If \[ \cot x(1+\sin x)=4m \] and \[ \cot x(1-\sin x)=4n \] Prove that \[ (m^2-n^2)^2=mn \]
Solution:
\[ 4m=\cot x(1+\sin x) = \frac{\cos x}{\sin x}(1+\sin x) \]
\[ 4n=\cot x(1-\sin x) = \frac{\cos x}{\sin x}(1-\sin x) \]
Multiplying,
\[ 16mn = \frac{\cos^2 x}{\sin^2 x}(1-\sin^2 x) \]
\[ = \frac{\cos^4 x}{\sin^2 x} \]
Now,
\[ 4(m+n) = \frac{\cos x}{\sin x}(2) \]
\[ m+n=\frac{\cos x}{2\sin x} \]
Also,
\[ 4(m-n) = \frac{\cos x}{\sin x}(2\sin x) \]
\[ m-n=\frac{\cos x}{2} \]
Therefore,
\[ m^2-n^2 = (m+n)(m-n) \]
\[ = \frac{\cos x}{2\sin x}\cdot\frac{\cos x}{2} \]
\[ = \frac{\cos^2 x}{4\sin x} \]
Squaring both sides,
\[ (m^2-n^2)^2 = \frac{\cos^4 x}{16\sin^2 x} \]
\[ =mn \]
Hence proved.