Talk:Binomial theorem: Difference between revisions

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	To learn how to update the categories for this article, see here. To update categories, edit the metadata template.  Definition:  ${\displaystyle \textstyle (x+y)^{n}=\sum _{k=0}^{n}{n \choose k}x^{k}y^{n-k}}$ for any natural number n. [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

status is really about 2.5 - 2 for the elementary binomial theorem/formula, and 3 for the Newtonian. Anthony Argyriou 17:23, 18 July 2007 (CDT)

While the definition is strictly true, it seems written backwards, in that if you actually do the sum for (x+y)^2 the answer you get as the equation is written is y^2 + 2xy + x^2. Of course you can rearrange to get x^2 + 2xy + y^2. Another way to write it would be

x^(n-k)y^(k), in which case you directly get the answers as shown in the examples.

David E. Volk