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題組內容

Problem 5. Find the Fourier series of f(x).

(a)

其他申論題

(i) Is Tr(AX)≥ 0 true?

(ii) Is it true that if Tr(AX) = 0, then AX = 0 (zero matrix)? Prove or disprove your answer.

(a) the first-order ODE:

(b) the second-order ODE:

(b)f(x)= {1,-1≤x≤1, 0,x＜-1;x＞1

Problem 6. Use Laplace transform to solve the following differential equation:

(a) Assume that Re{f(z)} = x3 -3xy2. Find the imaginary part Im{f(z)} so that f(z) is analytic for all x .

(b) Assume that u(x, y) = x3 +3xy2. Show that it is impossible to find a real-valued function v(x, y) such that f(z) = u(x,y) + iu(x,y) is differentiable with respect to z for all z .

(a) Calculate f'(0) and f"(0).

(b) Find the Taylor series expansion of f(z) about the point z = 0; that is, find the coefficients such that in a certain neighborhood of x = 0.

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