The displacement of a particle starts from rest is proportional to the square of time, then the particle travels with

The distance travelled by a particle is proportional to the squares of time, then the particle travels with

(A):The displacement of a particle starting from rest is directly proportional to the cube of the time of travel then the particle is moving with non uniform acceleration. (R ):Acceleration veca=(d^(2)vecs)/(dt^(2))

The displacement of a particle is proportional to the cube of time. Then magnitude of its acceleration

If the displacement of an object is proportional to square of time, then the object moves with

In a straight line motion the distance travelled is proportional to the square root of the time taken The acceleration of the particle is proportional to :-

The acceleratin of a particle increases linearly with time t as 6t. If the initial velocity of the particles is zero and the particle starts from the origin, then the distance traveled by the particle in time t will be

The displacement of a particle starting from rest (at t = 0) is given by s = 6t^(2) - t^(3) . The time in seconds at which the particle will attain zero velocity again, is

A particle retards from a velocity v_(0) while moving in a straight line. If the magnitude of deceleration is directly proportional to the square loop of the speed of the particle, find its average velocity for the total time of its motion.

A particle starts from rest. Its acceleration is varying with time as shown in the figure. When the particle comes to rest, its distance from its starting point is

The acceleration of a'particle starting from rest, varies with time according to the relation a=kt+c . The velocity of the particle after time t will be :