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MathematicsMathematics
15 July, 14:31

Two litters of a particular rodent species have been born, one with two brownhaired and one gray-haired (litter 1), and the other with three brown-haired and two gray-haired (litter 2). We select a litter at random and then select an offspring at random from the selected litter.

(a) What is the probability that the animal chosen is brown-haired?

(b) Given that a brown-haired offspring was selected, what is the probability that the sampling was from litter 1?

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  1. 15 July, 17:06
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    a. So probability that the animal chosen is brown-haired = 0.633

    b. Given that a brown-haired offspring was selected, probability that the sampling was from litter1 = P (B|A) = 0.5263.

    Step-by-step explanation:

    Being that We are given, event of Brown hair with two disjoint events, one is { (BrownHair) ∩ (Litter 1) } and the other is { (BrownHair) ∩ (Litter 2) }.

    a) To find the probability that the animal chosen is brown-haired,

    Let A : we choose a brown-haired rodent and B : we choose litter1.

    So using the axioms of probability, we can write

    P (A) = P (A | B) * P (B) + P (A | Bc) * P (Bc)

    Making use of the given information, we get;

    number of brown haired rodents in litter 2 P (AB) Total number of rodents in litterl

    and

    P (A |B^{c}) = / frac{/text{number of brown haired rodents in litter2}}{/text{Total number of rodents in litter2}} = / frac{3}{5}

    And also it is given that we choose litter at random, so P (B) = P (Bc) = 1/2

    So now we plug these values in the equation of P (A) and get

    P (A) = (/frac{2}{3}*/frac{1}{2}) + (/frac{3}{5}*/frac{1}{2}) = / frac{2}{6}+/frac{3}{10} = 0.633

    So probability that the animal chosen is brown-haired = 0.633

    b) Given that a brown-haired offspring was selected, probability that the sampling was from litter1 = P (B|A)

    Lets make use of Bayes rule to find this conditional probability,

    So using theorem we get,

    P (B|A) = / fracP (A{P (A|B) * P (B) + P (A|B^{c}) * P (B^{c}) }

    P (B|A) = / frac{ (1/2) * (2/3) }{[ (1/2) * (2/3) ]+[ (1/2) * (3/5) ]} = / frac{10}{19} = 0.5263

    Thus, Given that a brown-haired offspring was selected, probability that the sampling was from litter1 = P (B|A) = 0.5263.
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