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5 September, 04:26

Young's modulus is a quantitative measure of stiffness of an elastic material. Suppose that for metal sheets of a particular type, its mean value and standard deviation are 70 GPa and 2.2 GPa, respectively. Suppose the distribution is normal. (Round your answers to four decimal places.) (a) Calculate P (69 ≤ X ≤ 71) when n = 16.

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  1. 5 September, 04:40
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    P (69 ≤ X≤ 71) = 0.34728

    Step-by-step explanation:

    Hello!

    Your study variable is X: stiffness of an elastic metal sheet.

    X~N (μ; σ²)

    To be able to calculate this probability you need to standardize the variable that way you can use the Z-table to get the probabilities for the study variable. The Z-table shows cumulative probabilities P (Z≤z)

    P (69 ≤ X≤ 71)

    You can rewrite this probability as:

    P (X ≤ 71) - P (X ≤ 69)

    Now you standardize both terms

    P (Z ≤ (71 - 70) / (2.2)) - P (Z ≤ (69 - 70) / (2.2)) = P (Z ≤ 0.45) - P (Z ≤ - 0.45) = 0.67364 - 0.32636 = 0.34728

    -i hope you have a nice day!
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