Tournament: Difference between revisions
→Pools: Updated total sets formula for round robin pools.
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(→Pools: Updated total sets formula for round robin pools.) |
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**16 pools of 6, top 4 players of each pool advanced to the 64-man bracket. | **16 pools of 6, top 4 players of each pool advanced to the 64-man bracket. | ||
Pools are usually only employed at large tournaments. N number of entrants are split into P number of pools, and the top Y finishers in each pool are either placed into a second round of pools or seeded into a double elimination bracket, which proceeds normally. The number of entrants for the subsequent round or bracket is ''P*Y''. Placing well in a pool gives a player a better position in a bracket or the next round of pools, giving extra incentive to strive for the top pool positions. Tournaments using pools will result in a significantly larger amount of games being played than without them. There is a total of ''B(B-1)/2'' sets per pool, with B players per pool. Thus a round of round-robin pools with N participants total requires a grand total of '' | Pools are usually only employed at large tournaments. N number of entrants are split into P number of pools, and the top Y finishers in each pool are either placed into a second round of pools or seeded into a double elimination bracket, which proceeds normally. The number of entrants for the subsequent round or bracket is ''P*Y''. Placing well in a pool gives a player a better position in a bracket or the next round of pools, giving extra incentive to strive for the top pool positions. Tournaments using pools will result in a significantly larger amount of games being played than without them. There is a total of ''B(B-1)/2'' sets per pool, with B players per pool. Thus a round of round-robin pools with N participants total requires a grand total of ''NB(B-1)/2'' sets. | ||
===Swiss system=== | ===Swiss system=== | ||