A particle moves in xy plane such that `v_(x)=50-16 t` and `y=100-4t^(2)` where `v_(x)` is in m/s and y is in m. It is also known that `x=0` when `t=0`. Determine (i) Acceleration of particle (ii) Velocity of particle when `y=0`.

A particle is moving in X-Y plane that x=2t and y=5sin(2t). Then maximum speed of particle is:

A particle in moving in a straight line such that its velocity is given by v=12t-3t^(2) , where v is in m//s and t is in seconds. If at =0, the particle is at the origin, find the velocity at t=3 s .

If a particle moves in a circle of radius 4m at speed given by v = 2t where v is in m/s and t in sec at t = 4sec, acceleration of particle will be

The velocity of a particle moving on the x-axis is given by v=x^(2)+x , where x is in m and v in m/s. What is its position (in m) when its acceleration is 30m//s^(2) .

The velocity of a particle defined by the relation v = 8 -0.02x, where v is expressed in m/s and x in meter. Knowing that x = 0 at t = 0, the acceleration at t=0 is

The acceleration of a particle moving in straight line is defined by the relation a= -4x(-1+(1)/(4)x^(2)) , where a is acceleration in m//s^(2) and x is position in meter. If velocity v = 17 m//s when x = 0 , then the velocity of the particle when x = 4 meter is :

The position of a particle moving on the x-axis is given by x=t^(3)+4t^(2)-2t+5 where x is in meter and t is in seconds (i) the velocity of the particle at t=4 s is 78 m//s (ii) the acceleration of the particle at t=4 s is 32 m//s^(2) (iii) the average velocity during the interval t=0 to t=4 s is 30 m//s (iv) the average acceleration during the interval t=0 to t=4 s is 20 m//s^(2)