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12 September, 10:28

6. An urn contains 15 red balls and 8 blue balls. In each draw, one ball is extracted at random. It is then returned to the urn, along with 6 extra balls of the same color. (the total number of balls in the urn increases after each draw). Consider the event Ck={a blue ball is extracted at the k-th draw}. Determine the probability P (C4). (at the first three draws the extracted balls are not blue).

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  1. 12 September, 10:35
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    P (C4) = 0.0711

    Step-by-step explanation:

    consider the first draw = 15/23 since it cannot be a blue ball

    The second draw = 21/29 since 6 more red balls will be added after the draw since a blue ball cannot be drawn

    the third draw = 27/35 since 6 more red balls will be added after each draw since a blue ball cannot be drawn

    therefore the total number of red balls will be = 15 + 6 + 6 + 6 = 33 red balls after the 4th draw. the total ball now in the urn = 33 red + 4 blue = 41

    Hence the probability of drawing a blue ball at the fourth draw after drawing red balls at the previous attempts = 8/41

    P (C4) = P (fourth ball is blue) * P (first ball red) * P (second ball red) * P (third ball red)

    = (8/41) * (15/23) * (21/29) * (27/35) = 0.0711
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