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Guidelines: HW are due at the start of class in hard copy. No electronic submissions accepted. You can turn the HW in late the following Monday for 2/3 credit. After that, no late submissions are accepted.
- Due Friday, January 19: page 40 do problems #1 and #3a but just do the math computations, not the computer plots. FHW1_soln
- Due Friday, January 26: page 40 do problems #2 but just do the math computations, not the computer plots. Also do page 56 #4. Note there is a typo in the book on this problem: the interval should be [-pi, pi] *not* [-2 pi, 2 pi].FHW2_soln
- Due Friday, February 2: FHW3_soln_pg1 FHW3_soln_pg2
- Using the formula in Theorem 2.3.3 (page 50-51) calculate the complex
Fourier series on [-pi,pi] of the function Chi_{pi/4} which was defined in problem
1 on page 40. - As given in Theorem 2.5.1, compute the sine series and the cosine series of f(t)=t
on the interval [0,1]
- Using the formula in Theorem 2.3.3 (page 50-51) calculate the complex
- Due Friday, February 9: Solutions here hw4_soln. Problems were in this pdf file: hw4
- Project Due Friday February 16: In this pdf file: proj1, proj1_soln
- Due Friday, February 23: hw5, hw5_soln
- Due Friday, March 2: hw6, hw6_soln
- Project Due Friday, March 16: proj2
- Due Friday, March 23: hw7
- Exam on Friday, March 30. In class, no notes, closed book. These notes will tell you what you need to know. exam_review
- Due Friday, April 13: hw8
- Due Friday, April 20: hw9
- Project 3 due by 5:00 pm, May 2: proj3. Here are the two script files as .txt files: part1, part2. For this project only you can email me it as a pdf file. Try to keep the size of the file at a reasonable level. You can also slide hard copy under my office door (Little 338) any time before the due date and time. This project is worth 30 points or 1.5 times a usual project.