A particle which is moving along x-axis has acceleration at any time t like `a(t)=(12t^2-30t)m//s^2`.At t=0, velocity of particle is 7 m/s and at t=1 sec, particle is at x=6m. Choose the CORRECT function for position at any time t.

Starting from rest, the acceleration of a particle is a=2(t-1) . The velocity of the particle at t=5s is :-

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

Let bar(v)(t) be the velocity of a particle at time t. Then :

A particle is moving along x-axis with acceleration a=a_(0)(1-t//T) where a_(0) and T are constants. The particle at t=0 has zero velocity. Calculate the distance(position ) of particle.

A particle moving along x-axis has acceleration f , at time t , given by f = f_0 (1 - (t)/(T)) , where f_0 and T are constant. The particle at t = 0 has zero velocity. In the time interval between t = 0 and the instant when f = 0 , the particle's velocity (v_x) is :

A particle starts motion from rest and moves along a straight line. Its acceleration-time graph is shown. Find out speed of particle at t=2s and at t=3s.

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.

A particle moves along X-axis in such a way that its coordinate X varies with time t according to the equation x = (2-5t +6t^(2))m . The initial velocity of the particle is

If the velocity of a paraticle moving along x-axis is given as v=(4t^(2)+3t=1)m//s then acceleration of the particle at t=1sec is :

Position of particle moving along x-axis is given as x=2+5t+7t^(2) then calculate :