Question 1:
The Fourier transform of a signal is given by X(ω) = 1 + ej2ω - 3e-j2ω. Determine the signal in the time domain.
Question 2:
Determine the difference equation for the system whose frequency response is
H(w) = (1 + e-jω)/1 - 0.75e-jω
Question 3:
Calculate the convolution x1[n]*x2[n] where x1[n] = {1, 0, 0, -1} (x1 [0] = 1) and x2[n] = {1, 2, 0, 2, 1} (x2[0] = 0)
Question 4:
An LTI system is given by:
y[n] = x[n] - 2x [n - 1] + x[n - 2]
(a) Determine its impulse response.
(b) Determine the frequency response.
(c) What is the output if the input is
x[n] = cos(Π.n/2) + cos(Πn)
Question 5:
The impulse response of an LTI system is given by
h[n] = δ[n] - 2 cosω0δ[n - 1] + δ[n - 2]
(a) Determine the frequency response of the system for ωo = Π/4.
(b) Determine the output for the input signal
x[n] = cos(Πn/4) + cos(Πn)