An urn B1 contains 2 white and 3 black balls and another urn B2 contains 3 white and 4 black balls. One urn is selected at random and a ball is drawn from it. If the ball drawn is found black, find the probability that the urn chosen was B1.

P (B1|Black) = = 21/41 = 0.512

Step-by-step explanation:

In this question, we will use the conditional probability formula that is, for two events A and B, the probability that event A occurs given than event B has already occured is:

P (A|B) = P (A∩B) / P (B)

Here, we need to find the probability that the ball is from urn B1 given that it is black. i. e.

P (B1|Black) = P (B1∩Black) / P (Black)

P (B1∩Black) is the probability that the ball is chosen from B1 and it is black. The number of black balls in urn B1 is 3 and the total number of balls in this urn is 5. The probability of choosing either of the urns is 1/2.

So, P (B1∩Black) = (1/2) (3/5)

P (B1∩Black) = 3/10

P (Black) is the probability of selecting a black ball. this can be from either of the urns B1 and B2. So, we can calculate this probability as:

P (Black) = P (Black in B1) + P (Black in B2)

= (1/2) (3/5) + (1/2) (4/7)

P (Black) = 41/70

P (B1|Black) = P (B1∩Black) / P (Black)

= (3/10) / (41/70)

P (B1|Black) = 21/41 = 0.512