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 particle travels along the arc of a circle of radius r . Its speed depends on the distance travelled l as v=asqrtl where 'a' is a constant. The angle alpha between the vectors of net acceleration and the velocity of the particle is

The kinetic energy of a particle moving along a circle of radius R depends on the distance covered s as K.E = KS2 where K is a constant. Find the force acting on the particle as a function of S -

The kinetic energy of a particle moving along a circle of radius R depends on the distance covered S as K =alpha.S^(2), where alpha is a constant. Find the force acting on the particle as a function of S.

The kinetic energy K of a particle moving along a circle of radius R depends upon the distance S as K=betaS^2 , where beta is a constant. Tangential acceleration of the particle is proportional to

(a) A ball, suspended by a thread, swings in a vertical plane so that its acceleration in the extreme and the lowest positions are equal. The angle θ of thread deflection in the extreme position will be ( b) The kinetic energy of a particle moving in a circle of radius R depens on the distance covered as T = as^(2) , where 'a' is a constant. Find the force acting on the particle as a function of s.

The kinetic energy K of a particle moving along a circle of radius R depends upon the distance s as K=as^2 . The force acting on the particle is

A vehicle of mass m starts moving along a horizontal circle of radius R such that its speed varies with distance s covered by the vehicle as c=Ksqrts , where K is a constant. Calculate: a. Tangential and normal force on vehicle as fucntion of s. b. Distance s in terms of time t. c. Work done by the resultant force in first t seconds after the beginning of motion.

Write an expression for the distance S covered in time t by a body which is initially at rest and starts moving with a constant acceleration a.

The acceleration of an object moving in a circle of radius R with uniform speed v is

A point moves along a circle having a radius 20cm with a constant tangential acceleration 5 cm//s^(2) . How much time is needed after motion begins for the normal acceleration of the point to be equal to tangential acceleration?