If x(n)=A, -M<n<M,; x(n)=0, elsewhere. Then what is the Fourier transform of the signal?

( frac{sin u2061(M- frac{1}{2}) }{sin u2061( frac{ }{2})} )

A ( frac{sin u2061(M- frac{1}{2}) }{sin u2061( frac{ }{2})} )

A2 ( frac{sin u2061(M+ frac{1}{2}) }{sin u2061( frac{ }{2})} )

A ( frac{sin u2061(M+ frac{1}{2}) }{sin u2061( frac{ }{2})} )

( frac{sin u2061(M- frac{1}{2}) }{sin u2061( frac{ }{2})} )

What is the value of |X( )| given X( )=1/(1-ae-j ), |a|<1?

( frac{1}{ sqrt{1+2acos +a^2}} )

( frac{1}{ sqrt{1-2acos +a^2}} )

( frac{1}{ sqrt{1+2acos +a^2}} )

What is the value of XI( ) given ( frac{1}{1-ae^{-j }} ), |a|<1?

( frac{1+acos }{1-2acos +a^2} )

( frac{1-acos }{1-2acos +a^2} )

What is the value of XR( ) given X( )= ( frac{1}{1-ae^{-j }} ),|a|<1?

( frac{1+acos }{1-2acos +a^2} )

( frac{1-acos }{1-2acos +a^2} )

If x(n) is a real and odd sequence, then what is the expression for x(n)?

( frac{1}{ } int_0^ )[XI( ) cos n] d

( frac{1}{ } int_0^ )[XI( ) sin n] d

( frac{1}{ } int_0^ )[XI( ) cos n] d

If x(n) is a real sequence, then what is the value of XI( )?

( sum_{n=- }^ x(n)cos u2061( n) )

( sum_{n=- }^ x(n)sin u2061( n) )

( sum_{n=- }^ x(n)cos u2061( n) )

If x(n)=xR(n)+jxI(n) is a complex sequence whose Fourier transform is given as X( )=XR( )+jXI( ), then what is the value of xI(n)?

( int_0^{2 } )[XR( ) sin n+ XI( ) cos n] d

( frac{1}{2 } int_0^{2 } )[XR( ) sin n+ XI( ) cos n] d

( int_0^{2 } )[XR( ) sin n+ XI( ) cos n] d

( frac{1}{2 } int_0^{2 } )[XR( ) sin n XI( ) cos n] d

If x(n)=xR(n)+jxI(n) is a complex sequence whose Fourier transform is given as X( )=XR( )+jXI( ), then what is the value of XR( )?

( sum_{n=- }^ )xR (n)cos n-xI (n)sin n

( sum_{n=0}^ )xR (n)cos n-xI (n)sin n

( sum_{n=0}^ )xR (n)cos n+xI (n)sin n

( sum_{n=- }^ )xR (n)cos n+xI (n)sin n

( sum_{n=- }^ )xR (n)cos n-xI (n)sin n

13 + Mcqs in Properties of Fourier Transform for Discrete Time Signals in Digital Signal Processing Page 1 McqOptions

1.	What is the energy density spectrum of the signal x(n)=aⁿu(n), \|a\|<1?
A.	( frac{1}{1+2acos +a^2} )
B.	( frac{1}{1-2acos +a^2} )
C.	( frac{1}{1-2acos -a^2} )
D.	( frac{1}{1+2acos -a^2} )
Answer» C. ( frac{1}{1-2acos -a^2} )

Discussion

2.	What is the convolution of the sequences of x₁(n)=x₂(n)={1,1,1}?
A.	{1,2,<strong>3</strong>,2,1}
B.	{1,2,3,2,1}
C.	{1,1,1,1,1}
D.	{1,1,<strong>1</strong>,1,1}
Answer» B. {1,2,3,2,1}

Discussion

3.	If X( ) is the Fourier transform of the signal x(n), then what is the Fourier transform of the signal x(n-k)?
A.	e<sup>j k</sup>. X(- )
B.	e<sup>j k</sup>. X( )
C.	e<sup>-j k</sup>. X(- )
D.	e<sup>-j k</sup>. X( )
Answer» E.

Discussion

4.	What is the Fourier transform of the signal x(n)=a^\|n\|, \|a\|<1?
A.	( frac{1+a^2}{1-2acos +a^2} )
B.	( frac{1-a^2}{1-2acos +a^2} )
C.	( frac{2a}{1-2acos +a^2} )
D.	None of the mentioned
Answer» C. ( frac{2a}{1-2acos +a^2} )

Discussion

5.	If x(n)=A, -M<n<M,; x(n)=0, elsewhere. Then what is the Fourier transform of the signal?
A.	A ( frac{sin u2061(M- frac{1}{2}) }{sin u2061( frac{ }{2})} )
B.	A<sup>2</sup> ( frac{sin u2061(M+ frac{1}{2}) }{sin u2061( frac{ }{2})} )
C.	A ( frac{sin u2061(M+ frac{1}{2}) }{sin u2061( frac{ }{2})} )
D.	( frac{sin u2061(M- frac{1}{2}) }{sin u2061( frac{ }{2})} )
Answer» D. ( frac{sin u2061(M- frac{1}{2}) }{sin u2061( frac{ }{2})} )

Discussion

6.	What is the value of \|X( )\| given X( )=1/(1-ae^-j), \|a\|<1?
A.	( frac{1}{ sqrt{1-2acos +a^2}} )
B.	( frac{1}{ sqrt{1+2acos +a^2}} )
C.	( frac{1}{1-2acos +a^2} )
D.	( frac{1}{1+2acos +a^2} )
Answer» B. ( frac{1}{ sqrt{1+2acos +a^2}} )

Discussion

7.	What is the value of X_I( ) given ( frac{1}{1-ae^{-j }} ), \|a\|<1?
A.	( frac{asin }{1-2acos +a^2} )
B.	( frac{1+acos }{1-2acos +a^2} )
C.	( frac{1-acos }{1-2acos +a^2} )
D.	( frac{-asin }{1-2acos +a^2} )
Answer» E.

Discussion

8.	What is the value of X_R( ) given X( )= ( frac{1}{1-ae^{-j }} ),\|a\|<1?
A.	( frac{asin }{1-2acos +a^2} )
B.	( frac{1+acos }{1-2acos +a^2} )
C.	( frac{1-acos }{1-2acos +a^2} )
D.	( frac{-asin }{1-2acos +a^2} )
Answer» D. ( frac{-asin }{1-2acos +a^2} )

Discussion

9.	If x(n) is a real and odd sequence, then what is the expression for x(n)?
A.	( frac{1}{ } int_0^ )[X<sub>I</sub>( ) sin n] d
B.	( frac{1}{ } int_0^ )[X<sub>I</sub>( ) sin n] d
C.	( frac{1}{ } int_0^ )[X<sub>I</sub>( ) cos n] d
D.	( frac{1}{ } int_0^ )[X<sub>I</sub>( ) cos n] d
Answer» C. ( frac{1}{ } int_0^ )[X<sub>I</sub>( ) cos n] d

Discussion

10.	If x(n) is a real signal, then x(n)= ( frac{1}{ } int_0^ )[X_R( ) cos n- X_I( ) sin n] d .
A.	True
B.	False
Answer» B. False

Discussion

11.	If x(n) is a real sequence, then what is the value of X_I( )?
A.	( sum_{n=- }^ x(n)sin u2061( n) )
B.	( sum_{n=- }^ x(n)sin u2061( n) )
C.	( sum_{n=- }^ x(n)cos u2061( n) )
D.	( sum_{n=- }^ x(n)cos u2061( n) )
Answer» C. ( sum_{n=- }^ x(n)cos u2061( n) )

Discussion

12.	If x(n)=x_R(n)+jx_I(n) is a complex sequence whose Fourier transform is given as X( )=X_R( )+jX_I( ), then what is the value of x_I(n)?
A.	( frac{1}{2 } int_0^{2 } )[X<sub>R</sub>( ) sin n+ X<sub>I</sub>( ) cos n] d
B.	( int_0^{2 } )[X<sub>R</sub>( ) sin n+ X<sub>I</sub>( ) cos n] d
C.	( frac{1}{2 } int_0^{2 } )[X<sub>R</sub>( ) sin n X<sub>I</sub>( ) cos n] d
D.	None of the mentioned
Answer» B. ( int_0^{2 } )[X<sub>R</sub>( ) sin n+ X<sub>I</sub>( ) cos n] d

Discussion

13.	If x(n)=x_R(n)+jx_I(n) is a complex sequence whose Fourier transform is given as X( )=X_R( )+jX_I( ), then what is the value of X_R( )?
A.	( sum_{n=0}^ )x<sub>R</sub> (n)cos n-x<sub>I</sub> (n)sin n
B.	( sum_{n=0}^ )x<sub>R</sub> (n)cos n+x<sub>I</sub> (n)sin n
C.	( sum_{n=- }^ )x<sub>R</sub> (n)cos n+x<sub>I</sub> (n)sin n
D.	( sum_{n=- }^ )x<sub>R</sub> (n)cos n-x<sub>I</sub> (n)sin n
Answer» D. ( sum_{n=- }^ )x<sub>R</sub> (n)cos n-x<sub>I</sub> (n)sin n

Discussion

Explore topic-wise MCQs in Digital Signal Processing.

What is the energy density spectrum of the signal x(n)=aⁿu(n), |a|<1?

What is the convolution of the sequences of x₁(n)=x₂(n)={1,1,1}?

If X( ) is the Fourier transform of the signal x(n), then what is the Fourier transform of the signal x(n-k)?

What is the Fourier transform of the signal x(n)=a^|n|, |a|<1?

If x(n)=A, -M<n<M,; x(n)=0, elsewhere. Then what is the Fourier transform of the signal?

What is the value of |X( )| given X( )=1/(1-ae^-j), |a|<1?

What is the value of X_I( ) given ( frac{1}{1-ae^{-j }} ), |a|<1?

What is the value of X_R( ) given X( )= ( frac{1}{1-ae^{-j }} ),|a|<1?

If x(n) is a real and odd sequence, then what is the expression for x(n)?

If x(n) is a real signal, then x(n)= ( frac{1}{ } int_0^ )[X_R( ) cos n- X_I( ) sin n] d .

If x(n) is a real sequence, then what is the value of X_I( )?

If x(n)=x_R(n)+jx_I(n) is a complex sequence whose Fourier transform is given as X( )=X_R( )+jX_I( ), then what is the value of x_I(n)?

If x(n)=x_R(n)+jx_I(n) is a complex sequence whose Fourier transform is given as X( )=X_R( )+jX_I( ), then what is the value of X_R( )?

Explore topic-wise MCQs in Digital Signal Processing.

What is the energy density spectrum of the signal x(n)=anu(n), |a|<1?

What is the convolution of the sequences of x1(n)=x2(n)={1,1,1}?

If X( ) is the Fourier transform of the signal x(n), then what is the Fourier transform of the signal x(n-k)?

What is the Fourier transform of the signal x(n)=a|n|, |a|<1?

If x(n)=A, -M<n<M,; x(n)=0, elsewhere. Then what is the Fourier transform of the signal?

What is the value of |X( )| given X( )=1/(1-ae-j ), |a|<1?

What is the value of XI( ) given ( frac{1}{1-ae^{-j }} ), |a|<1?

What is the value of XR( ) given X( )= ( frac{1}{1-ae^{-j }} ),|a|<1?

If x(n) is a real and odd sequence, then what is the expression for x(n)?

If x(n) is a real signal, then x(n)= ( frac{1}{ } int_0^ )[XR( ) cos n- XI( ) sin n] d .

If x(n) is a real sequence, then what is the value of XI( )?

If x(n)=xR(n)+jxI(n) is a complex sequence whose Fourier transform is given as X( )=XR( )+jXI( ), then what is the value of xI(n)?

If x(n)=xR(n)+jxI(n) is a complex sequence whose Fourier transform is given as X( )=XR( )+jXI( ), then what is the value of XR( )?

What is the energy density spectrum of the signal x(n)=aⁿu(n), |a|<1?

What is the convolution of the sequences of x₁(n)=x₂(n)={1,1,1}?

What is the Fourier transform of the signal x(n)=a^|n|, |a|<1?

What is the value of |X( )| given X( )=1/(1-ae^-j), |a|<1?

What is the value of X_I( ) given ( frac{1}{1-ae^{-j }} ), |a|<1?

What is the value of X_R( ) given X( )= ( frac{1}{1-ae^{-j }} ),|a|<1?

If x(n) is a real signal, then x(n)= ( frac{1}{ } int_0^ )[X_R( ) cos n- X_I( ) sin n] d .

If x(n) is a real sequence, then what is the value of X_I( )?

If x(n)=x_R(n)+jx_I(n) is a complex sequence whose Fourier transform is given as X( )=X_R( )+jX_I( ), then what is the value of x_I(n)?

If x(n)=x_R(n)+jx_I(n) is a complex sequence whose Fourier transform is given as X( )=X_R( )+jX_I( ), then what is the value of X_R( )?