COURSE:  Theory of Functions of a Complex Variable,  M361 #58670, Fall 2004
------
TEXT:     J.E. Marsden, M.J. Hoffman, "Basic Complex Analysis", 3rd edition
----
SYLLABUS:  Ch. 1: Analytic Functions                               (7 days)
           Ch. 2: Cauchy's Theorem                                 (6 days)
           Ch. 3: Series Representation of Analytic Functions      (4 days)
           Ch. 4: Calculus of Residues                             (5 days)
           Ch. 5: Conformal Mappings                               (3 days)

INSTRUCTOR: H. Koch, Office Hours TTh 2:30-4:00, RLM 12.152, Tel: 471-8183,
----------  Email: koch@math.utexas.edu, Web: www.ma.utexas.edu/users/koch/

GRADING:  Letter grades (A,B,C,D,F) will be given for each     | 90 -100  A
-------  exam, but number grades (100,99,..,2,1,0) will be     | 80 - 89  B
     kept for averaging. The course grade will be obtained     | 70 - 79  C
     by averaging the scores of the four exams, and of the     | 60 - 69  D
     homework.  Each  student may replace the grade of any     |  0 - 59  F
     ONE  exam by the grade of one of the following exams.

HOMEWORK     will be assigned every Tuesday and collected one week later in
--------     class.  Each assignment is graded  on a scale from zero to 30.
     The sum/3 of the ten highest scores contributes 6% to the class grade.

EXAMS: There will be four seventy-minutes,    |  Homework                6%
-----  cumulative (approx 80% new and 20%     |  Exam 1  ( Tu Sep 21 )  22%
     old topics) exams. Speed is a factor     |  Exam 2  ( Th Oct 14 )  23%
     being tested. Books, calculators, or     |  Exam 3  ( Th Nov 11 )  24%
     notes are not allowed.  FINAL ----->     |  Exam 4  ( Th Dec  9 )  25%
     No make-up exams will be given.