Answer:
[tex]\alpha= \frac{2rF}{3mR}[/tex]
Explanation:
The torque reqired to rotate the above masses rod system
[tex]\tau = rF= I\alpha[/tex]...............(1)
Total moment of inertia of masses and rod is
[tex]I=2m\left ( \frac{R}{2} \right )^2+mR^{2}[/tex]
=[tex]\frac{3}{2} mR^{2}[/tex]
now Substitute I=[tex]\frac{3}{2} mR^{2}[/tex] in the (1) we get
[tex]rF= \frac{3}{2}mR^{2}\alpha[/tex]
rearranging for alpha we get
[tex]\alpha= \frac{2rF}{3mR}[/tex]
hence the acceleration is
[tex]\alpha= \frac{2rF}{3mR}[/tex]
