How to proof: \(\displaystyle{\cos{{\left({10}^{{\circ}}\right)}}}\cdot{\cos{{\left({30}^{{\circ}}\right)}}}\cdot{\cos{{\left({50}^{{\circ}}\right)}}}\cdot{\cos{{\left({70}^{{\circ}}\right)}}}={\frac{{{3}}}{{{16}}}}\)

Aileen Rogers

Aileen Rogers

Answered question

2022-04-07

How to proof: cos(10)cos(30)cos(50)cos(70)=316

Answer & Explanation

dabCrupedeedaejrg

dabCrupedeedaejrg

Beginner2022-04-08Added 10 answers

cos(10)cos(30)cos(50)cos(70)=sin(80)cos(30)sin(40)sin(20)
=cos(30)sin(80)12(cos(60)cos(20))
=cos(30)12(sin(80)cos(60)cos(20)sin(80))
=cos(30)12(12(sin(140)+sin(20))
12(sin(100)+sin(60)))
=cos(30)14(sin(40)+sin(20)sin(80)sin(60))
= cos(30)14(sin(60)cos(20)sin(20)cos(60)
+sin(20)sin(60)cos(20)sin(20)cos(60)
sin(60))
= cos(30)14(2sin(20)cos(60)+sin(20)sin(60))
= cos(30)14sin(60)=316

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