Answer:
The period is 9.9 seconds
Explanation:
The period (T) of a mass (m) attached to a spring with spring constant k is:
[tex] T=2\pi\sqrt{\frac{m}{k}}[/tex] (1)
So, if the mas is M we have that:
[tex] 7.0s=T_{1}=2\pi\sqrt{\frac{M}{k}}[/tex] (2)
Now if we double the mass:
[tex]T_{2}=2\pi\sqrt{\frac{2M}{k}} [/tex]
[tex]T_{2}=\sqrt{2}(2\pi\sqrt{\frac{M}{k}}) [/tex] (3)
Because spring constant doesn’t change, we note that the term [tex]2\pi\sqrt{\frac{M}{k}} [/tex] on (3) is equal to the right side of (2), so we have:
[tex]T_{2}=\sqrt{2}T_{1}=\sqrt{2}(7.0s) [/tex]
[tex] T_{2}=9.9s[/tex]
