What is the antiderivative of $e^{8 x}$ $e^(8x)$ ?

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What is the antiderivative of $e^{8 x}$ $e^(8x)$ ?

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Answer 1 · 2016-01-22T14:21:46

$\frac{1}{8} e^{8 x} + C$ $1/8 e^(8x) +C$

Explanation:

We can go through the steps of integrating by substitution, but some find the following more clear:

We know that $\frac{d}{d x} (e^{8 x}) = 8 e^{8 x}$ $d/dx(e^(8x)) = 8e^(8x)$

That is $8$ $8$ time more that we want the derivative to be. So, we'll multiply by $\frac{1}{8}$ $1/8$ (divide by $8$ $8$ ).
$\frac{d}{d x} (\frac{1}{8} e^{8 x}) = \frac{1}{8} \cdot 8 e^{8 x} = e^{8 x}$ $d/dx(1/8e^(8x)) = 1/8*8e^(8x) = e^(8x)$

The general antiderivative is, therefore, $\frac{1}{8} e^{8 x} + C$ $1/8e^(8x)+C$ .

Here is the substitution solution

$\int e^{8 x} d x$ $inte^(8x) dx$

Let $u = 8 x$ $u=8x$ , so we get $d u = 8 d x$ $du = 8 dx$ and $d x = \frac{1}{8} d u$ $dx = 1/8 du$

The integral becomes:

$\int e^{u} \cdot \frac{1}{8} d u = \frac{1}{8} \int e^{u} d u = \frac{1}{8} e^{u} + C$ $int e^u * 1/8 du = 1/8 int e^u du = 1/8 e^u +C$

Reversing the substitution gives

$\int e^{8 x} d x = \frac{1}{8} e^{8 x} + C$ $inte^(8x) dx = 1/8e^(8x)+C$

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What is the antiderivative of $e^{8 x}$ $e^(8x)$ ?

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