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31 December, 23:12

For what intervals is f (x) = xe^-x concave down?

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  1. 31 December, 23:33
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    When the second derivative is negative the function is concave downward.

    f (x) = xe^-x

    f ' (x) = e^-x - xe^-x

    f '' (x) = - e^-x - [e^-x - xe^-x] = - e^-x - e^-x + xe^-x = - 2e^-x + xe^-x

    f '' (x) = e^-x [x - 2]

    Found x for f '' (x) < 0

    e^-x [x - 2] < 0

    Given that e^-x is always > 0, x - 2 < 0

    => x < 2

    Therefore, the function is concave downward in ( - ∞, 2)
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