The motion of a body is given by the equation `(dv)/(dt)=4-2v`, where v is the speed in m/s and t in second. If the body was at rest at t = 0, then find
(i) The magnitude of initial acceleration
(ii) Speed of body as a function of time

The motion of a body is given by the equation dv//dt=6-3v , where v is in m//s. If the body was at rest at t=0 The speed varies with time as

The motion of a body is given by the equation dv//dt=6-3v , where v is in m//s. If the body was at rest at t=0 (i) the terminal speed is 2 m//s (ii) the magnitude of the initial acceleration is 6 m//s^(2) (iii) The speed varies with time as v=2(1-e^(-3t)) m//s (iv) The speed is 1 m//s , when the acceleration is half initial value

The motion of a body is given by the equation dv//dt=6-3v , where v is in m//s. If the body was at rest at t=0 (i) the terminal speed is 2 m//s (ii) the magnitude of the initial acceleration is 6 m//s^(2) (iii) The speed varies with time as v=2(1-e^(-3t)) m//s (iv) The speed is 1 m//s , when the acceleration is half initial value

The motion of a body is given by the equation d nu /dt = 6 - 3 nu where nu is the speed in m s^(-1) and t is time in s. The body is at rest at t = 0. The speed varies with time as

The motion of a body is given by the equation d nu /dt = 6 - 3 nu where nu is the speed in m s^(-1) and t is time in s. The body is at rest at t = 0. The speed varies with time as

The motion of a particle moving along x-axis is represented by the equation (dv)/(dt)=6-3v , where v is in m/s and t is in second. If the particle is at rest at t = 0 , then

The motion of a particle moving along x-axis is represented by the equation (dv)/(dt)=6-3v , where v is in m/s and t is in second. If the particle is at rest at t = 0 , then

The motion of a body is defined by (dv(t))/(dt) = 6-3 v(t) where v (t) is the velocity (in m/s ) of the body at time t (in seconds ). If the body was at rest at t= 0 , find its velocity (in m/s ) when the acceleration is half the initial value.