Math 407 Section 500
- Daily journal
- Follow the above link for a record of class activities and homework
assignments each day.
- Course description
This three-credit course covers the elements of one-dimensional complex analysis: the complex numbers (their algebra, geometry, and topology); analytic functions of a complex variable (definition, examples, properties); integration in the complex plane, particularly Cauchy's integral formula and its consequences; infinite series of complex numbers and of complex variables, including Taylor series and Laurent series; the residue theorem and the computation of real integrals by complex methods; and conformal mapping.
- Course objectives
By the end of the course, you should be able
to analyze functions of a complex variable using series expansions, using line integrals, using geometry, and using partial differential equations;
to explain the major theorems that distinguish complex analysis from real analysis; and
to apply complex analysis to compute geometric mappings and real integrals.
The required textbook is
Schaum's Outline of Complex Variables, second edition, by Murray R. Spiegel, Seymour Lipschutz, John J. Schiller, and Dennis Spellman, McGraw-Hill, 2009, ISBN 9780071615693. The course covers Chapters 1–8. Some corrections to the textbook are posted.
The official prerequisite for this course is Math 221 (Several Variable Calculus).
The course meets 9:35–10:50 in the morning on Tuesday and Thursday in room 148 of the Blocker building.
- Exams and grades
Grades are based on the standard scale (60% is passing, 70% or higher earns a C, 80% or higher earns a B, 90% or higher earns an A).
The two midterm exams are scheduled for February 16 (Thursday) and March 29 (Thursday). Each of these exams counts for 20% of the course grade.
The cumulative final examination, which has been scheduled by the Registrar for 7:30–9:30 on the morning of Friday, May 4, counts for 20% of the course grade.
Homework counts for 20% of the course grade.
Quizzes count for 20% of the course grade.
- Course website
- Office hours
During the Spring 2012 semester, my office hour in Milner 202 is 2:00–3:00 in the afternoon on Monday and Wednesday; I am available also by appointment. The best way to contact me is via email to firstname.lastname@example.org. Telephone messages can be left at the Milner office of the Department of Mathematics, 979-845-7554.
- TAMU policy statements
- Academic integrity
The Aggie Honor Code states: “An Aggie does not lie, cheat or steal,
or tolerate those who do.” Information about the Honor Council Rules
and Procedures can be found at the website of the
Aggie Honor System
- Americans with Disabilities Act (ADA)
This federal antidiscrimination statute provides comprehensive civil rights protection for persons with disabilities. Among other things, this legislation requires that all students with disabilities be guaranteed a learning environment that provides for reasonable accommodation of their disabilities. If you believe you have a disability requiring an accommodation, please contact Disability Services in Room B118 of Cain Hall, or call 979-845-1637. For additional information visit the website of Disability Services.
See Student Rule 7.