Power applied to a particle varices with time as `P =(3t^(2)-2t + 1)` watt, where t is in second. Find the change in its kinetic energy between time `t=2s` and `t = 4 s` .

Power applied to a particle varies with time as P=(4t^(3)-5t+2) watt, where t is in second. Find the change its K.F. between time t = 2 and t = 4 sec.

If v=(t^(2)-4t+10^(5)) m/s where t is in second. Find acceleration at t=1 sec.

Power supplied to a particle of mass 3 kg varies with time as p = 4t ^(3) watt, where t in time is seconds. If velocity of particle at t =0s is u=2 m//s. The velocity of particle at time t =3s will be :

Power supplied to a particle of mass 3 kg varies with time as p = 4t ^(3) watt, where t in time is seconds. If velocity of particle at t =0s is u=2 m//s. The velocity of particle at time t =3s will be :

Power supplied to a mass 2 kg varies with time as P = (3t^(2))/(2) watt. Here t is in second . If velocity of particle at t = 0 is v = 0 , the velocity of particle at time t = 2s will be:

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 of a particle is given by v=(4t^(2)-4t+3)m//s where t is time in seconds. Find its acceleration at t=1 second.

The position of a particle is expressed as vecr = ( 4t^(2) hati + 2thatj) m, where t is time in second. Find the velocity o the particle at t = 3 s

The position (in meters) of a particle moving on the x-axis is given by: x=2+9t +3t^(2) -t^(3) , where t is time in seconds . The distance travelled by the particle between t= 1s and t= 4s is m.

The speed of a particle moving in a circle of radius r=2m varies with 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 .