Numbers in sports

This page contains numbers appearing in sports.

List of numbers in sports
In the association football, there are 32 teams playing eight four-team double s followed by a 16-team two-legged with a single-legged final, resulting in 125 matches.

In the Icelandic association football, there are 12 teams playing a double , resulting in 132 matches.

In each regular season of the Mexican association football, there are 18 teams playing a single , resulting in 153 matches.

In the association football, there are 15 teams playing an eight-team double and a seven-team double round-robin tournament with single-legged  matches, resulting in 154 matches in the regular season.

In some former seasons of the association football, there were 32 teams playing eight four-team double s followed by four four-team double round-robin tournaments and an eight-team two-legged with a single-legged final, resulting in 157 matches.

In the association football, there are 15 teams playing an eight-team double and a seven-team double round-robin tournament with single-legged  matches followed by a six-team , resulting in 164 matches.

In the association football, there are 14 teams playing a double , resulting in 182 matches.

In the association football, there are 12 teams playing a double followed by two six-team double round-robin tournaments, resulting in 192 matches.

In the Finnish association football, there are 12 teams playing a triple , resulting in 198 matches.

In the association football, there are 48 teams playing 12 four-team double s followed by a 32-team two-legged with a single-legged final, resulting in 205 matches.

In the last seasons before the rebranding of the association football, there were 80 teams playing an 80-team two-legged first round followed by eight five-team single s and a 32-team two-legged with a single-legged final, resulting in 221 matches.

In the association football, there are 12 teams playing a triple followed by two six-team single round-robin tournaments, resulting in 228 matches.

In the association football, there are 14 teams playing a double followed by a six-team double round-robin tournament and two four-team double round-robin tournaments, resulting in 236 matches.

In the association football, there are 14 teams playing a double followed by two six-team double round-robin tournaments, resulting in 242 matches.

In the association football, there are 12 teams playing two double s followed by a two-legged championship final, resulting in 266 matches.

In the, there are 32 teams playing a 16-game season followed by a 12-team and the , resulting in 268 matches.

It is also the number of matches in the Romanian association football, which has a 14-team double followed by a six-team double round-robin tournament and an eight-team double round-robin tournament.

In the Polish association football, there are 16 teams playing a double followed by two eight-team single round-robin tournaments, resulting in 296 matches.

Sources: and.

In the association football, there are 16 teams playing two single s interrupted by two eight-team single round-robin tournaments and a single-legged final, resulting in 297 matches.

In the, races go over 305 s.

In the association football, there are 16 teams playing a double followed by three six-team double round-robin tournaments (some involving teams from the ), resulting in 330 matches.

In the Mexican association football, there are 18 teams playing two single s, each followed by an eight-team two-legged , resulting in 334 matches.

In the United States, there are 22 teams playing a 34-game season, resulting in 374 matches in the regular season.

In the association football, there are 28 teams playing a single , resulting in 378 matches.

In the English association football, there are 20 teams playing a double , resulting in 380 matches.

In the United States, there are 22 teams playing a 34-game season followed by a by a 12-team with two-legged quarterfinals and semifinals, resulting in 391 matches.

In the Colombian association football, there are 20 teams playing two single s with two-legged rivalries, each followed by an eight-team two-legged , resulting in 428 matches.

In the English association football, there are 24 teams playing a double , resulting in 552 matches.

Some association football competitions, such as the, have four-team double s in the group stage. With, there are exactly 748 possible points columns in the final standings of a group.

There are 8!/4! = 14!!!! = 1,680 possible ways to draw the quarter-finals of a.

For the of the, the eight group winners have to be drawn against a runner-up of another group. The number of possible outcomes is !8 = 14,833. In reality, the actual number is almost always smaller, since teams of the same association cannot be drawn against each other.

The goes over 42,195 s.

For the of the, the eight seeded teams have to be drawn against the eight unseeded teams. The number of possible outcomes is 8! × 28 = 16!! = 10,321,920. In reality, the actual number is almost always smaller, since teams of the same association cannot be drawn against each other.

There are 16!/8! = 30!!!! = 518,918,400 possible ways to draw the round of 16 of a.

For the of the, the eight group winners had to be drawn against a third-placed team of another group, and the eight runner-ups had to be drawn against one of the eight third-placed teams from the. The number of possible outcomes was !8 × 8! = 598,066,560. In reality, the actual number would be almost always smaller (and was always smaller), since teams of the same association could not be drawn against each other.

For the of the, the twelve group winners and the four best third-placed teams from the  have to be drawn against a runner-up of another group or one of the four other third-placed teams from the UEFA Champions League. The number of possible outcomes is !12 + 4 × !13 + 6 × !14 + 4 × !15 + !16 = 9,823,096,307,544. In reality, the actual number is almost always smaller, since teams of the same association cannot be drawn against each other.

For the of the, the sixteen seeded teams have to be drawn against the sixteen unseeded teams. The number of possible outcomes is 16! = 20,922,789,888,000. In reality, the actual number is almost always smaller, since teams of the same association cannot be drawn against each other.

There are 32!/16! = 62!!!! = 32P16 = 12,576,278,705,767,096,320,000 possible ways to draw the round of 32 of a (e.g 16 out of 32 rounds).

Class 1
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