"If people do not believe that mathematics is simple, it is only because they do not realize how complicated life is. ” J. von Neumann
Trigonometric exercise asked by Dr. Yousef abbas in theمنبر الرياضيات facebook group
Exercise:
Evaluate the following, $\cos \frac{\pi }{7}\cos \frac{2\pi }{7}%
\cos \frac{4\pi }{7}$
Solution:
we have A=$\cos \theta \cos 2\theta \cos 4\theta $ then
$\sin \theta A=\sin \theta \cos \theta \cos 2\theta \cos 4\theta $
$2\sin \theta A=\sin 2\theta \cos 2\theta \cos 4\theta $
$4\sin \theta A=\sin 4\theta \cos 4\theta $
$8\sin \theta A=\sin 8\theta $
thus, $A=\frac{\sin 8\theta }{8\sin \theta }$
but $\sin 8\theta =\sin \left( \frac{8\pi }{7}\right) =\sin \left( \pi +%
\frac{\pi }{7}\right) =-\sin \left( \frac{\pi }{7}\right) =-\sin \theta $
Therefore, $A=\frac{-\sin \theta }{8\sin \theta }=-\frac{1}{8}$
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