1 Answer

Mc Missile · Answer 1 · 2023-12-08T21:07:14+0000

From the given information, we have

$13\sin(\theta) = 12\cos(\theta) \implies (\sin(\theta))/(\cos(\theta)) = (12)/(13)$

In the expression of interest, divide through everything by
$\cos^2(\theta)$ to get

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

Then plugging in the given info, we get

$(2\sin(\theta)\cos(\theta))/(\cos^2(\theta) - \sin^2(\theta)) = (2* (12)/(13))/(1 - \left((12)/(13)\right)^2) = \boxed{(312)/(25)}$

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