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

A particle moves along the x-axis in such a way that its coordinates x varies with time 't' according to the equation x=2-5t+6t^(2) . What is the initial velocity of the particle?

A particle moves along the x-axis from x=0 to x=5m under the influence of a force given by F=7-2x+3x^(2) . Find the work done in the process.

The force acting on a particle moving along X-axis is F=-k(x-v_0t) where k is a positive constant. An observer moving at a constant velocity v_0 along the X-axis looks the particle . What kind of motion does he find for the particle?

A particles moves along x - axis from x = 0 to x = 7m under the influence of a force given by f(x)=12-2x+3x^(2) then the workdone is,

A particle moves along a line according to the law s(t)=2t^(3)-9t^(2)+12t-4 , where tge0 . Find the particle's acceleration each time the velocity is zero.

A particle moves along a line according to the law s(t)=2t^(3)-9t^(2)+12t-4 , where tge0 . At what times the particle changes direction?

A particle moves along a line according to the law s(t)=2t^(3)-9t^(2)+12t-4 , where tge0 . Find the total distance travelled by the particle in the first 4 seconds.

A particle moves along a straight line in suc a way that after t second its distance from the origin is s = 2t^(2) + 3t metres. Find the instantaneous velocities at t =3 and t =6 seconds.

The displacement of a particle along the x-axis is given by x = asin^2 omegat . The motion of the particle corresponds to