If sin 2A = λ sin 2B, then write the value of (λ + 1)/(λ − 1)

If \( \sin2A=\lambda\sin2B \), then write the value of \( \dfrac{\lambda+1}{\lambda-1} \)

Solution:
Given, \[ \sin2A=\lambda\sin2B \]
\[ \lambda=\frac{\sin2A}{\sin2B} \]
Therefore, \[ \frac{\lambda+1}{\lambda-1} = \frac{ \frac{\sin2A}{\sin2B}+1 }{ \frac{\sin2A}{\sin2B}-1 } \]
\[ = \frac{\sin2A+\sin2B}{\sin2A-\sin2B} \]
Using identities, \[ \sin C+\sin D = 2\sin\frac{C+D}{2}\cos\frac{C-D}{2} \]
and \[ \sin C-\sin D = 2\cos\frac{C+D}{2}\sin\frac{C-D}{2} \]
\[ = \frac{ 2\sin(A+B)\cos(A-B) }{ 2\cos(A+B)\sin(A-B) } \]
\[ = \tan(A+B)\cot(A-B) \]
\[ \boxed{\tan(A+B)\cot(A-B)} \]

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