\displaystyle{\sin{{\left(-\frac{{{5}\pi}}{{6}}\right)}}}=-\frac{{1}}{{2}} Explanation: As \displaystyle{\sin{{\left(-\theta\right)}}}=-{\sin{\theta}} and \displaystyle{\sin{{\left(\pi-\theta\right)}}}={\sin{\theta}} ...

\displaystyle-{1} Explanation: Use \displaystyle{\sin{{\left(-{x}\right)}}}=-{\sin{{x}}}{\quad\text{and}\quad}{\sin{{\left({2}\pi+{x}\right)}}}={\sin{{x}}} Here, \displaystyle{\sin{{\left(-\frac{{{5}\pi}}{{2}}\right)}}}=-{\sin{{\left(\frac{{{5}\pi}}{{2}}\right)}}}=-{\sin{{\left({2}\pi+\frac{\pi}{{2}}\right)}}}=-{\sin{{\left(\frac{\pi}{{2}}\right)}}}=-{1} ...

\displaystyle\frac{\sqrt{{2}}}{{2}} Explanation: Trig table and unit circle --> \displaystyle{\sin{{\left(\frac{{-{5}\pi}}{{4}}\right)}}}={\sin{{\left(\frac{{-{5}\pi}}{{4}}+\frac{{{8}\pi}}{{4}}\right)}}}={\sin{{\left(\frac{{{3}\pi}}{{4}}\right)}}}= ...

\displaystyle\frac{\sqrt{{{2}+\sqrt{{3}}}}}{{2}} Explanation: Unit circle and property of complementary arcs --> \displaystyle{\sin{{\left(\frac{{-{5}\pi}}{{12}}\right)}}}={\sin{{\left(\frac{\pi}{{12}}-\frac{{{6}\pi}}{{12}}\right)}}}={\sin{{\left(\frac{\pi}{{12}}-\frac{\pi}{{2}}\right)}}}={\cos{{\left(\frac{\pi}{{12}}\right)}}} ...

\displaystyle-\frac{\sqrt{{{3}}}}{{2}} Explanation: \displaystyle{\sin{{\left(-\frac{{{8}\cdot\pi}}{{12}}\right)}}} \displaystyle={\sin{{\left(-{120}°\right)}}} \displaystyle=-{\sin{{\left({120}°\right)}}} ...

\displaystyle\frac{{1}}{{2}} Explanation: notice that \displaystyle\frac{{{25}\pi}}{{6}}=\frac{{{\left({24}+{1}\right)}\pi}}{{6}}={4}\pi+\frac{\pi}{{6}} so you're just looking at \displaystyle\frac{\pi}{{6}} ...