A point moves with uniform acceleration and `v_(1), v_(2), v_(3)` denote the average velocities in the successive intervals of times `v_(1),v_(2),v_(3)` . Then `(v_(1)-v_(2))/(v_(2)-v_(3))= (t_(1)+t_(2))/(t_(2)+t_(3))`

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).

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 car moves with speed v_(1) upto (t)/(3) time and then with speed v_(2) upto next (2t)/(3) time. Path is straight line.What is the average speed of car? " (A) (2v_(1)v_(2))/(v_(1)+v_(2)) (B) (v_(1)+v_(2))/(2) (C) (2v_(1)+v_(2))/(3) (D) (v_(1)+2v_(2))/(3)

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?

The velocity-time graph of a particle in one-dimensional motion is shown in Fig.: (a) Which of the following formulae are correct for describing the motion of the particle over the time-interval t_(1) to t_(2) : (a) x(t_(2)) = x(t_(1)) + v (t_(1)) (t_(2) - t_(1)) + (1//2) a (t_(2) - t_(1))^(2) (b) v(t_(2)) = v(t_(1)) + a (t_(2) - t_(1)) (c) v_("average") = (x (t_(2)) - x(t_(1)))//(t_(2) - t_(1)) (d) a_("average") = (v(t_(2)) - v(t_(1)))//(t_(2) - t_(1)) (e) x(t_(2)) = x(t_(1)) + v_("average") (t_(2) - t_(1)) + (1//2) a_("average") (t_(2) - t_(1))^(2) (f) x(t_(2)) - x(t_(1)) = area under the v - t curve bounded by the t-axis and the dotted line shown.

Two cars of same mass are moving with velocities v_(1) and v_(2) respectively. If they are stopped by supplying same breaking power in time t_(1) and t_(2) respectively then (v_(1))/(v_(2)) is

If v is the velocity and f is the acceleration of a particle, at time t, such that t=(v^(2))/(2) , then : -(df)/(dt)=

A particle move with velocity v_(1) for time t_(1) and v_(2) for time t_(2) along a straight line. The magntidue of its average acceleration is