- Thread starter
- #1

- Thread starter dwsmith
- Start date

- Thread starter
- #1

- Feb 13, 2012

- 1,704

The stability condition requires that the Transfer Function has all poles with negative real part... one of poles is in s=1 so that...Can some show me how we show a LTI system is BIBO? I read the definition but it didn't help.

For example, how would we show if

\[

H(s) = \frac{s - 2}{(s + 2)(s + 1)(s - 1)}

\]

is BIBO stable or unstable?

Kind regards

$\chi$ $\sigma$