A particle moving along x axis has acceleration f at time t given by `f=f_0(1-1/t)` where `f_0` and T are constant the particle at T=0 has zero velocity in the time interval between t=0 and the instant when f=0 the particle velocity `v_x` is

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 constant. 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

A particle moves along x-axis with acceleration a = a0 (1 – t// T) where a_(0) and T are constants if velocity at t = 0 is zero then find the average velocity from t = 0 to the time 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 given by v=v_(0) sin omegat , where v_(0) is constant and omega=2pi//T . Find the average velocity in time interval t=0 to t=T//2.