A particle moving along x-axis has acceleration f, at time t, given by `f = f_(0) (1-(t)/(T))`, where `f_(0)` and T are constants. The particle at `t = 0` has zero velocity. In the time interval between `t = 0` and the instant when `f = 0`, the particle's velocity `(v_(x))` is

A particle is moving along x-axis with acceleration a=a_(0)(1-t//T) where a_(0) and T are constants. The particle at t=0 has zero velocity. Calculate the average velocity between t=0 and the instant when a=0

The instantaneous velocity of a particle moving in a straight line is given as a function of time by: v=v_0 (1-((t)/(t_0))^(n)) where t_0 is a constant and n is a positive integer . The average velocity of the particle between t=0 and t=t_0 is (3v_0)/(4 ) .Then , the value of n is

The velocity of a particle is zero at t=0

The position of particle at time t is given by, x(t) = (v_(0)//prop) (1-e^(-ut)) where v_(0) is a constant prop gt 0 . The dimension of v_(0) and prop are,

A particle is moving along x-axis such that its velocity varies with time according to v=(3m//s^(2))t-(2m//s^(3))t^(2) . Find the velocity at t = 1 s and average velocity of the particle for the interval t = 0 to t = 5 s.

A particle moving on a curve has the position at time t given by x=f'(t) sin t + f''(t) cos t, y= f'(t) cos t - f''(t) sin t where f is a thrice differentiable function. Then prove that the velocity of the particle at time t is f'(t) +f'''(t) .

A particle moves with initial velocity v_(0) and retardation alphav , where v is velocity at any instant t. Then the particle

A particle is moving along the axis under the influnence of a force given by F = -5x + 15 . At time t = 0 , the particle is located at x = 6 and having zero velocity it take 0.5 second to reach the origin for the first time. The equation of motion of the particle can be respected by

A starts from rest, with uniform acceleration a. The acceleration of the body as function of time t is given by the equation a = pt, where p is a constant, then the displacement of the particle in the time interval t = 0 to t=t_(1) will be

The position of a particle at time t is given by the relation x(t) = ( v_(0) /( alpha)) ( 1 - c^(-at)) , where v_(0) is a constant and alpha gt 0 . Find the dimensions of v_(0) and alpha .