If `S=t^3+6t^2-36t+100` . Determine acceleration and displacement at the time when velocity vanishes

Displacement s of a particle at time t is expressed as s=1/2t^3-6t . Find the acceleration at the time when the velocity vanishes (i.e., velocity tends to zero).

Displacement x and time t, in a rectiIinear motion of a partical are reIated as t = sqrt(x)+3 . Here x is measured in metre and t in second. Find the displacement of the partical when its velocity is zero.

The displacement x of a particle moving in one dimension under the action of a constant force is related to time t by the equation t = sqrt(x+3) where x is in meters and t is in seconds. Finds the displacement (in metres ) of the particle when its velocity is zero.

A particle moving in a stright line covers a distance of x cm in t seconds, where x = t^(3) + 6t^(2) - 15t + 18. Find the velocity and acceleration of the paricle at the end of 2 seconds. When does the particle stop ?

A train attains a velocity v after starting from rest with a uniform acceleration alpha . Then the train travels for sometime withuniform velocity, and at last comes to rest with a uniform retardation beta . If the overall displacement is s in time t , show that t = (s)/(v)+(v)/(2)((1)/alpha+(1)/(beta))

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

If the acceleration of a particle at time t seconds be 1.2t^(2)ft//s^(2) and velocity of the particle at time 2 seconds be 2.2 ft/s, then find its velocity at time 5 seconds.

Starting from rest a body moves at first with constant acceleration a. Then it moves with a uniform velocity and finally comes to rest with a constant retardation a. If the displacement is s and time taken is t, prove that the body was in motion with uniform velocity for a time interval of sqrt(t^(2)-4s//a).