Instructor:
TA:
Time:
Location:
Objectives:
Lecture content:
2. Fourier analysis
3. Partial differential equations
Lecture syllabus:
Lecture | Date | Subject | Note |
1 | 2/23 | First-order differential equations | |
2 | 3/2 | First-order differential equations | |
3 | 3/9 | Linear differential equations of second and higher order | Quiz 1 |
4 | 3/16 | Linear differential equations of second and higher order | |
5 | 3/23 | Systems of differential equations, phase plane, qualitative methods | |
6 | 3/30 | Systems of differential equations, phase plane, qualitative methods | Quiz 2 |
7 | 4/6 | Spring break, no class | |
8 | 4/13 | Series solutions of differential equations. Special functions | |
9 | 4/20 | Midterm exam | |
10 | 4/27 | Series solutions of differential equations. Special functions | |
11 | 5/4 | Laplace transforms | |
12 | 5/11 | Laplace transforms | |
13 | 5/18 | Fourier series, integrals, and transforms | |
14 | 5/25 | Fourier series, integrals, and transforms | Quiz 3 (delayed) |
15 | 6/1 | Partial differential equations | |
16 | 6/8 | Partial differential equations | |
17 | 6/15 | Partial differential equations | |
18 | 6/22 | Final exam |
Grade:
Textbook:
Reference: