It think it would be best to see first what happens in one dimension.
I have an example for the function $y=A\cos(\omega\theta+\phi)$.
- For the graph of $y=A\cos(\omega\theta+\phi)$
- $A$ is the amplitude. The crest of the wave has height $ A$.
- $\omega=2\pi f$ where $f$ is the frequency. One complete wave is generated over an interval of length $T={1/ f}={2\pi\over\omega}$.
- $\phi/\omega$ is the phase shift. The wave "starts'' at $(-\phi/\omega,0)$.

If you like, you may download an interactive version of the above diagram
here. You may use the sliders on the top, left, and bottom, (by clicking and dragging the "circle") to change the parameters
$A$,
$\phi$, and
$\omega$.