In a round robin tennis tournament involving 7 players, each player will play every other player twice. How many total matches will be played in the tournament?

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asked Jan 20, 2015 89.4k views

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Nick Maxwell · Answer 1 · 2015-01-23T17:03:35+0000

Total number of ways to make a pair:

The first player can be any one of 7 . For each of those . . .
The opponent can be any one of the remaining 6 .

Total ways to make a pair = 7 x 6 = 42 ways .

BUT ... every pair can be made in two ways ... A vs B or B vs A .
So 42 'ways' make only (42/2) = 21 different pairs.

If every pair plays 2 matches, then (21 x 2) = 42 total matches will be played.

Now, is that an elegant solution or what !

In a round robin tennis tournament involving 7 players, each player will play every other player twice. How many total matches will be played in the tournament?

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