The value of -011-ex- edx is

Explanation for the correct answer.Evaluate the integral.∫_0^11/e^x+ edx0ex0ex=∫_0^11/e^x(1+e/e^x)dxLet, 1+e/e^x=t0ex0ex⇒ e/e^xdx=dt0ex0ex⇒1/e^xdx= 1/edtI= 1/e ...

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Standard XII

Mathematics

Parametric Differentiation

The value of ...

Question

The value of $\int_{0}^{1} \frac{1}{e^{x} + e} d x$ is

$(\frac{1}{e}) \log [(\frac{1 + e}{2})]$

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$\log [(\frac{1 + e}{2})]$

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$(\frac{1}{e}) \log (1 + e)$

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$\log [\frac{2}{(1 + e)}]$

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$(\frac{1}{e}) \log [\frac{2}{(1 + e)}]$

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Solution

The correct option is A
$(\frac{1}{e}) \log [(\frac{1 + e}{2})]$

Explanation for the correct answer.
Evaluate the integral.
$\int_{0}^{1} \frac{1}{e^{x} + e} d x = \int_{0}^{1} \frac{1}{e^{x} (1 + \frac{e}{e^{x}})} d x$
Let,
$1 + \frac{e}{e^{x}} = t \Rightarrow - \frac{e}{e^{x}} d x = d t \Rightarrow \frac{1}{e^{x}} d x = - \frac{1}{e} d t$
$I = - \frac{1}{e} \int_{1 + e}^{2} \frac{d t}{t} = - \frac{1}{e} {[\log t]}_{1 + e}^{2} = - \frac{1}{e} [\log \frac{2}{1 + e}] = \frac{1}{e} [\log \frac{1 + e}{2}]$
Hence, option A is correct .

Suggest Corrections

The value of ∫011ex+edx is

The correct option is A 1elog1+e2Explanation for the correct answer.Evaluate the integral.∫011ex+edx=∫011ex1+eexdxLet, 1+eex=t⇒-eexdx=dt⇒1exdx=-1edtI=-1e∫1+e2dtt=-1elogt1+e2=-1elog21+e=1elog1+e2Hence, option A is correct .

The value of $\int_{0}^{1} \frac{1}{e^{x} + e} d x$ is