A body of mass `m` accelerates uniformly from rest to velocity `v_(0)` in time `t_(0)`, find the instantaneous power delivered to body when velocity is `(v_(0))/(2)`.

A body of mass m accelerates uniformly from rest to velocity v_(0) in time t_(0) . What is the instantaneous power delivered to the body when its velocity is (v_(0))/(2) ?

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 accelerates uniformly from rest to v_1 in time v_2 . As a function of time t, the instantaneous power delivered to the body is

A body of mass m , accelerates uniform from rest to v_(1) in time t_(1) . The instanencoes power delivered to the body as a finction of 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

A body of mass 1 kg is acclerated uniformly from rest to a speed of 5 m/s in 4 sec. What is the instantaneous power delivered to the body at time t? (Assume t lt 4 sec.)

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