Evaluate the indefinite integral, using trigonometric substitution and a triangle to express the answer in terms of x.

Kenju asked Sep 26, 2023

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Kenju asked Sep 26, 2023

by Kenju

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14 votes

Given the indefinite integral:

$\int \frac{1}{(25+4x^2)^{(3)/(2)}}dx\text{ }$

Applying integration by trigonometric substitution:

$\int (1)/(50\sec (u))du$
$=(1)/(50)\int (1)/(\sec (u))du$
$=(1)/(50)\int \cos (u)du$
$=(1)/(50)\sin (u)$

Now we substitute into the equation u = arctan(2/5x)

$=(1)/(50)\sin (\arctan ((2)/(5)x))$

Finally simplifying:

$=\frac{x}{25(4x^2+25)^{(1)/(2)}}+\text{ C}$

BrookeB answered Oct 1, 2023

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