The function f(x) = (ln (π + x)/ln (e + x)) is

Question

The function f(x) = (ln (π + x)/ln (e + x)) is (A) increasing on (0, ∞ ) (B) decreasing on (0, ∞ ) (C) increasing on (0, π /e), decreasing on ( π /e, ∞ ) (D) decreasing on 0, π /e), increasing on (π /e, ∞ )

Tardigrade Admin · Accepted Answer

We have f(x) = ( textIn (π+x)/ textIn(e+x)) ∴ f'(x) = (((1/π+x)) textIn(e+x) - (1/(e+x)) textIn(π+x)/[ textIn (e +x)]2) = ((e+x) textIn (e+x)-(π+x) textIn(π+x)/(e+x)(π+x)( textIn(e+x))2) < 0 on (0, ∞) since 1 < e < π ∴ f(x) decreases on (0 , ∞).

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

increasing on $(0, \infty)$

decreasing on $(0, \infty)$

increasing on $(0, π / e)$ , decreasing on $(π / e, \infty)$

decreasing on $0, π / e)$ , increasing on $(π / e, \infty)$

Q. The function f(x)=ln(e+x)ln(π+x)​ is

increasing on (0,∞)

decreasing on (0,∞)

increasing on (0,π/e), decreasing on (π/e,∞)

decreasing on 0,π/e), increasing on (π/e,∞)

We have f(x)=In(e+x)In(π+x)​ ∴f′(x)=[In(e+x)]2(π+x1​)In(e+x)−(e+x)1​In(π+x)​ =(e+x)(π+x)(In(e+x))2(e+x)In(e+x)−(π+x)In(π+x)​ < 0 on (0,∞) since 1<e<π ∴f(x) decreases on (0,∞).

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

increasing on $(0, \infty)$

decreasing on $(0, \infty)$

increasing on $(0, π / e)$ , decreasing on $(π / e, \infty)$

decreasing on $0, π / e)$ , increasing on $(π / e, \infty)$