What is the definite integral of $ln x$ $ln x$ from 0 to 1?

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What is the definite integral of $ln x$ $ln x$ from 0 to 1?

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Answer 1 · 2015-09-02T17:20:07

The integral should give you $- 1$ $-1$ .

Explanation:

We have:
$\int_{0}^{1} ln (x) d x =$ $int_0^1ln(x)dx=$ by parts: $= x ln x - \int x \frac{1}{x} d x = = x ln x - \int 1 d x = x ln x - x {∣ ∣ ∣}_{0}^{1}$ $=xlnx-intx1/xdx==xlnx-int1dx=xlnx-x|_0^1$
$= [1 ln (1) - 1] - [0 ln (0) - 0] =$ $=[1ln(1)-1]-[0ln(0)-0]=$
But $ln (0)$ $ln(0)$ cannot be evaluated:
$= [0 - 1] - [?]$ $=[0-1]-[?]$
Considering the meaning of integral (the area described by a curve and the $x$ $x$ axis) and the graph of your function:
graph{ln(x) [-2.375, 17.625, -8.44, 1.56]}
you can see that your function at zero continues indefinitely towards $- \infty$ $-oo$ giving you a never ending area!

BUT
$ln (0)$ $ln(0)$ may not exist, but does $lim_(x→0+)xln(x)$ exist? I think you will find it is $0$ and hence the value of the definite integral is $−1$ .
[After @George C.]

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What is the definite integral of $ln x$ $ln x$ from 0 to 1?

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