A particle located at x = 0 at time t = 0, starts moving along the positive x - direction with a velocity `'upsilon'` that varies as `upsilon=alpha sqrt(x)`. The displacement of the particle varies with time as

A particle located at x = 0 at time t = 0 , starts moving along with the positive x-direction with a velocity 'v' that varies as v = a sqrt(x) . The displacement of the particle varies with time as

A particle located at x = 0 at time t = 0 , starts moving along with the positive x-direction with a velocity 'v' that varies as v = a sqrt(x) . The displacement of the particle varies with time as

A particle located at x = 0 at time t = 0, starts moving along the positive x-direction with a velocity that varies as v=psqrtx . The displacement of the particle varies with time as (where, p is constant)

If the displacement of a particle varies with time as sqrt x = t+ 3

A particle located at position x=0, at time t=0, starts moving along the positive x-direction with a velocity v^2=alpha x (where alpha is a positive constant). The displacement of particle is proportional to

a partical located at origin at time t=o , starts moving along poitive y direction wth a velocity v that varies as v=2rootY so displacemnet of the partical varies with time as

A particle starts from the origin at time t = 0 and moves along the positive x-axis. The graph of velocity with respect to time is shown in figure. What is the position of the particle at time t = 5s ?

Velocity of a particle varies with time as v=4t. Calculate the displacement of particle between t=2 to t=4 sec.

The power supplied by a force acting on a particle moving in a straight line is constant. The velocity of the particle varies with the displacement x as :

A particle moving in the positive x-direction has initial velocity v_(0) . The particle undergoes retardation kv^(2) , where vis its instantaneous velocity. The velocity of the particle as a function of time is given by: