what if we take 2^-infinite=0.finite=0:finite then second become stable

@@IbyiwacuiRwandatv we have to take atleast one value of n, for which it gets unbounded.

1) y[n]=ln(x[n]) 2) y[n]=log(x[n]) 3) y(t)=e^at.x(t) 4) y(t)=1/x(t) can you determine each of them stable or not .also give reason please and thank you

I think for BI we get bounded output...

Check the formula of even

how last one is stable

1) y[n]=ln(x[n]) 2) y[n]=log(x[n]) 3) y(t)=e^at.x(t) 4) y(t)=1/x(t) can you determine each of them stable or not .also give reason please and thank you

@@toppoint360 For natural logarithm (logarithm with base e i.e, lnx ) and for the common logarithm (logarithm with base 10 i.e, logx ) As x approaches to zero the values of lnx and logx approaches to -infinity, so in the first two questions when the input is made zero i.e, bounded, the output is becoming unbounded, so the first two systems are unstable. In the third system, depending on 'a' value in the coefficient, for a>0, even with bounded input if you make t tend to infinity, the coefficient tend to infinity there by making output tending to infinity, making the system unstable. for a

@@toppoint360 all unstable