JEE Mains · Maths · STD 12 - 7.1 indefinite integral
Let \(n \ge 2\) be a natural number and \(0 < \theta < \frac{\pi }{2}\). Then \(\int {\frac{{{{\left( {{{\sin }^n}\,\theta - \sin \,\theta } \right)}^{\frac{1}{n}}}\,\cos \,\theta }}{{{{\sin }^{n + 1}}\,\theta }}} d\theta \) is equal to
- A \(\frac{n}{{{n^2} - 1}}{\left( {1 - \frac{1}{{{{\sin }^{n - 1}}\,\theta }}} \right)^{\frac{{n + 1}}{n}}} + C\)
- B \(\frac{n}{{{n^2} + 1}}{\left( {1 - \frac{1}{{{{\sin }^{n - 1}}\,\theta }}} \right)^{\frac{{n + 1}}{n}}} + C\)
- C \(\frac{n}{{{n^2} - 1}}{\left( {1 + \frac{1}{{{{\sin }^{n - 1}}\,\theta }}} \right)^{\frac{{n + 1}}{n}}} + C\)
- D \(\frac{n}{{{n^2} - 1}}{\left( {1 - \frac{1}{{{{\sin }^{n + 1}}\,\theta }}} \right)^{\frac{{n + 1}}{n}}} + C\)
Answer & Solution
Correct Answer
(A) \(\frac{n}{{{n^2} - 1}}{\left( {1 - \frac{1}{{{{\sin }^{n - 1}}\,\theta }}} \right)^{\frac{{n + 1}}{n}}} + C\)
Step-by-step Solution
Detailed explanation
\(\int \frac{\left(\sin ^{n} \theta-\sin \theta\right)^{\frac{1}{n}} \cos \theta}{\sin ^{n+1} \theta} d \theta\) \(=\int \frac{\left(t^{n}-t\right)^{n} d t}{t^{n+1}} \quad(\text { Put } \sin \theta=t)\)…
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