Answer:
2.06 N/m
Explanation:
The system makes 10.0 complete oscillations in 17.0 s. So, the frequency of the system is
[tex]f=\frac{10.0}{17.0 s}=0.59 Hz[/tex]
The angular frequency of the system is given by
[tex]\omega = 2\pi f=2\pi (0.59 Hz)=3.71 rad/s[/tex]
In a simple harmonic motion, the angular frequency is related to the mass and the spring constant by
[tex]\omega=\sqrt{\frac{k}{m}}[/tex]
where
k is the spring constant
m is the mass
Here we know
[tex]\omega=3.71 rad/s\\m = 150 g = 0.150 kg[/tex]
So we can solve the formula to find k:
[tex]k=\omega^2 m = (3.71 rad/s)^2 (0.150 kg)=2.06 N/m[/tex]
