new to puzzles here. A real life situation led me to consider this. We have a small league of 6 people playing in teams of two. I would like to rotate the teams in such a way that everyone gets an equal chance to play with every other person and against every other person.
e.g. in the first game, it's A+B vs C+D and E+F sit out.
How do I arrange rotations in such a way that everyone gets an equal number of chances to play with every other player and against every other player?
Each person plays the same number of matches with each of the other 5, so the number of matches each person plays must be a multiple of 5.
If each person plays 5 matches, then there are a total of 30 players across the matches. But this is impossible because 4 players are in each match and 30 isn't divisible by 4. So each player must play at least 10 matches, with a total of 15 matches.
You can make five sets of three games each: for each set, divide the players into three pairs, and have each pair play the other two once. This is one possible way to divide the pairs:
You can check that for every two players, they are together in two games (in the set where they are paired) and against each other in four games (once in each of the other sets).
Well, for four players (A,B,C and D), there are three possible pairings:
A&B v C&D
A&C v B&D
A&D v B&C
Those games exclude E&F.
Then there are $\binom{6}{2}$ = 15 different ways to have two people sitting out.
What you've asked for here is similar to an Individual-Pairs tournament. This link has many schedules for varying number of players if you are interested.
The 6 person schedule is asymmetric, meaning some people play an unfair number of times.
The schedules proposed so far are not strictly "Individual-Pairs" tournaments since they don't meet the critia:
In the solutions posted so far, people parter with each other twice, and play against each other four times. However, these solutions are fair and given that you accepted the answer, this is probably what you are looking for. However, for some numbers of people (4, 5, 8, 9, 12, 13, etc) there exist very nice minimal tournaments which are quite handy.
