The mass attached to the spring must be 0.72 kg
Explanation:
The frequency of vibration of a spring-mass system is given by:
[tex]f=\frac{1}{2\pi} \sqrt{\frac{k}{m}}[/tex] (1)
where
k is the spring constant
m is the mass attached to the spring
We can find the spring constant by using Hookes' law:
[tex]F=kx[/tex]
where
F is the force applied on the spring
x is the stretching of the spring
When a mass of m = 2.82 kg is applied to the spring, the force applied is the weight of the mass, so we have
[tex]mg=kx[/tex]
and using [tex]g=9.8 m/s^2[/tex] and [tex]x=0.0177 m[/tex], we find
[tex]k=\frac{mg}{x}=\frac{(2.82)(9.8)}{0.0177}=1561.3 N/m[/tex]
Now we want the frequency of vibration to be
f = 7.42 Hz
So we can rearrange eq.(1) to find the mass m that we need to attach to the spring:
[tex]m=\frac{k}{(2\pi f)^2}=\frac{1561.3}{(2\pi (7.42))^2}=0.72 kg[/tex]
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