Alice, Bob, and Charlie are ro
Alice, Bob, and Charlie are rolling a fair die in that order.They keep rolling until one of them rolls a 6.
What is the probability that each of them wins?
Answer:
a)The prob of Alice win = Alice wins in the first round + AliceWins in the 2nd round + Alice Wins in the 3nd round+—
=1/6 + 5/6*5/6*5/6*1/6 + 5/6*5/6*5/6*5/6*5/6*5/6*1/6 +—– (1/6is the probability of getting 6 and 5/6 is the probability ofgetting a number which is not 6 while rolling a fair dice)
Since you can see that the above is a GP with r<1
So we can use the equation a/(1-r) to get the ans
where a=1/6 and r = (5/6*5/6*5/6*1/6)/(1/6) = 125/216
So., Prob of Alice win = (1/6)/(1-125/216)=0.3956044
b)Same as above nowdoing for Bob but his turn comes after Aliceso
The prob of Bob win = Bob wins in the first round + Bob Wins inthe 2nd round + Bob Wins in the 3nd round+—
=5/6*1/6 + 5/6*5/6*5/6*5/6*1/6 + 5/6*5/6*5/6*5/6*5/6*5/6*5/6*1/6+—– (1/6 is the probability of getting 6 and 5/6 is theprobability of getting a number which is not 6 while rolling a fairdice)
Since you can see that the above is a GP with r<1
So we can use the equation a/(1-r) to get the ans
where a=5/6*1/6 and r = (5/6*5/6*5/6*5/6*1/6)/(5/6*1/6) =125/216
So., Prob of Bob win = (5/6*1/6)/(1-125/216)=0.3296703
c)
Same as above nowdoing for Charlie but his turn comes afterAlice&Bob so
The prob of Charlie win = Charlie wins in the first round +Charlie Wins in the 2nd round + Charlie Wins in the 3ndround+—
=5/6*5/6*1/6 + 5/6*5/6*5/6*5/6*5/6*1/6 +5/6*5/6*5/6*5/6*5/6*5/6*5/6*5/6*1/6 +—– (1/6 is the probabilityof getting 6 and 5/6 is the probability of getting a number whichis not 6 while rolling a fair dice)
Since you can see that the above is a GP with r<1
So we can use the equation a/(1-r) to get the ans
where a=5/6*5/6*1/6 and r =(5/6*5/6*5/6*5/6*5/6*1/6)/(5/6*5/6*1/6) = 125/216 (i.e. 2nd term /first term)
So., Prob of Charlie win = (5/6*5/6*1/6)/(1-125/216)=0.2747253
Hope the above answer has helped you in understanding theproble. Please upvote the ans if it has reallyhelped you. Good Luck!!