A particle of mass m moves in a circle of radius R in such a way that its speed `(v)` varies with distance (s) as `v = a sqrt(s)` where a is a constant. Calcualte the acceleration and force on the particle.

A particle moves in a circular path such that its speed 1v varies with distance s as v = sqrt(s) , where prop is a positive constant. Find the acceleration of the particle after traversing a distance s .

A particle moves in a circular path such that its speed 1v varies with distance s as v = sqrt(s) , where prop is a positive constant. Find the acceleration of the particle after traversing a distance s .

A particle moves in a circular path such that its speed v varies with distance s as v=alphasqrt(s) where alpha is a positive constant. If the acceleration of the particle after traversing a distance s is [alpha^2sqrt(x+s^2/R^2)] find x.

A particle moves in a circular path such that its speed v varies with distance s as v=alphasqrt(s) where alpha is a positive constant. If the acceleration of the particle after traversing a distance s is [alpha^2sqrt(x+s^2/R^2)] find x.

A particle moves in a circular path such that its speed v varies with distance as V= alphasqrt(s) where alpha is a positive constant. Find the acceleration of the particle after traversing a distance s.

A particle moves in a circular path such that its speed v varies with distance as V= alphasqrt(s) where alpha is a positive constant. Find the acceleration of the particle after traversing a distance s.