The displacement of a particle is zero at t= 0 and x at t=t.It starts moving in the positive x-direction with a velocity which varies as `V = K sqrt x` , where k is constant. the relation between V and t is

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

The velocity of a particle moving in the positive direction of the X-axis varies as V = KsqrtS where K is a positive constant. Draw V-t graph.

If the displacement of a particle varies with time as x = 5t^2+ 7t . Then find its velocity.

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

The displacement of the particle at x = 0 of a stretched string carrying a wave in the positive x-direction is given by f(t)=Asin(t/T) . The wave speed is v. Write the wave equation.

The displacement of A particle at x = 0 of a stretched string carrying a wave in the positive X-direction is given by f(t)=Ae^(-t^2) . The wave speed is V. Write equation of the wave.

V = k((P)/(T))^(0.33) where k is constant. It is an,