A Ranking for the Vancouver 2010 Winter Olympic Games ... - UFF
A Ranking for the Vancouver 2010 Winter Olympic Games ... - UFF
A Ranking for the Vancouver 2010 Winter Olympic Games ... - UFF
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A <strong>Ranking</strong> <strong>for</strong> <strong>the</strong> <strong>Vancouver</strong> <strong>2010</strong><br />
<strong>Winter</strong> <strong>Olympic</strong> <strong>Games</strong> Based on a Hyerarchcical Copeland Method 177<br />
O<strong>the</strong>r analysis, in terms of <strong>the</strong> variation among <strong>the</strong> types of rankings, is showed. In <strong>the</strong><br />
follow table we calculated <strong>the</strong> variation between <strong>the</strong> ranking proposed and <strong>the</strong> Lexigraphic<br />
<strong>Ranking</strong>.<br />
COUNTRY<br />
VARIATION<br />
(Xtk - Xtk-1)<br />
QUADRATIC<br />
VARIATION<br />
(Xtk - Xtk-1)²<br />
Canada 0 0<br />
United States -1 1<br />
Germany 0 0<br />
Norway 1 1<br />
Austria -4 16<br />
Russia -6 36<br />
China 0 0<br />
Switzerland 2 4<br />
France -3 9<br />
Italy -6 36<br />
Sweden 4 16<br />
South Korea 7 49<br />
Czech Republic 0 0<br />
Ne<strong>the</strong>rlands 5 25<br />
Poland -1 1<br />
Finland -10 100<br />
Australia 5 25<br />
Japan -2 4<br />
Croatia -2 4<br />
Latvia -4 16<br />
Slovenia 0 0<br />
Belarus 7 49<br />
Slovakia 8 64<br />
Great Britain 8 64<br />
Kazakhstan 0 0<br />
Estonia 0 0<br />
Albania 1 1<br />
Albania 1 1<br />
Algeria 1 1<br />
Andorra 1 1<br />
Argentina 1 1<br />
Armenia 1 1<br />
Azerbaijan 1 1<br />
Belgium 1 1<br />
Bermuda 1 1<br />
Bosnia & Herzegovina 1 1<br />
Brazil 1 1<br />
Bulgaria 1 1<br />
Cayman Islands 1 1<br />
Chile 1 1<br />
Chinese Taipei 1 1<br />
Colombia 1 1<br />
Costa Rica 1 1<br />
Cyprus 1 1<br />
Denmark 1 1
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