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4 May, 04:47

A salesperson receives an annual salary of $6,000 plus 8% of the value of the orders she takes. The annual value of these orders can be represented by a random variable with a mean of $600,000 and a standard deviation of $180,000. Find the mean and standard deviation of the salesperson's annual income.

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  1. 4 May, 04:55
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    Mean: $48,000 Standard deviation: $14,400

    Explanation:

    1. Mean of the annual income:

    The mean income is the expected income, which is: the sum of the annual salary (constant) plus the 8% of the mean value of the orders ($600,000):

    Mean annual income = $6,000 + 8% * $600,000 = $6,000 + $48,000 = $54,000.

    2. Standard deviation of the annual income.

    The standar deviation is a measure of how extended the values are.

    It means that the annual value of the orders will be around the mean plus or minus a number of standard deviations, depending on the precision you want.

    The 8% of the the standard deviation is 8% * $180,000 = $14,400.

    Since the $6,000 is a constant it does not modify the standard deviation.

    These results are a consequence of the linearity of the mean and the standard deviation.

    Call Y the salesperson salary, and X the valueof the orders. Then:

    Y = 6,000 + 8% X

    The linearity property states that:

    Mean of Y = 8% * (mean of X) + 6,000

    And:

    Standard deviation of Y = 8% * (Standard deviation of X).
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