The discrete timefourier transform for the given signal x[n] - u[n] is
The discrete time Fourier coefficients x[k] of the signal x [n ] =
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The zero state respone y(k) for input f(k) = (0.8)k u(k) is
Consider a signal x(n) with following factors:
1. x(n) is real and even signal
2. The period of x(n) is N = 10
3. x(11) = 5
The signal x(n) is
Consider a discrete time signal x(n) = {-1, 2, -3, 2, -1} value of ∠x(eiω) is equal to
A low pass filter with impulse response h1(n) has spectrum H1 (eiω) shown below.
Here only one period has been shown by reversing every second sign of h1(n) a new filter having impulse response h2(t) is created. The spectrum of H2(eiω) is given by
A red signal x[n] with Fourier transform x(eiΩ) has following property:
1. x[n] = 0 for, n > 0
2. x [ 0] > 0
The signal x[n] is
A causal and stable LTI system has the property that,
The frequency response H(eiΩ) for this system is
A 5-point sequence x[n] is given as 4 [- 3] = 1, x[ - 2] = 1, x[ -1 ] = 0 . x[0] = 5 , x[1] - 1
Let x(eiω) denote the discrete time fourier transform of x[n].
The value of
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25 docs|263 tests
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