If A + B = π/4, Find (1 + tan A)(1 + tan B)
Question:
If \[ A+B=\frac{\pi}{4} \] then \[ (1+\tan A)(1+\tan B) \] = ……………………………………………..
If \[ A+B=\frac{\pi}{4} \] then \[ (1+\tan A)(1+\tan B) \] = ……………………………………………..
Solution
Using the tangent addition formula:
\[ \tan(A+B) = \frac{\tan A+\tan B} {1-\tan A\tan B} \]
Given,
\[ A+B=\frac{\pi}{4} \]
Therefore,
\[ \tan\left(\frac{\pi}{4}\right)=1 \]
Hence,
\[ \frac{\tan A+\tan B} {1-\tan A\tan B} =1 \]
Cross multiplying,
\[ \tan A+\tan B = 1-\tan A\tan B \]
Adding \(1+\tan A\tan B\) to both sides,
\[ 1+\tan A+\tan B+\tan A\tan B = 2 \]
Factorizing,
\[ (1+\tan A)(1+\tan B)=2 \]
Therefore,
\[ \boxed{2} \]