What is the energy of a discrete time signal in terms of X(ω)?

\(2π\int_{-π}^π |X(ω)|^2 dω\)

\(\frac{1}{2π} \int_{-π}^π |X(ω)|^2 dω\)

\(\frac{1}{2π} \int_0^π |X(ω)|^2 dω\)

What is the value of discrete time signal x(n) at n≠0 whose Fourier transform is represented as below?

\(\frac{ω_c}{\pi}.\frac{sin ω_c.n}{ω_c.n}\)

\(\frac{-ω_c}{\pi}.\frac{sin ω_c.n}{ω_c.n}\)

\(ω_c.\pi \frac{sin ω_c.n}{ω_c.n}\)

What is the synthesis equation of the discrete time signal x(n), whose Fourier transform is X(ω)?

\(2π\int_0^2π X(ω) e^jωn dω\)

\(\frac{1}{π} \int_0^{2π} X(ω) e^jωn dω\)

\(\frac{1}{2π} \int_0^{2π} X(ω) e^jωn dω\)

What is the Fourier transform X(ω) of a finite energy discrete time signal x(n)?

\(\sum_{n=-∞}^∞x(n)e^{-jωn}\)

\(\sum_{n=0}^∞x(n)e^{-jωn}\)

\(\sum_{n=0}^{N-1}x(n)e^{-jωn}\)

What is the expression for Fourier series coefficient ck in terms of the discrete signal x(n)?

\(\frac{1}{N} \sum_{n=0}^{N-1}x(n)e^{j2πkn/N}\)

\(N\sum_{n=0}^{N-1}x(n)e^{-j2πkn/N}\)

\(\frac{1}{N} \sum_{n=0}^{N+1}x(n)e^{-j2πkn/N}\)

\(\frac{1}{N} \sum_{n=0}^{N-1}x(n)e^{-j2πkn/N}\)

Explore topic-wise MCQs in Digital Signal Processing Questions and Answers.

This section includes 10 Mcqs, each offering curated multiple-choice questions to sharpen your Digital Signal Processing Questions and Answers knowledge and support exam preparation. Choose a topic below to get started.

1.	What is the energy of a discrete time signal in terms of X(ω)?
A.	\(2π\int_{-π}^π \|X(ω)\|^2 dω\)
B.	\(\frac{1}{2π} \int_{-π}^π \|X(ω)\|^2 dω\)
C.	\(\frac{1}{2π} \int_0^π \|X(ω)\|^2 dω\)
D.	None of the mentioned
Answer» C. \(\frac{1}{2π} \int_0^π \|X(ω)\|^2 dω\)

Discussion

2.	The oscillatory behavior of the approximation of XN(ω) to the function X(ω) at a point of discontinuity of X(ω) is known as Gibbs phenomenon.
A.	True
B.	False
Answer» B. False

Discussion

3.	What is the value of discrete time signal x(n) at n≠0 whose Fourier transform is represented as below?
A.	\(\frac{ω_c}{\pi}.\frac{sin ω_c.n}{ω_c.n}\)
B.	\(\frac{-ω_c}{\pi}.\frac{sin ω_c.n}{ω_c.n}\)
C.	\(ω_c.\pi \frac{sin ω_c.n}{ω_c.n}\)
D.	None of the mentioned
Answer» B. \(\frac{-ω_c}{\pi}.\frac{sin ω_c.n}{ω_c.n}\)

Discussion

4.	What is the synthesis equation of the discrete time signal x(n), whose Fourier transform is X(ω)?
A.	\(2π\int_0^2π X(ω) e^jωn dω\)
B.	\(\frac{1}{π} \int_0^{2π} X(ω) e^jωn dω\)
C.	\(\frac{1}{2π} \int_0^{2π} X(ω) e^jωn dω\)
D.	None of the mentioned
Answer» D. None of the mentioned

Discussion

5.	What is the period of the Fourier transform X(ω) of the signal x(n)?
A.	π
B.	1
C.	Non-periodic
D.	2π
Answer» E.

Discussion

6.	What is the Fourier transform X(ω) of a finite energy discrete time signal x(n)?
A.	\(\sum_{n=-∞}^∞x(n)e^{-jωn}\)
B.	\(\sum_{n=0}^∞x(n)e^{-jωn}\)
C.	\(\sum_{n=0}^{N-1}x(n)e^{-jωn}\)
D.	None of the mentioned
Answer» B. \(\sum_{n=0}^∞x(n)e^{-jωn}\)

Discussion

7.	What is the equation for average power of discrete time periodic signal x(n) with period N in terms of Fourier series coefficient ck?
A.	\(\sum_{k=0}^{N-1}\|c_k\|\)
B.	\(\sum_{k=0}^{N-1}\|c_k\|^2\)
C.	\(\sum_{k=0}^N\|c_k\|^2\)
D.	\(\sum_{k=0}^N\|c_k\|\)
Answer» C. \(\sum_{k=0}^N\|c_k\|^2\)

Discussion

8.	What are the Fourier series coefficients for the signal x(n)=cosπn/3?
A.	c1=c2=c3=c4=0,c1=c5=1/2
B.	c0=c1=c2=c3=c4=c5=0
C.	c0=c1=c2=c3=c4=c5=1/2
D.	none of the mentioned
Answer» B. c0=c1=c2=c3=c4=c5=0

Discussion

9.	The Fourier series for the signal x(n)=cos√2πn exists.
A.	True
B.	False
Answer» C.

Discussion

10.	What is the expression for Fourier series coefficient ck in terms of the discrete signal x(n)?
A.	\(\frac{1}{N} \sum_{n=0}^{N-1}x(n)e^{j2πkn/N}\)
B.	\(N\sum_{n=0}^{N-1}x(n)e^{-j2πkn/N}\)
C.	\(\frac{1}{N} \sum_{n=0}^{N+1}x(n)e^{-j2πkn/N}\)
D.	\(\frac{1}{N} \sum_{n=0}^{N-1}x(n)e^{-j2πkn/N}\)
Answer» E.

Discussion

Explore topic-wise MCQs in Digital Signal Processing Questions and Answers.

What is the energy of a discrete time signal in terms of X(ω)?

The oscillatory behavior of the approximation of XN(ω) to the function X(ω) at a point of discontinuity of X(ω) is known as Gibbs phenomenon.

What is the value of discrete time signal x(n) at n≠0 whose Fourier transform is represented as below?

What is the synthesis equation of the discrete time signal x(n), whose Fourier transform is X(ω)?

What is the period of the Fourier transform X(ω) of the signal x(n)?

What is the Fourier transform X(ω) of a finite energy discrete time signal x(n)?

What is the equation for average power of discrete time periodic signal x(n) with period N in terms of Fourier series coefficient ck?

What are the Fourier series coefficients for the signal x(n)=cosπn/3?

The Fourier series for the signal x(n)=cos√2πn exists.

What is the expression for Fourier series coefficient ck in terms of the discrete signal x(n)?