InterviewSolution
Saved Bookmarks
InterviewSolution
| 1. |
In Nth order differential equation, the characteristics of bilinear transformation, let z=re^jw,s=o+jΩ Then for s = \(\frac{2}{T}(\frac{1-z^{-1}}{1+z^{-1}})\), the values of Ω, ℴ are(a) ℴ = \(\frac{2}{T}(\frac{r^2-1}{1+r^2+2rcosω})\), Ω = \(\frac{2}{T}(\frac{2rsinω}{1+r^2+2rcosω})\)(b) Ω = \(\frac{2}{T}(\frac{r^2-1}{1+r^2+2rcosω})\), ℴ = \(\frac{2}{T}(\frac{2rsinω}{1+r^2+2rcosω})\)(c) Ω=0, ℴ=0(d) NoneI had been asked this question during an internship interview.This interesting question is from IIR Filter Design by the Bilinear Transformation topic in portion Discrete Time Systems Implementation of Digital Signal Processing |
|
Answer» CORRECT CHOICE is (a) ℴ = \(\FRAC{2}{T}(\frac{r^2-1}{1+r^2+2rcosω})\), Ω = \(\frac{2}{T}(\frac{2rsinω}{1+r^2+2rcosω})\) The explanation is: s = \(\frac{2}{T}(\frac{z-1}{z+1}) \) = \(\frac{2}{T}(\frac{re^jw-1}{re^jw+1})\) = \(\frac{2}{T}(\frac{r^2-1}{1+r^2+2rcosω}+J \frac{2rsinω}{1+r^2+2rcosω})(s = ℴ+jΩ)\) |
|