Respuesta :
Answer:
At steady state output will be 2
Explanation:
We have given transfer function [tex]G(S)=\frac{6}{12S+3}[/tex]
Input is unit step so [tex]X(S)=\frac{1}{S}[/tex]
We know that [tex]G(S)=\frac{Y(S)}{X(S)}[/tex], here [tex]Y(S)[/tex], is output
So output [tex]Y(S)=G(S)\times X(S)[/tex]
[tex]Y(S)=\frac{1}{S}\times \frac{6}{12S+3}[/tex]
Taking 12 common from denominator
[tex]Y(S)=\frac{1}{2S(S+\frac{1}{4})}[/tex]
Now using partial fraction
[tex]\frac{1}{2S(S+\frac{1}{4})}=\frac{A}{2S}+\frac{B}{(S+\frac{1}{4})}[/tex]
[tex]\frac{1}{2S(S+\frac{1}{4})}=\frac{A(S+\frac{1}{4}+2BS)}{2S(S+\frac{1}{4})}[/tex]
[tex]AS+\frac{A}{4}+2BS=1[/tex]
On comparing coefficient A=4 and B = -2
Putting the values of A and B in Y(S)
[tex]Y(S)=\frac{4}{2S}-\frac{2}{S+\frac{1}{4}}[/tex]
Now taking inverse la place
[tex]y(t)=2-2e^{\frac{-t}{4}}[/tex]
Steady state means t tends to infinite
So output at steady state = [tex]y(t)=2-2e^{\frac{-\infty}{4}}[/tex]
[tex]y(t)=2-0=2[/tex]
