Digital Signal Processing

Structures for FIR Systems

Question 1
Marks : +2 | -2
Pass Ratio : 100%
What is the condition of M, if the structure according to the direct form is as follows?
M even
M odd
All values of M
Doesn’t depend on value of M
Explanation:
When the FIR system has linear phase, the unit sample response of the system satisfies either the symmetry or asymmetry condition, h(n)=±h(M-1-n)
Question 2
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 3
Marks : +2 | -2
Pass Ratio : 100%
Which of the following is the application of lattice filter?
Digital speech processing
Adaptive filter
Electroencephalogram
All of the mentioned
Explanation:
Lattice filters are used extensively in digital signal processing and in the implementation of adaptive filters.
Question 4
Marks : +2 | -2
Pass Ratio : 100%
What is the unit sample response of the mth filter?
hm(0)=0 and hm(k)=αm(k), k=1,2…m
hm(k)=αm(k), k=0,1,2…m(αm(0)≠1)
hm(0)=1 and hm(k)=αm(k), k=1,2…m
none of the mentioned
Explanation:
We know that Hm(z)=Am(z) and Am(z) is a polynomial whose equation is given as Am(z)=\\(1+\\sum_{k=1}^m α_m (k)z^{-k}\\), m≤1 and A0(z)=1
Question 5
Marks : +2 | -2
Pass Ratio : 100%
The direct form realization is often called a transversal or tapped-delay-line filter.
True
False
Explanation:
The structure of the direct form realization, resembles a tapped delay line or a transversal system.
Question 6
Marks : +2 | -2
Pass Ratio : 100%
The constants K1 and K2 of the lattice structure are called as reflection coefficients.
True
False
Explanation:
The equation of the output from the second stage lattice filter is given by
Question 7
Marks : +2 | -2
Pass Ratio : 100%
If a three stage lattice filter with coefficients K1=1/4, K2=1/2 K3=1/3, then what are the FIR filter coefficients for the direct form structure?
(1,8/24,5/8,1/3)
(1,5/8,13/24,1/3)
(1/4,13/24,5/8,1/3)
(1,13/24,5/8,1/3)
Explanation:
We get the output from the third stage lattice filter as
Question 8
Marks : +2 | -2
Pass Ratio : 100%
What is the value of the coefficient α2(1) in the case of FIR filter represented in direct form structure with m=2 in terms of K1 and K2?
K1(K2)
K1(1-K2)
K1(1+K2)
None of the mentioned
Explanation:
The equation for the output of an FIR filter represented in the direct form structure is given as
Question 9
Marks : +2 | -2
Pass Ratio : 100%
What is the system function of all-zero filter or comb filter?
\\(\\frac{1}{M}(1+z^{-M} e^{j2πα})\\)
\\(\\frac{1}{M}(1+z^M e^{j2πα})\\)
\\(\\frac{1}{M}(1-z^M e^{j2πα})\\)
\\(\\frac{1}{M}(1-z^{-M} e^{j2πα})\\)
Explanation:
The system function H(z) which is characterized by the set of frequency samples is obtained as
Question 10
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.