Find the discrete fourier transform X[k] of x[n]=[2 2 0 0]

Find the Discrete Time Fourier Transform of f(n) = anu[n + 1] where |a| < 1...

Find the Discrete Time Fourier Transform of f(n) = anu[n + 1] where |a| < 1 Using the definition of the Discrete Time Fourier Transform

Given x(n) = {-1, 0, 2, 3}; where x(n=0) = -1                                   &nbsp

Given x(n) = {-1, 0, 2, 3}; where x(n=0) = -1                                                                  ­ a) compute its Discrete Time Fourier Transform X(ejw) b) sample X(ejw) at kw1 = 2?k/4, k = 0,1,2,3 and show that is equal to X~(k) which is the Discrete Fourier Series (DFS) of x~(n)

Find the forward discrete fourier transform of f(t)={0,2,4,-2}

Find the forward discrete fourier transform of f(t)={0,2,4,-2}

Find the Fourier transform of ?(?) = { 5? 2 , ?? |?| < ? 0,...

Find the Fourier transform of ?(?) = { 5? 2 , ?? |?| < ? 0, ?? |?| ≥ ? a=7

discrete fourier transform of Dk =<1,-1,0>

discrete fourier transform of Dk =<1,-1,0>

Find the Fourier Transform of the following, Show all steps: 1- f(x)=e^(-6x^2) 2- f(x) is 0...

Find the Fourier Transform of the following, Show all steps: 1- f(x)=e^(-6x^2) 2- f(x) is 0 for all x except 0≤x≤2 where f(x)=4

a) Find the Fourier cosine transform of e^(-ax), given a>0. b) Use item (a) above to...

a) Find the Fourier cosine transform of e^(-ax), given a>0. b) Use item (a) above to find the Fourier sine transform of e^(-ax)/x, given a > 0.

Given signal x(t) = sinc(t): 1. Find out the Fourier transform of x(t), find X(f), sketch...

Given signal x(t) = sinc(t): 1. Find out the Fourier transform of x(t), find X(f), sketch them. 2. Find out the Nyquist sampling frequency of x(t). 3. Given sampling rate fs, write down the expression of the Fourier transform of xs(t), Xs(f) in terms of X(f). 4. Let sampling frequency fs = 1Hz. Sketch the sampled signal xs(t) = x(kTs) and the Fourier transform of xs(t), Xs(f). 5. Let sampling frequency fs = 2Hz. Repeat 4. 6. Let sampling frequency...

Use the Fourier transform to find the solution of the following initial boundaryvalue Laplace equations uxx...

Use the Fourier transform to find the solution of the following initial boundaryvalue Laplace equations uxx + uyy = 0, −∞ < x < ∞ 0 < y < a, u(x, 0) = f(x), u(x, a) = 0, −∞ < x < ∞ u(x, y) → 0 uniformlyiny as|x| → ∞.

Find the Fourier sine expansion of f(x) = x for 0 < x < 1 2-...

Find the Fourier sine expansion of f(x) = x for 0 < x < 1 2- x for 1 < x <2 (at least the first 4 nonzero term)