top button
Flag Notify
    Connect to us
      Site Registration

Site Registration

What are the probabilities of winning for each player?

+2 votes
975 views

Robin and Williams are playing a game. An unbiased coin is tossed repeatedly. Robin wins as soon as the sequence of tosses HHT appears. Williams wins as soon as the sequence of tosses HTH appears. The game ends when one of them wins. What are the probabilities of winning for each player?

posted Dec 17, 2014 by Shashi Kant

Share this puzzle
Facebook Share Button Twitter Share Button LinkedIn Share Button

2 Answers

+2 votes

Ans. (Robin) HHT - 2/3 (Williams) HTH - 1/3

Let the probability of Robin winning be p. The probability of Williams winning is (1-p). If the first toss is tails, it is as good as the game has not started, hence the probability of Robin winning is p after the first tail.

p = 1/2*p + ….

Let the first toss be heads. If the second toss is heads, then Robin definitely wins. Since HH has occurred, and at some point, tails will occur, so HHT will occur. Hence Robin wins with probability 1 for HH.

p = 1/2*p + 1/2 (1/2*1 + ….)

Let the second toss be tails. If the third toss is heads, Robin loses as HTH occurs. If the third toss is tails (HTT) - since two tails have occurred in a row, now it is as good as the game has started from the beginning, so the chances of Robin winning are back to p.

p = 1/2*p + 1/2 (1/2*1 + 1/2*(1/2*0 + 1/2*p))

solving this equation gives us p=2/3

answer Dec 19, 2014 by Shashi Kant
0 votes

Ans: 0.5 (50%)

Probability that HHT will appear = 1/8
Probability that HTH will appear = 1/8
Probability that both will not appear = 6/8

Robin can win the game in first trial or in second trial or in third........
So probability =
1/8 + (6/8 ×1/8) +(6/8×6/8×1/8)+ (6/8×6/8×6/8×1/8)......
= sum of this infinite GP whose common ratio is 6/8 and first term is 1/8.
Sum= first term/(1- common ratio)
= (1/8)/(1 - 6/8 )
=1/2
= 0.5

Same for Williams...

answer Dec 17, 2014 by Swapnil Morankar
Why we should toss again say we tossed three times and got some H/T combination and none wins. Now we should toss only once more and last two (some H/T combination) plus this toss will decide the result.

Sorry for my understanding of the question and your answer, though not checked the working....
How second toss will decide the result.
Take this case... In first toss TTT , second toss HHH , again third time TTT.....

Sorry but I didn't understood what were you said exactly.
Both of us has not understood each other :)

One time only one toss either T or H so first result would be after third toss after their after every toss can generate the result along with previous two toss.
Ohh! You are right sir.
Means he can win in first three tosses or in first four tosses or in first five tosses and so on.....
So I think probability will be-
(1/2×1/2×1/2)+(1/2×1/2×1/2×1/2)+(1/2×1/2×1/2×1/2×1/2).......
Sum= (1/8)/(1- 1/2)
        =1/4
         = 0.25
I think 0.25 be the answer.
Am I right sir?
I dont know the answer, it been 20 years I left probability :)
Probably answer again so Shashi Kant get the intimation and hope he know the answer.



Similar Puzzles
0 votes

In a game of 6 players lasting for 40 minutes, there are 4 reserves.
They substitute each player, so that all players, including reserves, are on the pitch for the same length of time, how long is each player on the pitch?

+1 vote

A game is being played where eight players can last for seventy minutes. Six substitutes alternate with each player in this game. Thus, all players are on the pitch for the same amount of time including the substitutes.

For how long is each player on the pitch?

0 votes

Atul and Bhola are prisoners. The jailer have them play a game. He places one coin on each cell of an 8x8 chessboard. Some are tails up and others are heads up. Bhola cannot yet see the board. The jailer shows the board to Atul and selects a cell. He will allow Atul to flip exactly one coin on the board. Then Bhola arrives. He is asked to inspect the board and then guess the cell selected by the jailer. If Bhola guesses the correct cell among 64 options, Atul and Bhola are set free. Otherwise, they are both executed. Is there a winning strategy for Atul and Bhola? (They can co-operate and discuss a strategy before the game starts).

0 votes

Five players compete in a table tennis tournament such that each player plays every other player exactly once. There are no draws in these matches. In each game both players have the same probability of winning, and the result of one game does not influence the outcome of the others.
What is the probability that some player will win all of her games?

0 votes

Chaya purchased a portable music player for $100 through a deal. She sold it to Sindy for $125. After a year, she bought it back from Sindy at $150. Upon using it for a month, she sold it to Suzzanne for $175.

Can you calculate if this entire deal was profitable or a loss for Chaya?

...