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28 December, 18:18

A plant manufacturers part whose lengths are normally distributed with a mean of 16.3 centimeters and a standard deviation of 2.5 centimeters. 20% of all parts are below what length?

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  1. 28 December, 22:13
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    20% of all parts are below 14.2 cm

    Step-by-step explanation:

    The formula of the z score is z = (x - μ) / σ, where μ is the mean, σ is the standard deviation

    ∵ P (x < h) = 20%

    ∵ 20% = (20/100) = 0.2

    ∴ P (x < h) = 0.2

    Let us use the normal distribution table to find z-score of the corresponding area 0.2

    ∵ z-score of the corresponding area 0.2 is - 0.845

    ∵ The mean is 16.3 cm

    ∴ μ = 16.3

    ∵ The standard deviation is 2.5 cm

    ∴ σ = 2.5

    - Substitute these values in the formula above to find h

    ∵ - 0.845 = (h - 16.3) / 2.5

    - Multiply both sides by 2.5

    ∴ - 2.1125 = h - 16.3

    - Add 16.3 to both sides

    ∴ 14.1875 = h

    - Round it to the nearest tenth

    ∴ h = 14.2 cm

    20% of all parts are below 14.2 cm
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