Bag
P contains 3 white, 2 red, and 5 blue balls, while bag
Q contains 2 white, 3 red, and 5 blue balls. We are interested in finding the probability of drawing a red ball from bag
Q after transferring one ball from bag
P to bag
Q.
First, define
E1,E2, and
E3 as the events of drawing a white, red, and blue ball from bag
P, respectively. The probabilities are calculated as follows:
P(E1)=‌ (probability of drawing a white ball from
P )
P(E2)=‌ (probability of drawing a red ball from
P )
P(E3)=‌ (probability of drawing a blue ball from
P )
Now, consider the composition of bag
Q after transferring one ball from bag
P :
If
E1 occurs (a white ball is transferred), bag
Q will have 3 white balls, 3 red balls, and 5 blue balls. The probability of drawing a red ball from
Q becomes
‌.
If
E2 occurs (a red ball is transferred), bag
Q will have 2 white balls, 4 red balls, and 5 blue balls. The probability of drawing a red ball from
Q becomes
‌.
If
E3 occurs (a blue ball is transferred), bag
Q will have 2 white balls, 3 red balls, and 6 blue balls. The probability of drawing a red ball from
Q becomes
‌.
The overall probability
P(E) of drawing a red ball from bag
Q is computed using the law of total probability:
P(E)=P(E1)⋅‌+P(E2)⋅‌+P(E3)⋅‌Substitute the values:
‌P(E)=(‌×‌)+(‌×‌)+(‌×‌)‌P(E)=‌+‌+‌=‌=‌The probability that a ball chosen from bag
Q is red after transfer is
‌.