$\int \frac{1 + \tan x \tan(x + a)}{\tan x \tan(x + a)} dx =$
- A$\tan a (\log(\sec(x + a)) + \log \sec x + C)$
- B$\cot a (\log |\sin x| - \log |\sin(x + a)|) + C$
- C$\tan a (\log (\frac{\cos x}{\sin(x + a)})) + C$
- D$\cot a (\log \frac{\sin(x + a)}{\cos(x + a)}) + C$
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