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24 March, 04:52

A company introduces a new product for which the number of units sold S is

S (t) = 200 (5 - 9 / (2+t))

where t is the time in months

(a) Find the avg. value of S (t) during the first year.

(b) During what month does S' (t) equal the avg value during the first year? ... ?

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  1. 24 March, 08:06
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    (a) The "average value" of a function over an interval [a, b] is defined to be

    (1 / (b-a)) times the integral of f from the limits x = a to x = b.

    Now S = 200 (5 - 9 / (2+t))

    The average value of S during the first year (from t = 0 months to t = 12 months) is then:

    (1/12) times the integral of 200 (5 - 9 / (2+t)) from t = 0 to t = 12

    or 200/12 times the integral of (5 - 9 / (2+t)) from t = 0 to t = 12

    This equals 200/12 * (5t - 9ln (2+t))

    Evaluating this with the limits t = 0 to t = 12 gives:

    708.113 units., which is the average value of S (t) during the first year.

    (b). We need to find S' (t), and then equate this with the average value.

    Now S' (t) = 1800 / (t+2) ^2

    So you're left with solving 1800 / (t+2) ^2 = 708.113

    I'll leave that to you
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