Question

If $\sin \frac{\pi }{14}\sin \frac{3\pi }{14}\sin \frac{5\pi }{14}\sin \frac{7\pi }{14}\sin \frac{9\pi }{14}\sin \frac{11\pi }{14}\sin \frac{13\pi }{14}=\frac{1}{k},$ then $k$ is equal to

Answer 1

$\sin \frac{\pi }{14}\sin \frac{3\pi }{14}\sin \frac{5\pi }{14}\sin \frac{7\pi }{14}\sin \frac{9\pi }{14}\sin \frac{11\pi }{14}\sin \frac{13\pi }{14}$
$=\sin \frac{\pi }{14}\sin \frac{3\pi }{14}\sin \frac{5\pi }{14}\sin \frac{\pi }{2}\sin (\pi -\frac{5\pi }{14})\sin (\pi -\frac{3\pi }{14})\sin (\pi -\frac{\pi }{14})$
$={\sin }^2\frac{\pi }{14}{\sin }^2\frac{3\pi }{4}{\sin }^2\frac{5\pi }{14}$
$={\left(\sin \frac{\pi }{14}\sin \frac{3\pi }{14}\sin \frac{5\pi }{14}\right)}^2$
$={\left[\cos (\frac{\pi }{2}-\frac{\pi }{14})\cos (\frac{\pi }{2}-\frac{3\pi }{14})\cos (\frac{\pi }{2}-\frac{5\pi }{14})\right]}^2$
$={\left[\cos \frac{3\pi }{7}\cos \frac{2\pi }{7}\cos \frac{\pi }{7}\right]}^2={\left[\cos (\pi -\frac{4\pi }{7})\cos \frac{2\pi }{7}\cos \frac{\pi }{7}\right]}^2={[-\cos \frac{2\pi }{7}\cos \frac{\pi }{7}\cos \frac{4\pi }{7}]}^2={\left[\cos \frac{\pi }{7}\cos \frac{2\pi }{7}\cos \frac{4\pi }{7}\right]}^2={\left[\frac{\sin \frac{8\pi }{7}}{2^3\sin \frac{\pi }{7}}\right]}^2=\frac{1}{64}{\left[\frac{\sin (\pi +\frac{\pi }{7})}{\sin \frac{\pi }{7}}\right]}^2=\frac{1}{64}\therefore k=64$