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Jura Brazdil · Answer 1 · 2019-04-18T04:33:44+0000

Recall that

$\cos^2\theta+\sin^2\theta=1$

which means

$(\sin\theta)/(√(1-\sin^2\theta))=(\sin\theta)/(√(\cos^2\theta))$

Now,
$\cos\theta$ could be positive or negative, which means
$√(\cos^2\theta)=|\cos\theta|$ . If we specifically knew the sign of
$\cos\theta$ was positive, then we can simplify and write

$(\sin\theta)/(√(1-\sin^2\theta))=(\sin\theta)/(\cos\theta)=\tan\theta$

or if it's negative,

$(\sin\theta)/(√(1-\sin^2\theta))=(\sin\theta)/(-\cos\theta)=-\tan\theta$

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