# 2 definitions for argument, why?

by Jhenrique
Tags: argument, definitions
 P: 686 In the wiki, I found this definition for the argument: http://en.wikipedia.org/wiki/List_of...al_definitions However, in other page of the wiki (http://en.wikipedia.org/wiki/Complex..._as_a_variable), I found this definition for argument:$$\arg(z) = \ln(\sqrt[2 i]{z \div \bar{z} }) = \frac{ln(z) - ln(\bar{z})}{2 i}$$I don't understand why exist 2 defitions for the argument and how those 2 defitions are related.
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Thanks
P: 1,001
 Quote by Jhenrique In the wiki, I found this definition for the argument:
This gives the inverse of $\mathrm{cis}\,\theta = \cos \theta + i \sin \theta = e^{i\theta}$. It is not a definition of the argument, but reflects the fact that if $z = e^{i\theta}$ then
$$-i \log e^{i\theta} = -i(i \theta) = \theta = \arg z.$$
It doesn't give $\arg z$ if $|z| = R \neq 1$:
$$-i \log (Re^{i\theta}) = -i \log R + \theta \neq \arg z$$

 However, in other page of the wiki (http://en.wikipedia.org/wiki/Complex..._as_a_variable), I found this definition for argument:$$\arg(z) = \ln(\sqrt[2 i]{z \div \bar{z} }) = \frac{ln(z) - ln(\bar{z})}{2 i}$$I don't understand why exist 2 defitions for the argument and how those 2 defitions are related.
This gives $\arg z$ for any $z \neq 0$ (if you choose the correct branch of $z^{1/(2i)}$).