Prove that \cos2\theta-\sqrt{3}\sin2\theta\equiv2\cos(2\theta+\pi/3)\equiv-2\sin(2\theta-\pi/6)

Richie Patterson

Richie Patterson

Answered question

2022-02-26

Prove that
cos2θ3sin2θ2cos(2θ+π3)2sin(2θπ6)

Answer & Explanation

an2gi2m9gg

an2gi2m9gg

Beginner2022-02-27Added 9 answers

Use the identities for the sine and cosine of the sum or difference of two angles:
sin(2θπ6)=sin2θcosπ6cos2θsinπ6
=32sin2θ12cos2θ
and
cos(θ+π3)=cos2θcosπ3sin2θsinπ3
=12cos2θ32sin2θ
Elsie Tillman

Elsie Tillman

Beginner2022-02-28Added 5 answers

First, let's recap:
sinπ3=32
cosπ3=12
sinπ6=12
cosπ6=32
Going from cos2θ3sin2θ to 2cos(2θ+π3)
cos2θ3sin2θ=cos2θsin2θ32sinθcosθ
=212(cos2θsin2θ32sinθcosθ)
=2(12(cos2θsin2θ)1232sinθcosθ)
=2((cos2θsin2θ)cosπ32sinθcosθsinπ3)
=2(cos2θcosπ3sin2θsinπ3)
=2cos(2θ+π3)

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