Let fx be a differentiable function defined on -0- 2- such that f-x-f-2-x for all x - 0-2- f0-1 and f2-e2- Then the value of -20fxdx is

F'(x)=f'(2 x) On integrating both sides, we get f(x)= f(2 x)+c Put x=0 f(0)+f(2)=c ⇒ c=1+e^2 ∴ f(x)+f(2 x)=1+e^2 I= ∫^2_0f(x)dx = ∫^1_0 {f(x)+f(2 x)}dx=1+e^2 ...

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Byju's Answer

Standard XII

Mathematics

Property 3

Let fx be a d...

Question

Let $f (x)$ be a differentiable function defined on $[0, 2]$ such that $f^{'} (x) = f^{'} (2 - x)$ for all $x \in (0, 2),$ $f (0) = 1$ and $f (2) = e^{2} .$ Then the value of $2 \int 0 f (x) d x$ is

1 + e^{2}

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1 - e^{2}

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2 (1 - e^{2})

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2 (1 + e^{2})

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Solution

The correct option is A $1 + e^{2}$
$f^{'} (x) = f^{'} (2 - x)$
On integrating both sides, we get
$f (x) = - f (2 - x) + c$
Put $x = 0$
$f (0) + f (2) = c$
$\Rightarrow c = 1 + e^{2}$
$∴ f (x) + f (2 - x) = 1 + e^{2}$
$I = 2 \int 0 f (x) d x$
$= 1 \int 0 {f (x) + f (2 - x)} d x = 1 + e^{2}$

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Similar questions

Q. Let

f (x)

be a differentiable function defined on

[0, 2]

such that

f^{'} (x) = f^{'} (2 - x)

for all

x \in (0, 2),

f (0) = 1

and

f (2) = e^{2} .

Then the value of

2 \int 0 f (x) d x

Q. Let

f : [0, 2] \to

R be a function which is continuous on [0, 2] and is differentiable on (0, 2) with

f (0) = 1

Let

F (x) = \int_{0}^{x^{2}} f (\sqrt{t}) d t

for

x \in [0, 2]

. If

F^{'} (x) = f^{'} (x)

for all x

\in (0, 2)

, then F(2) equals:

Q. Let

f

be a twice differentiable function defined on

R

such that

f (0) = 1,

f^{'} (0) = 2

and

f^{'} (x) \neq 0

for all

x \in R .

∣ ∣ ∣ \begin{matrix} f (x) & f^{'} (x) f^{'} (x) & f^{''} (x) \end{matrix} ∣ ∣ ∣ = 0,

for all

x \in R,

then the value of

f (1)

lies in the interval

Q. Let

f : [0, 2] \to R

be a function which is continuous on [0,2] and is differentiable on (0,2) with f(0)=1.
Let

F (x) = \int_{0}^{x^{2}} f (\sqrt{t}) d t, f o r x ϵ [0, 2], I f F^{'} (x) = f^{'} (x), \forall x ϵ (0, 2),

then F(2) equals

Q. Let

f : [0, 2] \to R

a function which is continuous on

[0, 2]

and is differentiable on

(0, 2)

with

f (0) = 1

. Let

F (x) = x^{2} \int 0 f (\sqrt{t}) d t,

for

x \in [0, 2]

, if

F^{'} (x) = f^{'} (x), \forall x \in (0, 2),

then

F (2)

equals to

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Let f(x) be a differentiable function defined on [0,2] such that f′(x)=f′(2−x) for all x∈(0,2), f(0)=1 and f(2)=e2. Then the value of 2∫0f(x)dx is

The correct option is A 1+e2f′(x)=f′(2−x) On integrating both sides, we get f(x)=−f(2−x)+c Put x=0 f(0)+f(2)=c ⇒c=1+e2 ∴f(x)+f(2−x)=1+e2 I=2∫0f(x)dx =1∫0{f(x)+f(2−x)}dx=1+e2

Let $f (x)$ be a differentiable function defined on $[0, 2]$ such that $f^{'} (x) = f^{'} (2 - x)$ for all $x \in (0, 2),$ $f (0) = 1$ and $f (2) = e^{2} .$ Then the value of $2 \int 0 f (x) d x$ is

The correct option is A $1 + e^{2}$
$f^{'} (x) = f^{'} (2 - x)$
On integrating both sides, we get
$f (x) = - f (2 - x) + c$
Put $x = 0$
$f (0) + f (2) = c$
$\Rightarrow c = 1 + e^{2}$
$∴ f (x) + f (2 - x) = 1 + e^{2}$
$I = 2 \int 0 f (x) d x$
$= 1 \int 0 {f (x) + f (2 - x)} d x = 1 + e^{2}$