3. cos x +sin x- cos(2x) sin(2x), cos(3x), 4 8. ...

Question 3 and 5

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Exercises and Problems for Section 10.5 EXERCISES I Which of the series in Exercises 1-4 are Fourier series? 6. Repeat Exercis 1. 1+ cos x + cos x + cos' x + cos“ x + …. 2. sin x + sin(x +1) + sin(x + 2) + ... 7. What fraction o is contained in t ics of its Fourie 3. cos x +sin x- cos(2x) sin(2x) , cos(3x) , sin(3x) 4 8. 1 4. sin x + sin(2x) 4 3 sin(3x) + ... For Exercises 8-10, given functions, ass 2n. Graph the first function. 5. Construct the first three Fourier approximations to the square wave function (X) = {; -A < x < 0 0 < x < n. -1 8. f(x) = x², 9. h(x) = Use a calculator or computer to draw the graph of each approximation. 10. g(x) = x, PROBLEMS degree Fourier terval 0 < x < 11. Find the constant term of the Fourier series of the tri- angular wave function defined by f(x) = |x| for -1 < x<1 and f(x + 2) = f(x) for all x. 12. Using your result from Exercise 10, write the Fourier series of g(x) = x. Assume that your series converges to g(x) for -a < x < n. Substituting an appropriate value of x into the series, show that riod is not 2r, y tution. Notice th and cos(nx), bu cos(2rnx).] 16. Suppose f has Find the fourth-e 00 1 on 0 <x < 2. [E 2k 1 4 17. Suppose that a s a quantity A and odic signal A cos the signal picks u k-1 13. (a) For-2n < x< 2n, use a calculator to sketch: sin 3x i) y = sin x +