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 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 moving in the positive direction of X-axis varies as v=5sqrt(x) . Assuming that at t = 0, particle was at x = 0. What is the acceleration of the particle ?

The velocity of a particle moving on the x- axis is gienv by v=x^(2)+x( for xgt0) where v is in m//s and x is in m . Find its acceleration in m//s^(2) when passing through the point x=2m

The position of a particle is given by x=2(t-t^(2)) where t is expressed in seconds and x is in metre. The acceleration of the particle is

The velocity of a particle moving in the positive direction of x-axis veries as v=10sqrtx . Assuming that at t=0 , particle was at x=0

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 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 :

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 of unit mass is moving along x-axis. The velocity of particle varies with position x as v(x). =alphax^-beta (where alpha and beta are positive constants and x>0 ). The acceleration of the particle as a function of x is given as

A particle moves in circle of radius 1.0 cm at a speed given by v=2.0 t where v is in cm/s and t in seconeds. A. find the radia accelerationof the particle at t=1 s. b. Findthe tangential acceleration at t=1s. c.Find the magnitude of the aceleration at t=1s.