**Problem of the Week**

**Math Club**

**DST and GT Day**

**Number Theory Conf.**

**Zassenhaus Conference**

**Hilton Memorial Lecture**

calculus:math_323:start

Section Number | Instructor | Meeting times |
---|---|---|

01 | Xiaojie Du | MWF 8:00-9:30 SW 327 |

02 | Lin Yao | MWF 8:00-9:30 FA 209 |

03 | Eran Crockett | MWF 9:40-11:10 S2 260 |

04 | Alexander Borisov | MWF 11:20-12:50 SW 211 |

05 | Kunal Sharma | MWF 1:10-2:40 S2 260 |

06 | John Brown | MWF 1:10-2:40 SW 211 |

07 | Matthew Wolak | MWF 2:50-4:20 S2 260 |

08 | Nicholas Devin | MWF 2:50-4:20 SW 211 |

09 | Nicholas Devin | MWF 4:40-6:10 S2 260 |

10 | Matthew Wolak | MWF 4:40-6:10 WH G002 |

Course coordinator: Alexander Borisov

*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

Math 222, Math 227, or Math 230

Develop theoretical and practical skills for multivariable calculus.

The final grade will be determined as follows:

- Test 1, 15% (Week 5)
- Test 2, 15% (Week 10)
- Test 3, 15% (Week 14)
- Quizzes, 15%
- Homework, 5%
- Final, 35% (TBD)*

*Additionally, the following One-Letter-Grade Rule will apply to all students: The grade in the course will not exceed the grade on the final examination by more than one grade point. (For example, if you get C- on the final examination, your best possible grade is B-).

(subject to change and adjustment at your instructor's discretion)

Week | Dates | Sections | Topics |
---|---|---|---|

1 | Jan 17-19 | 12.1 | 3-D Coordinates |

12.2 | Vectors | ||

2 | Jan 22-26 | 12.3 | Dot Products |

12.4 | Cross Products | ||

12.5 | Lines and Planes | ||

3 | Jan 29-Feb 2 | 12.6 | Quadratic Surfaces |

13.1 | Vector Valued Functions | ||

13.2 | Derivatives of Vector Valued Functions | ||

4 | Feb 5-9 | 13.3 | Arc Length |

13.4 | Motion in Space | ||

Exam 1 Review: Chapters 12 and 13 | |||

5 | Feb 12-16 | Exam 1 | Chapters 12 and 13 |

14.1 | Functions of Several Variables | ||

14.2 | Limits and Continuity | ||

6 | Feb 19-23 | 14.3 | Partial Derivatives |

14.4 | Tangent Planes and Linear Approximation | ||

14.5 | The Chain Rule | ||

7 | Feb 26-Mar 2 | 14.6 | Directional Derivatives and the Gradient |

14.7 | Maxima and Minima | ||

14.8 | Lagrange Multipliers | ||

8 | Mar 5-9 | No class: Winter Break | |

No class: Winter Break | |||

15.1 | Double Integrals over Rectangles | ||

9 | Mar 12-16 | 15.2 | Double Integrals over General Regions |

15.3 | Double Integrals in Polar Coordinates | ||

Exam 2 Review: Chapter 14 and Sections 15.1 - 15.3 | |||

10 | Mar 19-23 | Exam 2 | Chapter 14 and Sections 15.1 - 15.3 |

15.6 | Triple Integrals | ||

15.7 | Triple Integrals in Cylindrical Coordinates | ||

11 | Mar 26-30 | 15.8 | Triple Integrals in Spherical Coordinates |

15.9 | Change of Variables | ||

No class: Spring Break | |||

12 | Apr 9-13 | 16.1 | Vector Fields |

16.2 | Line Integrals | ||

16.3 | The Fundamental Theorem of Line Integrals | ||

13 | Apr 16-20 | 16.4 | Green's Theorem |

16.5 | Curl and Divergence | ||

Review for Exam 3: Sections 15.4 - 15.9 and 16.1 - 16.5 | |||

14 | Apr 23-27 | Exam 3 | Sections 15.4 - 15.9 and 16.1 - 16.5 |

16.6 | Parametric Surfaces | ||

16.7 | Surface Integrals | ||

15 | Apr 30-May 4 | 16.8 | Stokes' Theorem |

16.9 | The Divergence Theorem | ||

Review | |||

16 | May 7 | Review | |

May 11 | Cumulative Final Exam: 10:25 am -12:25 pm, GW 69EX |

Sample examinations can be found at the following address:

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

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.

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.

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: 2018/05/01 18:17 by borisov

Except where otherwise noted, content on this wiki is licensed under the following license: CC Attribution-Noncommercial-Share Alike 3.0 Unported