Let f be a differentiable function such that f - x - f x -02 f x dx - f 0-4- e 2-3- then f x isA- e x - e 2-1-3B- ex-e2-2-3C- ex-e-a r g-z-1-23D- 2 ex - e 2-1- - z - where - greatest integer - z is a complex number

The correct option is A e^x ( e^2 1/3 )f'(x)=f(x)+k ∫f'(x)/f(x)+k=∫ dx log (f(x)+k)=x+c f(x)=k_1e^x k f(0)=k_1 k=4 e^2/3 ....(1) k=∫_0^2f(x)dx 3k=k_1(e ...

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Standard XII

Mathematics

Differentiation under Integral Sign

Let f be a di...

Question

Let f be a differentiable function such that $f^{'} (x) = f (x) + \int_{0}^{2} f (x) d x, f (0) = \frac{4 - e^{2}}{3}$ , then f(x) is

e^{x} - (\frac{e^{2} - 1}{3})

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e^{x} - (\frac{e^{2} - 2}{3})

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e^{x} + \frac{e - [a r g | z - 1 |]}{3}

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2^{e x} - \frac{e^{2} - 1}{[a r g (- | z |)]}

(where [.] greatest integer & z is a complex number)

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Solution

The correct option is A $e^{x} - (\frac{e^{2} - 1}{3})$
$f^{'} (x) = f (x) + k \int \frac{f^{'} (x)}{f (x) + k} = \int d x l o g (f (x) + k) = x + c f (x) = k_{1} e^{x} - k f (0) = k_{1} - k = \frac{4 - e^{2}}{3}$ ....(1)
$k = \int_{0}^{2} f (x) d x 3 k = k_{1} (e^{2} - 1)$ ....(2)
Solving (1) and (2), we get
$f (x) = e^{x} - (\frac{e^{2} - 1}{3})$

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Similar questions

Q. Let f be a differentiable function such that

f^{'} (x) = f (x) + \int_{0}^{2} f (x) d x, f (0) = \frac{4 - e^{2}}{3}

, then f(x) is

Q. Let

f

be a differentiable function satisfying

f^{'} (x) = f (x) + 2 \int 0 f (x) d x

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f (0) = \frac{4 - e^{2}}{3}

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Q. Let

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be a differentiable function defined on

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such that

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

for all

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f (0) = 1

and

f (2) = e^{2} .

Then the value of

2 \int 0 f (x) d x

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f (x)

is a function satisfying

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with

f (0) = 1

and

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be another function such that

f (x) + g (x) = x^{2}

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Let f be a differentiable function such that f′(x)=f(x)+∫20f(x)dx,f(0)=4−e23, then f(x) is

The correct option is A ex−(e2−13)f′(x)=f(x)+k∫f′(x)f(x)+k=∫dxlog(f(x)+k)=x+cf(x)=k1ex−kf(0)=k1−k=4−e23 ....(1) k=∫20f(x)dx3k=k1(e2−1) ....(2) Solving (1) and (2), we get f(x)=ex−(e2−13)

Let f be a differentiable function such that $f^{'} (x) = f (x) + \int_{0}^{2} f (x) d x, f (0) = \frac{4 - e^{2}}{3}$ , then f(x) is