The velocity of a particle moving along positive X-axis varies as `v=alphasqrtx` where `alpha` is a constant.if particle is at x=0 at t=0 , what will be the average velocity of particle during the time it moves a distance S ?

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 (v) of a particle of mass m moving along x-axis is given by v=alphasqrt(x) , where alpha is a constant. Find work done by force acting on particle during its motion from x=0 to x=2m :-

A particle moves along the X-axis as x=u(t-2s)+a(t-2s)^2 .

If the velocity of a paraticle moving along x-axis is given as v=(4t^(2)+3t=1)m//s then acceleration of the particle at t=1sec is :

The velocity of a particle moving in the positive direction of the x axis varies as v=5sqrtx , assuming that at the moment t=0 the particle was located at the point x=0 , find acceleration of the particle.

If the velocity of a particle moving along x-axis is given as v=(3t^(2)-2t) and t=0, x=0 then calculate position of the particle at t=2sec.

The velocity (v) of a particle of mass m moving along x-axis is given by v=alphax , where alpha is a constant. Find work done by force acting on particle during its motion from x=0 to x=2m :-

Position of particle moving along x-axis is given as x=2+5t+7t^(2) then calculate :

A particle moves along x-axis with acceleration a = a0 (1 – t// T) where a_(0) and T are constants if velocity at t = 0 is zero then find the average velocity from t = 0 to the time when a = 0.

The velocity- time graph of the particle moving along a straight line is shown. The rate of acceleration and deceleration is constant and it is equal to 5 ms^(-2) . If the average velocity during the motion is 20 ms^(-1) , then the value of t is