3) Impulse response of an FIR and LTI system with linear phase is given as: h(n)={1, -1/2, 2, -1/2, 1}, n=0,1,2,3,4. a) Calculate the frequency response of the system using DFT. Write the magnitude...


3) Impulse response of an FIR and LTI system with linear phase is given as: h(n)={1, -1/2, 2, -1/2, 1},<br>n=0,1,2,3,4.<br>a) Calculate the frequency response of the system using DFT. Write the magnitude response, phase<br>response and the group delay of the system.<br>b) Let h'(n)={1, -1/2, 2, -1/2, 1, 0} signal be the periodic version of h(n) with period N=6. Find DFS<br>coefficients ofh’(n). Find and compare the computational loads of DFT and FFT algorithms.<br>(Computational load for DFT is N²,and for FFT is Nlog,N.)<br>c) The input signal x(n)={1, 2} is applied to the system in (a). Find the 5 points circular convolution<br>of x(n) and h(n) in time domain: c(n) = x(n) *s h(n)<br>d) Now, calculate the output of the system, y(n), firstly with linear convolution: yı(n) = x(n) * h(n),<br>then calculate the output with 6 points in time domain: y2(n) = x(n) *6 h(n). Compare the results.<br>

Extracted text: 3) Impulse response of an FIR and LTI system with linear phase is given as: h(n)={1, -1/2, 2, -1/2, 1}, n=0,1,2,3,4. a) Calculate the frequency response of the system using DFT. Write the magnitude response, phase response and the group delay of the system. b) Let h'(n)={1, -1/2, 2, -1/2, 1, 0} signal be the periodic version of h(n) with period N=6. Find DFS coefficients ofh’(n). Find and compare the computational loads of DFT and FFT algorithms. (Computational load for DFT is N²,and for FFT is Nlog,N.) c) The input signal x(n)={1, 2} is applied to the system in (a). Find the 5 points circular convolution of x(n) and h(n) in time domain: c(n) = x(n) *s h(n) d) Now, calculate the output of the system, y(n), firstly with linear convolution: yı(n) = x(n) * h(n), then calculate the output with 6 points in time domain: y2(n) = x(n) *6 h(n). Compare the results.

Jun 11, 2022
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