Id | Town | Player | X | Y | Town score ▾ | Player score | Ally | Distance |
81058 | Zenobia ![]() | Palmyras | 525 | 482 | 6988 | 6988 | DELETE | 30.8 |
70775 | Orasul Barbone72 ![]() | menthos | 507 | 488 | 9915 | 182605 | New World Order II | 13.9 |
70788 | Orasul Barbone75 ![]() | menthos | 507 | 488 | 12199 | 182605 | New World Order II | 13.9 |
69141 | Orasul Barbone59 ![]() | menthos | 507 | 488 | 13384 | 182605 | New World Order II | 13.9 |
69151 | Orasul Barbone60 ![]() | menthos | 507 | 488 | 13716 | 182605 | New World Order II | 13.9 |
69152 | Orasul Barbone61 ![]() | menthos | 507 | 488 | 13716 | 182605 | New World Order II | 13.9 |
69156 | Orasul Barbone62 ![]() | menthos | 507 | 488 | 13716 | 182605 | New World Order II | 13.9 |
Players list: Palmyras; menthos
BBCode:
[town]81058[/town] 6988pts [player]Palmyras[/player] 525/482 30.8
[town]70775[/town] 9915pts [player]menthos[/player] 507/488 13.9
[town]70788[/town] 12199pts [player]menthos[/player] 507/488 13.9
[town]69141[/town] 13384pts [player]menthos[/player] 507/488 13.9
[town]69151[/town] 13716pts [player]menthos[/player] 507/488 13.9
[town]69152[/town] 13716pts [player]menthos[/player] 507/488 13.9
[town]69156[/town] 13716pts [player]menthos[/player] 507/488 13.9
[town]81058[/town] 6988pts [player]Palmyras[/player] 525/482 30.8
[town]70775[/town] 9915pts [player]menthos[/player] 507/488 13.9
[town]70788[/town] 12199pts [player]menthos[/player] 507/488 13.9
[town]69141[/town] 13384pts [player]menthos[/player] 507/488 13.9
[town]69151[/town] 13716pts [player]menthos[/player] 507/488 13.9
[town]69152[/town] 13716pts [player]menthos[/player] 507/488 13.9
[town]69156[/town] 13716pts [player]menthos[/player] 507/488 13.9
= This player has only one town so his academy might not be well developed.
= This player has lost some points during the last week and may be inactive.
= This player is inactive or in vacation mode.
Note: The "radius" of search is "square", so if X = 400 and Y = 500, for a radius of 10, the search will take place in a square area with X between 390 and 410 and Y between 490 and 510. Consequently, a radius of 50, covers a whole sea.