Answer: 0.9730
Step-by-step explanation:
Let A be the event of the answer being correct and B be the event of the knew the answer.
Given: [tex]P(A)=0.9[/tex]
[tex]P(A^c)=0.1[/tex]
[tex]P(B|A^{C})=0.25[/tex]
If it is given that the answer is correct , then the probability that he guess the answer [tex]P(B|A)= 1[/tex]
By Bayes theorem , we have
[tex]P(A|B)=\dfrac{P(B|A)P(A)}{P(B|A)P(A)+P(C|A^c)P(A^c)}[/tex]
[tex] =\dfrac{(1)(0.9)}{(1))(0.9)+(0.25)(0.1)}\\\\=0.972972972973\approx0.9730[/tex]
Hence, the student correctly answers a question, the probability that the student really knew the correct answer is 0.9730.
