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Question

There are three bags B1, B2, and B3.The bag B1 contains 5 red and 5 green balls, B2 contains 3 red and 5 green balls, B3 contains 5 red and 3 green balls. Bags B1, B2 and B3 have probabilities 310,310 and 410 respectively of being chosen. A bag is selected at random and a ball is chosen at random from the bag. Then which of the following option is/are correct?

A
Probability that the chosen ball is green, given that the selected bag is B3, equals 38
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B
Probability that the chosen ball is green equals 3980
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C
Probability that the selected bag is B3, given that the chosen ball is green, equals 513
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D
Probability that the selected bag is B3, and the chosen ball is green equals 310
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Solution

The correct option is B Probability that the chosen ball is green equals 3980
Given, Bag B1 (5 Red, 5 Green),Bag B2 (3 Red, 5 Green), Bag B3(5 Red, 3 Green)
Probability of chosing bag 1, bag 2 and bag 3: P(B1)=310,P(B2)=310,P(B3)=410
Probability of chosing green ball
P(G)=P(B1)×P(GB1)+P(B2)×P(GB2)+P(B3)×P(GB3)
=310×510+310×58+410×38=3980

Probability that the chosen ball is green, given that the selected bag is B3,=P(GB3)=38

Probability that the selected bag is B3, and the chosen ball is green =P(B3G)
Using Baye's Theorem
=P(B3G)=P(B3).P(GB3)P(G)=410×383980=413

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