Answer:
0.3646 or 36.46%
Step-by-step explanation:
The probability that Bob was the first to be inaccurate is:
[tex]P(B) = 0.8*(1-0.65)=0.28[/tex]
The probability that the statement ends up being inaccurate is 100% minus the probability of the saying being accurate at the end:
[tex]P(I) = 1-P(A)\\P(I)=1-(0.8*0.65*0.85*0.7*0.75)\\P(I)=0.76795}[/tex]
The probability that Bob was inaccurate given that the saying does not match the saying from the teacher is:
[tex]P(B|I) = \frac{0.28}{0.76795}\\P(B|I)=0.3646[/tex]
The probability is 0.3646 or 36.46%.
Answer:
0.4558 is the required probability here.
Step-by-step explanation:
We first compute the probability of the saying not reaching correctly here as:
= 1 - Probability that all of them said it correctly
= 1 - 0.8*0.65*0.85*0.7*0.75
= 0.76795
Now the probability that given the end saying does not match the one from the teacher, conditional probability that Bob was inaccurate is computed using Bayes theorem here as:
= P( Bob was inaccurate and saying did not reach correctly ) / P( saying did not reach correctly)
= (1 - 0.65) / 0.76795
= 0.4558
Therefore 0.4558 is the required probability here.
