Problem #PRU-78680

Problems Geometry Plane geometry Circles Central angle. Arc length and circumference Methods Mathematical induction Mathematical induction in geometry Pigeonhole principle Pigeonhole principle (finite number of poits, lines etc.)

Problem

On a circle of radius 1, the point \(O\) is marked and from this point, to the right, a notch is marked using a compass of radius \(l\). From the obtained notch \(O_1\), a new notch is marked, in the same direction with the same radius and this is process is repeated 1968 times. After this, the circle is cut at all 1968 notches, and we get 1968 arcs. How many different lengths of arcs can this result in?