Respuesta :
Answer:
0.49
Step-by-step explanation:
Let the probability that a person does yoga be P(Y) = 0.07
Let the probability that a person is male = P(M) = 0.49
If the probability that person does yoga is independent of whether the person is male, then the conditional probability
P(Y|M) = P(Y) and P(M|Y) = P(M)
P(M|Y) = P(M) = 0.49
Answer: 0.49
Step-by-step explanation: let the P(Y) be the probability that the person does yoga = 0.07 and let P(M) be the probability that the person is a male = 0.49.
We need to get the probability that the person is a male given that he does yoga.
This simply implies that the 2 events will occur assuming that one has already occurred.
For this case, the person has already done yoga, hence we need the probability that the person is a male given that he has done yoga.
This is represented as P(M|Y) = P(M) and P(Y) / P(Y)
P(M|Y) = 0.49 × 0.07/ 0.07 = 0.49
