Answer:
The force on second wheel is twice off the force on first wheel.
Explanation:
In this case, two wheels can rotate freely about fixed axles through their centers. We know that, in rotational mechanics, the torque is given by :
[tex]\tau=I\alpha[/tex]
Also, [tex]\tau=Fr[/tex]
And moment of inertia is, [tex]I=mr^2[/tex]
It implies,
[tex]Fr=mr^2\alpha \\\\F=mr\alpha[/tex]
Here, one has twice the radius of the other. Ratio of forces will be :
[tex]\dfrac{F_1}{F_2}=\dfrac{mr_1\alpha }{mr_2\alpha }\\\\\dfrac{F_1}{F_2}=\dfrac{r_1 }{2r_1}\\\\\dfrac{F_1}{F_2}=\dfrac{1 }{2}\\\\F_2=2F_1[/tex]
So, the force on second wheel is twice off the force on first wheel.
