http://i467.photobucket.com/albums/rr36/RR1337/Siege.png

25&25&field&5$1,1^5$4,1^5$20,1^5$23,1^5$5,5^5$9,5^5$15,5^5$19, 5^5$1,8^5$23,8^5$4,9^5$20,9^5$4,15^5$20,15^5$1,16^ 5$23,16^5$5,19^5$9,19^5$15,19^5$19,19^5$1,23^5$4,2 3^5$20,23^5$23,23&0,0$0,2112,2,0^1,0$0,2112,2,0^2,0$0,2112,2,0^3,0$0 ,2112,2,0^4,0$0,2112,2,0^5,0$0,2112,2,0^6,0$0,2112 ,2,0^7,0$0,2112,2,0^8,0$21,0112,1,0^9,0$0,2112,1,0 ^10,0$21,0112,0,0^11,0$99,1221,0,0^12,0$98,1201,0, 0^13,0$99,1201,0,0^14,0$21,2112,0,0^15,0$0,2112,1, 0^16,0$21,2112,1,0^17,0$0,2112,2,0^18,0$0,2112,2,0 ^19,0$0,2112,2,0^20,0$0,2112,2,0^21,0$0,2112,2,0^2 2,0$0,2112,2,0^23,0$0,2112,2,0^24,0$0,2112,2,0^0,1 $0,2112,2,0^1,1$0,2112,2,0^2,1$0,2112,2,0^3,1$0,21 12,2,0^4,1$0,2112,2,0^5,1$22,0112,1,0^6,1$21,1001, 1,0^7,1$11,1021,1,0^8,1$23,0110,1,0^9,1$0,2112,1,0 ^10,1$22,0110,0,0^11,1$23,0112,0,0^12,1$84,2112,0, 0^13,1$23,2112,0,0^14,1$22,2110,0,0^15,1$0,2112,1, 0^16,1$23,2110,1,0^17,1$11,1021,1,0^18,1$21,1021,1 ,0^19,1$22,2112,1,0^20,1$0,2112,2,0^21,1$0,2112,2, 0^22,1$0,2112,2,0^23,1$0,2112,2,0^24,1$0,2112,2,0^ 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,1,0^10,4$22,0112,0,0^11,4$23,0110,0,0^12,4$84,211 2,0,0^13,4$23,2110,0,0^14,4$22,2112,0,0^15,4$0,211 2,1,0^16,4$0,2112,1,0^17,4$23,2112,2,0^18,4$21,120 1,1,0^19,4$21,1201,1,0^20,4$23,0112,1,0^21,4$0,211 2,1,0^22,4$0,2112,1,0^23,4$0,2112,1,0^24,4$21,2112 ,1,0^0,5$21,0112,1,0^1,5$0,2112,1,0^2,5$0,2112,1,0 ^3,5$0,2112,1,0^4,5$21,2110,1,0^5,5$0,2112,2,0^6,5 $0,2112,2,0^7,5$11,0112,1,0^8,5$0,2112,1,0^9,5$0,2 112,1,0^10,5$21,0112,0,0^11,5$84,2112,0,0^12,5$84, 2112,0,0^13,5$84,2112,0,0^14,5$21,2112,0,0^15,5$0, 2112,1,0^16,5$0,2112,1,0^17,5$11,2112,1,0^18,5$0,2 112,2,0^19,5$0,2112,2,0^20,5$21,0110,1,0^21,5$0,21 12,1,0^22,5$0,2112,1,0^23,5$0,2112,1,0^24,5$21,211 2,1,0^0,6$22,0110,1,0^1,6$11,1201,1,0^2,6$23,0112, 1,0^3,6$0,2112,1,0^4,6$21,2110,1,0^5,6$0,2112,2,0^ 6,6$22,0112,1,0^7,6$23,0110,1,0^8,6$0,2112,1,0^9,6 $22,0112,0,0^10,6$23,0110,0,0^14,6$23,2110,0,0^15, 6$22,2112,0,0^16,6$0,2112,1,0^17,6$23,2110,1,0^18, 6$22,2112,1,0^19,6$0,2112,2,0^20,6$21,0110,1,0^21, 6$0,2112,1,0^22,6$23,2112,1,0^23,6$11,1201,1,0^24, 6$22,2110,1,0^0,7$0,2112,2,0^1,7$0,2112,2,0^2,7$21 ,0112,1,0^3,7$0,2112,1,0^4,7$23,2110,1,0^5,7$11,10 01,1,0^6,7$23,0110,1,0^7,7$0,2112,1,0^8,7$0,2112,1 ,0^9,7$11,0110,0,0^15,7$11,2110,0,0^16,7$0,2112,1, 0^17,7$0,2112,1,0^18,7$23,2110,1,0^19,7$11,1001,1, 0^20,7$23,0110,1,0^21,7$0,2112,1,0^22,7$21,2112,1, 0^23,7$0,2112,2,0^24,7$0,2112,2,0^0,8$0,2112,2,0^1 ,8$0,2112,2,0^2,8$21,0112,1,0^3,8$0,2112,1,0^4,8$0 ,2112,1,0^5,8$0,2112,1,0^6,8$0,2112,1,0^7,8$0,2112 ,1,0^8,8$22,0112,0,0^9,8$23,0110,0,0^15,8$23,2110, 0,0^16,8$22,2112,0,0^17,8$0,2112,1,0^18,8$0,2112,1 ,0^19,8$0,2112,1,0^20,8$0,2112,1,0^21,8$0,2112,1,0 ^22,8$21,2112,1,0^23,8$0,2112,2,0^24,8$0,2112,2,0^ 0,9$21,1001,1,0^1,9$21,1001,1,0^2,9$23,0110,1,0^3, 9$0,2112,1,0^4,9$0,2112,1,0^5,9$22,0112,0,0^6,9$21 ,1001,0,0^7,9$22,2112,0,0^8,9$21,0112,0,0^9,9$99,1 021,0,0^10,9$98,1001,0,0^11,9$98,1001,0,0^12,9$98, 1001,0,0^13,9$98,1001,0,0^14,9$98,1001,0,0^15,9$99 ,1001,0,0^16,9$21,2112,0,0^17,9$22,0112,0,0^18,9$2 1,1021,0,0^19,9$22,2112,0,0^20,9$0,2112,1,0^21,9$0 ,2112,1,0^22,9$23,2110,1,0^23,9$21,1021,1,0^24,9$2 1,1021,1,0^0,10$21,1001,0,0^1,10$21,1001,0,0^2,10$ 22,2112,0,0^3,10$0,2112,1,0^4,10$22,0112,0,0^5,10$ 23,0110,0,0^6,10$99,0112,0,0^7,10$21,2112,0,0^8,10 $22,0110,0,0^9,10$21,1201,0,0^10,10$21,1201,0,0^11 ,10$21,1201,0,0^12,10$21,1201,0,0^13,10$21,1201,0, 0^14,10$21,1201,0,0^15,10$21,1201,0,0^16,10$22,211 0,0,0^17,10$21,0112,0,0^18,10$99,2112,0,0^19,10$23 ,2110,0,0^20,10$22,2112,0,0^21,10$0,2112,1,0^22,10 $22,0112,0,0^23,10$21,1021,0,0^24,10$21,1021,0,0^0 ,11$99,2112,0,0^2,11$23,2110,0,0^3,11$11,1001,0,0^ 4,11$23,0110,0,0^6,11$98,0112,0,0^7,11$21,2112,0,0 ^8,11$22,0112,0,0^9,11$21,1001,0,0^10,11$22,2112,0 ,0^11,11$23,2112,1,0^12,11$21,1221,1,0^13,11$23,01 12,1,0^14,11$22,0112,0,0^15,11$21,1001,0,0^16,11$2 2,2112,0,0^17,11$21,0112,0,0^18,11$98,2112,0,0^20, 11$23,2110,0,0^21,11$11,1001,0,0^22,11$23,0110,0,0 ^24,11$99,0112,0,0^0,12$98,2112,0,0^6,12$98,0112,0 ,0^7,12$21,2112,0,0^8,12$21,0112,0,0^9,12$84,2112, 0,0^10,12$21,2112,0,0^11,12$21,2112,1,0^12,12$84,2 112,2,0^13,12$21,0112,1,0^14,12$21,0112,0,0^15,12$ 84,2112,0,0^16,12$21,2112,0,0^17,12$21,0112,0,0^18 ,12$98,2112,0,0^24,12$98,0112,0,0^0,13$99,2110,0,0 ^2,13$23,2112,0,0^3,13$11,1201,0,0^4,13$23,0112,0, 0^6,13$98,0112,0,0^7,13$21,2112,0,0^8,13$22,0110,0 ,0^9,13$21,1201,0,0^10,13$22,2110,0,0^11,13$23,211 0,1,0^12,13$21,1021,1,0^13,13$23,0110,1,0^14,13$22 ,0110,0,0^15,13$21,1201,0,0^16,13$22,2110,0,0^17,1 3$21,0112,0,0^18,13$98,2112,0,0^20,13$23,2112,0,0^ 21,13$11,1201,0,0^22,13$23,0112,0,0^24,13$99,0110, 0,0^0,14$21,1201,0,0^1,14$21,1201,0,0^2,14$22,2110 ,0,0^3,14$0,2112,1,0^4,14$22,0110,0,0^5,14$23,0112 ,0,0^6,14$99,0110,0,0^7,14$21,2112,0,0^8,14$22,011 2,0,0^9,14$21,1021,0,0^10,14$21,1021,0,0^11,14$21, 1021,0,0^12,14$21,1021,0,0^13,14$21,1021,0,0^14,14 $21,1021,0,0^15,14$21,1021,0,0^16,14$22,2112,0,0^1 7,14$21,0112,0,0^18,14$99,2110,0,0^19,14$23,2112,0 ,0^20,14$22,2110,0,0^21,14$0,2112,1,0^22,14$22,011 0,0,0^23,14$21,1221,0,0^24,14$21,1221,0,0^0,15$21, 1201,1,0^1,15$21,1201,1,0^2,15$23,0112,1,0^3,15$0, 2112,1,0^4,15$0,2112,1,0^5,15$22,0110,0,0^6,15$21, 1201,0,0^7,15$22,2110,0,0^8,15$21,0112,0,0^9,15$99 ,1221,0,0^10,15$98,1201,0,0^11,15$98,1201,0,0^12,1 5$98,1201,0,0^13,15$98,1201,0,0^14,15$98,1201,0,0^ 15,15$99,1201,0,0^16,15$21,2112,0,0^17,15$22,0110, 0,0^18,15$21,1221,0,0^19,15$22,2110,0,0^20,15$0,21 12,1,0^21,15$0,2112,1,0^22,15$23,2112,1,0^23,15$21 ,1201,1,0^24,15$21,1201,1,0^0,16$0,2112,2,0^1,16$0 ,2112,2,0^2,16$21,0110,1,0^3,16$0,2112,1,0^4,16$0, 2112,1,0^5,16$0,2112,1,0^6,16$0,2112,1,0^7,16$0,21 12,1,0^8,16$22,0110,0,0^9,16$23,0112,0,0^15,16$23, 2112,0,0^16,16$22,2110,0,0^17,16$0,2112,1,0^18,16$ 0,2112,1,0^19,16$0,2112,1,0^20,16$0,2112,1,0^21,16 $0,2112,1,0^22,16$21,2112,1,0^23,16$0,2112,2,0^24, 16$0,2112,2,0^0,17$0,2112,2,0^1,17$0,2112,2,0^2,17 $21,0110,1,0^3,17$0,2112,1,0^4,17$23,2112,1,0^5,17 $11,1201,1,0^6,17$23,0112,1,0^7,17$0,2112,1,0^8,17 $0,2112,1,0^9,17$11,0110,0,0^15,17$11,2110,0,0^16, 17$0,2112,1,0^17,17$0,2112,1,0^18,17$23,2112,1,0^1 9,17$11,1201,1,0^20,17$23,0112,1,0^21,17$0,2112,1, 0^22,17$21,2112,1,0^23,17$0,2112,2,0^24,17$0,2112, 2,0^0,18$22,0112,1,0^1,18$11,1021,1,0^2,18$23,0110 ,1,0^3,18$0,2112,1,0^4,18$21,2110,1,0^5,18$0,2112, 2,0^6,18$22,0110,1,0^7,18$23,0112,1,0^8,18$0,2112, 1,0^9,18$22,0110,0,0^10,18$23,0112,0,0^14,18$23,21 12,0,0^15,18$22,2110,0,0^16,18$0,2112,1,0^17,18$23 ,2112,1,0^18,18$22,2110,1,0^19,18$0,2112,2,0^20,18 $21,0110,1,0^21,18$0,2112,1,0^22,18$23,2110,1,0^23 ,18$11,1021,1,0^24,18$22,2112,1,0^0,19$21,0110,1,0 ^1,19$0,2112,1,0^2,19$0,2112,1,0^3,19$0,2112,1,0^4 ,19$21,2110,1,0^5,19$0,2112,2,0^6,19$0,2112,2,0^7, 19$11,0110,1,0^8,19$0,2112,1,0^9,19$0,2112,1,0^10, 19$21,0112,0,0^11,19$84,2112,0,0^12,19$84,2112,0,0 ^13,19$84,2112,0,0^14,19$21,2112,0,0^15,19$0,2112, 1,0^16,19$0,2112,1,0^17,19$11,2110,1,0^18,19$0,211 2,2,0^19,19$0,2112,2,0^20,19$21,0110,1,0^21,19$0,2 112,1,0^22,19$0,2112,1,0^23,19$0,2112,1,0^24,19$21 ,2112,1,0^0,20$21,0110,1,0^1,20$0,2112,1,0^2,20$0, 2112,1,0^3,20$0,2112,1,0^4,20$23,2110,1,0^5,20$21, 1001,1,0^6,20$21,1001,1,0^7,20$23,0110,1,0^8,20$0, 2112,1,0^9,20$0,2112,1,0^10,20$22,0110,0,0^11,20$2 3,0112,0,0^12,20$84,2112,0,0^13,20$23,2112,0,0^14, 20$22,2110,0,0^15,20$0,2112,1,0^16,20$0,2112,1,0^1 7,20$23,2110,1,0^18,20$21,1001,1,0^19,20$21,1001,1 ,0^20,20$23,0110,2,0^21,20$0,2112,1,0^22,20$0,2112 ,1,0^23,20$0,2112,1,0^24,20$21,2112,1,0^0,21$22,01 10,1,0^1,21$11,1201,1,0^2,21$23,0112,1,0^3,21$0,21 12,1,0^4,21$0,2112,1,0^5,21$0,2112,1,0^6,21$0,2112 ,1,0^7,21$0,2112,1,0^8,21$0,2112,1,0^9,21$0,2112,1 ,0^10,21$0,2112,1,0^11,21$22,0110,0,0^12,21$21,122 1,0,0^13,21$22,2110,0,0^14,21$0,2112,1,0^15,21$0,2 112,1,0^16,21$0,2112,1,0^17,21$0,2112,1,0^18,21$0, 2112,1,0^19,21$0,2112,1,0^20,21$0,2112,1,0^21,21$0 ,2112,1,0^22,21$23,2112,1,0^23,21$11,1201,1,0^24,2 1$22,2110,1,0^0,22$0,2112,2,0^1,22$0,2112,2,0^2,22 $22,0110,1,0^3,22$21,1201,1,0^4,22$21,1201,1,0^5,2 2$23,0112,1,0^6,22$0,2112,1,0^7,22$0,2112,1,0^8,22 $0,2112,1,0^9,22$0,2112,1,0^10,22$0,2112,1,0^11,22 $22,0112,0,0^12,22$21,1001,0,0^13,22$22,2112,0,0^1 4,22$0,2112,1,0^15,22$0,2112,1,0^16,22$0,2112,1,0^ 17,22$0,2112,1,0^18,22$0,2112,1,0^19,22$23,2112,1, 0^20,22$21,1201,1,0^21,22$21,1201,1,0^22,22$22,211 0,1,0^23,22$0,2112,2,0^24,22$0,2112,2,0^0,23$0,211 2,2,0^1,23$0,2112,2,0^2,23$0,2112,2,0^3,23$0,2112, 2,0^4,23$0,2112,2,0^5,23$22,0110,1,0^6,23$21,1201, 1,0^7,23$11,1201,1,0^8,23$23,0112,1,0^9,23$0,2112, 1,0^10,23$22,0112,0,0^11,23$23,0110,0,0^12,23$84,2 112,0,0^13,23$23,2110,0,0^14,23$22,2112,0,0^15,23$ 0,2112,1,0^16,23$23,2112,1,0^17,23$11,1201,1,0^18, 23$21,1201,1,0^19,23$22,2110,1,0^20,23$0,2112,2,0^ 21,23$0,2112,2,0^22,23$0,2112,2,0^23,23$0,2112,2,0 ^24,23$0,2112,2,0^0,24$0,2112,2,0^1,24$0,2112,2,0^ 2,24$0,2112,2,0^3,24$0,2112,2,0^4,24$0,2112,2,0^5, 24$0,2112,2,0^6,24$0,2112,2,0^7,24$0,2112,2,0^8,24 $21,0110,1,0^9,24$0,2112,1,0^10,24$21,0112,0,0^11, 24$99,1021,0,0^12,24$98,1001,0,0^13,24$99,1001,0,0 ^14,24$21,2112,0,0^15,24$0,2112,1,0^16,24$21,2112, 1,0^17,24$0,2112,2,0^18,24$0,2112,2,0^19,24$0,2112 ,2,0^20,24$0,2112,2,0^21,24$0,2112,2,0^22,24$0,211 2,2,0^23,24$0,2112,2,0^24,24$0,2112,2,0&

I actually had a lot of fun creating this awesome 25x25 FFA.

http://i467.photobucket.com/albums/rr36/RR1337/Siege.png

25&25&field&5$1,1^5$4,1^5$20,1^5$23,1^5$5,5^5$9,5^5$15,5^5$19, 5^5$1,8^5$23,8^5$4,9^5$20,9^5$4,15^5$20,15^5$1,16^ 5$23,16^5$5,19^5$9,19^5$15,19^5$19,19^5$1,23^5$4,2 3^5$20,23^5$23,23&0,0$0,2112,2,0^1,0$0,2112,2,0^2,0$0,2112,2,0^3,0$0 ,2112,2,0^4,0$0,2112,2,0^5,0$0,2112,2,0^6,0$0,2112 ,2,0^7,0$0,2112,2,0^8,0$21,0112,1,0^9,0$0,2112,1,0 ^10,0$21,0112,0,0^11,0$99,1221,0,0^12,0$98,1201,0, 0^13,0$99,1201,0,0^14,0$21,2112,0,0^15,0$0,2112,1, 0^16,0$21,2112,1,0^17,0$0,2112,2,0^18,0$0,2112,2,0 ^19,0$0,2112,2,0^20,0$0,2112,2,0^21,0$0,2112,2,0^2 2,0$0,2112,2,0^23,0$0,2112,2,0^24,0$0,2112,2,0^0,1 $0,2112,2,0^1,1$0,2112,2,0^2,1$0,2112,2,0^3,1$0,21 12,2,0^4,1$0,2112,2,0^5,1$22,0112,1,0^6,1$21,1001, 1,0^7,1$11,1021,1,0^8,1$23,0110,1,0^9,1$0,2112,1,0 ^10,1$22,0110,0,0^11,1$23,0112,0,0^12,1$84,2112,0, 0^13,1$23,2112,0,0^14,1$22,2110,0,0^15,1$0,2112,1, 0^16,1$23,2110,1,0^17,1$11,1021,1,0^18,1$21,1021,1 ,0^19,1$22,2112,1,0^20,1$0,2112,2,0^21,1$0,2112,2, 0^22,1$0,2112,2,0^23,1$0,2112,2,0^24,1$0,2112,2,0^ 0,2$0,2112,2,0^1,2$0,2112,2,0^2,2$22,0112,1,0^3,2$ 21,1001,1,0^4,2$21,1001,1,0^5,2$23,0110,1,0^6,2$0, 2112,1,0^7,2$0,2112,1,0^8,2$0,2112,1,0^9,2$0,2112, 1,0^10,2$0,2112,1,0^11,2$22,0110,0,0^12,2$21,1201, 0,0^13,2$22,2110,0,0^14,2$0,2112,1,0^15,2$0,2112,1 ,0^16,2$0,2112,1,0^17,2$0,2112,1,0^18,2$0,2112,1,0 ^19,2$23,2110,1,0^20,2$21,1021,1,0^21,2$21,1021,1, 0^22,2$22,2112,1,0^23,2$0,2112,2,0^24,2$0,2112,2,0 ^0,3$22,0112,1,0^1,3$11,1021,1,0^2,3$23,0110,1,0^3 ,3$0,2112,1,0^4,3$0,2112,1,0^5,3$0,2112,1,0^6,3$0, 2112,1,0^7,3$0,2112,1,0^8,3$0,2112,1,0^9,3$0,2112, 1,0^10,3$0,2112,1,0^11,3$22,0112,0,0^12,3$21,1001, 0,0^13,3$22,2112,0,0^14,3$0,2112,1,0^15,3$0,2112,1 ,0^16,3$0,2112,1,0^17,3$0,2112,1,0^18,3$0,2112,1,0 ^19,3$0,2112,1,0^20,3$0,2112,1,0^21,3$0,2112,1,0^2 2,3$23,2110,1,0^23,3$11,1021,1,0^24,3$22,2112,1,0^ 0,4$21,0112,1,0^1,4$0,2112,1,0^2,4$0,2112,1,0^3,4$ 0,2112,1,0^4,4$23,2112,1,0^5,4$21,1201,1,0^6,4$21, 1201,1,0^7,4$23,0112,1,0^8,4$0,2112,1,0^9,4$0,2112 ,1,0^10,4$22,0112,0,0^11,4$23,0110,0,0^12,4$84,211 2,0,0^13,4$23,2110,0,0^14,4$22,2112,0,0^15,4$0,211 2,1,0^16,4$0,2112,1,0^17,4$23,2112,2,0^18,4$21,120 1,1,0^19,4$21,1201,1,0^20,4$23,0112,1,0^21,4$0,211 2,1,0^22,4$0,2112,1,0^23,4$0,2112,1,0^24,4$21,2112 ,1,0^0,5$21,0112,1,0^1,5$0,2112,1,0^2,5$0,2112,1,0 ^3,5$0,2112,1,0^4,5$21,2110,1,0^5,5$0,2112,2,0^6,5 $0,2112,2,0^7,5$11,0112,1,0^8,5$0,2112,1,0^9,5$0,2 112,1,0^10,5$21,0112,0,0^11,5$84,2112,0,0^12,5$84, 2112,0,0^13,5$84,2112,0,0^14,5$21,2112,0,0^15,5$0, 2112,1,0^16,5$0,2112,1,0^17,5$11,2112,1,0^18,5$0,2 112,2,0^19,5$0,2112,2,0^20,5$21,0110,1,0^21,5$0,21 12,1,0^22,5$0,2112,1,0^23,5$0,2112,1,0^24,5$21,211 2,1,0^0,6$22,0110,1,0^1,6$11,1201,1,0^2,6$23,0112, 1,0^3,6$0,2112,1,0^4,6$21,2110,1,0^5,6$0,2112,2,0^ 6,6$22,0112,1,0^7,6$23,0110,1,0^8,6$0,2112,1,0^9,6 $22,0112,0,0^10,6$23,0110,0,0^14,6$23,2110,0,0^15, 6$22,2112,0,0^16,6$0,2112,1,0^17,6$23,2110,1,0^18, 6$22,2112,1,0^19,6$0,2112,2,0^20,6$21,0110,1,0^21, 6$0,2112,1,0^22,6$23,2112,1,0^23,6$11,1201,1,0^24, 6$22,2110,1,0^0,7$0,2112,2,0^1,7$0,2112,2,0^2,7$21 ,0112,1,0^3,7$0,2112,1,0^4,7$23,2110,1,0^5,7$11,10 01,1,0^6,7$23,0110,1,0^7,7$0,2112,1,0^8,7$0,2112,1 ,0^9,7$11,0110,0,0^15,7$11,2110,0,0^16,7$0,2112,1, 0^17,7$0,2112,1,0^18,7$23,2110,1,0^19,7$11,1001,1, 0^20,7$23,0110,1,0^21,7$0,2112,1,0^22,7$21,2112,1, 0^23,7$0,2112,2,0^24,7$0,2112,2,0^0,8$0,2112,2,0^1 ,8$0,2112,2,0^2,8$21,0112,1,0^3,8$0,2112,1,0^4,8$0 ,2112,1,0^5,8$0,2112,1,0^6,8$0,2112,1,0^7,8$0,2112 ,1,0^8,8$22,0112,0,0^9,8$23,0110,0,0^15,8$23,2110, 0,0^16,8$22,2112,0,0^17,8$0,2112,1,0^18,8$0,2112,1 ,0^19,8$0,2112,1,0^20,8$0,2112,1,0^21,8$0,2112,1,0 ^22,8$21,2112,1,0^23,8$0,2112,2,0^24,8$0,2112,2,0^ 0,9$21,1001,1,0^1,9$21,1001,1,0^2,9$23,0110,1,0^3, 9$0,2112,1,0^4,9$0,2112,1,0^5,9$22,0112,0,0^6,9$21 ,1001,0,0^7,9$22,2112,0,0^8,9$21,0112,0,0^9,9$99,1 021,0,0^10,9$98,1001,0,0^11,9$98,1001,0,0^12,9$98, 1001,0,0^13,9$98,1001,0,0^14,9$98,1001,0,0^15,9$99 ,1001,0,0^16,9$21,2112,0,0^17,9$22,0112,0,0^18,9$2 1,1021,0,0^19,9$22,2112,0,0^20,9$0,2112,1,0^21,9$0 ,2112,1,0^22,9$23,2110,1,0^23,9$21,1021,1,0^24,9$2 1,1021,1,0^0,10$21,1001,0,0^1,10$21,1001,0,0^2,10$ 22,2112,0,0^3,10$0,2112,1,0^4,10$22,0112,0,0^5,10$ 23,0110,0,0^6,10$99,0112,0,0^7,10$21,2112,0,0^8,10 $22,0110,0,0^9,10$21,1201,0,0^10,10$21,1201,0,0^11 ,10$21,1201,0,0^12,10$21,1201,0,0^13,10$21,1201,0, 0^14,10$21,1201,0,0^15,10$21,1201,0,0^16,10$22,211 0,0,0^17,10$21,0112,0,0^18,10$99,2112,0,0^19,10$23 ,2110,0,0^20,10$22,2112,0,0^21,10$0,2112,1,0^22,10 $22,0112,0,0^23,10$21,1021,0,0^24,10$21,1021,0,0^0 ,11$99,2112,0,0^2,11$23,2110,0,0^3,11$11,1001,0,0^ 4,11$23,0110,0,0^6,11$98,0112,0,0^7,11$21,2112,0,0 ^8,11$22,0112,0,0^9,11$21,1001,0,0^10,11$22,2112,0 ,0^11,11$23,2112,1,0^12,11$21,1221,1,0^13,11$23,01 12,1,0^14,11$22,0112,0,0^15,11$21,1001,0,0^16,11$2 2,2112,0,0^17,11$21,0112,0,0^18,11$98,2112,0,0^20, 11$23,2110,0,0^21,11$11,1001,0,0^22,11$23,0110,0,0 ^24,11$99,0112,0,0^0,12$98,2112,0,0^6,12$98,0112,0 ,0^7,12$21,2112,0,0^8,12$21,0112,0,0^9,12$84,2112, 0,0^10,12$21,2112,0,0^11,12$21,2112,1,0^12,12$84,2 112,2,0^13,12$21,0112,1,0^14,12$21,0112,0,0^15,12$ 84,2112,0,0^16,12$21,2112,0,0^17,12$21,0112,0,0^18 ,12$98,2112,0,0^24,12$98,0112,0,0^0,13$99,2110,0,0 ^2,13$23,2112,0,0^3,13$11,1201,0,0^4,13$23,0112,0, 0^6,13$98,0112,0,0^7,13$21,2112,0,0^8,13$22,0110,0 ,0^9,13$21,1201,0,0^10,13$22,2110,0,0^11,13$23,211 0,1,0^12,13$21,1021,1,0^13,13$23,0110,1,0^14,13$22 ,0110,0,0^15,13$21,1201,0,0^16,13$22,2110,0,0^17,1 3$21,0112,0,0^18,13$98,2112,0,0^20,13$23,2112,0,0^ 21,13$11,1201,0,0^22,13$23,0112,0,0^24,13$99,0110, 0,0^0,14$21,1201,0,0^1,14$21,1201,0,0^2,14$22,2110 ,0,0^3,14$0,2112,1,0^4,14$22,0110,0,0^5,14$23,0112 ,0,0^6,14$99,0110,0,0^7,14$21,2112,0,0^8,14$22,011 2,0,0^9,14$21,1021,0,0^10,14$21,1021,0,0^11,14$21, 1021,0,0^12,14$21,1021,0,0^13,14$21,1021,0,0^14,14 $21,1021,0,0^15,14$21,1021,0,0^16,14$22,2112,0,0^1 7,14$21,0112,0,0^18,14$99,2110,0,0^19,14$23,2112,0 ,0^20,14$22,2110,0,0^21,14$0,2112,1,0^22,14$22,011 0,0,0^23,14$21,1221,0,0^24,14$21,1221,0,0^0,15$21, 1201,1,0^1,15$21,1201,1,0^2,15$23,0112,1,0^3,15$0, 2112,1,0^4,15$0,2112,1,0^5,15$22,0110,0,0^6,15$21, 1201,0,0^7,15$22,2110,0,0^8,15$21,0112,0,0^9,15$99 ,1221,0,0^10,15$98,1201,0,0^11,15$98,1201,0,0^12,1 5$98,1201,0,0^13,15$98,1201,0,0^14,15$98,1201,0,0^ 15,15$99,1201,0,0^16,15$21,2112,0,0^17,15$22,0110, 0,0^18,15$21,1221,0,0^19,15$22,2110,0,0^20,15$0,21 12,1,0^21,15$0,2112,1,0^22,15$23,2112,1,0^23,15$21 ,1201,1,0^24,15$21,1201,1,0^0,16$0,2112,2,0^1,16$0 ,2112,2,0^2,16$21,0110,1,0^3,16$0,2112,1,0^4,16$0, 2112,1,0^5,16$0,2112,1,0^6,16$0,2112,1,0^7,16$0,21 12,1,0^8,16$22,0110,0,0^9,16$23,0112,0,0^15,16$23, 2112,0,0^16,16$22,2110,0,0^17,16$0,2112,1,0^18,16$ 0,2112,1,0^19,16$0,2112,1,0^20,16$0,2112,1,0^21,16 $0,2112,1,0^22,16$21,2112,1,0^23,16$0,2112,2,0^24, 16$0,2112,2,0^0,17$0,2112,2,0^1,17$0,2112,2,0^2,17 $21,0110,1,0^3,17$0,2112,1,0^4,17$23,2112,1,0^5,17 $11,1201,1,0^6,17$23,0112,1,0^7,17$0,2112,1,0^8,17 $0,2112,1,0^9,17$11,0110,0,0^15,17$11,2110,0,0^16, 17$0,2112,1,0^17,17$0,2112,1,0^18,17$23,2112,1,0^1 9,17$11,1201,1,0^20,17$23,0112,1,0^21,17$0,2112,1, 0^22,17$21,2112,1,0^23,17$0,2112,2,0^24,17$0,2112, 2,0^0,18$22,0112,1,0^1,18$11,1021,1,0^2,18$23,0110 ,1,0^3,18$0,2112,1,0^4,18$21,2110,1,0^5,18$0,2112, 2,0^6,18$22,0110,1,0^7,18$23,0112,1,0^8,18$0,2112, 1,0^9,18$22,0110,0,0^10,18$23,0112,0,0^14,18$23,21 12,0,0^15,18$22,2110,0,0^16,18$0,2112,1,0^17,18$23 ,2112,1,0^18,18$22,2110,1,0^19,18$0,2112,2,0^20,18 $21,0110,1,0^21,18$0,2112,1,0^22,18$23,2110,1,0^23 ,18$11,1021,1,0^24,18$22,2112,1,0^0,19$21,0110,1,0 ^1,19$0,2112,1,0^2,19$0,2112,1,0^3,19$0,2112,1,0^4 ,19$21,2110,1,0^5,19$0,2112,2,0^6,19$0,2112,2,0^7, 19$11,0110,1,0^8,19$0,2112,1,0^9,19$0,2112,1,0^10, 19$21,0112,0,0^11,19$84,2112,0,0^12,19$84,2112,0,0 ^13,19$84,2112,0,0^14,19$21,2112,0,0^15,19$0,2112, 1,0^16,19$0,2112,1,0^17,19$11,2110,1,0^18,19$0,211 2,2,0^19,19$0,2112,2,0^20,19$21,0110,1,0^21,19$0,2 112,1,0^22,19$0,2112,1,0^23,19$0,2112,1,0^24,19$21 ,2112,1,0^0,20$21,0110,1,0^1,20$0,2112,1,0^2,20$0, 2112,1,0^3,20$0,2112,1,0^4,20$23,2110,1,0^5,20$21, 1001,1,0^6,20$21,1001,1,0^7,20$23,0110,1,0^8,20$0, 2112,1,0^9,20$0,2112,1,0^10,20$22,0110,0,0^11,20$2 3,0112,0,0^12,20$84,2112,0,0^13,20$23,2112,0,0^14, 20$22,2110,0,0^15,20$0,2112,1,0^16,20$0,2112,1,0^1 7,20$23,2110,1,0^18,20$21,1001,1,0^19,20$21,1001,1 ,0^20,20$23,0110,2,0^21,20$0,2112,1,0^22,20$0,2112 ,1,0^23,20$0,2112,1,0^24,20$21,2112,1,0^0,21$22,01 10,1,0^1,21$11,1201,1,0^2,21$23,0112,1,0^3,21$0,21 12,1,0^4,21$0,2112,1,0^5,21$0,2112,1,0^6,21$0,2112 ,1,0^7,21$0,2112,1,0^8,21$0,2112,1,0^9,21$0,2112,1 ,0^10,21$0,2112,1,0^11,21$22,0110,0,0^12,21$21,122 1,0,0^13,21$22,2110,0,0^14,21$0,2112,1,0^15,21$0,2 112,1,0^16,21$0,2112,1,0^17,21$0,2112,1,0^18,21$0, 2112,1,0^19,21$0,2112,1,0^20,21$0,2112,1,0^21,21$0 ,2112,1,0^22,21$23,2112,1,0^23,21$11,1201,1,0^24,2 1$22,2110,1,0^0,22$0,2112,2,0^1,22$0,2112,2,0^2,22 $22,0110,1,0^3,22$21,1201,1,0^4,22$21,1201,1,0^5,2 2$23,0112,1,0^6,22$0,2112,1,0^7,22$0,2112,1,0^8,22 $0,2112,1,0^9,22$0,2112,1,0^10,22$0,2112,1,0^11,22 $22,0112,0,0^12,22$21,1001,0,0^13,22$22,2112,0,0^1 4,22$0,2112,1,0^15,22$0,2112,1,0^16,22$0,2112,1,0^ 17,22$0,2112,1,0^18,22$0,2112,1,0^19,22$23,2112,1, 0^20,22$21,1201,1,0^21,22$21,1201,1,0^22,22$22,211 0,1,0^23,22$0,2112,2,0^24,22$0,2112,2,0^0,23$0,211 2,2,0^1,23$0,2112,2,0^2,23$0,2112,2,0^3,23$0,2112, 2,0^4,23$0,2112,2,0^5,23$22,0110,1,0^6,23$21,1201, 1,0^7,23$11,1201,1,0^8,23$23,0112,1,0^9,23$0,2112, 1,0^10,23$22,0112,0,0^11,23$23,0110,0,0^12,23$84,2 112,0,0^13,23$23,2110,0,0^14,23$22,2112,0,0^15,23$ 0,2112,1,0^16,23$23,2112,1,0^17,23$11,1201,1,0^18, 23$21,1201,1,0^19,23$22,2110,1,0^20,23$0,2112,2,0^ 21,23$0,2112,2,0^22,23$0,2112,2,0^23,23$0,2112,2,0 ^24,23$0,2112,2,0^0,24$0,2112,2,0^1,24$0,2112,2,0^ 2,24$0,2112,2,0^3,24$0,2112,2,0^4,24$0,2112,2,0^5, 24$0,2112,2,0^6,24$0,2112,2,0^7,24$0,2112,2,0^8,24 $21,0110,1,0^9,24$0,2112,1,0^10,24$21,0112,0,0^11, 24$99,1021,0,0^12,24$98,1001,0,0^13,24$99,1001,0,0 ^14,24$21,2112,0,0^15,24$0,2112,1,0^16,24$21,2112, 1,0^17,24$0,2112,2,0^18,24$0,2112,2,0^19,24$0,2112 ,2,0^20,24$0,2112,2,0^21,24$0,2112,2,0^22,24$0,211 2,2,0^23,24$0,2112,2,0^24,24$0,2112,2,0&

I actually had a lot of fun creating this awesome 25x25 FFA.

Nice Map. Although There Is A Map KINDA Similar To This, Elevate, This One Is Better. I Support 10/10.

I don't think FFA maps should be symmetrical. TDM is symmetrical, but most good FFA maps isn't. So make it TDM

It wouldn't be good for TDM, because it's easy to shoot into the opposing base. Plus, we need more good FFA maps.

This one isn't really like Elevate, it's more symmetrical.

4.5/5

I like it, but some of the narrow passages on the right can be walked through, and the ones on the left cannot be walked through.
Makes it so its not symmetrical.

muhaha

It isn't really a big deal for me, since both spots are right next to each other, and they both have upwards pathways.

Muahaha indeed. >:3

Pretty good for a FFA but as MacPlaya said, FFA maps shouldn't be symmetrical but even though you can spray to other bases in TDM it still would be better that way.

Bloodbath is symmetrical. Elevate is somewhat symmetrical. Xing is symmetrical. Hostile Grounds is symmetrical.

I can do this all day. ;P

But I dont like any of those -.-

Good FFA maps is usually not symmetrical imo

I see what you're saying, but the choice lies in Blank's hands.

Lol true, but what does blank knows. Tsk, tsk:rolleyes:

He knows how to pick great maps. xD