The corresponding equation is
d^2y(t)/dt^2+k.dy(t)/dt+y(t)=x(t)
where
- x(t) is the input of your system
- y(t) is its output
you have just to replace k by sin(t) using a clock and a sine wave block. and use derivative and integrator block instead of transfer function block to realize your model
or you can do this
from your transfer function
Y(p)(P^2+Kp+1)=X(p)
P^2 Y(p) + K p Y(p)+ 1=X(p)
Y(p)+K Y(p)/p+Y(p)/p^2=X(p)/p^2
this can be represented by
