Week | Monday | Wednesday | Friday |

1 | Jan 10: 1.1-5
Complex arithmetic |
Jan 12: 1.6, 2.1-2.3
Sets, limits, complex derivatives |
Jan 14: 2.4
Cauchy-Riemann equations |

2 | Jan 17
Martin Luther King Day |
Jan 19: 2.5
Harmonic functions |
Jan 21: 7.3
Mobius transforms |

3 | Jan 24: 7.4
More Mobius transforms |
Jan 26: 3.1
Exponential and trig functions |
Jan 28: 3.2
Logarithms |

4 | Jan 31: 3.3
Multi-valued functions |
Feb 2: 1.1-3.3, 7.2-7.3
Leeway/Review |
Feb 4: 1.1-3.3, 7.2-7.3
First Midterm |

5 | Feb 7: 4.1-2
Contour integration |
Feb 9: 4.3-4
FToC; Cauchy's theorem |
Feb 11: 4.5-6
Consequences of Cauchy's theorem |

6 | Feb 14: 5.1, 5.3
Power series |
Feb 16: 5.2
Taylor series |
Feb 18: 5.5
Laurent series |

7 | Feb 21
President's Day |
Feb 23: 4.1-5.5
Leeway/Review |
Feb 25
Second Midterm |

8 | Feb 28: 5.5
More Laurent series |
Mar 1: 5.6
Zeroes and poles |
Mar 3: 5.7
The point at infinity |

9 | Mar 6: 6.1
The residue theorem |
Mar 8: 6.2-3
Trig and indefinite integrals |
Mar 10: 6.3-6.4
More indefinite integrals |

10 | Mar 13: 6.4-5
More indefinite integrals |
Mar 15: 6.7
Argument principle, Rouche's theorem |
Mar 17: 1.1-7.3
Leeway/Review |

The final is at Tuesday, March 21, 8-11 a.m (exam code 04).

Note this schedule may change slightly as the quarter progresses, due to lecture overruns or other Acts of God.