Question
\[ \text{If } \sec x-\tan x=\frac23, \]
\[ \text{then } \tan x=\ ? \]
Solution
Using identity
\[ (\sec x+\tan x)(\sec x-\tan x)=1 \]
\[ (\sec x+\tan x)\times\frac23=1 \]
\[ \sec x+\tan x=\frac32 \]
Now,
\[ 2\tan x = (\sec x+\tan x)-(\sec x-\tan x) \]
\[ =\frac32-\frac23 \]
\[ =\frac{9-4}{6} =\frac56 \]
Therefore,
\[ \tan x=\frac5{12} \]
Answer
\[ \boxed{\frac5{12}} \]