Suppose we have $5$ points in plane, each lying on a line for which no three of these lines intersect in one point, and also non of these $5$ points is an intersection point of two lines. At time $t=0$, each of the points starts to move on its own line in an arbitrary direction and with an arbitrary but constant positive speed. Each point keeps going unless it meets another point. When so, the two points reverse their directions and go back the path they've come. Prove that after some finite time $T$, one of the points will never meet anymore points.
This problem popped into my mind some weeks ago. I kept thinking about it for a long while, but I couldn't reach anything. All the answers are welcomed!