Events & Promotions
|
|
GMAT Club Daily Prep
Thank you for using the timer - this advanced tool can estimate your performance and suggest more practice questions. We have subscribed you to Daily Prep Questions via email.
Customized
for You
Track
Your Progress
Practice
Pays
Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.
Apr 2808:00 AM PDT
-11:00 AM PDT
Whether you are just beginning your MBA journey or fine-tuning your path to a 700+ score, GMAT Day is designed to give you a competitive edge.
11 Apr 2005, 05:32
Kudos
Bookmarks
A and B alternately toss a coin. The first one to turn up a head wins. if no more than five tosses each are allowed for a single game.
1- Find the probability that the person who tosses first will win the game?
2- What are the odds against A's losing if she goes first?
1- Find the probability that the person who tosses first will win the game?
2- What are the odds against A's losing if she goes first?
Archived Topic
Hi there,
This topic has been closed and archived due to inactivity or violation of community quality standards. No more replies are possible here.
Where to now? Join ongoing discussions on thousands of quality questions in our Quantitative Questions Forum
Still interested in this question? Check out the "Best Topics" block below for a better discussion on this exact question, as well as several more related questions.
Thank you for understanding, and happy exploring!
11 Apr 2005, 10:12
Kudos
Bookmarks
1. The person who starts the toss wins if either of these sequences occur:
H, T T H, or T T T T H
The probability of these sequences occuring is 1/2, 1/8 and 1/32 respectively.
Therefore, the total probability of the one who starts the tosses to win is 21/32.
2. The A's probability of winning if she starts first = 21/32. The probability of a draw is 1/32 (the sequence T T T T T). Therefore, A's probability of losing is 10/32 = 5/16 is she starts first.
Hope that helps.
H, T T H, or T T T T H
The probability of these sequences occuring is 1/2, 1/8 and 1/32 respectively.
Therefore, the total probability of the one who starts the tosses to win is 21/32.
2. The A's probability of winning if she starts first = 21/32. The probability of a draw is 1/32 (the sequence T T T T T). Therefore, A's probability of losing is 10/32 = 5/16 is she starts first.
Hope that helps.
11 Apr 2005, 10:38
Kudos
Bookmarks
kapslock, take a look at my reasoning.
What do you think? It seems to me that you forgot the second player or limited to 3 tosses each instead of 5 ones.
What do you think? It seems to me that you forgot the second player or limited to 3 tosses each instead of 5 ones.
Attachments
bingo.JPG [ 92.49 KiB | Viewed 1248 times ]
