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Algebra of Limits

Let F:R→ R be...

Question

Let $F : R \to R$ be a function. We say that $f$ has
PROPERTY $1$ if $\lim_{h \to 0} \frac{f (h) - f (0)}{\sqrt{|h|}}$ exists and is fine
PROPERTY $2$ if $\lim_{h \to 0} \frac{f (h) - f (0)}{h^{2}}$ exists and is fine
Then which of the following options is/are correct?

A

$f (x) = x |x|$ has $PROPERTY2$

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B

$F (x) = x^{2 / 3}$ has $PROPERTY1$

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C

$f (x) = \sin x$ has $PROPERTY2$

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D

$f (x) = |x|$ has $PROPERTY1$

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Solution

The correct option is D
$f (x) = |x|$ has $PROPERTY1$

Explanation for correct option(s)
Option B : $F (x) = x^{2 / 3}$ has PROPERTY $1$
Consider the given equation as,
$\lim_{h \to 0} \frac{f (h) - f (0)}{\sqrt{|h|}}$
If $F (x) = x^{2 / 3}$
$\lim_{h \to + 0} \frac{h^{2 / 3} - 0}{\sqrt{|h|}} = \lim_{h \to + 0} \frac{h^{2 / 3}}{\sqrt{|h|}} = 0 \lim_{h \to - 0} \frac{- h^{2 / 3} + 0}{\sqrt{|h|}} = \lim_{h \to - 0} \frac{- h^{2 / 3}}{\sqrt{|h|}} = 0$
Both values are same so that the limit dos exist
Option D: $f (x) = |x|$ has PROPERTY $1$
If $f (x) = |x|$
$\lim_{h \to + 0} \frac{|h| - 0}{\sqrt{|h|}} = \lim_{h \to + 0} \frac{|h|}{\sqrt{|h|}} = 0 \lim_{h \to - 0} \frac{- |h| + 0}{\sqrt{|h|}} = \lim_{h \to - 0} \frac{- |h|}{\sqrt{|h|}} = 0$
Both values are same so that the limit dose exist
Explanation for incorrect option(s)
Option A: $f (x) = x |x|$ has PROPERTY $2$
Consider the given equation as,
$\lim_{h \to 0} \frac{f (h) - f (0)}{h^{2}}$
if $f (x) = x |x|$
$\lim_{h \to + 0} \frac{h |h| - 0}{h^{2}} = \lim_{h \to + 0} \frac{h |h|}{h^{2}} = \lim_{h \to + 0} \frac{h^{2}}{h^{2}} = 1$
$\lim_{h \to - 0} \frac{h |h| - 0}{h^{2}} = \lim_{h \to - 0} \frac{- h |h|}{h^{2}} = \lim_{h \to - 0} \frac{- h^{2}}{h^{2}} = - 1$
Both values are not same so that the limit dose not exist
Option C: $f (x) = \sin x$ has PROPERTY $2$
Consider the given equation as,
$\lim_{h \to 0} \frac{f (h) - f (0)}{h^{2}}$
if $f (x) = \sin x$
$\lim_{h \to + 0} \frac{\sin (h) - \sin (0)}{h^{2}} = \lim_{h \to + 0} \frac{\sin (h)}{h^{2}} = \lim_{h \to + 0} \frac{\sin (h)}{h} \frac{1}{h}$
$\lim_{h \to - 0} \frac{- \sin (h) + \sin (0)}{h^{2}} = \lim_{h \to - 0} \frac{- \sin (h)}{h^{2}} = \lim_{h \to - 0} \frac{- \sin (h)}{h} \frac{1}{h}$
Both values are not same so that the limit dose not exist
Therefore, the correct answers are option (B) and (D).

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Similar questions

f : R \to R

be a function. We say that

f

1

lim h \to 0 \frac{f (h) - f (0)}{\sqrt{| h |}}

exists and is finite, and
PROPERTY

2

lim h \to 0 \frac{f (h) - f (0)}{h^{2}}

exists and is finite.
Then which of the following options is/are correct?

f : R \to R

be a function. We say that

f

1

lim h \to 0 \frac{f (h) - f (0)}{\sqrt{| h |}}

exists and is finite, and
PROPERTY

2

lim h \to 0 \frac{f (h) - f (0)}{h^{2}}

exists and is finite.
Then which of the following options is/are correct?

Q. If ‘f ’ is an increasing function from

R \to R

such that f'' (x) > 0 and

f^{- 1}

\frac{(f^{- 1} (x))}{d x^{2}}

f (x)

be a continous and differentiable function on

[0, 1]

f (0) \neq 0

f (1) = 0

. We can conclude that there exists

c \in (0, 1)

Q. For every twice differentiable function

f : R \to [- 2, 2]

(f (0))^{2} + (f^{'} (0))^{2} = 85

, which of the following statement(s) is (are) TRUE?

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