Determine the output of the Hilbert transformer designed in Exercise 5.23 to the input signal \(\mathrm{x}\) determined as Fs \(=1500 ; \mathrm{TS}=1 / \mathrm{Fs} ; \mathrm{t}=0: \mathrm{TS}: 1-\mathrm{TS} ;\)

\(\mathrm{fc} 1=200 ; \mathrm{fc} 2=300 ;\)

\(\mathrm{x}=\cos \left(2^{*} \mathrm{pi}{ }^{*} \mathrm{fc} 1 .{ }^{*}\right)+\sin \left(2 * \mathrm{pi}{ }^{* \mathrm{fc} 2} 2{ }^{* \mathrm{t}}\right) ;\)

Exercise 5.23

Design a Hilbert transformer of order \(M=98\) using a Type IV structure and the Chebyshev method, and compare your results with those from Exercise 5.22.

Exercise 5.22.

Design a Hilbert transformer of order \(M=98\) using a Type IV structure and the triangular, Hann, and Blackman window methods.