Answer:
When we double the angular velocity the maximum acceleration [tex](a_{max})[/tex] will changes by a factor of 4.
Explanation:
Given the angular frequency [tex](\omega)[/tex] of the simple harmonic oscillator is doubled.
We need to find the change in the maximum acceleration of the oscillator.
[tex]a_{max}=A\omega^2[/tex]
Now, according to the problem, the angular frequency [tex](\omega)[/tex] got doubled.
Let us plug [tex]\omega=2\times \omega[/tex]. Then the maximum acceleration will be [tex]a_{max'}[/tex]
[tex]a_{max}=A\omega^2[/tex]
[tex]a_{max'}=A(2\times \omega)^2\\a_{max'}=A\times 4\omega\\a_{max'}=4A\omega[/tex]
[tex]a_{max'}=4a_{max}[/tex]
We can see, when we double the angular velocity the maximum acceleration will changes by a factor of 4.
