Answer:
The ratio is 4
Explanation:
The moment of inertia of a solid sphere about a central axis is:
[tex]I=\frac{2mr^{2}}{5} [/tex]
With m the mass and r the radius of the sphere.
For the smaller sphere with mass M and radius R the moment of inertia is:
[tex]I_{small} =\frac{2MR^{2}}{5} [/tex] (1)
For the bigger sphere with mass M and radius 2R the moment of inertia is:
[tex] I_{big}=\frac{2M(2R)^{2}}{5}[/tex]
[tex] I_{big}=\frac{2^{2}*2M(R)^{2}}{5}[/tex] (2)
The ratio between larger of the larger sphere's moment of inertia about a central axis to that of the smaller sphere is the ratio between (2) and (1):
[tex]\frac{I_{big}}{I_{small}}=\frac{\frac{4*2M(R)^{2}}{5}}{\frac{2M(R)^{2}}{5}} [/tex]
The term [tex] \frac{2M(R)^{2}}{5} [/tex] cancels, so:
[tex] \frac{I_{big}}{I_{small}}=4[/tex]
