Question

23. Eight tennis players (call them A,B,C,D,E,G,F.H) are randomly assigned to start po-
sitions in a ladder tournament. Initially, position 1 plays position 2, position 3 plays
4. 5 plays 6 and 7 plays 8. Second round has 2 matches: winner of (1,2) match plays
winner of (3,4), and winner (5,6) plays winner(7,8). The winners of the two 2nd round
matches play each other in the final match. Player A wins against any of the others
Plaver B always beats any opponent except player A. What is the probability that
player B wins the 2nd place trophy in the final match?



24. In a roomful of 30 people, what is the probability that at least two people have the
same birthday? Assume birthdays are uniformly distributed and there is no leap year
complication.
Google this - it's a classic problem, and several innovative presentations of the proper
calculations are available. Be sure to verify the accuracy of the solution(s) you find!!
2-5​

Answer 1

Answer:I don't uave time to answer such big answer

Step-by-step explanation:

Answer 2

Answer:

such a big questionOMG!!!

I AM SHOCKED