For a driven damped oscillation, if the driven force $F=F_{ 0 }cos(\omega t )$, then the solution to the motion is $$x=Acos(\omega t+\varphi )$$. 

- Why the oscillation and the driven force must have the same frequency but can be out of phase? 

The solution to $\varphi$ is $tan(\varphi )=\frac { \omega \gamma  }{ { { \omega  }_{ 0 } }^{ 2 }-{ \omega  }^{ 2 } }$.

- Why would $\varphi$ goes to zero(F and x in phase) if $\omega$ goes to zero?