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Hi I came across this question from my friend.

Give me a generalised formula to find how many tennis matches (singles) are required for n players ?

Example : if the number of players are 16 then

first : we need 8 mataches (for 16 players) , here 8 players will be eliminated and 8 players will be there

secode : we need 4 matches (for 8 players) , here again 4 players will be eliminated and 4 will be remaining

third : we need 2 matches (for 4 players) , here again 2 players will be eliminated and 2 will be remaining

Final : we need 1 macth to decide a winner among the 2 players

so totally 15 matches are required.

I need a generalised formula to find , such that if I give the value n I should get the number of matches required to find the winner

n may be odd or even

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closed as off-topic by Bjørn-Roger Kringsjå, Antti Haapala, Deduplicator, David Eisenstat, Paul Hankin Mar 19 at 1:44

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1  
So what have you got so far? We won't solve the problem for you. –  mdm Mar 30 '11 at 8:26
    
This reeks of homework... –  Aron Rotteveel Mar 30 '11 at 8:29
    
What you had tried? Post your algorithm –  Hukam Mar 30 '11 at 8:32
    
What does this have to do with programming? –  NPE Mar 30 '11 at 9:10
5  
I'm voting to close this question as off-topic because it's about mathematics and logic, not programming. –  duskwuff Mar 13 at 4:50

3 Answers 3

For elimination game, the number of matches is always n-1, because one player will be eliminated after one game and n-1 players have to be eliminated in total.

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As eventually every player but 1 (the champion) has to lost his match (and every player can lost only in 1 match) then the number of matches required is n-1

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if the number of players are 22 how would you solve –  Hukam Mar 30 '11 at 8:33
    
@Chand, if player eliminated after the 1st loss then number of matches is n-1 always - regardless of how the tournament is held. How to organize such tournament with arbitrary number of players is another problem which is not part of the original one it seems. –  Vladimir Mar 30 '11 at 8:36
    
but the obvious option is to let some players pass through 1st round without playing and so make number of players in 2nd round 2^k –  Vladimir Mar 30 '11 at 8:42

n-1, because there is one player to leave after each game. and the champion remains

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