How do you use the angle sum or difference identity to find the exact value of $cos((-11pi)/12)$ ?

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How do you use the angle sum or difference identity to find the exact value of $cos((-11pi)/12)$ ?

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Answer 1 · 2016-09-15T13:29:32

$- sqrt(2 + sqrt3)/2$

Explanation:

$cos ((-11pi)/12) = cos (pi/12 - (12pi)/12) =$
$= cos (pi/12 - pi) = - cos (pi/12)$
Find $cos (pi/12)$ by using trig identity:
$2cos^2 a = 1 + cos 2a$
Trig table of special arcs -->
$2cos^2 (pi/12) = 1 + cos (pi/6) = 1 + sqrt3/2 = (2 + sqrt3)/2$
$cos^2 (pi/12) = (2 + sqrt3)/4$
$cos (pi/12) = +- sqrt(2 + sqrt3)/2$
Since $cos (pi/12)$ is positive (Quadrant I), take the positive result.
Finally,
$cos ((-11pi)/12) = - cos (pi/12) = - sqrt(2 + sqrt3)/2$

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How do you use the angle sum or difference identity to find the exact value of $cos((-11pi)/12)$ ?

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How do you use the angle sum or difference identity to find the exact value of $cos((-11pi)/12)$ ?