2 Answers

Spstanley · Answer 1 · 2018-01-22T12:09:34+0000

sin(-11pi/12) = -sin(11pi/12) = -sin(pi - pi/12) = -sin(pi/12) = -sin( (pi/6) / 2)

= - sqrt( (1-cos(pi/6) ) / 2) = -sqrt( (1-√3/2) / 2 ) = -(√3-1) / 2√2

Giolekva · Answer 2 · 2018-01-24T15:03:40+0000

Answer:

The exact value is:

$\sin ((-11\pi)/(12))=-((√(3)-1)/(2√(2)))$

Explanation:

We are asked to find the value of:

$\sin ((-11\pi)/(12))$

We know that for any angle theta (θ) :

$\sin (-\theta)=-\sin \theta$

Hence, we get:

$\sin ((-11\pi)/(12))=-\sin ((11\pi)/(12))$

Hence,

$\sin ((-11\pi)/(12))=-\sin (\pi-(\pi)/(12))\\\\\\i.e.\\\\\\\sin ((-11\pi)/(12))=-\sin ((\pi)/(12))$

Since,

$\sin (\pi-\theta)=\sin \theta$

Also,

$\sin ((\pi)/(12))=\sin ((\pi)/(3)-(\pi)/(4))$

Hence,

on using the formula:

$\sin (A-B)=\sin A\cdot \cos B-\cos A\cdot \sin B$

Hence, we get:

$\sin ((\pi)/(12))=\sin ((\pi)/(3))\cos ((\pi)/(4))-\cos ((\pi)/(3))\sin ((\pi)/(4))\\\\\\\sin ((\pi)/(12))=(√(3))/(2)\cdot (1)/(√(2))-(1)/(2)\cdot (1)/(√(2))\\\\\\\sin ((\pi)/(12))=(√(3)-1)/(2√(2))$

Hence, the value is:

$\sin ((-11\pi)/(12))=-((√(3)-1)/(2√(2)))$

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