JEE Mains · Maths · STD 12 - 7.1 indefinite integral
Let \(\alpha \in (0, \pi /2)\) be fixed. If the integral \(\int {\frac{{\tan \,x + \tan \,\alpha }}{{\tan \,x - \tan \,\alpha }}dx = A\left( x \right)\,\cos \,2\alpha + B\left( x \right)\,\sin \,2\alpha + C} \) where \(C\) is a constant of integration, then the functions \(A(x)\) and \(B(x)\) are respectively
- A \(x + \alpha \) and \(\,{\log _e}\left| {\sin \,\left( {x - \alpha } \right)} \right|\)
- B \(x - \alpha \) and \(\,{\log _e}\left| {\cos \,\left( {x - \alpha } \right)} \right|\)
- C \(x - \alpha \) and \(\,{\log _e}\left| {\sin \,\left( {x - \alpha } \right)} \right|\)
- D \(x + \alpha \) and \(\,{\log _e}\left| {\sin \,\left( {x + \alpha } \right)} \right|\)
Answer & Solution
Correct Answer
(C) \(x - \alpha \) and \(\,{\log _e}\left| {\sin \,\left( {x - \alpha } \right)} \right|\)
Step-by-step Solution
Detailed explanation
\(\int {\frac{{\tan x + \tan \alpha }}{{\tan x - \tan \alpha }}} dx\) \( = \int {\frac{{\sin (x + \alpha )}}{{\sin (x - \alpha )}}} dx\) Let, \(x-\alpha=t\) \( \Rightarrow \int {\frac{{\sin (t + 2\alpha )}}{{\sin t}}} dt\)…
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