The velocity of a particle are given by `(4t – 2)" ms"^(–1)` along x–axis. Calculate the average acceleration of particle during the time interval from t = 1 to t = 2s.

The velocity of a particle is given by the equation, v = 2t^(2) + 5 cms^(-1) . Find the average acceleration during the time interval between t_(1) = 2s and t_(2) = 4s .

The intantaneous coordinates of a particle are x= (8t-1)m and y=(4t^(2))m . Calculate (i) the average velocity of the particle during time interval from t =2s to t=4s (ii) the instantaneous velocity of the particle at t = 2s .

The velocity of a particle is given by the equation, v = 2t^(2) + 5 cms^(-1) . Find the change in velocity of the particle during the time interval between t_(1) = 2s and t_(2) = 4s .

The position (x) of a particle moving along x - axis veries with time (t) as shown in figure. The average acceleration of particle in time interval t = 0 to t = 8 s is

The position (x) of a particle moving along x - axis veries with time (t) as shown in figure. The average acceleration of particle in time interval t = 0 to t = 8 s is

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 .

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 .

A particle moves rectilinearly possessing a parabolic s-t graph. Find the average velocity of the particle over a time interval from t = 1/2 s to t = 1.5 s.