MHT CET · Maths · Application of Derivatives
The function \(f(x)=\frac{\log _e(\pi+x)}{\log _e(e+x)}\) is
- A increasing on \((0, \infty)\).
- B increasing on \(\left(0, \frac{\pi}{\mathrm{e}}\right)\), decreasing on \(\left(\frac{\pi}{\mathrm{e}}, \infty\right)\).
- C decreasing on \((0, \infty)\).
- D decreasing on \(\left(0, \frac{\pi}{\mathrm{e}}\right)\), increasing on \(\left(\frac{\pi}{\mathrm{e}}, \infty\right)\)
Answer & Solution
Correct Answer
(C) decreasing on \((0, \infty)\).
Step-by-step Solution
Detailed explanation
\(\text { Let } \mathrm{f}(x)=\frac{\ln (\pi+x)}{\ln (\mathrm{e}+x)} \)
\( \therefore \mathrm{f}^{\prime}(x) =\frac{\ln (\mathrm{e}+x) \times \frac{1}{\pi+x}-\ln (\pi+x) \times \frac{1}{\mathrm{e}+x}}{[\ln (\mathrm{e}+x)]^2} \)
\( =\frac{(\mathrm{e}+x) \ln (\mathrm{e}+x)-(\pi+x) \ln (\pi+x)}{[\ln (\mathrm{e}+x)]^2 \times(\mathrm{e}+x)(\pi+x)} \)
\( \Rightarrow f^{\prime}(x) \lt 0 \text { for all } x\gt0 \)
\( \therefore \mathrm{f}(x) \text { is decreasing on }(0, \infty).\)
\( \therefore \mathrm{f}^{\prime}(x) =\frac{\ln (\mathrm{e}+x) \times \frac{1}{\pi+x}-\ln (\pi+x) \times \frac{1}{\mathrm{e}+x}}{[\ln (\mathrm{e}+x)]^2} \)
\( =\frac{(\mathrm{e}+x) \ln (\mathrm{e}+x)-(\pi+x) \ln (\pi+x)}{[\ln (\mathrm{e}+x)]^2 \times(\mathrm{e}+x)(\pi+x)} \)
\( \Rightarrow f^{\prime}(x) \lt 0 \text { for all } x\gt0 \)
\( \therefore \mathrm{f}(x) \text { is decreasing on }(0, \infty).\)
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