Let f be any function defined on - and let it satisfy the condition -fx-fy- -x-y2- x-y-If f0-1- then

|f(x) f(y)|≤ |(x y)^2|,∀ x,y ∈ℝ ⇒|f(x) f(y)x y|≤ |x y| ⇒ nbsp;lim_x→ y|f(x) f(y)x y|≤ 0 ⇒ |f'(y)|≤ 0 ⇒ f'(y)=0 ⇒ f(y)=C Since f(0)=1⇒ f(y)=1 ∀ y∈ℝ ...

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Byju's Answer

Standard XIII

Mathematics

Derivative from First Principle

Let f be any ...

Question

Let $f$ be any function defined on $R$ and let it satisfy the condition :
$| f (x) - f (y) | \leq | (x - y)^{2} |, \forall x, y \in R$
If $f (0) = 1,$ then

f (x) < 0, \forall x \in R

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f (x)

can take any value in

R .

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f (x) = 0, \forall x \in R

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f (x) > 0, \forall x \in R

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Solution

The correct option is D $f (x) > 0, \forall x \in R$
$| f (x) - f (y) | \leq | (x - y)^{2} |, \forall x, y \in R$
$\Rightarrow ∣ ∣ ∣ \frac{f (x) - f (y)}{x - y} ∣ ∣ ∣ \leq | x - y |$
$\Rightarrow lim x \to y ∣ ∣ ∣ \frac{f (x) - f (y)}{x - y} ∣ ∣ ∣ \leq 0$
$\Rightarrow | f^{'} (y) | \leq 0 \Rightarrow f^{'} (y) = 0$
$\Rightarrow f (y) = C$
Since $f (0) = 1 \Rightarrow f (y) = 1 \forall y \in R$

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Similar questions

Q. Let

f

be any function defined on

R

and let it satisfy the condition :

| f (x) - f (y) | \leq | (x - y)^{2} |, \forall x, y \in R

f (0) = 1,

then

Q. Let

f : (- 1, \infty) \to R

be defined by

f (0) = 1

and

f (x) = \frac{1}{x} {log}_{e} (1 + x), x \neq 0

. Then the function

f

Q. Let

f (x)

be defined for all

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and be continuous,Let

f (x)

satisfy

f (\frac{x}{y}) = f (x) - f (y)

for all x,y,

f (e) = 1

Then

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λ f (x y) = \frac{f (x)}{y} + \frac{f (y)}{x}

\forall

x, y

> 0

. If

f (x)

is differentiable and

f (1) = 1

, then the value of

lim x \to \infty x

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Q. Let

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be a differentiable function satisfying

f (\frac{x + y}{2}) = \frac{f (x) + f (y)}{2} \forall x, y \in R

, where

f (0) = 0

and

I = 2 π \int 0 {(f (x) - sin x)}^{2} d x .

Which of the following is/are correct?

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Let f be any function defined on R and let it satisfy the condition : |f(x)−f(y)|≤|(x−y)2|,∀ x,y∈R If f(0)=1, then

The correct option is D f(x)>0,∀ x∈R|f(x)−f(y)|≤|(x−y)2|,∀ x,y∈R ⇒∣∣∣f(x)−f(y)x−y∣∣∣≤|x−y| ⇒limx→y∣∣∣f(x)−f(y)x−y∣∣∣≤0 ⇒|f′(y)|≤0⇒f′(y)=0 ⇒f(y)=C Since f(0)=1⇒f(y)=1 ∀ y∈R

Let $f$ be any function defined on $R$ and let it satisfy the condition :
$| f (x) - f (y) | \leq | (x - y)^{2} |, \forall x, y \in R$
If $f (0) = 1,$ then