An onject intially att rest moves along x-axis subjected to an acceleration which veries with time according to relation `a=2t+5`. Its velocity after 2 seconds will be :-

The acceleration of a particle which starts from rest varies with time according to relation a=2t+3. The velocity of the particle at time t would be

The acceleration of a'particle starting from rest, varies with time according to the relation a=kt+c . The velocity of the particle after time t will be :

A point initially at rest moves along x-axis. Its acceleration varies with time as a = (6t + 5) m//s^(2) . If it starts from origin, the distance covered in 2 s is:

An object moves along x-axis such that its position varies with time according to the relation x=50t-5t^(2) Here, x is in meters and time is in seconds. Find the displacement and distance travelled for the time interval t = 0 to t = 6 s.

The position x of a particle varies with time t according to the relation x=t^3+3t^2+2t . Find the velocity and acceleration as functions of time.

A particle moves along X-axis in such a way that its coordinate X varies with time t according to the equation x = (2-5t +6t^(2))m . The initial velocity of the particle is

A particle moves along x-axis in such a way that its r-coordinate varies with time't according to the equation x= (8-4t + 6t^(2) ) metre. The velocity of the particle will vary with time according to the graph

A body moves along x-axis such that its displacement varies with time as given, x=7 + 3t + 5t^2 . The average velocity during 3rd second is

A particle moves along x axis in such a way that its coordinate x varies with time t according to the equation x = A_0 - A_1 t + A_2 t^2 . The initial velocity of the particle is.