If tan A + tan B + tan C = 6, Find cot A cot B cot C
Question:
If in a triangle \( \triangle ABC \), \[ \tan A+\tan B+\tan C=6 \] then \[ \cot A\cot B\cot C= \]
If in a triangle \( \triangle ABC \), \[ \tan A+\tan B+\tan C=6 \] then \[ \cot A\cot B\cot C= \]
Solution
In a triangle,
\[ A+B+C=\pi \]
Using the identity:
\[ \tan(A+B+C)=0 \]
Now,
\[ \tan(A+B+C) = \frac{ \tan A+\tan B+\tan C -\tan A\tan B\tan C } { 1-\tan A\tan B-\tan B\tan C-\tan C\tan A } \]
Since
\[ A+B+C=\pi \]
we have
\[ \tan(A+B+C)=\tan\pi=0 \]
Therefore, numerator must be zero:
\[ \tan A+\tan B+\tan C = \tan A\tan B\tan C \]
Given,
\[ \tan A+\tan B+\tan C=6 \]
Hence,
\[ \tan A\tan B\tan C=6 \]
Taking reciprocal,
\[ \cot A\cot B\cot C = \frac{1}{6} \]
Final Answer
\[ \boxed{ \cot A\cot B\cot C=\frac{1}{6} } \]
Correct Option: (c)