How do you integrate $e^(4x) dx$ ?

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How do you integrate $e^(4x) dx$ ?

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Answer 1 · 2016-06-24T16:58:23

$1/4e^(4x)+C$

Explanation:

We will use the integration rule for $e^x$ :

$inte^udu=e^u+C$

So, for the given integral, let $u=4x$ . This implies that $du=4dx$ .

$inte^(4x)dx=1/4inte^(4x)*4dx=1/4inte^udu=1/4e^u+C$

Since $u=4x$ :

$1/4e^u+C=1/4e^(4x)+C$

We can differentiate this answer to check that we get $e^(4x)$ . Indeed, through the chain rule, the $1/4$ we had to add gets "undone" by the $4$ coming from the power of $4x$ via the chain rule.

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How do you integrate $e^(4x) dx$ ?

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