Math. 412, Sec. 501 (Fulling)

Homework Assignments

Haberman, 4th edition

  1. Tues. Sept. 13: 2.3.1(b), 2.3.2(d), 2.3.3(a,c), 2.3.6, 12.4.4, 12.3.6 (Note: 4 from chapter Two, 2 from chapter Twelve.)
  2. Tues. Sept. 20: 3.2.2(b,f), 3.3.1, 3.3.3(c), 3.3.14, 3.3.16
  3. Tues. Sept. 27: 2.4.1(a,b), 2.4.2, 2.2.3, 2.5.1(a,d), 2.5.2(a,b) [Keep a copy to study for the test, since the grader obviously can't return the papers before then!]
  4. Tues. Oct. 4: 7.3.1(d), 7.3.4(b), 7.4.1(b,c)
  5. Thurs. Oct. 13: 10.2.2, 10.3.3, 10.3.5, 10.3.6, 10.4.8, 10.5.16, 10.6.13
  6. Thurs. Oct. 20: 10.3.13, 9.3.5(a), 9.3.6(a), 9.3.5(c) [= 9.3.6(c)], 9.3.22 [and use the result to solve y' + y = f(t), y(0) = 0, for arbitrary f], 10.4.3, 10.6.10, and fill in the details on p. 58 of the notes:
    1. Show that convolution is commutative:
    2. Prove the convolution formula for the inverse Fourier transform of a product ("Convolution Theorem").
  7. Thurs. Oct. 27: Click here.
  8. Thurs. Nov. 3: 5.4.1, 5.4.6, 5.5.1(c), 5.5.2, 5.5.8, 5.8.5, 5.8.8(c,d)
  9. Tues. Nov. 15: 5.3.3, 5.3.9, 2.5.3, 2.5.6(a), 2.5.8(c), 2.5.4, 7.8.7
  10. Tues. Nov. 22: 7.8.8, 7.7.1, 7.7.3, 7.7.8, 7.9.1(c), 7.9.3(a), 7.5.1, 7.5.2
  11. Thurs. Dec. 1: 7.10.1(b), 7.10.2(b), 7.10.3(c), 7.10.9(a), 7.10.10(a), 7.10.12, 5.9.3, 7.8.10 [Warning: The meaning of THETA and PHI in the book and problems is reversed from that in the notes and lectures.]

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Last modified Thu 3 Nov 05