There are 7 table-tennis players. Each player will have one match against each of the other 6 players. How many different matches are there to be arranged?
|
Player 1 |
Player 2 |
Player 3 |
Player 4 |
Player 1 |
x |
✓ |
✓ |
✓ |
Player 2 |
x |
x |
✓ |
✓ |
Player 3 |
x |
x |
x |
✓ |
Player 4 |
x |
x |
x |
x |
Each table-tennis player only plays with each of the other table-tennis players once.
Number of matches based on number of table-tennis players:
2 players:
1 =
2 x 123 players:
1 + 2 = 3 =
3 x 224 players:
1 + 2 + 3 = 6 =
4 x 32Formula:
Number of matches =
Number of players x (Number of players - 1)2Number of matches arranged for 7 table-tennis players
=
7 x 62= 21
Answer(s): 21