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[[page with more instructions_MA453Fall2008walther]] turns blue and I am transferred to a newborn page of name as indicated.
 
[[page with more instructions_MA453Fall2008walther]] turns blue and I am transferred to a newborn page of name as indicated.
  
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For this week, click this link [[week1_MA453Fall2008walther|here]] and on that new page create a page as outlined above. Then move to that page and state your favorite theorem. Why is it you favorite theorem? Have other people he same favorite theorem? Crosslink! Use the math-environment if appropriate.  
 
For this week, click this link [[week1_MA453Fall2008walther|here]] and on that new page create a page as outlined above. Then move to that page and state your favorite theorem. Why is it you favorite theorem? Have other people he same favorite theorem? Crosslink! Use the math-environment if appropriate.  

Revision as of 03:37, 26 August 2008

MA 453 Fall 2008 Professor Walther

Here are some basic pointers:

In order to do any editing, you must be logged in.

If you look under MediaWiki FAQ, you get lots of instructions how to work with Rhea. Some important things are under item 4 in that manual.

If you want to do things like $ \sum_{i=1}^\infty 1/i^2 = \frac{\pi^2}{6} $ here then you should look a) at the "view source" button on this page and b) get acquainted with Latex [1], a text-formatting program designed to write math stuff.

Here is some more math, to show yo mathsymbol commands: $ \forall x\in{\mathbb R}, x^2\ge 0 $ $ \exists n\in{\mathbb N}, n^2\le 0 $ where $ {\mathbb N}=0,1,2,\ldots $


If you want to make a new page, all you need to do is to invent one. For example, let's say I want to make a page for further instructions how to deal with Rhea. I just type "double-left-square-bracket page with more instructions double-right-square-bracket", where of course I use the actual brackets. The effect is: I get a link (initially red) to a page that is the empty set. Once I click it, the link page with more instructions_MA453Fall2008walther turns blue and I am transferred to a newborn page of name as indicated.

For this week, click this link here and on that new page create a page as outlined above. Then move to that page and state your favorite theorem. Why is it you favorite theorem? Have other people he same favorite theorem? Crosslink! Use the math-environment if appropriate.

Getting started

Alumni Liaison

Basic linear algebra uncovers and clarifies very important geometry and algebra.

Dr. Paul Garrett