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calculus:math_323:start

Math 323 Calculus III

Sections

Section Number Instructor Meeting times
01 Wenbo Wang MWF 8-9:30 SW 206
02 Kunal Sharma MWF 8-9:30 LN 2403
03 Eran Crockett MWF 9:40-10:40 SW 325
R 8:30-9:55 SW 325
04 Eran Crockett MWF 10:50-11:50 SW 325
R 10:05-11:30 SW 325
05 Mathew Wolak MWF 10:50-11:50 LN 2403
T 11:40-1:05 SW 325
06 Jonathan Williams MWF 12:00-1:00 LN G332
T 10:05-11:30 LN G332
07 Wiktor Mogilski MWF 1:10-2:10 LN 2403
R 11:40-1:05 SW 206
08 Junyi Dong MWF 2:20-3:20 LN 2403
T 1:15-2:40 SW 206
09 Mathew Wolak MWF 3:30-4:30 LH 11
R 1:15-2:40 SW 325

Course coordinator: Mathew Wolak

Textbook:

Multivariable Calculus, Eighth Edition, James Stewart
You will need the online code.

  • Chapter 12: Vectors and the Geometry of Space
  • Chapter 13: Vector Functions
  • Chapter 14: Partial Derivatives
  • Chapter 15: Multiple Integrals
  • Chapter 16: Vector Calculus

Prerequisite:

Math 222

Course Objectives:

Develop theoretical and practical skills for multivariable calculus.

Evaluation:

The final grade will be determined as follows:

  • Test 1, 20% (Week 5)
  • Test 2, 20% (Week 9)
  • Test 3, 20% (Week 12)
  • Quizzes, 5%
  • Homework, 5%
  • Final, 30% (TBD)

Tentative Schedule:

Week Dates Sections Topics
1 Jan 17-20 12.1 3-D Coordinates
2 Jan 23-27 12.2 Vectors
12.3 Dot Products
12.4 Cross Products
3 Jan 30-Feb 3 12.5 Lines and Planes
12.6 Quadratic Surfaces
13.1 Vector Valued Functions
4 Feb 6-10 13.2 Derivatives of Vector Valued Functions
13.3 Arc Length
13.4 Motion in Space
5 Feb 13-17 Exam 1 Chapters 12 and 13
14.1 Functions of Several Variables
6 Feb 20-24 14.2 Limits and Continuity
13.3 Partial Derivatives
14.4 Tangent Planes and Linear Approximation
7 Feb 27-Mar 2 14.5 The Chain Rule
14.6 Directional Derivatives and the Gradient
8 Mar 8-10 14.7 Maxima and Minima
14.8 Lagrange Multipliers
9 Mar 13-17 Exam 2 Chapter 14
15.1 Double Integrals over Rectangles
10 Mar 20-24 15.2 Double Integrals over General Regions
15.3 Double Integrals in Polar Coordinates
15.6 Triple Integrals
11 Mar 27-31 15.7 Triple Integrals in Cylindrical Coordinates
15.8 Triple Integrals in Spherical Coordinates
15.9 Change of Variables
12 April 3-7 Exam 3 Chapter 15
16.1 Vector Fields
13 April 18-21 16.2 Line Integrals
16.3 The Fundamental Theorem of Line Integrals
14 April 24-28 16.4 Green's Theorem
16.5 Curl and Divergence
16.6 Parametric Surfaces
15 May 1-5 16.7 Surface Integrals
16.8 Stokes' Theorem
16.9 The Divergence Theorem
16 May 8-9 Review
Cumulative Final Exam

Help Outside of Class:

Your instructor will inform you of their office hours for your section.

Disability Services:

If you need accommodations to to a disability, please see your instructor with documentation from Services for Students with Disabilities. We will do our best to accommodate your needs.

Academic Honesty:

Cheating is considered a very serious offense. According to the University Catalog, cheating consists of: “Giving or receiving unauthorized help before, during or after an examination”. The full strength of Binghamton Academic Honesty Policy will be applied to anyone caught cheating. This may include failing the course, and further disciplinary action.

Other important information

The final is comprehensive and mandatory. There will be no make-up for the final exam except for extraordinary circumstances. Failure to take the final will result in a grade of F for the class. University photo ID is required to take the exam. Please note that no calculators are allowed during exams.

calculus/math_323/start.txt · Last modified: 2017/01/24 13:25 by wolak