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2013 REGULATION
ANNA UNIVERSITY QUESTIONS
EC6502
ENGINEERING NOTES
EVENTUALENGINEER
Principles of Digital Signal Processing
QUESTIONS
Question Bank
UNIT I
Part A
- Write the formula for DFT and IDFT.
- Name any two properties of DFT.
- State and prove Parseval theorem.
- State and prove time-shifting property of DFT.
- State and prove circular convolution.
- What are ‘twiddle factor’ of the DFT?(May-2012)
- State the relationship between DTFT and DFT.(Nov-2011,May-2014)
- Determine the value of W16 for 64-point DFT.
- Give the number of complex addition and complex multiplication required for the direct computation of N-point DFT.
- What is zero padding? What are its uses?(Nov-2011,Nov-2013)
- Define circular convolution.
- Distinguish between Circular convolution and linear convolution.
- Write briefly about Overlap-save method.
- Write briefly about Overlap-add method
- State the difference between Overlap-save method and Overlap-add method.
- What is the need for FFT?
- What is the main advantage of FFT?(May-2011)
- Calculate the number of complex multiplication and complex addition needed in the calculation of DFT using FFT algorithm with 32-point sequence.(Nov-2010,Nov-2013)
- What is radix-2 FFT?
- What is DIT FFT algorithm?
- What is DIF FFT algorithm?
- What are the differences and similarities between DIT and DIF algorithm?
- Draw the basic butterfly diagram of radix 2 DIT FFT.
- Draw the basic butterfly diagram of radix 2 DIF FFT.
- What is meant by ‘in-place’ in DIT and DIF algorithm?(Nov-2014)
- Give the computation efficiency of FFT over DFT.
- Explain how you would use the FFT algorithm to compute the IDFT.
- What is bit reversal?(May-2014,May-2011)
- How many stages of decimations are required in the case of 64pt Radix-2 DIT-FFT algorithm?(May-2012)
- Given two sequences of length N=4 defined by x[n] = {1, 2, 2, 1} and h[n] = {2, 1, 1, 2}, determine the periodic convolution.
Ans.: y[n] = {9, 10, 9, 8}(Nov-2010)
- Compute the 4-point DFT of the following sequences,
i. x[n] = 2n
ii. x[n] = 2-n
iii. x[n] = sin(nπ/2)
iv. x[n] = cos(nπ/2)
Ans.: (a) X(k) = {15, -3+j6, -5, -3-j6}
(b) X(k) = {15/8, (3/4)-j(3/8), (5/8), (3/4)-j(3/8)}
(c) X(k) = {0, -j2, 0, j2}
(d) X(k) = {1, 1-j√2, 1, 1+j√2}
- Find IDFT of X(k) = {1, 0, 1, 0}.
Ans.: x[n] = {0.5, 0, 0.5, 0}
- Find the IDFT of the sequence X(k) = {10, -2+j2, -2, -2-j2} using DIT and DIF algorithm.
Ans.: x[n] = {1, 2, 3, 4}
- The first five samples of 8-point DFT of a real valued sequence are {28, -4+j9.565, -4+j4, -4+j1.656, -4}. Determine the remaining three samples.
Ans.: X(5) = -4-j1.656, X(6) = -4-j4, X(7) = -4-j9.565
- For the 8-sample sequence x[n] = {1, 2, 3, 5, 5, 3, 2, 1}, the first five DFT coefficients are {22, -7.536-j3.121, 1+j, -0.465-j1.121, 0}. Determine the remaining three DFT coefficients.
Ans.: X(5)= -0.465+j1.121, X(6)= 1-j, X(7)= -7.536+j3.121
- Consider the finite sequence x[n] = {1, 2, 2, 1}. The 5-point DFT of x[n] is denoted by X(k). Plot the sequence whose DFT is Y(k) = e-j4πk/5 X(k).
Ans.: y[n] = {1, 0, 1, 2, 2}
- If the DFT of the sequence x[n] = {1, 2, 1, 1, 2, -1} is X(k). Plot the sequence whose DFT is Y(k) = e-jπk X(k).
Ans.: y[n] = {1, 2, -1, 1, 2, 1}
- Consider the 8-point decimation-in-frequency (DIF) flow graph. What is the gain of the “signal path” that goes from x[5] to X(3)?
Ans.: (X(3)/x[5]) = 0.707+j0.707
- Compute 4-point DFT of a sequence x[n] = {0, 1, 2, 3} using DIF and DIT algorithm.
Ans.: X(k) = {6, -2+j2, -2, -2-j2}
- Consider the 8-point decimation-in-time (DIT) flow graph. What is the gain of the “signal path” that goes from x[3] to X(2)?
Ans.: (X(2)/x[3]) = j
Part B
1. An input sequence x[n] = {2, 1, 0, 1, 2} is applied to DSP system having an impulse sequence h[n] = {5,3,2,1}. Determine the output sequence produced by (a) Linear convolution and (b) Verify the same through circular convolution.
Ans.: y[n] = {10, 11, 7, 9, 14, 8, 5, 2}
2. Convolve the following sequence using (a) Overlap-save method and (b) Overlap-add method,
x[n] = {1, -1, 2, 1, 2, -1, 1, 3, 1} and h[n] = {1, 2, 1}(Nov-2014,Nov-11,Nov-2013,Nov-2010)
Ans.: y[n] = {1, 1, 1, 4, 6, 4, 1, 4, 8, 5, 1}
3. Draw the signal flow graph for 8/16-point DFT using (a) DIT algorithm and DIF algorithm.(May-2014)
4. Compute the IDFT for the sequence X(k) = 2-kwhere k = 0 to 7 using DIF FFT algorithm.(Nov-14)
5. Find the DFT of a sequence x[n] = {1, 2, 3, 4, 4, 3, 2, 1} using DIT algorithm.(Nov-2010,Nov-2013)
Ans.: X(k) = {20, -5.828-j2.414, 0, 0.172-j0.414, 0, 0.172+j0.414, 0, -5.828-j2.414}
6. Find the DFT of a sequence x[n] = {1, 1, 1, 1, 1, 1, 0, 0} using DIF algorithm. Ans.: X(k) = {6, -0.707-j0.707, 1-j, 0.707+j0.293, 0, 0.707-j0.293, 1+j, -0.707+j0.707}
7. Find the DFT of a sequence x[n] = {1, 1, 1, 1, 1, 0, 0, 0} using DIF algorithm.(Nov-2011)
Ans.: X(k) = {5, -j2.414, 1, -j0.414, 1, j0.414, 1,j2.414}
8. Find the IDFT of a sequence X(k) = {5, 0, 1-j, 0, 1, 0, 1+j, 0} using DIT algorithm.
Ans.: x[n] = {1, 0.75, 0.5, 0.25, 1, 0.75, 0.5, 0.25}
9. Consider two sequence x[n] = cos(nπ/2) and h[n] = 2n. Determine the output sequence y[n] by circular convolution using concentric circle method. Take N=4.
Ans.: y[n] = {-3, -6, 3, 6}
10. Determine the output sequence y[n] of FIR filter with impulse response, h[n] = {1, 2, 3} to input sequence x[n] = {1, 2, 2, 1}. Use circular convolution in frequency domain.
Ans.: y[n] = {1, 4, 9, 11, 8, 3}
11. Find the Linear convolution through circular convolution of x1[n] and x2[n].
x1[n] = δ[n] + δ[n-1] + δ[n-2]
x2[n] = 2δ[n] - δ[n-1] + 2δ[n-2]
Ans.: x3[n] = 2δ[n] + δ[n-1] + 3δ[n-2] + δ[n-3] + 2δ[n-4]
12. Given two sequence x1[n] = {1, 2, 3, 1} and x2[n] = {4, 3, 2, 2}. Find x3[n] such that (i) X3(k) = X1(k).X2(k), (ii) using concentric circle method and (iii) Matrix method.
Ans.: X3(k) = {17, 19, 22, 19}
13. Find the output y[n] of a filter whose impulse response is h[n] = {1, 1, 1} and input signal is x[n] = {3, -1, 0, 1, 3, 2, 0, 1, 2, 1} using (i) Overlap save method and (ii) Overlap add method.
Ans.: y[n] = (3, 2, 2, 0, 4, 6, 5, 3, 3, 4, 3, 1)
14. Find the output y[n] of a filter whose impulse response is h[n] = {1, 2} and input signal is x[n] = {1, 2, -1, 2, 3, -2, -3, -1, 1, 1, 2, -1} using (i) Overlap save method and (ii) Overlap add method.
Ans.: y[n] = (1, 4, 3, 0, 7, 4, -7, -7, -1, 3, 4, 3, -2)
15. Determine the output of a linear FIR filter whose impulse response h[n] = {1, -3, 5} and input signal x[n] = {-1, 4, 7, 3, -2, 9, 10, 12, -5, 8} using (i) Overlap-save method and (ii) Overlap-add method.
Ans.: y[n] = (-1, 7, -10, 2, 24, 30, -27, 27, 9, 83, -49, 40)
16. Determine the DFT of the given data sequence x[n] = {2, 1, 4, 6, 5, 8, 3, 9}(Nov-2013,May-2012)
Ans.: X(k) = {38, -5.828+j6.11, j6, -0.412+j8.1, -10, -0.412-j8.1, -j6, -5.828-j6.11}
17. Determine the DFT of the given data sequence x[n] = {-1, 2, -3, 4, 9, -20, 12, 6} by DIT and DIF algorithm.
Ans.: X(k) = {9, 6.968+j0.86, -1+j28, -26.968-j29.14, 25, 26.968+j29.14, -1-j28, 6.968-j0.86}
18. Calculate IDFT for the given coefficients X(k) = {38, -5.828+j6.07, j6, -0.172+j8.07, -10, -0.172-j8.07, -j6, -5.828-j6.07} using DIT and DIF algorithm.
Ans.: x[n] = {2, 1, 4, 6, 5, 8, 3, 9}
19. State any six properties of DFT(Nov-2014)
20. Compute IDFT of the sequence X(k) = {7, -0.707-j0.707, -j, 0.707-j0.707, 1, 0.707 +j0.707, j, -0.707+j0.707} using DIT and DIF algorithm.
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