If velocity of particle is given by `v=2t^4`, then its acceleration `((dv)/(dt))` at any time t will be given by..

If velocity of a particle is given by v=2t^(2)-2 then find the acceleration of particle at t = 2 s.

If velcotiy of a particle is given by v=2t-1 then find the acceleration of particle at t = 2s.

If v=(t+2)(t+3) then acceleration (i.e(dv)/(dt)) at t=1 sec.

The velocity of a particle is given by v=12+3(t+7t^2) . What is the acceleration of the particle?

Velocity of a particle is given as v = (2t^(2) - 3)m//s . The acceleration of particle at t = 3s will be :

If velocity of a particle is given by v=3t^(2)-6t +4 . Find its displacement from t=0 to 3 secs .

The velocity of a particle is given by v=(2t^(2)-3t+10)ms^(-1) . Find the instantaneous acceleration at t = 5 s.

(a) If the initial velocity of a particle is u and collinear acceleration at any time t is at, calculate the velocity of the particle after time t . (b) A particle moves along a straight line such that its displacement at any time t is given by s = (t^(3) - 6 t^(2) + 3t + 4)m . What is the velocity of the particle when its acceleration is zero?

The velocity of a particle is given by v=(2t^(2)-4t+3)m//s where t is time in seconds. Find its acceleration at t=2 second.