The function fx-ln-x-lne-x is

We have f(x)=ln(π+x)/ln(e+x) ∴ f'(x)=(1/π+x )ln(e+x) 1/(e+x)ln(π+x)/[ln(e+x)]^2 =(e+x)ln(e+x) (π+x)ln(π+x)/(e+x)(π+x)(ln(e+x))^2 lt;0 on (0,∞) since 1 lt;e ...

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Standard XI

Mathematics

Monotonically Decreasing Functions

The function ...

Question

The function $f (x) = \frac{l n (π + x)}{l n (e + x)}$ is

increasing on

(0, \infty)

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decreasing on

(0, \infty)

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increasing on

(0, \frac{π}{e})

, decreasing on

(\frac{π}{e}, \infty)

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decreasing on

(0, \frac{π}{e})

, increasing on

(\frac{π}{e}, \infty)

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Solution

The correct option is B decreasing on $(0, \infty)$
We have $f (x) = \frac{l n (π + x)}{l n (e + x)}$
$∴ f^{'} (x) = \frac{(\frac{1}{π + x}) l n (e + x) - \frac{1}{(e + x)} l n (π + x)}{[l n (e + x)]^{2}}$
$= \frac{(e + x) l n (e + x) - (π + x) l n (π + x)}{(e + x) (π + x) (l n (e + x))^{2}}$
$< 0 o n (0, \infty) s i n c e 1 < e < π$

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The function f(x)=ln(π+x)ln(e+x) is

The correct option is B decreasing on (0,∞)We have f(x)=ln(π+x)ln(e+x) ∴f′(x)=(1π+x)ln(e+x)−1(e+x)ln(π+x)[ln(e+x)]2 =(e+x)ln(e+x)−(π+x)ln(π+x)(e+x)(π+x)(ln(e+x))2 <0 on (0,∞) since 1<e<π

The function $f (x) = \frac{l n (π + x)}{l n (e + x)}$ is