Answer:[tex]a=\frac{g\sin \theta }{2}[/tex]
Explanation:
Given
inclination is [tex]\theta [/tex]
let M be the mass and r be the radius of uniform circular ring
Moment of Inertia of ring [tex]I=mr^2[/tex]
Friction will Provide the Torque to ring
[tex]f_r\times r=I\times \alpha [/tex]
[tex]f_r\times r=mr^2\times \alpha [/tex]
in pure Rolling [tex]a=\alpha r[/tex]
[tex]\alpha =\frac{a}{r}[/tex]
[tex]f_r=ma[/tex]
Form FBD [tex]mg\sin \theta -f_r=ma[/tex]
[tex]mg\sin \theta =ma+ma[/tex]
[tex]2ma=mg\sin \theta [/tex]
[tex]a=\frac{g\sin \theta }{2}[/tex]
