The results of the last game:
| Game Master | Survived | Played | Starting # | Lost | Defected | Remaining |
---|
1 | Eric | 130 | 256 | 258 | 126 | 50 | 182 |
2 | filthyvermin | 110 | 256 | 256 | 146 | 29 | 139 |
| lukethefluke | 110 | 143 | 48 | 33 | 29 | 44 |
4 | Mark_K | 100 | 205 | 210 | 105 | | 105 |
5 | Bloobird | 80 | 143 | 72 | 63 | | 9 |
| Paasei | 80 | 143 | 0 | 63 | | -63 |
7 | Doctor Zeus | 70 | 205 | 224 | 135 | | 89 |
8 | Onuzq | 60 | 164 | 166 | 104 | | 62 |
| Gadarene | 60 | 143 | 134 | 83 | | 51 |
10 | eyebooger | 30 | 41 | 189 | 11 | -39 | 139 |
11 | Zurvan | 20 | 51 | 325 | 31 | -19 | 275 |
12 | bsball8806 | 10 | 10 | 261 | 0 | -50 | 211 |
You can check out the details of the Tug O'War game in the mod spreadsheet:
https://docs.google.com/spreadsheets...#gid=761391244
The columns E and I are the team modifiers. This can range from 100 (VVVVVVVVVV) to -50 (WWWWWWWWWW).
J = Modifier total = [50 + Modifier1 - Modifier2] and represents the win probability of the home team.
We see for example in match 26 that Eric was only 15% to win, but he got a rand of 0.123 and won against the odds. With such luck, Eric ships the win and welcomes 50 defectors from team bsball.
Even better than eric ran Luke, losing only 3 of 14 matches. He ties with filthy and they share the defectors from Zurvan and eyebooger.