代做Fundamentals of Digital Signal Processing Coursework Assignment 2代写Matlab编程
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Coursework Assignment 2
1. Consider an impulse response h[n] such that h[n] = 0 for n < 0 and n > M , and h[n] = -h[M - n] for 0 ≤ n ≤ M where M is an odd integer.
a) Express the Fourier transform. of h[n] in the form.
H(ejω ) = ejf (ω)A(ω) ,
where f (ω) and A(ω) are real-valued functions of ω . Determine f (ω) and A(ω).
b) Provide an example of such an impulse response h[n] for M = 7 and find the corresponding f (ω) and A(ω).
2. Read Section 7.2.2 from the textbook and pay particular attention to Example 7.7. We wish to design a generalized linear phase filter satisfying the specifications
0.95 < jH(ejω )j < 1.05, jH(ejω )j < 0.15,
0 ≤ jωj ≤ 0.5π 0.6π ≤ jωj ≤ π (1)
by applying a Kaiser window to the impulse response hd [n] of the ideal low-pass filter with cut- off frequency ωc = 0.55π . Find the value β and the window length M required to satisfy the specifications. Plot the corresponding Kaiser window and the impulse response of the designed low-pass filter. Plot the magnitude response
20 log10 jH(ejω )j
of the designed filter in the range ω ∈ (0, π) with resolution 2π/1024 or higher.
3. Suppose that we are given a continuous-time low-pass filter with frequency response Hc (jΩ) such that
1 - δ1 ≤ jHc (jω)j ≤ 1 + δ1 , jHc (jΩ)j ≤ δ2 ,
0 ≤ jΩj ≤ Ωp jΩj ≥ Ωs . (2)
A set of discrete-time low-pass filters can be obtained from Hc (s) by using the bilinear transfor- mation,i.e.
H(z) = Hc (s)js=(2/Td)(1-z-1)/(1+z-1) ,
with Td variable.
a) Assuming that Ωp is fixed, find Td such that the corresponding pass-band cut-off frequency of the discrete-time system is ωp = π/2.
b) With Ωp fixed, sketch ωp , the cut-off frequency of the discrete-time filter, as a function of Td , for 0 < Td < ∞ .
c) With Ωp and Ωs fixed sketch the width of the transition region, △ω = ωs - ωp as a function of Td , for Td in the range 0 < Td < ∞ .
4. Suppose that H1 (z), H2 (z) and H(z) are transformed versions of Hc1(s), Hc2(s) and Hc (s), respectively, obtained using impulse invariance or the bilinear transformation. Which of the two methods will guarantee that H(z) = H1 (z) + H2 (z) whenever Hc (s) = Hc1(s) + Hc2(s).
5. Suppose that we are given an ideal low-pass discrete-time filter with frequency response
H(e jω) = ( 1 0 , , π/ |ω| 4 < π/ < |ω 4 | ≤ π .We wish to derive new filters from this prototype by manipulating its impulse response h[n].
a) Plot the frequency response for the filter whose impulse response is h1 [n] = h[2n].
b) Plot the frequency response of the filter whose impulse response is
h2[h] = ( h 0, [n/2], n otherwise = 0, ±2, ±4, . . . .c) Plot the frequency response of the filter whose impulse response is
h3 [n] = ejπnh[n] = (-1)nh[n] .
There is no need to plot these frequency responses in matlab, a sketch would be sufficient.