Acceleration of a particle is given by
a = 2x
(i) It’s velocity at position x. Given that v = 10 m/s when x = 0.
(ii) Minimum speed that the particle can attain

Acceleration of a particle is given by a =1//V Where V is the velocity . Find (i) Velocity of particle at time t, given that v = 10 m/s at t = 0. (ii) Velocity of particle when its position is x, given that speed is 3 m/s at x = 0.

Acceleration of a particle is given by a= 3t^(2)+2t +1 Where t is time . Find (i) its velocity at time t assuming velocity to be 10 m/s at t = 0. (ii) its position at time t assuming that the particle is at origin at t = 0. (iii) What is the average speed of the particle in the duration t = 0 to t = 1s? (iv) What is the average acceleration of the particle in the duration t = 0 to t = 1s?

The velocity time relation of a particle is given by v = (3t^(2) -2t-1) m//s Calculate the position and acceleration of the particle when velocity of the particle is zero . Given the initial position of the particle is 5m .

Velocity of a particle is given as v = (2t^(2) - 3)m//s . The acceleration of particle at t = 3s will be :

The acceleration of a particle is given by a (t)=(3.00 m//s^(2)-(2.00 m/s^(3)) )t. (a) Find the initial speed v_(0) such that the particle will have the same x -coordinate at t =5.00 as it had at t=0. (b)What will be the velocity at t =5.00s?

If velocity of a particle is given by v=(2t+3)m//s . Then average velocity in interval 0letle1 s is :

Acceleration of a particle is increasing linearly with time. Its acceleration is 10 m//s^(2) at t =0 and 20 m//s^(2) at t = 5s. "Also" , its speed is 5m/s at t =0 and its positions is x= -100m at t =0 .Find at time t its acceleration ,velocity and positions.

A particle is moving along the x-axis whose acceleration is given by a= 3x-4 , where x is the location of the particle. At t = 0, the particle is at rest at x = 4//3m . The distance travelled by the particles in 5 s is

The figure shows the force (F) versus displacement (s) graph for a particle of mass m=2kg initially at rest. (i) The maximum speed of the particle occurs at x = …..m (ii) The maximum speed of the particle is …. ms^(-1) (iii) The particle once again has its speed zero at x =....m

A particle constrained to move along x-axis given a velocity u along the positive x-axis. The acceleration ' a ' of the particle varies as a = - bx, where b is a positive constant and x is the x co-ordinate of the position of the particle . Then select the correct alternative(s): .