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Q3:
 
Q3:
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Let <math>X_N[k],k=0,...,N-1</math> denote the N point Discrete Fourier Transform (DFT) of the signal x[n],n=0,...,N-1.
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For each case below derive an expression for the DFT  <math>Y_M[k],k=0,...,M-1</math> of the signal y[n],n=0,...,M-1 in terms of <math>X_N[k],k=0,...,N-1</math>
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 +
a. <math>y[n]=e^{\frac{j2\pi n}{N}}x[n],n=0,...,N-1,</math>
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b. <math>y[n]=\left\{\begin{array}{ll}x[N-1], &  n=0,\\ x[n-1], & n=1,...,N-1\end{array} \right. ,</math>
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 +
c. <math>y[n]=\left\{\begin{array}{ll}x[n/2], &  \text{n is even},\\ 0, & \text{n is odd},\end{array} \right. n=0,...,2N-1,</math>
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d. <math>y[n]=x[2n],n=0,...,N/2-1.</math> Assume that N is even.
  
  
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Q4:
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Q4:  
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Consider complex signal  <math>x[n]=\left\{\begin{array}{ll}, e^{j\omega _0 n} &  0<=n<=N-1,\\ 0, & \text{otherwise},\end{array} \right. </math>
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 +
a. Compute <math>X(e^{j\omega})</math> the Fourier Transform of x[n].
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 +
b. Compute X[k], the N points DFT of x[n].
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 +
c. For <math>\omega _0=2\pi k_0 /N, </math> where <math>k_0</math> is integer, compute DFT of x[n].
  
  

Revision as of 19:04, 3 October 2010

Week7 Quiz Pool

Q1: As part of the first stage in a radix 2 FFT, a sequence x[n] of length N = 8 is decomposed into two sequences of length 4 as

$ f_0[n] = x[2n]\text{ , n = 0, 1, 2, 3} $

$ f_1[n] = x[2n + 1]\text{ , n = 0, 1, 2, 3} $

The 4-pt. DFT of each of these two sequences is $ F_0[k]\text{ and }F_1[k] $ respectively.

The specific values of $ F_0[k]\text{ and }F_1[k] $, k = 0, 1, 2, 3, obtained from the length N = 8 sequence in question are listed in the Table below.

W7q1tableFFT.jpg


From the values of $ F_0[k] \text{ and }F_1[k] $, k = 0, 1, 2, 3, and the values of

$ W_8^k = e^{\frac{-j2\pi k}{8}}, k = 0, 1, 2, 3 $

provided in the Table, determine the numerical values of the actual N = 8-pt. DFT of x[n] denoted $ X_8[k] $ for k = 0, 1, 2, 3, 4, 5, 6, 7.

Answer Here.


Q2: The underlying length N = 8 sequence of x[n] in Q1 may be expressed as

$ x[n] = e^{j2\pi k_1n/8} + e^{j2\pi k_2n/8}, n = 0,1,2 ..., 7 $

Given the values of $ X_8[k] $ for k = 0, 1, ..., 7 determined in Q1, determine the numerical values of $ k_1\text{ and }k_2 $.

Answer Here.


Q3: Let $ X_N[k],k=0,...,N-1 $ denote the N point Discrete Fourier Transform (DFT) of the signal x[n],n=0,...,N-1.

For each case below derive an expression for the DFT $ Y_M[k],k=0,...,M-1 $ of the signal y[n],n=0,...,M-1 in terms of $ X_N[k],k=0,...,N-1 $

a. $ y[n]=e^{\frac{j2\pi n}{N}}x[n],n=0,...,N-1, $

b. $ y[n]=\left\{\begin{array}{ll}x[N-1], & n=0,\\ x[n-1], & n=1,...,N-1\end{array} \right. , $

c. $ y[n]=\left\{\begin{array}{ll}x[n/2], & \text{n is even},\\ 0, & \text{n is odd},\end{array} \right. n=0,...,2N-1, $

d. $ y[n]=x[2n],n=0,...,N/2-1. $ Assume that N is even.


Solution


Q4: Consider complex signal $ x[n]=\left\{\begin{array}{ll}, e^{j\omega _0 n} & 0<=n<=N-1,\\ 0, & \text{otherwise},\end{array} \right. $

a. Compute $ X(e^{j\omega}) $ the Fourier Transform of x[n].

b. Compute X[k], the N points DFT of x[n].

c. For $ \omega _0=2\pi k_0 /N, $ where $ k_0 $ is integer, compute DFT of x[n].


Solution


Q5:


Solution


Q6:


Solution


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Alumni Liaison

Recent Math PhD now doing a post-doctorate at UC Riverside.

Kuei-Nuan Lin