Question

Prove the postulate below?

The drivers of a train moving at a speed `v_1` sight another train at a distance `d` ahead of them on the same track, moving with slower speed `v_2`. 1st driver pulles the brake to create a retardation `r`. Show that if `d > (v_1 - v_2)^2/(2r)`, there will be no collision.

Answer 1

Using the equation of motion: `s = v_it + 1/2 a t^2`

Using the position of the first train at `t = 0` as the Origin, the respective displacement of the trains at time `t` is:

`p_1(t) = v_1 t - 1/2 r t^2`

`p_2(t) = d + v_2 t`

`p_1(t) = p_2(t) implies v_1 t - 1/2 r t^2 = d + v_2 t`

This is a quadratic:

`r/2 t^2 + (v_2 - v_1) t + d = 0`

In the quadratic equation, we force the discriminant (ie `b^2 - 4ac`) to be negative to ensure there are no real solutions,

`b^2 < 4ac implies (v_2 - v_1)^2 < 4 r/2 d`

`implies d > (v_2 - v_1)^2/(2r)`