Differential Calculus Limit | JEE Limit Question Answers

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Q.
Let $f : (0, 1) \to ℝ$ be a function defined by $f (x) = \frac{1}{1 - e^{- x}}$ and $g (x) = (f (- x) - f (x))$ . Consider two statements

(I) g is an increasing function in (0, 1)

(II) g is one-one in (0, 1)

Then,

A
Only (I) is true

B
Both (I) and (II) are true

C
Neither (I) nor (II) is true

D
Only (II) is true

Related Questions :-

Q. 1
$L e t a_{1}, a_{2}, a_{3}, . ., a_{n} b e n p o s i t i v e c o n s e c u t i v e t e r m s o f a n a r i t h m e t i c p r o g r e s s i o n . I f d > 0 i s i t s c o m m o n d i f f e r e n c e, t h e n$

$\lim_{n \to \infty} \sqrt{\frac{d}{n}} (\frac{1}{\sqrt{a_{1}} + \sqrt{a_{2}}} + \frac{1}{\sqrt{a_{2}} + \sqrt{a_{3}}} + . . . + \frac{1}{\sqrt{a_{n - 1}} + \sqrt{a_{n}}}) i s$

A. 1
$(c) : W e h a v e, a_{1}, a_{2}, . . . ., a_{n} a r e i n A . P .$

$∴ a_{2} - a_{1} = a_{3} - a_{2} = . . . . . . = a_{n} - a_{n - 1} = d$

$N o w, \lim_{n \to \infty} \sqrt{\frac{d}{n}} (\frac{1}{\sqrt{a_{1}} + \sqrt{a_{2}}} + \frac{1}{\sqrt{a_{2}} + \sqrt{a_{3}}} + . . . + \frac{1}{\sqrt{a_{n - 1}} + \sqrt{a_{n}}})$

$= \lim_{n \to \infty} \sqrt{\frac{d}{n}} (\frac{\sqrt{a_{2}} - \sqrt{a_{1}}}{a_{2} - a_{1}} + \frac{\sqrt{a_{3}} - \sqrt{a_{2}}}{a_{3} - a_{2}} + . . . + \frac{\sqrt{a_{n}} - \sqrt{a_{n - 1}}}{a_{n} - a_{n - 1}})$

$= \lim_{n \to \infty} \sqrt{\frac{d}{n}} (\frac{\sqrt{a_{2}} - \sqrt{a_{1}}}{d} + \frac{\sqrt{a_{3}} - \sqrt{a_{2}}}{d} + . . . + \frac{\sqrt{a_{n}} - \sqrt{a_{n - 1}}}{d})$

$= \lim_{n \to \infty} \frac{1}{\sqrt{n d}} (\sqrt{a_{n}} - \sqrt{a_{1}})$

$= \lim_{n \to \infty} \frac{1}{\sqrt{n d}} (\frac{a_{n} - a_{1}}{\sqrt{a_{n}} + \sqrt{a_{1}}}) = \lim_{n \to \infty} \frac{1}{\sqrt{n d}} \frac{(n - 1) d}{\sqrt{a_{n}} + \sqrt{a_{1}}}$

$= \lim_{n \to \infty} \frac{1}{\sqrt{n d}} \frac{n (1 - \frac{1}{n}) d}{\sqrt{n} (\sqrt{\frac{a_{1}}{n} + (1 - \frac{1}{n})} d + \sqrt{\frac{a_{1}}{n}})}$

$= \lim_{n \to \infty} \frac{(1 - \frac{1}{n}) d}{\sqrt{d} (\sqrt{\frac{a_{1}}{n} + d - \frac{d}{n}}) + \sqrt{\frac{a_{1}}{n}}} = \frac{d}{\sqrt{d} \cdot \sqrt{d}} = 1$

Q. 2
Among

$(S 1) : \lim_{n \to \infty} \frac{1}{n^{2}} (2 + 4 + 6 + . . . + 2 n) = 1$

$(S 2) : \lim_{n \to \infty} \frac{1}{n^{16}} (1^{15} + 2^{15} + 3^{15} + . . . . + n^{15}) = \frac{1}{16}$

A. 2
(d) : $(S 1) : \lim_{n \to \infty} \frac{1}{n^{2}} (2 + 4 + 6 + . . . + 2 n)$

$= \lim_{n \to \infty} \frac{1}{n^{2}} \times 2 (1 + 2 + 3 + . . . + n)$

$= \lim_{n \to \infty} \frac{1}{n^{2}} \times 2 \times \frac{n (n + 1)}{2} = \lim_{n \to \infty} (1 + \frac{1}{n}) = 1$

$∴ (S 1) i s t r u e .$

$(S 2) : \lim_{n \to \infty} \frac{1}{n^{16}} (1^{15} + 2^{15} + 3^{15} + . . . . + n^{15}) = \lim_{n \to \infty} \frac{1}{n^{16}} \sum_{r = 1}^{n} r^{15}$

$= \lim_{n \to \infty} \frac{1}{n} \sum_{r = 1}^{n} {(\frac{r}{n})}^{15} = \int_{0}^{1} x^{15} d x = | \frac{x^{16}}{16} |_{0}^{1} = \frac{1}{16}$

(S2) is also true.

Q. 3
$\lim_{n \to \infty} {(2^{\frac{1}{2}} - 2^{\frac{1}{3}}) (2^{\frac{1}{2}} - 2^{\frac{1}{5}}) . . . . (2^{\frac{1}{2}} - 2^{\frac{1}{2 n + 1}})} i s e q u a l t o$

A. 3
(c) : $L e t L = \lim_{n \to \infty} {(2^{\frac{1}{2}} - 2^{\frac{1}{3}}) (2^{\frac{1}{2}} - 2^{\frac{1}{5}}) . . . . (2^{\frac{1}{2}} - 2^{\frac{1}{2 n + 1}})}$

$B y S a n d w i c h T h e o r e m,$

${(2^{\frac{1}{2}} - 2^{\frac{1}{3}})}^{n} < (2^{\frac{1}{2}} - 2^{\frac{1}{3}}) (2^{\frac{1}{2}} - 2^{\frac{1}{5}}) (2^{\frac{1}{2}} - 2^{\frac{1}{7}}) . . . . (2^{\frac{1}{2}} - 2^{\frac{1}{2 n + 1}}) < {(2^{\frac{1}{2}} - 2^{\frac{1}{2 n + 1}})}^{n}$

$\Rightarrow \lim_{n \to \infty} {(2^{\frac{1}{2}} - 2^{\frac{1}{3}})}^{n} < L < \lim_{n \to \infty} {(2^{\frac{1}{2}} - 2^{\frac{1}{2 n + 1}})}^{n}$

$A s, \lim_{n \to \infty} {(2^{\frac{1}{2}} - 2^{\frac{1}{3}})}^{n} = 0 a n d \lim_{n \to \infty} {(2^{\frac{1}{2}} - 2^{\frac{1}{2 n + 1}})}^{n} = 0$

$∴ L = 0$

Q. 4
$\lim_{x \to 0} ((\frac{1 - \cos^{2} (3 x)}{\cos^{3} (4 x)}) (\frac{\sin^{3} (4 x)}{(\log_{e} {(2 x + 1))}^{5}})) i s e q u a l t o_____.$

A. 4
(d) : $\lim_{x \to 0} [(\frac{(1 - \cos^{2} 3 x)}{\cos^{3} (4 x)}) (\frac{\sin^{3} (4 x)}{(\log_{e} {(2 x + 1))}^{5}})]$

$= \lim_{x \to 0} [\frac{\sin^{2} (3 x)}{\cos^{3} 4 x} \times \frac{\sin^{3} (4 x)}{[\log_{e} {(2 x + 1)]}^{5}}]$

$= \lim_{x \to 0} [\frac{\frac{\sin^{2} (3 x)}{{(3 x)}^{2}} \times \frac{\sin^{3} (4 x)}{{(4 x)}^{3}} \times {(3 x)}^{2} \times {(4 x)}^{3}}{\cos^{3} (4 x) \cdot {[\frac{\log_{e} (2 x + 1)}{2 x}]}^{5} \times {(2 x)}^{5}}]$

$= \frac{9 \times 64}{32} = 18$

Q. 5
$I f α > β > 0 a r e t h e r o o t s o f t h e e q u a t i o n a x^{2} + b x + 1 = 0, a n d \lim_{x \to \frac{1}{α}} {(\frac{1 - \cos (x^{2} + b x + a)}{2 {(1 - α x)}^{2}})}^{\frac{1}{2}} = \frac{1}{k} (\frac{1}{β} - \frac{1}{α}), t h e n k i s e q u a l t o$

A. 5
(d) : $G i v e n, a x^{2} + b x + 1 = 0 h a s r o o t s α, β, t h e n x^{2} + b x + a = 0 h a s r o o t s \frac{1}{α}, \frac{1}{β} .$

$N o w, \lim_{x \to \frac{1}{α}} {(\frac{1 - \cos (x^{2} + b x + a)}{2 {(1 - α x)}^{2}})}^{1 / 2}$

$= \lim_{x \to \frac{1}{α}} {(\frac{2 \sin^{2} (\frac{x^{2} + b x + a}{2})}{2 {(1 - α x)}^{2}})}^{1 / 2}$

$= \lim_{x \to \frac{1}{α}} {(\frac{2 \sin^{2} (\frac{(x - \frac{1}{α}) (x - \frac{1}{β})}{2})}{2 {(1 - α x)}^{2}})}^{1 / 2}$

$= \lim_{x \to \frac{1}{α}} {(\frac{\frac{\sin^{2} (\frac{(1 - α x) (1 - β x)}{2 α β})}{{(\frac{(1 - α x) (1 - β x)}{2 α β})}^{2}} \times {(\frac{(1 - α x) (1 - β x)}{2 α β})}^{2}}{{(1 - α x)}^{2}})}^{1 / 2}$

$= \lim_{x \to \frac{1}{α}} (\frac{1 - β x}{2 α β}) = (\frac{α - β}{2 α^{2} β}) = \frac{1}{2 α} (\frac{1}{β} - \frac{1}{α})$

$= \frac{1}{k} (\frac{1}{β} - \frac{1}{α}) (\Rightarrow G i v e n)$

$S o, k = 2 α$

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