The distance x cm traversed by a particle along a straight line in t seconds is given by `x = 2t^3 - 15t^2+36t+6`
At what time will the velocity of the particle is minimum?

The displacement of particle along a straight line at time t is given by x = 2alpha + betat + gammat^2 . Find its acceleration.

The distance covered by a particle in time t is given by x = a + bt+ct^2+dt^3 , find the dimensions of a,b,c and d.

Derive - x = v_0t + 1/2at^2

The displacement equation of a particle moving along a straight line with uniform acceleration is x = v_0t + 1/2at^2 . Find the distance covered by the particle in the last second of its motion.

The position of a particle is given by barr = 3.0thati + 2.0t^2hatj + 5.0hatk . Find the velocity of particle at t=2sec

The displacement ( in meter ) of a particle moving along x-axis is given by x = 18t+ 5t^2 . Calculate instantaneous velocity at t = 2s

The displacement ( in meter ) of a particle moving along x-axis is given by x = 18t+ 5t^2 . Calculate instantaneous acceleration.

The displacement of a particle ( in meter ) moving along x axis is given by x = 18 + 5t^2 . Calculate the instantaneous velocity at t = 2S and instantaneous acceleration.

A particle describes a distance x m in t sec, given by x = 4+5t+63t^3 . Find the velocity of the particle at the end of 2 secs and the acceleration at the end of 3 secs

The displacement ( in meter ) of a particle moving along x-axis is given by x =18t+ 5t^2 . Calculate average velocity between t = 2s and t = 3s .