The velocity of particle moving in the positive direction of x axis varies as `v=alphasqrt(x)`, where `alpha` is a positive constnat. Assuming that at moment `t=0`, the particle was located at the point x=0. find.
(a) the time dependence of the velocity and the acceleration of the particle.
(b) the mean velocity of the particle averaged over the time that the particle takes to cover first s meters of the path

The velocity of a particle moving in the positive direction of the x axis varies as v=alphasqrtx , where alpha is a positive constant. Assuming that at the moment t=0 the particle was located at the point x=0 , find: (a) the time dependence of the velocity and the acceleration of the particle, (b) the mean velocity of the particle averaged over the time that the particle takes to cover the first s metres of the path.

The velocity of a particle moving in the positive direction of x -axis varies as v = alpha sqrt(x) where alpha is positive constant. Assuming that at the moment t = 0 , the particle was located at x = 0 , find (i) the time dependance of the velocity and the acceleration of the particle and (ii) the mean velocity of the particle averaged over the time that the particle takes to cover first s meters of the path.

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.

The velocity of a particle moving in the positive direction of x-axis veries as v=10sqrtx . Assuming that at t=0 , particle was at x=0

The velocity of a particle moving in the positive direction of X-axis varies as v=5sqrt(x) . Assuming that at t = 0, particle was at x = 0. What is the acceleration of the particle ?

A particle having a velocity v = v_0 at t= 0 is decelerated at the rate |a| = alpha sqrtv , where alpha is a positive constant.

A particle moves in a circular path such that its speed v varies with distance as V= alphasqrt(s) where alpha is a positive constant. Find the acceleration of the particle after traversing a distance s.

A particle moves in a circular path such that its speed v varies with distance as v=alphasqrts where alpha is a positive constant. Find the acceleration of particle after traversing a distance S?

A particle executing SHM with time period T and amplitude A. The mean velocity of the particle averaged over quarter oscillation, is

The velocity time relation of a particle is given by v = (3t^(2) -2t-1) m//s Calculate the position and acceleration of the particle when velocity of the particle is zero . Given the initial position of the particle is 5m .