Hint: Note that \frac 12=\sin 30^\circ and that \sin is increasing from 0^\circ to 90^\circ. You should be able to subtract 180^\circ or 90^\circ to get all the angles into the first ...

try drawing a circle sin is the height. You will see that at the angle 155 degrees it is the same height as 25 degrees.

\displaystyle{\left({{\sin{{165}}}^{\circ}=}{\sin{{\left({180}^{\circ}-{15}^{\circ}\right)}}}={{\sin{{15}}}^{\circ}=}\frac{{\sqrt{{6}}-\sqrt{{2}}}}{{4}}\right.} Explanation: We know that , \displaystyle{\left({\left({1}\right)}{\sin{{\left({x}+{y}\right)}}}={\sin{{x}}}{\cos{{y}}}+{\cos{{x}}}{\sin{{y}}}\right.} ...

\displaystyle\frac{\sqrt{{{2}-\sqrt{{3}}}}}{{2}} Explanation: sin 735 = sin (15 + 720) = sin (15 + 2(360)) = sin 15. Evaluate sin 15 by using trig identity: \displaystyle{2}{{\sin}^{{2}}{a}}={1}-{\cos{{2}}}{a} ...

use that \sin(30^{\circ})=2\sin(15^{\circ})\cos(15^{\circ}) and \cos^2(x)+\sin^2(x)=1

As some comments suggest, you can't eliminate the imaginary unit from the radical expression for \sin 1°. The crux of the matter is this: x=\sin 1° satisfies a cubuc equation involving \sin 3°, ...