$A, B, C, D, ………., X, Y, Z$ are the players who participated in a tournament. Everyone played with every other player exactly once. $A$ win scores $2$ points, a draw scores $1$ point and a lose scores $0$ points. None of the matches ended in a draw. No two players scored the same score. At the end of the tournament, the ranking list is published which is in accordance with the alphabetical order. Then.
- $M$ wins over $N$
- $N$ wins over $M$
- $M$ does not play with $N$
- None of these