Three children, John, Paul, and Ringo, are playing a game. Each child will choose either the number 1 or the number 2. When one child chooses a number different from those of the other two children, he is declared the winner. If all of the children choose the same number, the process repeats until one child is declared the winner. If Ringo always chooses 2 and the other children select numbers randomly, what is the probability that Ringo is declared the winner?
A. 1/6
B. 1/4
C. 1/3
D. 1/2
E. 2/3
Answer: C
Source: Princeton Review
Three children, John, Paul, and Ringo, are playing a game.
This topic has expert replies
-
- Legendary Member
- Posts: 1223
- Joined: Sat Feb 15, 2020 2:23 pm
- Followed by:1 members
Timer
00:00
Your Answer
A
B
C
D
E
Global Stats
GMAT/MBA Expert
- Brent@GMATPrepNow
- GMAT Instructor
- Posts: 16207
- Joined: Mon Dec 08, 2008 6:26 pm
- Location: Vancouver, BC
- Thanked: 5254 times
- Followed by:1268 members
- GMAT Score:770
This is one of my all-time favorite questions!!BTGModeratorVI wrote: ↑Sat Jun 27, 2020 6:37 amThree children, John, Paul, and Ringo, are playing a game. Each child will choose either the number 1 or the number 2. When one child chooses a number different from those of the other two children, he is declared the winner. If all of the children choose the same number, the process repeats until one child is declared the winner. If Ringo always chooses 2 and the other children select numbers randomly, what is the probability that Ringo is declared the winner?
A. 1/6
B. 1/4
C. 1/3
D. 1/2
E. 2/3
Answer: C
Source: Princeton Review
The main concept here is that all 3 children are equally likely to win this game (unless one of them possesses supernatural powers that allow him to know what numbers the other two boys will choose )
Also note that, if everything is random, the probability of winning by choosing the number 2 is the same as the probability of winning by choosing the number 1.
So, regardless of what number Ringo chooses, his probability of winning is exactly the same as each of the other boys winning.
Since all 3 boys have the same probability of winning, P(Ringo wins) = 1/3
Likewise, P(John wins) = 1/3 and P(Paul wins) = 1/3
Answer: C
Cheers,
Brent
GMAT/MBA Expert
- Scott@TargetTestPrep
- GMAT Instructor
- Posts: 7294
- Joined: Sat Apr 25, 2015 10:56 am
- Location: Los Angeles, CA
- Thanked: 43 times
- Followed by:29 members
Solution:BTGModeratorVI wrote: ↑Sat Jun 27, 2020 6:37 amThree children, John, Paul, and Ringo, are playing a game. Each child will choose either the number 1 or the number 2. When one child chooses a number different from those of the other two children, he is declared the winner. If all of the children choose the same number, the process repeats until one child is declared the winner. If Ringo always chooses 2 and the other children select numbers randomly, what is the probability that Ringo is declared the winner?
A. 1/6
B. 1/4
C. 1/3
D. 1/2
E. 2/3
Answer: C
Since Ringo always chooses the number 2, there are only 4 possible outcomes for any round of the game. We list Ringo’s choice first, followed by John’s and then Paul’s:
(2, 1, 1) Ringo wins
(2, 1, 2) Ringo loses (John wins)
(2, 2, 1) Ringo loses (Paul wins)
(2, 2, 2) No one wins, so another round is played. When this happens, the same 4 outcomes occur for the next round and for subsequent rounds.
We see that in any given round, each boy has a 1/3 chance of winning. It doesn’t matter if Ringo always chooses 2 or just randomly chooses a number, his probability of winning is 1/3.
Answer: C
Scott Woodbury-Stewart
Founder and CEO
[email protected]
See why Target Test Prep is rated 5 out of 5 stars on BEAT the GMAT. Read our reviews