A body of mass m accelerates uniformly from rest to `v_1` in time `t_1`. As a function of time t, the instantaneous power delivered to the body is

A body of mass m , accelerates uniformly from rest to V_(1) in time t_(1) . The instantaneous power delivered to the body as a function of time t is.

A body of mass m is acceleratad uniformaly from rest to a speed v in a time T . The instanseous power delivered to the body as a function of time is given by

Work done in time t on a body of mass m which is accelerated from rest to a speed v in time t_(1) as a function of time t is given by

A body starts from rest and acquires velocity V in time T . The instantaneous power delivered to the body in time 't' proportional to

An 8 kg block accelerates uniformly from rest to a velocity of 4 m s^(-1) in 40 second. The instantaneous power at the end of 8 second is P xx 10^(-2) watt. Find the value of P.

A body of mass m has its position x at a time t, expressed by the equation : x=3t^(3//2)+2t-(1)/(2) . The instantaneous force F on the body is proportional to

A body starts from rest with a uniform acceleration of 2 m s^(-1) . Find the distance covered by the body in 2 s.

An automobile of mass m accelerates from rest. If the engine supplies a constant power P, the velocity at time t is given by -

The position (x) of body moving along x-axis at time (t) is given by x=3f^(2) where x is in matre and t is in second. If mass of body is 2 kg, then find the instantaneous power delivered to body by force acting on it at t=4 s.

A body of mass 0.5 kg initially at rest is accelerating , due to a time dependent force [vecF= t hat i + sqrt(t) hat j] N then instantaneous power developed due to this force at t = 3 s will be