A man speaks the truth 3 out of 4 times. He rolls a dice and reports that the outcome is 6. What is the probability that the number is actually 6 ?

1 Answer
Jan 7, 2018

The probability is #3/4#.

Explanation:

Let #S# be the event that the roll is a 6.
Let #R# be the event that the man reports a 6.

Then we want to find #"P"(S|R).#

#"P"(S|R)=("P"(S nn R))/("P"(R))#

#color(white)("P"(S|R))=["P"(R|S)"P"(S)]/("P"(R))#

#color(white)("P"(S|R))=["P"(R|S)"P"(S)]/("P"(R|S)"P"(S)+"P"(R|S^C)"P"(S^C))#

Here's where it gets a bit tricky. We might think that #"P"(R|S^C)=1/4,# because he has a 1 in 4 chance of lying. But let's say the roll is a '1' and he lies. He has 5 choices of number to falsely report, and only one of them is '6'. So, we really should say that #"P"(R|S^C)=1/4xx1/5.#

So:

#"P"(S|R)=[(3/4)(1/6)]/((3/4)(1/6)+(1/20)(5/6))#

#color(white)("P"(S|R))=[1/8]/(1/8+1/24) color(blue)(xx24/24)#

#color(white)("P"(S|R))=[3]/(3+1)#

#color(white)("P"(S|R))=3/4#