Answer to Question #117544 in Complex Analysis for Chandana

Laplace transform of  y"-4y'+9y=t , is given as

L( y"-4y'+9y=t)=L(y'')-L(4y')+L(9y)=L(t)

L(y'')="s^2F(s)-sf(0)-f'(0)"

It is given in the question that, y(0)=0 and y'(0)=1.

L(y)="Y(s)"

Hence, L(y'') = "s^2Y(s)-s.0-1=s^2Y(s)-1."

Similarly, L(y')="sY(s)-y(0)=sY(s)"

L(t)="\\frac{1}{s^2}"

Putting the above values in the differential equations,

we get,

"s^2Y(s)-1-4sY(s)+9Y(s)=\\frac{1}{s^2}"

or, "Y(s) (s^2-4s+9)=\\frac{1}{s^2}+1"

or, "Y(s)=\\frac{1+s^2}{s^2(s^2-4s+9)}" (Answer)