2 Answers

Valerio Cocchi · Answer 1 · 2018-07-14T03:55:39+0000

$\sin240^\circ=\sin(180-240)^\circ=\sin(-60^\circ)=-\sin60^\circ=-\frac{\sqrt3}2$

using the fact that (1)
$\sin x=\sin(\pi -x)$ (where

is in radians; replace with
$180^\circ$ to convert to degrees) and (2)
$\sin(-x)=-\sin x$ for all

. Then
$\sin\frac\pi3=\sin60^\circ$ is a known value.

Matt Murphy · Answer 2 · 2018-07-19T09:07:09+0000

Answer:

Explanation:

We need to find the value of 240°

To find the value, first we need to understand in which quadrant 240° lies.

We know that there are four quadrants.

First quadrant lies from
$(0,\:(\pi )/(2))$ in radians or 0 to 90° in degrees.

Second quadrant lies from
$((\pi )/(2),\:\pi)$ in radians or 90° to 180° in degrees.

Third quadrant lies from
$(\pi,\:(3\pi )/(2))$ in radians or 180° to 270° in degrees.

Fourth quadrant lies from
$((3\pi )/(2),\:}2\pi )$ in radians or 270° to 360° in degrees.

Clearly we can see that 240° lies in the third quadrant, and in the third quadrant sin theta is negative.

Now,
$\text{sin\:240}^(\circ)=\text{sin\:(180+60)}^(\circ)$

We know that
$\text{sin}(\pi +x)=-\text{sin}x$

So,
$\text{sin\:240}^(\circ)=-\text{sin\:60}^(\circ)$

Hence,
$\text{sin\:240}^(\circ)=-(√(3))/(2)$

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