InterviewSolution
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InterviewSolution
This section includes InterviewSolutions, each offering curated multiple-choice questions to sharpen your knowledge and support exam preparation. Choose a topic below to get started.
| 1. |
What about the stability of system in |
| Answer» ROC include the unit circle hence it is stable. | |
| 2. |
Which one most appropriate dynamic system? |
| Answer» Because present output of y(n) depend upon past y(n - 1) and future y(n + 1). | |
| 3. |
An energy signal has G() = 10. Its energy density spectrum is |
| Answer» Energy density spectrum = |G(f)|2 = |10|2 = 100. | |
| 4. |
Consider Pole zero diagram as shown, If two Poles are moved in opposite direction towards ω = /2 and -/2, the filter will be |
| Answer» But still we will get the same response, zero are at same position. | |
| 5. |
If otherwise find E(X) |
| Answer» . | |
| 6. |
The data of speed of train V and resistance to motion R isThe law R = a + bV is of the form |
| Answer» Use method of least squares. | |
| 7. |
The function δ( - ) is |
| Answer» δ(t) is an impulse at t = 0, δ(t - b) is in impulse originating at t = b. | |
| 8. |
If () and its first derivative are Laplace transformable and Laplace of transform () is X(), then () is |
| Answer» It is initial value theorem. | |
| 9. |
If a function has only cosine terms, it must satisfy the equation |
| Answer» cos (- θ) = cos θ. | |
| 10. |
If () is a time varying voltage, is |
| Answer» Since . | |
| 11. |
An ac network has a power factor of 0.8 lagging for fundamental frequency. If the applied voltage contains thrid and fifth harmonics, the overall power factor will be |
| Answer» As frequency increases, XL decreases and power factor becomes worse. | |
| 12. |
what will be sampling rate to aviod aliasing for the signal m() = 10 cos 100 ? |
| Answer» To avoid aliasing fs ≤ 2fm . | |
| 13. |
If Laplace transform of () is F(), then = |
| Answer» £f(t) = £-1F(s) = f(t) £[a f1(t) + bf2(t)] = aF1(s) + bF2(s) where £[f(t - T)] = e-sT F(s) £[e-at f(t)] = F(s + a) Initial value theorem Final value theroem Convolution Integral where t is dummy variable for t. | |
| 14. |
Choose the function (), - ∞ < < + ∞, for which a Fourier series cannot be defined |
| Answer» Fourier series is applicable for periodic or finite duration signal and (c) is neither periodic nor finite duration signal. | |
| 15. |
If then the sequence [] is |
| Answer» Therefore x[n] is not periodic. | |
| 16. |
A 1 kHz sinusoidal signal is ideally sampled at 1500 samples/sec and the sampled signal is passed through an ideal low pass filter with cut off frequency 800 Hz. The output signal has the frequency. |
| Answer» Given fs = 1500 Hz ⇒ fm = 750 Hz. The given signal frequency is 1 kHz. The sampled frequency is 2.5 kHz, 0.5 kHz, But cut off frequency is 800 Hz or 0.8 kHz. Therefore only 0.5 kHz will pass. | |
| 17. |
If autocorrelation sequence is R() = then what will be energy of sequence? |
| Answer» In autocorrelation sequence max. energy lies at origin. | |
| 18. |
If I() = , fnal value of () is |
| Answer» . | |
| 19. |
If sequence () = (-) then it is |
| Answer» If n is +ve then causal, and if n is -ve then non-causal. | |
| 20. |
In the given figure 15.6 shows a series, R - C circuit fed by a current source (). There is an initial voltage . across the capacitor. The system |
| Answer» Due to presence of v0 the response will not proportional to cause. Hence v0 must be zero if it is a linear system. | |
| 21. |
Fourier transform of an external exponential W0 |
| Answer» Eternal mean the range is -∞ to +∞ So F[ejω0t] = =δ(f - f0). | |
| 22. |
If = 10 + 12 cos 500 - 3.5 sin 500 , then in amplitude phasse form = |
| Answer» Use trigonometric theorem. | |
| 23. |
The real part of complex frequency corresponds to oscillations. |
| Answer» The real part of s corresponds to change in amplitude. | |
| 24. |
A voltage = 100 sin ω + 10 sin 5 ω is applied to a pure capacitor having capacitance of 1 μF. If ω = 314 rad/sec, the current through the capacitor is |
| Answer» For Fundamental . | |
| 25. |
The F.T. of a conjugate symmetric function is always |
| Answer» F.T. of conjugate symmetric function is always real. | |
| 26. |
Which one is time invariant system? |
| Answer» For time invariant system y(n, k) = y(n - k), where y(n, k) mean shift the input by n - k, while y(n - k) mean change all the n (a) y[n] = x[2n] ⇒ y(n, k) = x[2n - k] y(n - k) = x[2(n - k)] y(n, k) ≠ y(n - k) Time variant (b) y[n] = x[n] x[n - 1] y[n, k] = x[n - k] x[n - k - 1] y[n - k] = x[n - k] x[n - k - 1] y[n, k] = x[n - k] Time Invariant (c) y[n] = x[n/2] ⇒ y[n, k] ⇒ y[n - k] y[n, k] ≠ y[n - k] Time variant. | |
| 27. |
The Fourier series representation of a periodic current (2 + 6 cos ω + sin 2ω) A. The effective value is |
| Answer» I =(22 + 62 + 24)0.5 = 64 = 8. | |
| 28. |
Energy density spectrum of a gate G() function is |
| Answer» and E.S.D. of g(t) = |G(f)|2 So E.S.D. of GT(t) = |G(f)|2 . | |
| 29. |
If , then () series has |
| Answer» Use power series method to solve it. | |
| 30. |
DTFT (Discrete time Fourier transform) of [] = ∪[] for -1 < < + 1. |
| Answer» . | |
| 31. |
The - transform of a systerm is If the ROC is || < 0.2, then the impluse response of the system is |
| Answer» ROC is |z| < 0.2, which shows x(n) must be non-causal, therefore sequence must be left handed. But given is z-transform of right handed sequence. But if H(z) become then ROC become |z| < 0.2 and inverse z-transform of is - (0.2)n ∪(- n - 1). | |
| 32. |
ROC of sequence [] = (3) ∪[] + (4) ∪[- - 1] |
| Answer» x[n] = (3)n ∪(n) + (4)n ∪(- n - 1) | |
| 33. |
δ( - ) is a pulse function. |
| Answer» It is an impulse function occuring at t = b. | |
| 34. |
If () is in volts, then F(ω) is in |
| Answer» Since we integrate with respect to time to F(jω), we get volt-secs. | |
| 35. |
A voltage V() which is a Gaussian ergodic random process with a mean of zero and a variance of 4 volt is measured by a true rms meter. The reading will be |
| Answer» Rms Uvalue =4. | |
| 36. |
An ac circuit has an impedance of (3 + 6) ohm for fundamental. The impedance for fifth harmonic is |
| Answer» R is independent of w and XL ∝ ω. | |
| 37. |
If then, (0) and (∞) are given by |
| Answer» Use initial and final value theorems. | |
| 38. |
The signal define by the equations( -) = 0 for < and ( - ) = 1 for ≥ is |
| Answer» u(t) is a unit step function u(t - a) is a unit step function shifted in time by a. | |
| 39. |
A signal is sampled at Nyquist rate = 2. The function can be recovered from its samples only. If it is a |
| Answer» Nyqist theorem is defined with respect to sinusoidal signal. | |
| 40. |
A voltage wave is = 50 sin ω. Its average value calculated over full one cycle is |
| Answer» Average of sinusoid over full cycle is zero. | |
| 41. |
If () and () are two functions of time and and are constants, then |
| Answer» £f(t) = £-1F(s) = f(t) £[a f1(t) + bf2(t)] = aF1(s) + bF2(s) where £[f(t - T)] = e-sT F(s) £[e-at f(t)] = F(s + a) Initial value theorem Final value theroem Convolution Integral where t is dummy variable for t. | |
| 42. |
The transform of () = ∪() |
| Answer» . | |
| 43. |
Fourier transform of () = |
| Answer» It is differentiational Property of F.T. . | |
| 44. |
For the system in the given figure |
| Answer» yk has two unit delays and then a multiplier of 0.5 before being fedback. | |
| 45. |
The Laplace transform of the waveform shown in the below figure is |
| Answer» x(t) = ∪(t - 1) + ∪(t - 2) - 2∪(t - 3). | |
| 46. |
A signal () = sin(ω + φ) is the input to a linear time invariant system having a frequency response H() If the O/P of the system is A( -), then the general form of H() will be |
| Answer» y(n) = A x(n - n0) ⇒ A sin (ω0(n - n0) + Φ) ⇒ A sin (ω0 n - n0ω0 + Φ) and ∠4 (ejω) is - n0ω0 + 2pk. | |
| 47. |
If then system is |
| Answer» ROC will be |z| > 0.4 and |z| > 2 Hence ROC ⇒ |z| > 0.4, which is exterior of circle of radius 0.4 Hence causal if ROC is |z| > 0.4 then non-causal. | |
| 48. |
A pulse function having magnitude E and duration from = 0 to = can be represented as |
| Answer» v(t) = Eu(t) - Eu(t - a). | |
| 49. |
If , = |
| Answer» . | |
| 50. |
If I() = , initial value of () is |
| Answer» . | |