- #1
K29
- 103
- 0
Homework Statement
I have proven in two ways (correctly) that the derivative of ln|x| = 1/x (note absolute value does vanish)
Now I open my textbook and see a general rule that \frac{d}{dx} ln (u) = \frac{u'}{u}
And the not so general derivative of |x| is \frac{d}{dx} |x| = \frac{x}{|x|}
So using these statements \frac{d}{dx} ln (|x|) = \frac{|x|'}{|x|}
=\frac{(\frac{x}{|x|})}{|x|}
=\frac{x}{|x|^{2}}
I've looked over this a few times and I can't see what I've done wrong. I mean I'm looking for a silly mistake but I don't see it. Can you see where I've gone wrong? Whats going on here?
Last edited:
