If a man has a velocity varying with time given as `v=3t^(2),v` is in `m//s` and `t` in `sec` then `:`

Find out his acceleration after 3 seconds `:`

If a man has a velocity varying with time given as v=3t^(2),v is in m//s and t in sec then : Find out his displacement after 2 seconds of his start :

If a man has a velocity varying with time given as v=3t^(2),v is in m//s and t in sec then : Find out the velocity of the man after 3 sec .

The velocity v of a body moving along a straight line varies with time t as v=2t^(2)e^(-t) , where v is in m/s and t is in second. The acceleration of body is zero at t =

A particle is rotates in a circular path of radius 54m with varying speed v=4t^(2) . Here v is in m//s and t inn second . Find angle between velocity and accelearation at t=3s .

If velocity v varies with time t as v=2t^(2) , then the plot between v and t^(2) will be given as :

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.

The velocity-time relation of an object starting from rest is given by v=3t . When "v" is in "m/s" and "t" in seconds. The distance traversed in "3" seconds is:

A particle in moving in a straight line such that its velocity is given by v=12t-3t^(2) , where v is in m//s and t is in seconds. If at =0, the particle is at the origin, find the velocity at t=3 s .

The speed of a particle moving in a circle of radius r=2m varies witht time t as v=t^(2) , where t is in second and v in m//s . Find the radial, tangential and net acceleration at t=2s .

A particle moves alo g a straight line and its velocity depends on time as v=6t-3t^(2) where 'v' is in m/sec and 't' is in sec. find average velocity and average speed forr first four seconds.