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17 September, 18:42

Assume a random variable x is normally distributed with mean = 90 and standard deviation = 5. Find the indicated probability.

P (x<85)

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  1. 17 September, 19:58
    0
    16%

    Step-by-step explanation:

    The indicated probability is actually the area under the standard normal curve to the left of the mean. I used the function normalcdf (on my TI-83 Plus calculator to find this quantity:

    normalcdf (-1000,85,90,5) = 0.1587.

    Note #1: This quantity (area / probability) is the area to the left of 85.

    Note #2: by the Empirical Rule, 68% of data lies within 1 s. d. of the mean, so the area between the mean (90) and the score (85) is half of 68%, or 34%. Subtracting this from 50% (the area to the left of the mean), we get 16%, which is roughly equivalent to the 0.1587 we got earlier.
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