$\int \frac{\sin (x-a)}{\sin (x-b)} d x = A x + B \log |\sin (x-b)| + C \Rightarrow (A, B) = $
- A$(\cos (b-a), \sin (b-a))$
- B$(\cos (b-a), \sin (a-b))$
- C$(-\cos (b-a), \sin (b-a))$
- D$(-\cos (b-a), \sin (a-b))$
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