Text: Walter Rudin, Principles of Mathematical Analysis (3rd ed.), McGraw-Hill.
Course description: A graduate-level introduction to real analysis. The course
covers properties of the real numbers, basic notions of metric topology, numerical
sequences and series, continuity, differentiation, and Riemann-Stieltjes integral.
Prerequisite: An undergraduate course in advanced calculus.
Exams: There will be a midterm exam and a cumulative final exam.
The date of the midterm will be announced at least one week in advance.
The final exam will be on Monday, December 10, 10:30 a.m. - 12:30 p.m.
Quizzes: There will be a short quiz at the beginning of almost every class.
Homework: A homework assignment will be given each Wednesday,
it will be due the following Wednesday.
Final score and letter grade computation:
|
Homework: Quizzes: Midterm Exam: Final Exam: |
50% 10% 15% 25% |
A: B: C: D: |
at least 85% at least 75% at least 65% at least 55% |