Get the answer to "How to proof: cos⁡(10∘)⋅cos⁡(30∘)⋅cos⁡(50∘)⋅cos⁡(70∘)=316"

Aileen Rogers

Answered question

2022-04-07

How to proof:

\cos (10^{\circ}) \cdot \cos (30^{\circ}) \cdot \cos (50^{\circ}) \cdot \cos (70^{\circ}) = \frac{3}{16}

dabCrupedeedaejrg

Beginner2022-04-08Added 10 answers

\cos (10^{\circ}) \cos (30^{\circ}) \cos (50^{\circ}) \cos (70^{\circ}) = \sin (80^{\circ}) \cos (30^{\circ}) \sin (40^{\circ}) \sin (20^{\circ})

= \cos (30^{\circ}) \sin (80^{\circ}) \cdot \frac{- 1}{2} (\cos (60^{\circ}) - \cos (20^{\circ}))

= \cos (30^{\circ}) \cdot \frac{- 1}{2} (\sin (80^{\circ}) \cos (60^{\circ}) - \cos (20^{\circ}) \sin (80^{\circ}))

= \cos (30^{\circ}) \cdot \frac{- 1}{2} (\frac{1}{2} (\sin (140^{\circ}) + \sin (20^{\circ})) -

\frac{1}{2} (\sin (100) + \sin (60^{\circ})))

= \cos (30^{\circ}) \cdot \frac{- 1}{4} (\sin (40^{\circ}) + \sin (20^{\circ}) - \sin (80^{\circ}) - \sin (60^{\circ}))

= \cos (30^{\circ}) \cdot \frac{- 1}{4} (\sin (60^{\circ}) \cos (20^{\circ}) - \sin (20^{\circ}) \cos (60^{\circ})

+ \sin (20^{\circ}) - \sin (60^{\circ}) \cos (20^{\circ}) - \sin (20^{\circ}) \cos (60^{\circ})

- \sin (60^{\circ}))

= \cos (30^{\circ}) \cdot \frac{- 1}{4} (- 2 \sin (20^{\circ}) \cos (60^{\circ}) + \sin (20^{\circ}) - \sin (60^{\circ}))

= \cos (30^{\circ}) \cdot \frac{1}{4} \sin (60^{\circ}) = \frac{3}{16}

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