A particle covers distance S in time t is given by `S=t^(3)-6t^(2)+6t+8`. When the acceleration is 0, the velocity is …………

A particle moves along a staight line such that its displacement at any time t is given by s=t^3-6t^2+3t+4m . Find the velocity when the acceleration is 0.

if position vector is vecr=t^3−6t^2+3t+4m find the time when acceleration is zero.

A particle moves in the xy plane and at time t is at the point (t^(2), t^(3)-2t) . Then find displacement , velocity and acceleration.

If s=2t^(3)+3t^(2)+2t+8 then find time at which acceleration is zero.

Relation between displacement x and time t is x=2-5t+6t^(2) , the initial acceleration will be :-

The position of a particle moving along a straight line is given by x =2 - 5t + t ^(3). Find the acceleration of the particle at t =2 s. (x is metere).

A particle move a distance x in time t according to equation x = (t + 5)^-1 . The acceleration of particle is proportional to.

The x and y coordinates of a particle at any time t are given by x=7t+4t^2 and y=5t , where x and t is seconds. The acceleration of particle at t=5 s is

if position vector is vecr =4t^4−6t^3+3t^2+4tm find the acceleration at t=2 sec.