 13

§11.6 The Directional Derivative
7
March 16

§11.7: Maxima & Minima
March 18

§11.8: Lagrange Multipliers
March 20

§11.8: Global Extremal Problems
SB
March 23

Spring Break
No Class
March 25

Spring Break
No Class
March 27

Spring Break
No Class
8
March 30

§§12.1–2: Double Integrals
April 1

§12.3: More Double Integrals
April 3

§12.4: Double Integrals in Polar Coordinates
9
April 6

Review for Exam Two
April 8

§12.5: Applications of Double Integrals
§12.6: Surface Area
April 10

§12.7: Triple Integrals
10
April 13

§12.8: Triple Integrals in Cylindrical & Spherical Coordinates
April 15

§13.1: Vector Fields
§13.2: Line Integrals
April 17

§13.3: The Fundamental Theorem for Line Integrals
11
April 20

§13.4: Green's Theorem
April 22

§13.5: Curl and Divergence
April 24

§13.6: Flux Integrals
12
April 27

§13.7: Stokes' Theorem
April 29

§ 13.8: The Divergence Theorem
§ 13.9: Summary of Integral Theorems
May 1

Review for the Final Exam

Last Day of Classes