Related MCQs

• By means of the DFT and IDFT, determine the response of the FIR filter with impulse response h(n)={1,2,3} to the input sequence x(n)={1,2,2,1}?
• What is the variance of the output DFT coefficients |X(k)|?
• If x1(n) and x2(n) are two real valued sequences of length N, and let x(n) be a complex valued sequence defined as x(n)=x1(n)+jx2(n), 0≤ n≤ N-1, then what is the value of x2(n)?
• Which of the following is true regarding the number of computations required to compute DFT at any one value of 'k'?
• If we split the N point data sequence into two N/2 point data sequences f1(n) and f2(n) corresponding to the even numbered and odd numbered samples of x(n) and F1(k) and F2(k) are the N/2 point DFTs of f1(k) and f2(k) respectively, then what is the N/2 point DFT X(k) of x(n)?
• WNk+N/2=
• What is the range in which the quantization errors due to rounding off are uniformly distributed as random variables if Δ=2-b?
• Every fourfold increase in the size N of the DFT requires an additional bit in computational precision to offset the additional quantization errors.
• What is the signal-to-noise ratio?
• If we split the N point data sequence into two N/2 point data sequences f1(n) and f2(n) corresponding to the even numbered and odd numbered samples of x(n), then such an FFT algorithm is known as decimation-in-time algorithm.