Download App

STD 12 - 6. Application of derivatives — JEE STD 11 Science — Question

Gujarat BoardEnglish MediumSTD 11 ScienceJEESTD 12 - 6. Application of derivatives4 Marks
MCQ
Let $h$ be a twice continuously differentiable positive function on an open interval $J.$ Let $g(x) = ln\left( {h(x)} \right)$ for each $x \in J$. Suppose ${\left( {h'(x)} \right)^2} > h''(x) h(x) $ for each $x \in J$. Then
  • A
    $g$ is increasing on $J$
  • B
    $g$ is decreasing on $J$
  • C
    $g$ is concave up on $J$
  • $g$ is concave down on $J$

Answer

Correct option: D.
$g$ is concave down on $J$
d
Given $g(x) = ln\left( {h(x)} \right)$

$g ' (x) = \frac{{h'(x)}}{{h(x)}}$

$g''(x) = \frac{{h(x)h''(x) - {{(h'(x))}^2}}}{{{h^2}(x)}}$ < 0

$ g''(x) \leq 0\Rightarrow  \,\,g (x)$  is concave down

Need a full question paper?

Generate a complete, print-ready paper with questions like this in minutes — across 16+ boards, with answer keys.

Start Generating Free

Explore more

JEE STD 11 Science question papersGujarat Board STD 11 Science question papersGujarat Board question paper generator

Similar questions

$\int {{{\sec }^2}\theta } \,\,{(\sec \theta \, + \,\tan \theta )^2}\,\,d\theta $
The eccentricity of the ellipse $ (x - 3)^2 + (y - 4)^2 =$ $\frac{{{y^2}}}{9}\,$  is
Let the mean and variance of $8$ numbers $x , y , 10$, $12,6,12,4,8$, be $9$ and $9.25$ respectively. If $x > y$, then $3 x-2 y$ is equal to $...........$.
The length of the perpendicular from point $(1, 2, 3)$ to the line $\frac{{x - 6}}{3} = \frac{{y - 7}}{2} = \frac{{z - 7}}{{ - 2}}$ is
The area between the parabolas ${x^2} = \frac{y}{4}$ and ${x^2} = 9y$ and the striaght line $y=2 $ is :
If the set $A$ has $p$ elements, $B$  has $q$ elements, then the number of elements in $A × B$ is
There are two urns. Urm $A$ has $3$ distinct red balls and urn $B$ has $9$ distinct blue balls. From each urm two balls are taken out at random and then transferred to the other. The number of ways in which this can be done is
If $n (2 n +1) \int_{0}^{1}\left(1- x ^{ n }\right)^{2 n } dx =1177 \int_{0}^{1}\left(1- x ^{ n }\right)^{2 n +1} dx$, then $n \in N$ is equal to $\dots\dots$
$\lim \limits_{x \rightarrow a} \frac{(a+2 x)^{\frac{1}{3}}-(3 x)^{\frac{1}{3}}}{(3 a+x)^{\frac{1}{3}}-(4 x)^{\frac{1}{3}}}(a \neq 0)$ is equal to
The coefficient of ${x^n}$ in the expansion of ${(1 + x + {x^2} + ....)^{ - n}}$ is