Integral of sec^2 3θ dθ

asked Dec 11, 2020 16.3k views

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Let
$\alpha=3\theta$ , so that
$\mathrm d\alpha=3\,\mathrm d\theta$ .

$\displaystyle\int\sec^23\theta\,\mathrm d\theta=\frac13\int\sec^2\alpha\,\mathrm d\alpha$

Recall that

$(\mathrm d)/(\mathrm d\alpha)\tan\alpha=\sec^2\alpha$

so we get the antiderivative

$\frac13\tan\alpha+C$

and back-substitute to get it in terms of
$\theta$ :

$\frac13\tan3\theta+C$

Keyah answered Dec 15, 2020

by Keyah

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