Question: We wish to use the Kaiser Window method to design a real-valued FIR filter with generalized linear phase that meets the following specifications: This specification
We wish to use the Kaiser Window method to design a real-valued FIR filter with generalized linear phase that meets the following specifications:
This specification is to be met by applying the Kaiser Window to the ideal real-valued impulse response associated with the ideal frequency response Hd(ejω) given by,
(a) What is the maximum value of δ that can be used to meet this specification? What is the corresponding value of β? Clearly explain your reasoning.
(b) What is the maximum value of ∆ω that can be used to meet the specification, what is the corresponding value of M? Clearly explain your reasoning.
![0 < [w] < 0.27, 0.37 < |w| < 0.4757. 0.5257 < lwl < . 0.9 < H(ej](https://dsd5zvtm8ll6.cloudfront.net/si.question.images/images/question_images/1550/1/4/2/4515c654bf3859181550142450357.jpg)
0 < [w] < 0.27, 0.37 < |w| < 0.4757. 0.5257 < lwl < . 0.9 < H(ej") < 1.1, -0.06 < H(ej) < 0.06. 1.9 < H(ei") < 2.1, 1. 0 < (w] < 0.257, Ha(el") = { 0, 0.257 < |w| < 0.5n. 0, 0.257 < |w| < 0.57. 2, 0.57 s lw| < 7.
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