Digital Filters Design MCQ [Free PDF] – Objective Question Answer for Digital Filters Design Quiz

151. In the frequency sampling method for FIR filter design, we specify the desired frequency response Hd(ω) at a set of equally spaced frequencies.

A. True
B. False

Answer: A

According to the frequency sampling method for FIR filter design, the desired frequency response is specified at a set of equally spaced frequencies.

 

152. What is the equation for the frequency ωk in the frequency response of an FIR filter?

A. \(\frac{π}{M}\)(k+α)

B. \(\frac{4π}{M}\)(k+α)

C. \(\frac{8π}{M}\)(k+α)

D. \(\frac{2π}{M}\)(k+α)

Answer: D

In the frequency sampling method for FIR filter design, we specify the desired frequency response Hd(ω) at a set of equally spaced frequencies, namely

ωk=\(\frac{2π}{M}(k+α)\)

where k=0,1,2…M-1/2 and α=0 0r 1/2.

 

153. Why is it desirable to optimize frequency response in the transition band of the filter?

A. Increase side lobe

B. Reduce side lobe
C. Increase main lobe
D. None of the mentioned

Answer: B

To reduce side lobes, it is desirable to optimize the frequency specification in the transition band of the filter.

 

151. Which of the following filter design is used in the formulation of the design of optimum equi ripple linear phase FIR filter?

A. Butterworth approximation
B. Chebyshev approximation
C. Hamming approximation
D. None of the mentioned

Answer: B

The filter design method described in the design of optimum equi ripple linear phase FIR filters is formulated as a Chebyshev approximation problem.

 

152. If δ2 represents the ripple in the stop band for a Chebyshev filter, then which of the following conditions is true?

A. 1-δ2 ≤ Hr(ω) ≤ 1+δ2;|ω|≤ωs
B. 1+δ2 ≤ Hr(ω) ≤ 1-δ2;|ω|≥ωs
C. δ2 ≤ Hr(ω) ≤ δ2;|ω|≤ωs
D. -δ2 ≤ Hr(ω) ≤ δ2;|ω|≥ωs

Answer: D

Let us consider the design of a low pass filter with the stop band edge frequency ωs and the ripple in the stopband is δ2, then from the general specifications of the Chebyshev filter, in the stop band the filter frequency response should satisfy the condition
-δ2 ≤ Hr(ω) ≤ δ2;|ω|≥ωs

 

153. If the filter has an anti-symmetric unit sample response with M even, then what is the value of Q(ω)?

A. cos(ω/2)
B. sin(ω/2)
C. 1
D. sinω

Answer: B

If the filter has an anti-symmetric unit sample response, then we know that

h(n)= -h(M-1-n)

and for M even, in this case, Q(ω)=sin(ω/2).

 

154. It is convenient to normalize W(ω) to unity in the stopband and set W(ω)=δ2/ δ1 in the passband.

A. True
B. False

Answer: A

The weighting function on the approximation error allows for the choice of the relative size of the errors in the different frequency bands. In particular, it is convenient to normalize W(ω) to unity in the stopband and set W(ω)=δ2/δ1 in the passband.

 

155. Which of the following defines the weighted approximation error?

A. W(ω)[Hdr(ω)+Hr(ω)]
B. W(ω)[Hdr(ω)-Hr(ω)]
C. W(ω)[Hr(ω)-Hdr(ω)]
D. None of the mentioned

Answer: B

The weighted approximation error is defined as E(ω) which is given as
E(ω)=W(ω)[Hdr(ω)- Hr(ω)].

 

156. The error function E(ω) does not alternate in sign between two successive extremal frequencies.

A. True
B. False

Answer: B

The error function E(ω) alternates in sign between two successive extremal frequencies, Hence the theorem is called an Alternative theorem.

 

157. At most how many extremal frequencies can be there in the error function of the ideal low pass filter?

A. L+1
B. L+2
C. L+3
D. L

Answer: C

We know that we can have at most L-1 local maxima and minima in the open interval 0<ω<π. In addition, ω=0 and π are also usually extrema. It is also maximum at ω for passband and stopband frequencies. Thus the error function of a low pass filter has at most L+3 extremal frequencies.

 

158. The filter designs that contain more than L+2 alternations are called as __________

A. Extra ripple filters
B. Maximal ripple filters
C. Equi ripple filters
D. None of the mentioned

Answer: A

In general, the filter designs that contain more than L+2 alternations or ripples are called Extra ripple filters.

 

159. If M is the length of the filter, then at how many the number of points, the error function is computed?

A. 2M
B. 4M
C. 8M
D. 16M

Answer: D

Having the solution for P(ω), we can now compute the error function

E(ω) from

E(ω)=W(ω)[Hdr(ω)-Hr(ω)]

on a dense set of frequency points. Usually, a number of points equal to 16M, where M is the length of the filter.

 

160. If |E(ω)|<δ for some frequencies on the dense set, then a new set of frequencies corresponding to the L+2 largest peaks of |E(ω)| are selected and computation is repeated.

A. True
B. False

Answer: B

If |E(ω)|≥δ for some frequencies on the dense set, then a new set of frequencies corresponding to the L+2 largest peaks of |E(ω)| are selected and computation is repeated.

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