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4 November, 18:20

A synthetic fiber used in manufacturing carpet has tensile strength that is normally distributed with mean 75.5 psi and standard deviation 3.5 psi. For a random sample of n = 12 fiber specimens, find the value of k, such that P (75.35

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  1. 4 November, 21:24
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    k = 76.67

    Step-by-step explanation:

    P (75.35< x
    Let us calculate the z-score for 75.35

    z-score = (x-mean) / SD

    From the question, mean = 75.5 and SD = 3.5

    z-score = (75.35-75.5) / 3.5

    z-score = - 0.0429

    Let us calculate the z-score for k

    z-score = (k-75.5) / 3.5

    Thus, we have the probability range as;

    P (-0.0429
    P (z-0.0429) = 0.2

    Let's say P (z<{ (k-75.5) / 3.5}) is F to combat ambiguity

    from z score table P (z>-0.0429) = 0.48289

    Hence,

    F - 0.48291 = 0.2

    F = 0.2 + 0.48291

    F = 0.68291

    From z-table, the z-score of is 0.476

    Hence:

    0.476 = (k - 75.5) / 3.5

    k-75.5 = 3.5 (0.476)

    k-75.5 = - 1.666

    k = 75+1.666

    k = 76.67
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