A solid sphere of mass m and radius R is rolling without slipping on a rough horizontal surface with angular acceleration alpha. Centre of mass of sphere lies at a distance (R)/(sqrt(2)) from the centre of sphere. Find the normal force applied by sphere on the surface at an instant when line joining centre of mass of sphere and centre of sphere makes an angle 45^(@) with the vertical and angular velocity of sphere at this instant is omega.

A solid sphere of mass m and radius R is rolling without slipping on

1.	A solid sphere of mass m and radius R is rolling without slipping on a rough horizontal surface with angular acceleration alpha. Centre of mass of sphere lies at a distance (R)/(sqrt(2)) from the centre of sphere. Find the normal force applied by sphere on the surface at an instant when line joining centre of mass of sphere and centre of sphere makes an angle 45^(@) with the vertical and angular velocity of sphere at this instant is omega.
Answer» `mg+(mR)/(2)(alpha-omega^(2))` `mg-(mR)/(2)(alpha+omega^(2))` `mg-(mR)/(2)(alpha-omega^(2))` `mg+(mR)/(2)(alpha+omega^(2))` Solution : Net acceleration of c.m in +y direction `(Ralpha)/(2)-(omega^(2)R)/(2)` `N-mg=ma_(cm,y)` `N=mg+(m)/(2)(alpha-omega^(2))R`

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