Prove that sin(π/5) sin(2π/5) sin(3π/5) sin(4π/5) = 5/16

Prove that: \[ \sin\frac{\pi}{5} \sin\frac{2\pi}{5} \sin\frac{3\pi}{5} \sin\frac{4\pi}{5} = \frac{5}{16} \]

Solution

Using

\[ \sin(\pi-\theta)=\sin\theta \]

we get

\[ \sin\frac{3\pi}{5} = \sin\frac{2\pi}{5} \]

\[ \sin\frac{4\pi}{5} = \sin\frac{\pi}{5} \]

Therefore,

\[ \sin\frac{\pi}{5} \sin\frac{2\pi}{5} \sin\frac{3\pi}{5} \sin\frac{4\pi}{5} = \sin^2\frac{\pi}{5} \sin^2\frac{2\pi}{5} \]

Now use the identity

\[ 2\sin A\sin B = \cos(A-B)-\cos(A+B) \]

with

\[ A=\frac{\pi}{5},\qquad B=\frac{2\pi}{5} \]

\[ 2\sin\frac{\pi}{5}\sin\frac{2\pi}{5} = \cos\frac{\pi}{5} – \cos\frac{3\pi}{5} \]

Since

\[ \cos\frac{3\pi}{5} = -\cos\frac{2\pi}{5} \]

therefore,

\[ 2\sin\frac{\pi}{5}\sin\frac{2\pi}{5} = \cos\frac{\pi}{5} + \cos\frac{2\pi}{5} \]

Using the standard values

\[ \cos36^\circ=\frac{\sqrt5+1}{4} \]

\[ \cos72^\circ=\frac{\sqrt5-1}{4} \]

Hence,

\[ 2\sin\frac{\pi}{5}\sin\frac{2\pi}{5} = \frac{\sqrt5+1}{4} + \frac{\sqrt5-1}{4} \]

\[ = \frac{2\sqrt5}{4} = \frac{\sqrt5}{2} \]

\[ \sin\frac{\pi}{5}\sin\frac{2\pi}{5} = \frac{\sqrt5}{4} \]

Squaring both sides,

\[ \sin^2\frac{\pi}{5} \sin^2\frac{2\pi}{5} = \frac{5}{16} \]

Therefore,

\[ \sin\frac{\pi}{5} \sin\frac{2\pi}{5} \sin\frac{3\pi}{5} \sin\frac{4\pi}{5} = \frac{5}{16} \]

Hence proved.

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