JEE Mains · Maths · STD 11 - 3. trignometrical ratios,functions and identities
For any \(\theta \, \in \,\left( {\frac{\pi }{4},\frac{\pi }{2}} \right)\), the expression \(3\,{\left( {\sin \,\theta - \cos \,\theta } \right)^4} + 6{\left( {\sin \,\theta + \cos \,\theta } \right)^2} + 4\,{\sin ^6}\,\theta \) equals
- A \(13 - 4\,{\cos ^2}\,\theta \, + 6\,{\sin ^2}\,\theta \,{\cos ^2}\,\theta \)
- B \(13 - 4\,{\cos ^6}\,\theta \,\)
- C \(13 - 4\,{\cos ^2}\,\theta \, + 6\,\,{\cos ^4}\,\theta \)
- D \(13 - 4\,{\cos ^4}\,\theta \, + 2\,{\sin ^2}\,\theta \,{\cos ^2}\,\theta \)
Answer & Solution
Correct Answer
(B) \(13 - 4\,{\cos ^6}\,\theta \,\)
Step-by-step Solution
Detailed explanation
\(3\,{(1 - \sin 2\theta )^2}\, + \,6(1 + \sin 2\theta )\, + \,4\,{\sin ^6}\theta \) \( = 3\,(1 - 2\sin \,2\theta + {\sin ^2}2\theta ) + \,6 + 6\sin 2\theta + \,4\,{\sin ^6}\theta \) \( = \,9 + 3{\sin ^2}2\theta + 4\,{\sin ^6}\theta \)…
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