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5 September, 23:44

In a certain school, 6% of all students get a probation due to diverse reasons. Use the Poisson approximation to the binomial distribution to determine the probabilities that among 80 students (randomly chosen in this given school) : a) 4 will get at least one probation in any given year. b) At least 3 will get at least one probation in any given year. c) Anywhere from 3 to 6, inclusive will get at least one probation in any given year.

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  1. 6 September, 02:08
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    Step-by-step explanation:

    In a certain school, 6% of all students get a probation due to diverse reasons. This means that

    p = 6/100 = 0.06

    Number of randomly selected students is 80. This means that

    n = 80

    Mean, u = np = 80*0.06 = 4.8

    Using poisson probability distribution,

    P (x=r) = (e^-u * u^r) / r!

    a) 4 will get at least one probation in any given year. It becomes

    P (x=4) = (e^-4.8 * 4.8^4) / 4! = 0.18

    b) At least 3 will get at least one probation in any given year. This means

    P (x greater than or equal to 3) = 1 - P (x lesser than or equal to 2)

    P (x lesser than or equal to 2) = P (x = 0) + P (x = 1) + / P (x = 2)

    P (x = 0) = (e^-4.8 * 4.8^0) / 0! = 0.0082

    P (x = 1) = (e^-4.8 * 4.8^1) / 1! = 0.04

    P (x = 2) = (e^-4.8 * 4.8^2) / 2! = 0.38

    P (x lesser than or equal to 2) = 0.0082 + 0.04 + 0.38 = 0.4282

    c) Anywhere from 3 to 6, inclusive will get at least one probation in any given year. This means

    P (3 lesser than or equal to x lesser than or equal to 6) = P (x = 3) + P (x = 4) + P (x = 5) + P (x = 6)

    P (x = 3) = (e^-4.8 * 4.8^3) / 3! = 0.15

    P (x = 4) = (e^-4.8 * 4.8^4) / 4! = 0.18

    P (x = 5) = (e^-4.8 * 4.8^5) / 5! = 0.17

    P (x = 5) = (e^-4.8 * 4.8^6) / 6! = 0.14

    P (3 lesser than or equal to x lesser than or equal to 6) = 0.15 + 0.18 + 0.17 + 0.14 = 0.64
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