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28 April, 10:39

F (x) = 2x*e^2x. find lim of f (x) as x--> - infinity and + infinity ... ?

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  1. 28 April, 11:14
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    I am assuming it is f (x) = 2x e^2x

    2x times e raised to the 2x power, and not 2 times e raised to the 2x**

    as it approaches infinity, your f (x) - - > infinity

    we can see by inspection, as 2x will approach inf, and e^ (2x) will approach infinity even faster.

    inf x inf = inf

    as it approaches neg infinity, your f (x) - - > 0

    we can see by inspection, as 2x will approach neg inf, and e^ (2x) will approach zero.

    - inf x 0 = - 0

    The minimum (or maximum) is given when the derivative = 0

    Using the product rule,

    f ' (x) = 2e^ (2x) + 4x e (2x)

    f ' (x) = 2e^ (2x) (1 + 2x)

    We find the roots

    2e^ (2x) will never equal 0

    1 + 2x = 0, x = - 1/2

    The minimum value will be when x = - 0.5
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