For each function y given below, find the Fourier transform Y of y in terms of the Fourier transform X of x. (a) y(t) =

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For Each Function Y Given Below Find The Fourier Transform Y Of Y In Terms Of The Fourier Transform X Of X A Y T 1 (47.98 KiB) Viewed 26 times

For each function y given below, find the Fourier transform Y of y in terms of the Fourier transform X of x. (a) y(t) = x(at - b), where a and b are constants and a = 0; 21 (b) y(t) = (c) y(t) = (d) y(t) = D(x*x) (t), where D denotes the derivative operator; (e) y(t) = tx(2t - 1); (f) y(t) = el2tx(t-1); (g) y(t) = (te-j5tx(t))*; and (h) y(t) = (Dx) *x₁ (t), where x₁ (t) = e-itx(t) and D denotes the derivative operator. x(t)dt; x²(t)dt;