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I keep getting wrong results when trying to differentiate this:

${\partial \over \partial x} \ln{(x - \sqrt{x^2+a^2})}$

Thanks for hints!

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    It's not$a$constant originally, sorry, I guess I confused the description...2012-06-21

3 Answers 3

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There may be a typo in the question, since the thing inside the logarithm is $\le 0$. So we solve a different problem, finding the derivative of $\ln(|x-\sqrt{x^2+a^2}|)$, or more simply of $\ln(\sqrt{x^2+a^2}-x)$.

Differentiate, using the Chain Rule (twice). We get $\frac{\frac{x}{\sqrt{x^2+a^2}}-1}{\sqrt{a^2+x^2}-x}.$

Bring the top to a common denominator, and simplify. We get $-\frac{1}{\sqrt{x^2+a^2}}.$

Another variant that makes sense in the reals is finding the derivative of $\ln(x-\sqrt{x^2-a^2})$. The same method yields $-\frac{1}{\sqrt{x^2-a^2}}$.

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    The teacher who wrote these doesn't allow slips. Luckily, I'll be examined by another teacher, who has a more human attitude, like you...2012-06-21
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You should be getting, firstly

$\frac{\partial }{{\partial x}}\ln \left( {x - \sqrt {{x^2} + {a^2}} } \right) = \frac{{\frac{\partial }{{\partial x}}\left( {x - \sqrt {{x^2} + {a^2}} } \right)}}{{x - \sqrt {{x^2} + {a^2}} }}$

Then

$\frac{\partial }{{\partial x}}\left( {x - \sqrt {{x^2} + {a^2}} } \right) = \frac{\partial }{{\partial x}}x - \frac{\partial }{{\partial x}}\sqrt {{x^2} + {a^2}} $

For

$\frac{\partial }{{\partial x}}\sqrt {{x^2} + {a^2}} = \frac{\partial }{{\partial x}}{\left( {{x^2} + {a^2}} \right)^{\frac{1}{2}}}$

use the power rule and the chain rule:

$\frac{\partial }{{\partial x}}u{\left( {x,a} \right)^n} = nu{\left( {x,a} \right)^{n - 1}}u'\left( {x,a} \right)$

I think you should be having either

$\ln \left( {x + \sqrt {{x^2} + {a^2}} } \right)$

or

$\ln \left( {\sqrt {{x^2} + {a^2}} - x} \right)$

as the original function, since your function is complex valued for any $x$. Anyways, the result will remain the same.

2

An other method: $y=\ln |x- \sqrt{x^2+a^2}|$ gives :

$\begin{align*} e^y &= x-\sqrt{x^2+a^2}\\ (e^y-x)^2 &=x^2+a^2 \\ 2(e^y-x) \left(e^y\frac{dy}{dx} -1\right) &=2x \\ e^y\frac{dy}{dx}&= 1+\frac{x}{e^y-x}=\frac{e^y}{e^y-x}\end{align*}$ Since : $e^y-x=-\sqrt{x^2+a^2}$, this gives : $\frac{dy}{dx}= - \frac{1}{\sqrt{x^2+a^2}}$