User:Albinomonkey/Sandbox

Useful code
 = = 2005
 * Clears space after photos, boxes
 * F1 season link

Table Test Area
Generic table:

GT Circuit Template Test Area
(to be continued)

The Rome Circuit in Gran Turismo games is located in Rome, Italy. It is a street-circuit, run entirely on asphalt with wide roads, but barriers on the edges of the circuit. The basic circuit contains several right-angled corners, requiring some concentration, but also allowing for overtaking opportunities.

It first appeared in Gran Turismo 2, along with a short-course version. The short version was taken out of Gran Turismo 3, but a reverse version ("Rome Circuit II") was added.

Competitions
(Roman numeral(s) in parentheses indicates which variations are used)

Gran Turismo 3
Amateur League: Professional League:
 * European Championship (I & II)
 * FF Challenge (II)
 * All Japan GT Championship (I)
 * Tourist Trophy (I)
 * Legend of the Silver Arrow (II)
 * British GT Car Cup (II)
 * FF Challenge (I)
 * Boxer Spirit (I)
 * Gran Turismo All Stars (I)
 * All Japan GT Championship (II)
 * Italian Avant Garde (I & II)
 * Yaris Race (II)
 * Elise Trophy (II)
 * Clio Trophy (I)
 * TVR Tuscan Challenge (II)
 * Polyphony Digital Cup (II)
 * Formula GT (I)

Template:A1GP team
(done!)



Race Summary


Michael Schumacher race results
(key)

Thanks to User: Gerbrant
You can copy and paste the Wikipedia search box in an HTML file. Add some formatting to get rid of unnecessary padding and you can add it to your desktop. &lt;hipe&gt;Your favourite online encyclopaedia at your fingertips!&lt;/hipe&gt;

Suggested code
    Suggested background image:

Enter a keyword, press enter. It's that simple.

Random Stuff
hopefully this asterisk is above the text *

FIFA World Cup refs

 * History of FIFA, 31 Mar 2006
 * History of football, 31 Mar 2006

Australian national football team (disambiguation)
Australia has four different codes that are sometimes known as football. The Australian national football team could refer to:


 * The official name of the Australia national football (soccer) team
 * Unofficial and rarely used names for:
 * Australian national rugby union team
 * Australian national rugby league team
 * All-Australian Team (Australian rules football) this team, although the official national team, does not play internationally. A team that does play internationally is Australian International Rules Team which play a variation of the sport known as International rules football

disambig

The Australian national football team is the official name of the Australia national football (soccer) team.

In everyday usage in Australia, "football" may refer to one of three other sports, two of which are represented in competition by a national team:
 * Australian national rugby union team
 * Australian national rugby league team

Australian rules football also has an official national team, the All-Australian Team although it is purely decorative – the team never players internationally. The Australian International Rules Team, selected from Australian rules players, does play internationally, but in a variation of the sport known as International rules football.

A-League foundation links

 * http://www.smh.com.au/news/Soccer/New-national-soccer-league-launched/2004/11/01/1099262765210.html
 * http://www.theage.com.au/articles/2004/10/30/1099028262059.html
 * http://www.footballaustralia.com.au//public/article/show.asp?articleid=8010&menuItemID=
 * http://www1.sbs.com.au/home/index.php3?id=51357
 * http://www.a-league.com.au/default.aspx?s=history

math markup
$$v=\pm c \sqrt{\left ( 1 - \frac{m_0}{m} \right )\left ( 1 + \frac{m_0}{m} \right)}$$

$$ \Gamma \Big( nv+\frac{1}{\alpha}, \frac{1}{\beta + \sum_{i=1}^{n} x_i} \Big) $$

$$ \Gamma \Big( 2n+3, \frac{1}{\frac{1}{10} + \sum_{i=1}^{n} x_i} \Big) $$

$$\sigma \frac{(s-t_1)(t_2-s)}{(t_2-t_1)}$$

$$exp\left\{- \frac{1}{2{\sigma}^2}\left(\frac{(t_2-t_1)}{(s-t_1)(t_2-s)}\right){\left[x - \left(\frac{(t_2-s)}{(t_2-t_1)}a + \frac{(s-t_1)}{(t_2-t_1)}b\right)\right]}^2\right\}$$

$$F_X(x) = \Phi \left(\frac{x}{\sigma}\sqrt{\frac{(t_2-t_1)}{(s-t_1)(t_2-s)}} - \frac{1}{\sigma\sqrt{(t_2-t_1)}}\left(a\sqrt{\frac{t_2-s}{s-t_1}} + b\sqrt{\frac{s-t_1}{t_2-s}} \right) \right)$$