What is the Fourier transform of rectangular window of length L?

$\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{jω(L+1)/2}$

$\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{jω(L-1)/2}$

$\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{-jω(L-1)/2}$

If x(n)=cos‚âà√¨‚àö¬¢0n and W(‚âà√¨‚àö¬¢) is the Fourier transform of the rectangular signal w(n), then what is the Fourier transform of the signal x(n).w(n)?$

[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢0)+ W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢0)].

1/2[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢0)- W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢0)].

1/2[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢0)+ W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢0)].

[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢0)+ W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢0)].

[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢0)- W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢0)].

If the signal to be analyzed is an analog signal, we would pass it through an anti-aliasing filter with B as the bandwidth of the filtered signal and then the signal is sampled at a rate:

Fs ‚Äö√Ñ√∂‚àö¬¢¬¨√ü 2B

Fs ‚Äö√Ñ√∂‚àö¬¢¬¨√ü B

Fs ‚Äö√Ñ√∂‚àö¬¢‚Äö√Ñ¬¢ 2B

16 + Mcqs in Frequency Analysis Signals Using Dft in Digital Signal Processing Page 1 McqOptions

1.	The condition with less number of samples L should be avoided.
A.	True
B.	False
Answer» B. False

Discussion

2.	Which of the following is the disadvantage of Hanning window over rectangular window?
A.	More side lobes
B.	Less side lobes
C.	More width of main lobe
D.	None of the mentioned
Answer» D. None of the mentioned

Discussion

3.	The characteristic of windowing the signal called “Leakage” is the power that is leaked out into the entire frequency range.
A.	True
B.	False
Answer» B. False

Discussion

4.	If x(n)=cosω0n and W(ω) is the Fourier transform of the rectangular signal w(n), then what is the Fourier transform of the signal x(n).w(n)?
A.	1/2[W(ω-ω0)- W(ω+ω0)]
B.	1/2[W(ω-ω0)+ W(ω+ω0)]
C.	[W(ω-ω0)+ W(ω+ω0)]
D.	[W(ω-ω0)- W(ω+ω0)]
Answer» C. [W(ω-ω0)+ W(ω+ω0)]

Discussion

5.	What is the Fourier transform of rectangular window of length L?
A.	$\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{jω(L+1)/2}$
B.	$\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{jω(L-1)/2}$
C.	$\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{-jω(L-1)/2}$
D.	None of the mentioned
Answer» D. None of the mentioned

Discussion

6.	If {x(n)} is the signal to be analyzed, limiting the duration of the sequence to L samples, in the interval 0≤ n≤ L-1, is equivalent to multiplying {x(n)} by?
A.	Kaiser window
B.	Hamming window
C.	Hanning window
D.	Rectangular window
Answer» E.

Discussion

7.	If the signal to be analyzed is an analog signal, we would pass it through an anti-aliasing filter with B as the bandwidth of the filtered signal and then the signal is sampled at a rate __________
A.	Fs ≤ 2B
B.	Fs ≤ B
C.	Fs ≥ 2B
D.	Fs = 2B
Answer» D. Fs = 2B

Discussion

8.	THE_CONDITION_WITH_LESS_NUMBER_OF_SAMPLES_L_SHOULD_BE_AVOIDED.?$
A.	True
B.	False
Answer» B. False

Discussion

9.	WHICH_OF_THE_FOLLOWING_IS_THE_DISADVANTAGE_OF_HANNING_WINDOW_OVER_RECTANGULAR_WINDOW??$
A.	More side lobes
B.	Less side lobes
C.	More width of main lobe
D.	None of the mentioned
Answer» D. None of the mentioned

Discussion

10.	Which of the following is the advantage of Hanning window over rectangular window?
A.	More side lobes
B.	Less side lobes
C.	More width of main lobe
D.	None of the mentioned
Answer» C. More width of main lobe

Discussion

11.	The characteristic of windowing the signal called ‚Äö√Ñ√∂‚àö√ë‚àö‚à´Leakage‚Äö√Ñ√∂‚àö√ë‚àöœÄ is the power that is leaked out into the entire frequency range.$
A.	True
B.	False
Answer» B. False

Discussion

12.	If x(n)=cos‚âà√¨‚àö¬¢₀n and W(‚âà√¨‚àö¬¢) is the Fourier transform of the rectangular signal w(n), then what is the Fourier transform of the signal x(n).w(n)?$
A.	1/2[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢<sub>0</sub>)- W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢<sub>0</sub>)].
B.	1/2[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢<sub>0</sub>)+ W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢<sub>0</sub>)].
C.	[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢<sub>0</sub>)+ W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢<sub>0</sub>)].
D.	[W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢<sub>0</sub>)- W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢<sub>0</sub>)].
Answer» C. [W(‚âà√¨‚àö¬¢-‚âà√¨‚àö¬¢<sub>0</sub>)+ W(‚âà√¨‚àö¬¢+‚âà√¨‚àö¬¢<sub>0</sub>)].

Discussion

13.	If {x(n)} is the signal to be analyzed, limiting the duration of the sequence to L samples, in the interval 0‚Äö√Ñ√∂‚àö¬¢¬¨√ü n‚Äö√Ñ√∂‚àö¬¢¬¨√ü L-1, is equivalent to multiplying {x(n)} by:$
A.	Kaiser window
B.	Hamming window
C.	Hanning window
D.	Rectangular window
Answer» E.

Discussion

14.	The finite observation interval for the signal places a limit on the frequency resolution.
A.	True
B.	False
Answer» B. False

Discussion

15.	What is the highest frequency that is contained in the sampled signal?
A.	2Fs
B.	Fs/2
C.	Fs
D.	None of the mentioned
Answer» C. Fs

Discussion

16.	If the signal to be analyzed is an analog signal, we would pass it through an anti-aliasing filter with B as the bandwidth of the filtered signal and then the signal is sampled at a rate:
A.	Fs ‚Äö√Ñ√∂‚àö¬¢¬¨√ü 2B
B.	Fs ‚Äö√Ñ√∂‚àö¬¢¬¨√ü B
C.	Fs ‚Äö√Ñ√∂‚àö¬¢‚Äö√Ñ¬¢ 2B
D.	Fs = 2B
Answer» D. Fs = 2B

Discussion

5.	What is the Fourier transform of rectangular window of length L?
A.	\(\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{jω(L+1)/2}\)
B.	\(\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{jω(L-1)/2}\)
C.	\(\frac{sin⁡(\frac{ωL}{2})}{sin⁡(\frac{ω}{2})} e^{-jω(L-1)/2}\)
D.	None of the mentioned
Answer» D. None of the mentioned

Explore topic-wise MCQs in Digital Signal Processing.

The condition with less number of samples L should be avoided.

Which of the following is the disadvantage of Hanning window over rectangular window?

The characteristic of windowing the signal called “Leakage” is the power that is leaked out into the entire frequency range.

If x(n)=cosω0n and W(ω) is the Fourier transform of the rectangular signal w(n), then what is the Fourier transform of the signal x(n).w(n)?

What is the Fourier transform of rectangular window of length L?

If {x(n)} is the signal to be analyzed, limiting the duration of the sequence to L samples, in the interval 0≤ n≤ L-1, is equivalent to multiplying {x(n)} by?

If the signal to be analyzed is an analog signal, we would pass it through an anti-aliasing filter with B as the bandwidth of the filtered signal and then the signal is sampled at a rate __________

THE_CONDITION_WITH_LESS_NUMBER_OF_SAMPLES_L_SHOULD_BE_AVOIDED.?$

WHICH_OF_THE_FOLLOWING_IS_THE_DISADVANTAGE_OF_HANNING_WINDOW_OVER_RECTANGULAR_WINDOW??$

Which of the following is the advantage of Hanning window over rectangular window?

The characteristic of windowing the signal called ‚Äö√Ñ√∂‚àö√ë‚àö‚à´Leakage‚Äö√Ñ√∂‚àö√ë‚àöœÄ is the power that is leaked out into the entire frequency range.$

If x(n)=cos‚âà√¨‚àö¬¢0n and W(‚âà√¨‚àö¬¢) is the Fourier transform of the rectangular signal w(n), then what is the Fourier transform of the signal x(n).w(n)?$

If {x(n)} is the signal to be analyzed, limiting the duration of the sequence to L samples, in the interval 0‚Äö√Ñ√∂‚àö¬¢¬¨√ü n‚Äö√Ñ√∂‚àö¬¢¬¨√ü L-1, is equivalent to multiplying {x(n)} by:$

The finite observation interval for the signal places a limit on the frequency resolution.

What is the highest frequency that is contained in the sampled signal?

If the signal to be analyzed is an analog signal, we would pass it through an anti-aliasing filter with B as the bandwidth of the filtered signal and then the signal is sampled at a rate:

If x(n)=cos‚âà√¨‚àö¬¢₀n and W(‚âà√¨‚àö¬¢) is the Fourier transform of the rectangular signal w(n), then what is the Fourier transform of the signal x(n).w(n)?$