How do you find the exact value of $cos[arctan(-8/15)]$ ?

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Answer 1 · 2016-02-05T16:35:08

Ok guy i want you to imagine a triangle rectangle with one side $a$ and another side $b$ , so the hypotenuse $c$ is equal to $sqrt(a^2+b^2)$

You have an angle $theta$ is opposite side is $a$ and his adjacent side is $b$

So you know trigonometry and

$tan(theta) = a/b$

$-tan(theta) = -a/b$

and you know $tan(theta)$ is odd so

$tan(-theta) = -a/b$

So you can say

$-theta = arctan(-a/b)$

again, you know the trigonometry and know

$cos(theta) = b/c$

but you know $-theta = arctan(-a/b)$ and the cosinus is an even function so you don't care if you put $-theta$ or $theta$ so

$cos(arctan(-a/b)) = b/c$

How do you find the exact value of cos[arctan(-8/15)]cos[arctan(-8/15)]?