Respuesta :
Answer:
There are 35 ways.
Step-by-step explanation:
Consider the provided information.
In order to find the number of possible sequences we have few case:
Case I: If team A will win all 4 games without losing any match.
A A A A
There is only 1 way as you can see, Because after winning 4 games in a row no need to play again.
Case II: If team A will win 4 games out of 5 games.
A A A B A, or A A B A A, or A B A A A, or B A A A A,
Remember A A A A B this is not going to include.
That means there are 4 possible ways if team B win one match.
Case III: If team A will win 4 games out of 6 games.
It means team A needs to win 3 games from first 5 games so that after wining 6th match they win the tournament.
So the number of ways are [tex]\frac{5!}{3!2!}=10[/tex]
That means there are 10 possible ways if team B win two match.
Case IV: If team A will win 4 games out of 7 games.
It means team A needs to win 3 games from first 6 games so that after wining 7th match they win the tournament.
So the number of ways are [tex]\frac{6!}{3!3!}=20[/tex]
That means there are 20 possible ways if team B win three match.
Thus, the total number of ways are: 1 + 4 + 10 + 20 = 35
Hence, there are 35 ways.
