A point moves along an arc of a circle of radius `R`. Its velocity depends on the distance `s` covered as `v=lambdasqrt(s)`, where `lambda` is a constant. Find the angle `theta` between the acceleration and velocity as a function of `s`.

A point moves along an arc of a circle of radius R. Its velocity depends on the distance covered s as v=sqrts , where a is a constant. Find the angle alpha between the vector of the total acceleration and the vector of velocity as a function of s.

A point moves along an arc of a circle of radius R. Its velocity depends on the distance covered s as v=asqrts , where a is a constant. Find the angle alpha between the vector of the total acceleration and the vector of velocity as a function of s.

A point moves along an arc of a circle of radius R. its velocity depends upon the distance covered as V=a sqrtS where a = constant. The angle theta between the vector of total acceleration and tangential acceleration

A point object moves along an arc of a circle of radius 'R'. Its velocity depends upon the distance covered 'S' as V = Ksqrt(S) where 'K' is a constant. If ' theta' is the angle between the total acceleration and tangential acceleration, then

A point object moves along an arc of a circle of radius 'R'. Its velocity depends upon the distance covered 'S' as V = Ksqrt(S) where 'K' is a constant. If ' theta' is the angle between the total acceleration and tangential acceleration, then