The velocity `v` of a particle of mass in moving along a straigh line change withh time `t` as `(d^(2)v)/(dt^(2)) = - Kv` where `K` is a particle constant which of the folloewing statement is correct?

The velocity v of a particle of mass is moving along a straight line change with time t as (d^(2)v)/(dt^(2)) = - Kv where K is a particle constant which of the following statement is correct?

The velocity v of a particle of mass m changes with time t as d^2v/(dt)=-kv , where k is constant. Now, which of the following statements is correct?

The acceleration of a particle moving along a straight line at any time t is given by a = 4 - 2v, where v is the speed of particle at any time t The maximum velocity is

The acceleration of a particle moving along a straight line at any time t is given by a = 4 - 2v, where v is the speed of particle at any time t The maximum velocity is

The velocity 'v' of a particle moving along straight line is given in terms of time t as v=3(t^(2)-t) where t is in seconds and v is in m//s . The distance travelled by particle from t=0 to t=2 seconds is :

The velocity 'v' of a particle moving along straight line is given in terms of time t as v=3(t^(2)-t) where t is in seconds and v is in m//s . The distance travelled by particle from t=0 to t=2 seconds is :

Force acting on a particle of mass m moving in straight line varies with the velocity of the particle as F=K//V K is constant then speed of the particle in time t

Force acting on a particle of mass m moving in straight line varies with the velocity of the particle as F=K//V K is constant then speed of the particle in time t