Digital Signal Processing

Structures for FIR Systems

Question 1
Marks : +2 | -2
Pass Ratio : 100%
In general, an FIR system is described by the difference equation y(n)=\\(\\sum_{k=0}^{M-1}b_k x(n-k)\\).
True
False
Explanation:
The difference equation y(n)=\\(\\sum_{k=0}^{M-1}b_k x(n-k)\\) describes the FIR system.
Question 2
Marks : +2 | -2
Pass Ratio : 100%
The desired frequency response is specified at a set of equally spaced frequencies defined by the equation?
\\(\\frac{\\pi}{2M}\\)(k+α)
\\(\\frac{\\pi}{M}\\)(k+α)
\\(\\frac{2\\pi}{M}\\)(k+α)
None of the mentioned
Explanation:
To derive the frequency sampling structure, we specify the desired frequency response at a set of equally spaced frequencies, namely ωk=\\(\\frac{2\\pi}{M}\\)(k+α), k=0,1…(M-1)/2 for M odd
Question 3
Marks : +2 | -2
Pass Ratio : 100%
Which of the following is an method for implementing an FIR system?
Direct form
Cascade form
Lattice structure
All of the mentioned
Explanation:
There are several structures for implementing an FIR system, beginning with the simplest structure, called the direct form. There are several other methods like cascade form realization, frequency sampling realization and lattice realization which are used for implementing and FIR system.
Question 4
Marks : +2 | -2
Pass Ratio : 100%
What is the general system function of an FIR system?
\\(\\sum_{k=0}^{M-1}b_k x(n-k)\\)
\\(\\sum_{k=0}^M b_k z^{-k}\\)
\\(\\sum_{k=0}^{M-1}b_k z^{-k}\\)
None of the mentioned
Explanation:
We know that the difference equation of an FIR system is given by y(n)=\\(\\sum_{k=0}^{M-1}b_k x(n-k)\\).
Question 5
Marks : +2 | -2
Pass Ratio : 100%
What are the lattice coefficients corresponding to the FIR filter with system function H(z)= 1+(13/24)z-1+(5/8)z-2+(1/3)z-3?
(1/2,1/4,1/3)
(1,1/2,1/3)
(1/4,1/2,1/3)
None of the mentioned
Explanation:
Given the system function of the FIR filter is
Question 6
Marks : +2 | -2
Pass Ratio : 100%
By combining two pairs of poles to form a fourth order filter section, by what factor we have reduced the number of multiplications?
25%
30%
40%
50%
Explanation:
We have to do 3 multiplications for every second order equation. So, we have to do 6 multiplications if we combine two second order equations and we have to perform 3 multiplications by directly calculating the fourth order equation. Thus the number of multiplications are reduced by a factor of 50%.
Question 7
Marks : +2 | -2
Pass Ratio : 100%
The FIR filter whose direct form structure is as shown below is a prediction error filter.
True
False
Explanation:
The FIR structure shown in the above figure is intimately related with the topic of linear prediction. Thus the top filter structure shown in the above figure is called a prediction error filter.
Question 8
Marks : +2 | -2
Pass Ratio : 100%
What is the output of the single stage lattice filter if x(n) is the input?
x(n)+Kx(n+1)
x(n)+Kx(n-1)
x(n)+Kx(n-1)+Kx(n+1)
Kx(n-1)
Explanation:
The single stage lattice filter is as shown below.
Question 9
Marks : +2 | -2
Pass Ratio : 100%
The realization of FIR filter by frequency sampling realization can be viewed as cascade of how many filters?
Two
Three
Four
None of the mentioned
Explanation:
In frequency sampling realization, the system function H(z) is characterized by the set of frequency samples {H(k+ α)} instead of {h(n)}. We view this FIR filter realization as a cascade of two filters. One is an all-zero or a comb filter and the other consists of parallel bank of single pole filters with resonant frequencies.
Question 10
Marks : +2 | -2
Pass Ratio : 100%
How many memory locations are used for storage of the output point of a sequence of length M in direct form realization?
M+1
M
M-1
None of the mentioned
Explanation:
The direct form realization follows immediately from the non-recursive difference equation given by y(n)=\\(\\sum_{k=0}^{M-1}b_k x(n-k)\\).