The distance-time formula for the motion of a particle along a straight line is `s=t^(3)-9t^(2)+24t-18`. Find when and where the velocity is zero.

A particle moves along a line by s = t^(3) - 9t^(2) + 24t . Then S is decreasing when t in

At time t, the distance s of a particle moving in a straight line is given by s= 4t^2+ 2t. Find the average velocity between t= 2sec and t= 8 sec.

The displacement s of a particle travelling in a straight line in t seconds is given by s=45t+11t^(2)-t^(3) . Find the time when the particle comes to rest.

The distance form a fixed point O of a particle pmoving in a straight line from O is given by s=16+48t-t^3 . The direction of motion of the particle after t=4 sec is

The motion of a particle along a straight line is described by the function s=6+4t^(2)-t^(4) in SI units.Find the velocity ,acceleration ,at t=2s,and the average velocity during 3rd second.