Prove the following identities : = (sin θ - 2 sin)^3 θ\(2 cos)^3 θ - (cos θ) = tan θ

Solving L.H.S. of the equation : By formula, sin 2 θ = 1 - cos 2 θ Since, L.H.S. = R.H.S. Hence, proved that = tan θ.

Mathematics

Prove the following identities :
$\dfrac{\text{sin θ - 2 sin}^3 θ}{\text{2 cos}^3 θ - \text{ cos θ}}$ = tan θ

Trigonometric Identities

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Answer

Solving L.H.S. of the equation :

$\Rightarrow \dfrac{\text{sin θ(1 - 2 sin}^2 θ)}{\text{cos θ(2 cos}^2 θ - 1)}$

By formula,

sin² θ = 1 - cos² θ

$\Rightarrow \dfrac{\text{sin θ[1 - 2(1 - cos}^2 θ)]}{\text{cos θ(2 cos}^2 θ - 1)} \\[1em] \Rightarrow \text{tan θ} \times \dfrac{1 - 2 + \text{ 2 cos}^2 θ}{\text{(2 cos}^2 θ - 1)} \\[1em] \Rightarrow \text{tan θ} \times \dfrac{\text{2 cos}^2 θ - 1}{\text{2 cos}^2 θ - 1} \\[1em] \Rightarrow \text{tan θ}.$

Since, L.H.S. = R.H.S.

Hence, proved that $\dfrac{\text{sin θ - 2 sin}^3 θ}{\text{2 cos}^3 θ - \text{ cos θ}}$ = tan θ.

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Mathematics

Prove the following identities :sin θ - 2 sin3θ2 cos3θ− cos θ\dfrac{\text{sin θ - 2 sin}^3 θ}{\text{2 cos}^3 θ - \text{ cos θ}}2 cos3θ− cos θsin θ - 2 sin3θ​ = tan θ

Trigonometric Identities

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Prove the following identities :
$\dfrac{\text{sin θ - 2 sin}^3 θ}{\text{2 cos}^3 θ - \text{ cos θ}}$ = tan θ