Because the quadratic equation has at most 2 solutions.

If the chords have the same length, then by power of a point they must be broken up into the same lengths. But for any point P not the center there are only two points of a specified distance k from that point on the circle, and these are the intersection of the original circle and the circle with radius k and center P.

If O is the center of the circle, and it is not P, then the 3 equal chords are at the same distance, d from it, i.e. all of them are tangent to the circle (O,d), impossible. Best regards, sunken rock