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Abijith Mg · Answer 1 · 2023-07-07T09:26:19+0000

It looks like the integral is

$\displaystyle \int_0^1 (2x - 8x^2)/(1+4x) \, dx$

Polynomial division yields

$(2x-8x^2)/(1+4x) = -2x + 1 - \frac1{1+4x}$

Now split up the integral as

$\displaystyle \int_0^1 \left(-2x + 1 - \frac1{1+4x}\right) \, dx = \int_0^1 (1-2x) \, dx - \int_0^1 (dx)/(1+4x)$

In the second integral, substitute
u=1+4x and
$du=4\,dx$ . Then
$x=0 \implies u=1$ and
$x=1 \implies u=5$ , so

$\displaystyle \int_0^1 (dx)/(1+4x) = \frac14 \int_1^5 \frac{du}u$

and by the fundamental theorem of calculus, the integral we want evaluates to

$\displaystyle \int_0^1 \left(-2x + 1 - \frac1{1+4x}\right) \, dx = \int_0^1 (1-2x) \, dx - \frac14 \int_1^5 \frac{du}u \\\\ = (x - x^2)\bigg|_(x=0)^(x=1) - \frac14 \ln|u| \bigg|_(u=1)^(u=5) \\\\ = \bigg((1 - 1^2) - (0 - 0^2)\bigg) - \frac14 (\ln(5) - \ln(1)) = \boxed{-\frac{\ln(5)}4}$

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