If \( \cos A=m\cos B \), then write the value of \( \cot\frac{A+B}{2}\cot\frac{A-B}{2} \)

Solution:

Given, \[ \cos A=m\cos B \]

\[ \frac{\cos A}{\cos B}=m \]

Using identities, \[ \cos A+\cos B = 2\cos\frac{A+B}{2}\cos\frac{A-B}{2} \]

and \[ \cos A-\cos B = -2\sin\frac{A+B}{2}\sin\frac{A-B}{2} \]

\[ m = \frac{\cos A+\cos B+\cos A-\cos B} {\cos A+\cos B-(\cos A-\cos B)} \]

\[ = \frac{ 2\cos\frac{A+B}{2}\cos\frac{A-B}{2} – 2\sin\frac{A+B}{2}\sin\frac{A-B}{2} } { 2\cos\frac{A+B}{2}\cos\frac{A-B}{2} + 2\sin\frac{A+B}{2}\sin\frac{A-B}{2} } \]

Dividing numerator and denominator by \[ 2\sin\frac{A+B}{2}\sin\frac{A-B}{2} \]

\[ m = \frac{ \cot\frac{A+B}{2}\cot\frac{A-B}{2}-1 } { \cot\frac{A+B}{2}\cot\frac{A-B}{2}+1 } \]

Let \[ x=\cot\frac{A+B}{2}\cot\frac{A-B}{2} \]

\[ m=\frac{x-1}{x+1} \]

\[ mx+m=x-1 \]

\[ x(m-1)=-(m+1) \]

\[ x=\frac{m+1}{1-m} \]

Therefore, \[ \boxed{ \cot\frac{A+B}{2}\cot\frac{A-B}{2} = \frac{m+1}{1-m} } \]