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11 December, 02:50

A family has j children with probability pj, where p1 =.1, p2 =.25, p3 =.35, p4 =.3. A child from this family is randomly chosen. Given that the child is the eldest child in the family, find the conditional probability that the family has

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  1. 11 December, 02:55
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    A) the conditional probability that the has only 1 child = 0.24

    B) The conditional probability that the family has only 4 children = 0.18

    Step-by-step explanation:

    To answer the questions, we first start with defining each event. Let E be the event that the child selected is the oldest and let Fj be the event that the family has j children.

    From this, we can deduce that the probability that the child is the oldest, given that there is j children is; P (E | Fj) = 1/j.

    In addition, we know P (Fj) = pj as given in the problem. In answering the 2 questions, we seek the probability P (Fj | E). Thus, by the Bayes's formula;

    P (Fj | E) = P (EFj) / P (E) which gives;

    P (Fj | E) = P (E / Fj) P (Fj)

    = (1/j) / Σ (4, i=1) (1/j) pj

    = ((pj) / j) / {p1 + (p2) / 2 + (p3) / 3 + (p4) / 4}

    Therefore, the conditional probability that the family has only 1 child; P (F1 | E) = p1 / {p1 + (p2) / 2 + (p3) / 3 + (p4) / 4} = 0.1 / (0.1 + (0.25/2) + (0.35/3) + (0.3/4) = 0.1/0.4167 = 0.24

    The conditional probability that the family has only 4 children =

    { (p4) / 4} / {p1 + (p2) / 2 + (p3) / 3 + (p4) / 4} = (0.3/4) / (0.1 + (0.25/2) + (0.35/3) + (0.3/4) = 0.075/0.4167 = 0.18
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