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(B) Let $u_1, u_2, u_3$ and $u_4$ be the velocities at times $t = 0, t_1, (t_1 + t_2)$ and $(t_1 + t_2 + t_3)$ respectively,and let $a$ be the uniform

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$(v_1 - v_2) : (v_2 - v_3) = (t_1 + t_2) : (t_2 + t_3)$

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(B) Let $u_1, u_2, u_3$ and $u_4$ be the velocities at times $t = 0, t_1, (t_1 + t_2)$ and $(t_1 + t_2 + t_3)$ respectively,and let $a$ be the uniform acceleration.The average velocities are given by:$v_1 = \frac{u_1 + u_2}{2}, v_2 = \frac{u_2 + u_3}{2}, v_3 = \frac{u_3 + u_4}{2}$Using the equation of motion $v = u + at$,we have:$u_2 = u_1 + at_1$$u_3 = u_1 + a(t_1 + t_2)$$u_4 = u_1 + a(t_1 + t_2 + t_3)$Now,calculate the differences:$v_1 - v_2 = \frac{u_1 + u_2 - u_2 - u_3}{2} = \frac{u_1 - u_3}{2} = \frac{u_1 - (u_1 + a(t_1 + t_2))}{2} = -\frac{a(t_1 + t_2)}{2}$$v_2 - v_3 = \frac{u_2 + u_3 - u_3 - u_4}{2} = \frac{u_2 - u_4}{2} = \frac{(u_1 + at_1) - (u_1 + a(t_1 + t_2 + t_3))}{2} = -\frac{a(t_2 + t_3)}{2}$Taking the ratio:$\frac{v_1 - v_2}{v_2 - v_3} = \frac{-a(t_1 + t_2) / 2}{-a(t_2 + t_3) / 2} = \frac{t_1 + t_2}{t_2 + t_3}$Thus,$(v_1 - v_2) : (v_2 - v_3) = (t_1 + t_2) : (t_2 + t_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?

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