Q. F.T. of continuous non-periodic signal is

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Q. Inverse Fourier transform of '1' is

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Q. Pick out the odd one

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Q. X and Y are two random variables and Z = X + Y . Letmz, mz, mx, my represent mean of Z, X and Y. Then

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Q. Energy spectral density is equal to for a signal g(t)

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Q. State space analysis is applicable to

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Q. For Ergodic Process

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Q. Assertion (A): A non-sinusoidal wave can be expressed in terms of sine waves of different frequencies which are multiples of the frequency of fundamental.

Reason (R): If negative half of a complex wave is a reproduction of the positive half, the even harmonics are absent.

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Q. A function will have only sine terms if

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Q. The impulse response h[n] of a linear time invariant system is given by h[n] = ∪[n + 3 ] + ∪[n - 2] -2∪[n -7]. The above system is

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Q. Which one condition is true to check the periodically for discrete time signal (where K is any integer, N is period, f₀ is frequency of signal)

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Q. If v(t) = 0 for t < 0 and e^(-αt) for t ≥ 0 V(jω) = 1/(α + jω).

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Q. The term 'energy spectral density' is associated with

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Q. If f(t) = 1, F(jω) = 2π δ(ω).

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Q. The state equations are in the form

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Q. (SI - A)¯¹ = adj(sI - A)/det (sI - A)

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Q. The eign values of n x n matrix A are the root of the characteristic equation 1λI - AI = 0

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Q. A signal is x + f(t) where x is constant and f(t) is a power signal with zero mean value. The power of the signal is

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Q. A pulse function can be represented as difference of two equal step functions.

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Q. A system with input x[n] and output y[n] is given as y[n] = (sin 5/6 πn) x(n) The system is

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