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UPD: Editorial
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For more than half an hour I tried to count connected almost Eulearian graphs in Div1-500 =( Didn't realize this is not a condition we need.
Upd: oops, that's pretty non-sense. Now I even can't myself understand what I was counting.
Are there any non-connected almost Eulerian graphs?
Initially I was counting connected graphs with at most 2 vertices having odd degree (*). After this solution failed on samples I realized that in addition to almost Eulerian graphs I also counted graphs with 1 bridge which fall into 2 Eulerian graphs after removal of this bridge. Luckily, it's possible to count AE graphs just from knowing (*) for all N. Maybe you made the same mistake as me initially?
UPD: initial version of the comment was wrong
How to solve Div.1 500?
Editorial link: http://codeforces.net/blog/entry/21112