Forty team play a tournament. Each team plays every other team just once. Each game results in a win for one team. If each team has a 50% chance of winning each game, the probability that he end of the tournament, every team has won a different number of games is `1//780` b. `40 !//2^(780)` c. `40 !//2^(780)` d. none of these

Forty team play a tournament. Each team plays every other team just once. Each game results in a win for one team. If each team has a 50% chance of winning each game, the probability that he end of the tournament, every team has won a different number of games is (A) 1/780 (B) (40!)/2^(783) (C) (40!)/2^(780) (D) none of these

Twenty teams take part in a football tournament. Each team has to play every other team. How many games would be played in the tournament?

In a tournament,team X, plays with each of the 6 other teams once.For each match the probabilities of a win,drawn and loss are equal.Find the probability that the team X, finishes with more wins than losses.

Thirty six games were played in a football tournament with each team playing once against each other. How many teams were there?

In a T-20 tournament, there are five teams. Each teams plays one match against every other team. Each team has 50% chance of winning any game it plays. No match ends in a tie. Statement-1: The Probability that there is an undefeated team in the tournament is (5)/(16) . Statment-2: The probability that there is a winless team is the tournament is (3)/(16) .

Twelve teams are participating in a cricket tournament. If every team play exactly one match with every other team, then the total number of matches played in the tournament is _____

A and B play a game where each is asked to select a number from 1 to 25. If the two numbers match, both of them win a prize. The probability that they will not win a prize in a single trial is

Twenty-eight games were played in a football tournament with each team playing once against each other.How many teams were there?