A point moves with uniform acceleration and `v_(1), v_(2)`, and `v_(3)` denote the average velocities in the three successive intervals of time `t_(1).t_(2)`, and `t_(3)` Which of the following Relations is correct?.

A point moves with a uniform acceleration and v_1 v_2 v_3 denote the average velociies in the three succellive intervals of time _1 , t_2 and t_3 . Find the ration of ( v-1 - v_2) and ( v_2 - v_3).

In an adiabatic process, the state of a gas is changed from P_(1),V_(1),T_(1), "to" P_(2),V_(2),T_(2). Which of the following relation is correct

A particle moves in a straight line with uniform acceleration. Its velocity at time t=0 is v_1 and at time t=t is v_2. The average velocity of the particle in this time interval is (v_1 + v_2)/2 . Is this statement true or false?

For body moving with uniform acceleration a , initial and final velocities in a time interval t are u and v respectively. Then its average velocity in the time interval t is

A body is moving with variable acceleartion (a) along a straight line. The average acceleration of body in time interval t_(1)" to "t_(2) is :-

A particle move with a velocity v=alpha t^(3) along a straight line.The average velocity in time interval t=0 to t=T is

If velocity of a particle is given by v=(2t+3)m//s . Then average velocity in interval 0letle1 s is :

If S, v and t respectively denote displacement, velocity and time, then which of the following graphs represents uniform motion?