Let fx - x - ln x - xln x x- 0- Column 1 Column 2 Column 3- I fx - 0 for some x - 1- e2 i lim x - fx - 0 P f is increasing in 0- 1- II f-x - 0 for some x - 1- e ii lim x - fx - - - Q f is decreasing in e- e2- III f-x - 0 for some x - 0- 1 iii lim x - f-x - - - R f- is increasing in 0- 1- IV f-x - 0 for some x - 1- e iv lim x - f-x - 0 S f- is decreasing in e- e2- -Which of the following options is the only CORRECT combination-

Column 1: (I) f(1) = 1 f(e^2) = e^2 + 2 2 · e^2 0 ⇒ f(1) · f(e^2) 0 ∴ f(x) = 0 for some x ∈ (1, e^2) Statement is correct. (II) f'(x) = 1/x ln x f'(1 ...

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Byju's Answer

Standard XII

Mathematics

Condition for Strictly Increasing

Let fx = x + ...

Question

Let $f (x) = x + ln x - x ln x x \in (0, \infty)$
$\begin{matrix} C o l u m n 1 & C o l u m n 2 & C o l u m n 3 (I) f (x) = 0 for some x \in (1, e^{2}) & (i) lim x \to \infty f (x) = 0 & (P) f is increasing in (0, 1) (I I) f^{'} (x) = 0 for some x \in (1, e) & (i i) lim x \to \infty f (x) = - \infty & (Q) f is decreasing in (e, e^{2}) (I I I) f^{'} (x) = 0 for some x \in (0, 1) & (i i i) lim x \to \infty f^{'} (x) = - \infty & (R) f^{'} is increasing in (0, 1) (I V) f^{''} (x) = 0 for some x \in (1, e) & (i v) lim x \to \infty f^{''} (x) = 0 & (S) f^{'} is decreasing in (e, e^{2}) \end{matrix}$

Which of the following options is the only CORRECT combination?

(I) (i i) (R)

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(I I) (i i i) (S)

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(I I I) (i v) (P)

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(I V) (i) (S)

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Solution

The correct option is B $(I I) (i i i) (S)$
Column 1:
$(I) f (1) = 1 f (e^{2}) = e^{2} + 2 - 2 \cdot e^{2} < 0 \Rightarrow f (1) \cdot f (e^{2}) < 0 ∴ f (x) = 0 for some x \in (1, e^{2})$
Statement is correct.
$(I I) f^{'} (x) = \frac{1}{x} - ln x f^{'} (1) = 1 f^{'} (e) = \frac{1}{e} - 1 < 0 \Rightarrow f^{'} (1) \cdot f^{'} (e) < 0 ∴ f^{'} (x) = 0 for some x \in (1, e)$
Statement is correct.
$(I I I) f^{'} (x) = \frac{1}{x} - ln x$

$∴ f^{'} (x) \neq 0 \forall x \in (0, 1)$
Statement is incorrect.
$(I V) f^{'} (x) = \frac{1}{x} - ln x f^{''} (x) = - \frac{1}{x^{2}} - \frac{1}{x} = - \frac{1}{x^{2}} (x + 1) f^{''} (1) = - 2 f^{''} (e) = - \frac{e + 1}{e^{2}} < 0 \Rightarrow f^{''} (1) \cdot f^{''} (e) > 0 ∴ f^{''} (x) \neq 0 \forall x \in (1, e)$
Statement is correct.

Column 2:
$lim x \to \infty f (x) = - \infty$
Therefore, statement $(i)$ is incorrect and statement $(i i)$ is correct.
$(i i i) f^{'} (x) = \frac{1}{x} - ln x lim x \to \infty = - \infty$
Statement is correct.
$(i i i) f^{''} (x) = - \frac{1}{x^{2}} - \frac{1}{x} lim x \to \infty = 0$
Statement is correct.

Column 3:
$(P) f^{'} (x) = \frac{1}{x} - ln x \Rightarrow f^{'} (x) > 0 \forall x \in (0, 1)$
Statement is correct.

$(Q)$ Similarly from the figure
$f^{'} (x) < 0 \forall x \in (e, e^{2})$
Statement is correct.
$(R) f^{''} (x) = - \frac{1}{x^{2}} (x + 1) \Rightarrow f^{''} (x) > 0 \forall x < - 1 ∴ f^{'} (x) is increasing in (- \infty, - 1) \Rightarrow f^{''} (x) < 0 \forall x > - 1 ∴ f^{'} (x) is decreasing in (- 1, \infty)$
$f^{'} (x) < 0 \forall x \in (e, e^{2})$
Statement is incorrect.
$(S)$ From above, we can say that,
Statement is correct.
Now,
$\begin{matrix} C o l u m n 1 & C o l u m n 2 & C o l u m n 3 (I) C o r r e c t & (i) I n c o r r e c t & (P) C o r r e c t (I I) C o r r e c t & (i i) C o r r e c t & (Q) C o r r e c t (I I I) I n c o r r e c t & (i i i) C o r r e c t & (R) I n c o r r e c t (I V) I n c o r r e c t & (i v) C o r r e c t & (S) C o r r e c t \end{matrix}$

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\begin{matrix} C o l u m n 1 & C o l u m n 2 & C o l u m n 3 (I) f (x) = 0 for some x \in (1, e^{2}) & (i) lim x \to \infty f (x) = 0 & (P) f is increasing in (0, 1) (I I) f^{'} (x) = 0 for some x \in (1, e) & (i i) lim x \to \infty f (x) = - \infty & (Q) f is decreasing in (e, e^{2}) (I I I) f^{'} (x) = 0 for some x \in (0, 1) & (i i i) lim x \to \infty f^{'} (x) = - \infty & (R) f^{'} is increasing in (0, 1) (I V) f^{''} (x) = 0 for some x \in (1, e) & (i v) lim x \to \infty f^{''} (x) = 0 & (S) f^{'} is decreasing in (e, e^{2}) \end{matrix}

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f (x) = x + ln x - x ln x, x \in (0, \infty)

\begin{matrix} C o l u m n 1 & C o l u m n 2 & C o l u m n 3 (I) f (x) = 0 for some x \in (1, e^{2}) & (i) lim x \to \infty f (x) = 0 & (P) f is increasing in (0, 1) (I I) f^{'} (x) = 0 for some x \in (1, e) & (i i) lim x \to \infty f (x) = - \infty & (Q) f is decreasing in (e, e^{2}) (I I I) f^{'} (x) = 0 for some x \in (0, 1) & (i i i) lim x \to \infty f^{'} (x) = - \infty & (R) f^{'} is increasing in (0, 1) (I V) f^{''} (x) = 0 for some x \in (1, e) & (i v) lim x \to \infty f^{''} (x) = 0 & (S) f^{'} is decreasing in (e, e^{2}) \end{matrix}

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f (x) = x + ln x - x ln x x \in (0, \infty)

\begin{matrix} C o l u m n 1 & C o l u m n 2 & C o l u m n 3 (I) f (x) = 0 for some x \in (1, e^{2}) & (i) lim x \to \infty f (x) = 0 & (P) f is increasing in (0, 1) (I I) f^{'} (x) = 0 for some x \in (1, e) & (i i) lim x \to \infty f (x) = - \infty & (Q) f is decreasing in (e, e^{2}) (I I I) f^{'} (x) = 0 for some x \in (0, 1) & (i i i) lim x \to \infty f^{'} (x) = - \infty & (R) f^{'} is increasing in (0, 1) (I V) f^{''} (x) = 0 for some x \in (1, e) & (i v) lim x \to \infty f^{''} (x) = 0 & (S) f^{'} is decreasing in (e, e^{2}) \end{matrix}

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Which of the following options is the only correct combination?

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