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Properties of Discrete Fourier Transform

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Properties of Discrete Fourier Transform MCQ Quiz in தமிழ் - Objective Question with Answer for Properties of Discrete Fourier Transform - இலவச PDF ஐப் பதிவிறக்கவும்

Last updated on Apr 5, 2025

பெறு Properties of Discrete Fourier Transform பதில்கள் மற்றும் விரிவான தீர்வுகளுடன் கூடிய பல தேர்வு கேள்விகள் (MCQ வினாடிவினா). இவற்றை இலவசமாகப் பதிவிறக்கவும் Properties of Discrete Fourier Transform MCQ வினாடி வினா Pdf மற்றும் வங்கி, SSC, ரயில்வே, UPSC, மாநில PSC போன்ற உங்களின் வரவிருக்கும் தேர்வுகளுக்குத் தயாராகுங்கள்.

Latest Properties of Discrete Fourier Transform MCQ Objective Questions

Top Properties of Discrete Fourier Transform MCQ Objective Questions

Properties of Discrete Fourier Transform Question 1:

\(\rm x[n]\) and \(\rm X[k]\) are \(\rm DFT\) pairs where \(\rm X[k] = DFT [x[n]]\). The period is \(\rm N\). Then \(\rm X[N-k]\) is equal to

\(\rm X[-k]\)
\(\rm X^*[-k]\)
\(\rm X^*[N-k]\)
\(\rm X^*[k]\)

Answer (Detailed Solution Below)

Option 4 :

\(\rm X^*[k]\)

By definition

\(\rm \begin{array}{l} X\left[ k \right] = \mathop \sum \limits_{n = 1}^{N - 1} x\left[ n \right]{e^{ - jk\frac{{2\pi n}}{N}}}\\ \rm \Rightarrow X\left[ {N - k} \right] = \mathop \sum \limits_{n = 1}^{N - 1} x\left[ n \right].{e^{ - j\frac{{\left( {N - k} \right)2\pi n}}{N}}}\\ \rm = \mathop \sum \limits_{n = 1}^{N - 1} x\left[ n \right]{e^{jk\frac{{2\pi n}}{N}}}.{e^{ - j2\pi n}}\\ \rm = \mathop \sum \limits_{n = 1}^{N - 1} x\left[ n \right]{e^{\frac{{jk2\pi n}}{N}}}\\ \rm \Rightarrow X\left[ {N - k} \right] = {\left( {\mathop \sum \limits_{n = 1}^{N - 1} x\left[ n \right].{e^{ - jk\frac{{2\pi n}}{N}}}} \right)^*} = {X^*}\left[ k \right] \end{array}\)

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Properties of Discrete Fourier Transform Question 2:

\(\rm x\left[ n \right] = \left\{ { - 1,2, - 3,2, - 1} \right\}\)Then the value of \(\rm \mathop \smallint \limits_0^{6\pi } {\left| {X\left( {{e^{j\omega }}} \right)} \right|^2}d\omega \) ____.

Answer (Detailed Solution Below) 358 - 385.5

\(\rm x[n]\) is discrete and aperiodic \(\rm \Rightarrow X\left( {{e^{j\omega }}} \right)\)is periodic and continuous.

\(\rm X\left( {{e^{j\omega }}} \right)\)is periodic with \(\rm 2π\).

Thus \(\rm \mathop \smallint \limits_0^{6\pi } {\left| {X\left( {{e^{j\omega }}} \right)} \right|^2}d\omega = 3\left[ {\mathop \smallint \limits_0^{2\pi } {{\left| {X\left( {{e^{j\omega }}} \right)} \right|}^2}d\omega } \right]\)

Now from Parseval’s theorem.

\(\rm \frac{1}{{2\pi }}\mathop \smallint \limits_0^{2\pi } {\left| {X\left( {{e^{j\omega }}} \right)} \right|^2}d\omega = \mathop \sum \limits_{n = - \infty }^\infty {\left| {x\left[ n \right]} \right|^2}\)

\(\rm \Rightarrow \mathop \smallint \limits_0^{2\pi } {\left| {X\left({e^{j\omega }}\right)} \right|^2}d\omega = 2\pi \mathop \sum \limits_{n = - \infty }^\infty {\left| {x\left[ n \right]} \right|^2}\)

\(\rm = 2\pi \left[ {1 + 4 + 9 + 4 + 1} \right]\)

\(\rm = 2\pi .19\)

Now,

\(\rm \mathop \smallint \limits_0^{6\pi } {\left| {X\left( {{e^{j\omega }}} \right)} \right|^2}d\omega = 3\left[ {2\pi .19} \right] = 358.14\)

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Properties of Discrete Fourier Transform MCQ Quiz in தமிழ் - Objective Question with Answer for Properties of Discrete Fourier Transform - இலவச PDF ஐப் பதிவிறக்கவும்

Latest Properties of Discrete Fourier Transform MCQ Objective Questions

Top Properties of Discrete Fourier Transform MCQ Objective Questions

Properties of Discrete Fourier Transform Question 1:

Answer (Detailed Solution Below)

Properties of Discrete Fourier Transform Question 1 Detailed Solution

Properties of Discrete Fourier Transform Question 2:

Answer (Detailed Solution Below) 358 - 385.5

Properties of Discrete Fourier Transform Question 2 Detailed Solution

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Properties of Discrete Fourier Transform MCQ Quiz in தமிழ் - Objective Question with Answer for Properties of Discrete Fourier Transform - இலவச PDF ஐப் பதிவிறக்கவும்

Latest Properties of Discrete Fourier Transform MCQ Objective Questions

Top Properties of Discrete Fourier Transform MCQ Objective Questions

Properties of Discrete Fourier Transform Question 1:

Answer (Detailed Solution Below)

Properties of Discrete Fourier Transform Question 1 Detailed Solution

Properties of Discrete Fourier Transform Question 2:

Answer (Detailed Solution Below) 358 - 385.5

Properties of Discrete Fourier Transform Question 2 Detailed Solution

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