Q. The output of a linear system for any input can be computed in which of the following ways?

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Q. For a second order system, damping ratio ζ is such that 0 < ζ <. Then the roots of characteristic equation are

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Q. If f(t)↔ F(jω), and f(t) is real, then F(- jω)

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Q. Fourier transform of the function f(t) = 1 is

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Q. The inverse response of a system h(n) = aⁿ∪(n) what is the condition for the system to be BIBO stable?

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Q. A system has poles at 0.01 Hz, 1 Hz and 80 Hz, zeros at 5 Hz, 100 Hz and 200 Hz. The approximate phase of the system response at 20 Hz is

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Q. Fourier transform of sgn (t) is

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Q. If the number of ways an event may result ins analysed into m successes and n failures, each equally likely to occur, the probability of success in a single trial is m( m + n)

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Q. If X(z) = (1 - a)z¯¹/[(1 - z¯¹)(1 - az¯¹)] and 1 < |z|, the final value of xk is

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Q. Final value theorem is used to find

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Q. Which one of following is correct condition to check the stability of sysytem in terms of impulse response?

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Q. If a function f(t) is an odd, function, its Fourier series

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Q. The total area under the probability distribution curve is

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Q. Which one of following is correct condition to check the stability of system?

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Q. The inverse Fourier transform of the function F(ω) = 2/jω is

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Q. Let f1(t) = G1(t) + 4, f2(t) = G2(t) + 3. If G1(t) and G2(t) are uncorrected then the correlation between f1(t) and f2(t) are

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Q. The function δ'(t - b) is a unit doublet.

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Q. The value of P(2 < x < 3) in function f(x) = K(x - 1) for K = 1 < x < 4 is

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Q. If f(t) = sgn(t), F(jω)

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Q. If xk = 0 for k < 0 and = 2^k for k ≥ 0 X(z) = z/(z -2).

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