Answer:
[tex]f=145.29Hz[/tex]
Explanation:
The centripetal force is given by:
[tex]F_c=ma_c(1)[/tex]
Here m is the body's mass in which the force is acting and [tex]a_c[/tex] is the centripetal acceleration:
[tex]a_c=\frac{v^2}{r}(2)[/tex]
Here v is the speed of the body and r its radius. The speed is given by:
[tex]v=2\pi fr(3)[/tex]
Replacing (3) in (2):
[tex]a_c=4\pi^2f^2r(4)[/tex]
Replacing (4) in (1) and solving for f:
[tex]F_c=m4\pi^2 f^2r\\\\f=\sqrt{\frac{F_c}{4m\pi^2r}}\\f=\sqrt{\frac{4*10^{-11}N}{4(3*10^{-16}kg)\pi^2(16*10^{-2}m)}}\\f=145.29Hz[/tex]
