JEE Mains · Maths · STD 12 - 6. Application of derivatives
Let \( f :R\rightarrow R \) be a twice differentiable function such that \( f^{\prime\prime}(x)>0 \) for all \( x\in R \) and \( f^{\prime}(a-1)=0 \), where a is real number. Let \( g(x)=f(tan^{2}x-2~tan~x+a), 0 < x < \frac{\pi}{2}\).
Consider the following two statements :
(I) g is increasing in \( (0,\frac{\pi}{4}) \)
(II) g is decreasing in \( (\frac{\pi}{4},\frac{\pi}{2}) \)
Then,
- A Neither (I) nor (II) is True
- B Only (II) is True
- C Only (I) is True
- D Both (I) and (II) are True
Answer & Solution
Correct Answer
(A) Neither (I) nor (II) is True
Step-by-step Solution
Detailed explanation
\( g(x)=f((tanx-1)^{2}+a-1) \) \({g^{\prime}}(x)=f^{\prime}((tanx-1)^{2}+a-1).2(tanx-1)sec^{2}x \) \(\because\) \( f^{\prime}(a-1)=0~and~f^{\prime\prime}(x)>0 \) \(\therefore\) \( f^{\prime}((tanx-1)^{2}+a-1)>0 \) g\(^{\prime}\)(x) \(>\) 0 if \( (tanx-1)>0 \) g is increasing in…
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