Talk:Fundamental Theorem of Algebra

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	To learn how to update the categories for this article, see here. To update categories, edit the metadata template.  Definition:  Any nonconstant polynomial whose coefficients are complex numbers has at least one complex number as a root. [d] [e] Checklist and Archives  Workgroup category:  Mathematics [Categories OK]  Talk Archive:  none  English language variant:  British English Unused subpages  Unused subpages:  - Bibliography - External Links - Works - Discography - Filmography - Catalogs - Timelines - Gallery - Audio - Video - Code - Tutorials - Student Level - Signed Articles - Function - Addendum - Debate Guide - Advanced - Recipes - Citable Version

just started the article

This is some material that used to be in the complex number article, but I felt an entire article on the fundamental theorem of algebra would be the better place for it. However all I did was cut and paste from there to here, so this article doesn't have a good structure yet. Feel free to attack it! - Greg Martin 18:54, 29 April 2007 (CDT); clarified by Jitse Niesen 02:35, 9 May 2007 (CDT)

W.l.o.g.

What does this mean?--Paul Wormer 21:12, 13 March 2008 (CDT)

Also "counting multiplicity" - I'm guessing that it means that Tp=Tq (e.g. in (x + 2)(x + 2)), but you ought to say that explicitly. Other than that, great intro - crystal clear. J. Noel Chiappa 09:59, 14 March 2008 (CDT)

I think W.l.o.g. means "without loss of generality" and I don't see any connection with multiplicity of roots. You and I differing on intepretation, I wouldn't call the article crystal clear.--Paul Wormer 10:42, 14 March 2008 (CDT)

Umm, I just meant the intro was crystal clear. And my mention of "counting multiplicity" was in the sense of "what does this mean" - i.e. the article needs to be changed to make it clear. J. Noel Chiappa 13:53, 14 March 2008 (CDT)

Wlog is indeed "without loss of generality". I think it's bad style to use this abbreviation (even though people that know about homotopy groups probably know this abbreviation) so I wrote it out.

"Counting multiplicity" means what is says in the formula above that phrase. For instance, the quadratic polynomial ${\displaystyle x^{2}-2x+1}$ is only zero at ${\displaystyle x=1}$, but this is a double root because ${\displaystyle x^{2}-2x+1=(x-1)^{2}}$. So this root counts for two if we count roots with their multiplicities. -- Jitse Niesen 11:26, 15 March 2008 (CDT)