**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) |