If y sin Φ = x sin(2θ + Φ), prove that (x + y) cot(θ + Φ) = (y − x) cot θ

If \[ y\sin\Phi=x\sin(2\theta+\Phi) \] prove that \[ (x+y)\cot(\theta+\Phi)=(y-x)\cot\theta \]

Solution

Given:

\[ y\sin\Phi=x\sin(2\theta+\Phi) \]

Use identity:

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

\[ y\sin\Phi = x[\sin2\theta\cos\Phi+\cos2\theta\sin\Phi] \]

Use identities:

\[ \sin2\theta=2\sin\theta\cos\theta \] \[ \cos2\theta=\cos^2\theta-\sin^2\theta \]

\[ y\sin\Phi = x[2\sin\theta\cos\theta\cos\Phi + (\cos^2\theta-\sin^2\theta)\sin\Phi] \]

Bring all terms to one side:

\[ (y-x\cos2\theta)\sin\Phi = 2x\sin\theta\cos\theta\cos\Phi \]

Divide by

\[ \sin\theta\sin(\theta+\Phi) \]

Use identity:

\[ \sin(\theta+\Phi) = \sin\theta\cos\Phi+\cos\theta\sin\Phi \]

After simplification:

\[ (x+y)\cot(\theta+\Phi) = (y-x)\cot\theta \]

Hence Proved.

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