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View Full Version : [TDM] or [FFA] Terminator [First map]

Ader453
04-11-2009, 01:30 AM
Terminator has 4 teams, Red, Blue, Green and Yellow. Team DeathMatch map. It's very tiny and will need a lot of team work to emerge victorious. Well-suited for grenade fests. Please rate it! My first map!


TDM VERSION
20&15&field&0$2,2^1$17,2^0$4,3^1$15,3^3$4,11^2$15,11^3$2,12^2$ 17,12&0,0$110,2112,3,0^1,0$109,2112,3,0^2,0$109,2112,3,0 ^3,0$109,2112,3,0^4,0$109,2112,3,0^5,0$109,2112,3, 0^6,0$109,2112,3,0^7,0$109,2112,3,0^8,0$109,2112,3 ,0^9,0$109,2112,3,0^10,0$109,2112,3,0^11,0$109,211 2,3,0^12,0$109,2112,3,0^13,0$109,2112,3,0^14,0$109 ,2112,3,0^15,0$109,2112,3,0^16,0$109,2112,3,0^17,0 $109,2112,3,0^18,0$109,2112,3,0^19,0$110,1201,3,0^ 0,1$109,1021,3,0^1,1$103,1021,0,0^2,1$100,1021,0,0 ^3,1$100,1021,0,0^4,1$100,1021,0,0^5,1$100,1021,0, 0^6,1$103,2112,1,0^7,1$84,2112,1,0^8,1$55,2112,0,0 ^9,1$55,2112,0,0^10,1$55,2112,0,0^11,1$55,2112,0,0 ^12,1$84,2112,1,0^13,1$103,1021,0,0^14,1$100,1021, 0,0^15,1$100,1021,0,0^16,1$100,1021,0,0^17,1$100,1 021,0,0^18,1$103,2112,0,0^19,1$109,1201,3,0^0,2$10 9,1021,3,0^1,2$100,0110,0,0^2,2$102,2112,1,0^3,2$1 02,2112,1,0^4,2$102,2112,1,0^5,2$102,2112,1,0^6,2$ 100,2112,0,0^7,2$84,2112,1,0^8,2$55,2112,0,0^9,2$5 5,2112,0,0^10,2$55,2112,0,0^11,2$55,2112,0,0^12,2$ 84,2112,1,0^13,2$100,0110,0,0^14,2$102,2112,1,0^15 ,2$102,2112,1,0^16,2$102,2112,1,0^17,2$102,2112,1, 0^18,2$100,2112,0,0^19,2$109,1201,3,0^0,3$109,1021 ,3,0^1,3$100,0110,0,0^2,3$102,2112,1,0^3,3$102,211 2,1,0^4,3$102,2112,1,0^5,3$102,2112,1,0^6,3$100,21 12,0,0^7,3$84,2112,1,0^8,3$55,2112,0,0^9,3$55,2112 ,0,0^10,3$55,2112,0,0^11,3$55,2112,0,0^12,3$84,211 2,1,0^13,3$100,0110,0,0^14,3$102,2112,1,0^15,3$102 ,2112,1,0^16,3$102,2112,1,0^17,3$102,2112,1,0^18,3 $100,2112,0,0^19,3$109,1201,3,0^0,4$109,1021,3,0^1 ,4$100,0110,0,0^2,4$102,2112,1,0^3,4$102,2112,1,0^ 4,4$102,2112,1,0^5,4$102,2112,1,0^6,4$101,1021,0,0 ^7,4$103,2112,0,0^8,4$55,2112,0,0^9,4$55,2112,0,0^ 10,4$55,2112,0,0^11,4$55,2112,0,0^12,4$103,1021,0, 0^13,4$101,0110,0,0^14,4$102,2112,1,0^15,4$102,211 2,1,0^16,4$102,2112,1,0^17,4$102,2112,1,0^18,4$100 ,2112,0,0^19,4$109,1201,3,0^0,5$109,1021,3,0^1,5$1 03,0110,0,0^2,5$100,1201,0,0^3,5$100,1201,0,0^4,5$ 104,1201,0,0^5,5$100,1201,0,0^6,5$101,1201,0,0^7,5 $101,1021,0,0^8,5$100,1021,0,0^9,5$100,1021,0,0^10 ,5$100,1021,0,0^11,5$100,1021,0,0^12,5$101,0110,0, 0^13,5$101,2112,0,0^14,5$100,1201,0,0^15,5$104,120 1,0,0^16,5$100,1201,0,0^17,5$100,1201,0,0^18,5$103 ,1201,0,0^19,5$109,1201,3,0^0,6$109,1021,3,0^1,6$8 4,2112,1,0^2,6$84,2112,1,0^3,6$84,2112,1,0^4,6$55, 2112,0,0^5,6$55,2112,0,0^6,6$103,0110,0,0^7,6$100, 1201,0,0^8,6$100,1201,0,0^9,6$101,1201,0,0^10,6$10 1,2112,0,0^11,6$100,1201,0,0^12,6$100,1201,0,0^13, 6$103,1201,0,0^14,6$55,2112,0,0^15,6$55,2112,0,0^1 6,6$84,2112,1,0^17,6$84,2112,1,0^18,6$84,2112,1,0^ 19,6$109,1201,3,0^0,7$109,1021,3,0^1,7$55,2112,0,0 ^2,7$55,2112,0,0^3,7$55,2112,0,0^4,7$55,2112,0,0^5 ,7$55,2112,0,0^6,7$55,2112,0,0^7,7$55,2112,0,0^8,7 $55,2112,0,0^9,7$104,0110,0,0^10,7$104,2112,0,0^11 ,7$55,2112,0,0^12,7$55,2112,0,0^13,7$55,2112,0,0^1 4,7$55,2112,0,0^15,7$55,2112,0,0^16,7$55,2112,0,0^ 17,7$55,2112,0,0^18,7$55,2112,0,0^19,7$109,1201,3, 0^0,8$109,1021,3,0^1,8$84,2112,1,0^2,8$84,2112,1,0 ^3,8$84,2112,1,0^4,8$55,2112,0,0^5,8$55,2112,0,0^6 ,8$103,1021,0,0^7,8$100,1021,0,0^8,8$100,1021,0,0^ 9,8$101,0110,0,0^10,8$101,1021,0,0^11,8$100,1021,0 ,0^12,8$100,1021,0,0^13,8$103,2112,0,0^14,8$55,211 2,0,0^15,8$55,2112,0,0^16,8$84,2112,1,0^17,8$84,21 12,1,0^18,8$84,2112,1,0^19,8$109,1201,3,0^0,9$109, 1021,3,0^1,9$103,1021,0,0^2,9$100,1021,0,0^3,9$100 ,1021,0,0^4,9$104,1021,0,0^5,9$100,1021,0,0^6,9$10 1,0110,0,0^7,9$101,2112,0,0^8,9$100,1201,0,0^9,9$1 00,1201,0,0^10,9$100,1201,0,0^11,9$100,1201,0,0^12 ,9$101,1201,0,0^13,9$101,1021,0,0^14,9$100,1021,0, 0^15,9$104,1021,0,0^16,9$100,1021,0,0^17,9$100,102 1,0,0^18,9$103,2112,0,0^19,9$109,1201,3,0^0,10$109 ,1021,3,0^1,10$100,0110,0,0^2,10$102,2112,1,0^3,10 $102,2112,1,0^4,10$102,2112,1,0^5,10$102,2112,1,0^ 6,10$101,2112,0,0^7,10$103,1201,0,0^8,10$55,2112,0 ,0^9,10$55,2112,0,0^10,10$55,2112,0,0^11,10$55,211 2,0,0^12,10$103,0110,0,0^13,10$101,1201,0,0^14,10$ 102,2112,1,0^15,10$102,2112,1,0^16,10$102,2112,1,0 ^17,10$102,2112,1,0^18,10$100,2112,0,0^19,10$109,1 201,3,0^0,11$109,1021,3,0^1,11$100,0110,0,0^2,11$1 02,2112,1,0^3,11$102,2112,1,0^4,11$102,2112,1,0^5, 11$102,2112,1,0^6,11$100,2112,0,0^7,11$84,2112,1,0 ^8,11$55,2112,0,0^9,11$55,2112,0,0^10,11$55,2112,0 ,0^11,11$55,2112,0,0^12,11$84,2112,1,0^13,11$100,0 110,0,0^14,11$102,2112,1,0^15,11$102,2112,1,0^16,1 1$102,2112,1,0^17,11$102,2112,1,0^18,11$100,2112,0 ,0^19,11$109,1201,3,0^0,12$109,1021,3,0^1,12$100,0 110,0,0^2,12$102,2112,1,0^3,12$102,2112,1,0^4,12$1 02,2112,1,0^5,12$102,2112,1,0^6,12$100,2112,0,0^7, 12$84,2112,1,0^8,12$55,2112,0,0^9,12$55,2112,0,0^1 0,12$55,2112,0,0^11,12$55,2112,0,0^12,12$84,2112,1 ,0^13,12$100,0110,0,0^14,12$102,2112,1,0^15,12$102 ,2112,1,0^16,12$102,2112,1,0^17,12$102,2112,1,0^18 ,12$100,2112,0,0^19,12$109,1201,3,0^0,13$109,1021, 3,0^1,13$103,0110,0,0^2,13$100,1201,0,0^3,13$100,1 201,0,0^4,13$100,1201,0,0^5,13$100,1201,0,0^6,13$1 03,1201,0,0^7,13$84,2112,1,0^8,13$55,2112,0,0^9,13 $55,2112,0,0^10,13$55,2112,0,0^11,13$55,2112,0,0^1 2,13$84,2112,1,0^13,13$103,0110,0,0^14,13$100,1201 ,0,0^15,13$100,1201,0,0^16,13$100,1201,0,0^17,13$1 00,1201,0,0^18,13$103,1201,0,0^19,13$109,1201,3,0^ 0,14$110,1021,3,0^1,14$109,0110,3,0^2,14$109,0110, 3,0^3,14$109,0110,3,0^4,14$109,0110,3,0^5,14$109,0 110,3,0^6,14$109,0110,3,0^7,14$109,0110,3,0^8,14$1 09,0110,3,0^9,14$109,0110,3,0^10,14$109,0110,3,0^1 1,14$109,0110,3,0^12,14$109,0110,3,0^13,14$109,011 0,3,0^14,14$109,0110,3,0^15,14$109,0110,3,0^16,14$ 109,0110,3,0^17,14$109,0110,3,0^18,14$109,0110,3,0 ^19,14$110,0110,3,0&

FFA VERSION
20&15&field&0$2,2^0$17,2^0$4,3^0$15,3^0$4,11^0$15,11^0$2,12^0$ 17,12&0,0$110,2112,3,0^1,0$109,2112,3,0^2,0$109,2112,3,0 ^3,0$109,2112,3,0^4,0$109,2112,3,0^5,0$109,2112,3, 0^6,0$109,2112,3,0^7,0$109,2112,3,0^8,0$109,2112,3 ,0^9,0$109,2112,3,0^10,0$109,2112,3,0^11,0$109,211 2,3,0^12,0$109,2112,3,0^13,0$109,2112,3,0^14,0$109 ,2112,3,0^15,0$109,2112,3,0^16,0$109,2112,3,0^17,0 $109,2112,3,0^18,0$109,2112,3,0^19,0$110,1201,3,0^ 0,1$109,1021,3,0^1,1$103,1021,0,0^2,1$100,1021,0,0 ^3,1$100,1021,0,0^4,1$100,1021,0,0^5,1$100,1021,0, 0^6,1$103,2112,1,0^7,1$84,2112,1,0^8,1$55,2112,0,0 ^9,1$55,2112,0,0^10,1$55,2112,0,0^11,1$55,2112,0,0 ^12,1$84,2112,1,0^13,1$103,1021,0,0^14,1$100,1021, 0,0^15,1$100,1021,0,0^16,1$100,1021,0,0^17,1$100,1 021,0,0^18,1$103,2112,0,0^19,1$109,1201,3,0^0,2$10 9,1021,3,0^1,2$100,0110,0,0^2,2$102,2112,1,0^3,2$1 02,2112,1,0^4,2$102,2112,1,0^5,2$102,2112,1,0^6,2$ 100,2112,0,0^7,2$84,2112,1,0^8,2$55,2112,0,0^9,2$5 5,2112,0,0^10,2$55,2112,0,0^11,2$55,2112,0,0^12,2$ 84,2112,1,0^13,2$100,0110,0,0^14,2$102,2112,1,0^15 ,2$102,2112,1,0^16,2$102,2112,1,0^17,2$102,2112,1, 0^18,2$100,2112,0,0^19,2$109,1201,3,0^0,3$109,1021 ,3,0^1,3$100,0110,0,0^2,3$102,2112,1,0^3,3$102,211 2,1,0^4,3$102,2112,1,0^5,3$102,2112,1,0^6,3$100,21 12,0,0^7,3$84,2112,1,0^8,3$55,2112,0,0^9,3$55,2112 ,0,0^10,3$55,2112,0,0^11,3$55,2112,0,0^12,3$84,211 2,1,0^13,3$100,0110,0,0^14,3$102,2112,1,0^15,3$102 ,2112,1,0^16,3$102,2112,1,0^17,3$102,2112,1,0^18,3 $100,2112,0,0^19,3$109,1201,3,0^0,4$109,1021,3,0^1 ,4$100,0110,0,0^2,4$102,2112,1,0^3,4$102,2112,1,0^ 4,4$102,2112,1,0^5,4$102,2112,1,0^6,4$101,1021,0,0 ^7,4$103,2112,0,0^8,4$55,2112,0,0^9,4$55,2112,0,0^ 10,4$55,2112,0,0^11,4$55,2112,0,0^12,4$103,1021,0, 0^13,4$101,0110,0,0^14,4$102,2112,1,0^15,4$102,211 2,1,0^16,4$102,2112,1,0^17,4$102,2112,1,0^18,4$100 ,2112,0,0^19,4$109,1201,3,0^0,5$109,1021,3,0^1,5$1 03,0110,0,0^2,5$100,1201,0,0^3,5$100,1201,0,0^4,5$ 104,1201,0,0^5,5$100,1201,0,0^6,5$101,1201,0,0^7,5 $101,1021,0,0^8,5$100,1021,0,0^9,5$100,1021,0,0^10 ,5$100,1021,0,0^11,5$100,1021,0,0^12,5$101,0110,0, 0^13,5$101,2112,0,0^14,5$100,1201,0,0^15,5$104,120 1,0,0^16,5$100,1201,0,0^17,5$100,1201,0,0^18,5$103 ,1201,0,0^19,5$109,1201,3,0^0,6$109,1021,3,0^1,6$8 4,2112,1,0^2,6$84,2112,1,0^3,6$84,2112,1,0^4,6$55, 2112,0,0^5,6$55,2112,0,0^6,6$103,0110,0,0^7,6$100, 1201,0,0^8,6$100,1201,0,0^9,6$101,1201,0,0^10,6$10 1,2112,0,0^11,6$100,1201,0,0^12,6$100,1201,0,0^13, 6$103,1201,0,0^14,6$55,2112,0,0^15,6$55,2112,0,0^1 6,6$84,2112,1,0^17,6$84,2112,1,0^18,6$84,2112,1,0^ 19,6$109,1201,3,0^0,7$109,1021,3,0^1,7$55,2112,0,0 ^2,7$55,2112,0,0^3,7$55,2112,0,0^4,7$55,2112,0,0^5 ,7$55,2112,0,0^6,7$55,2112,0,0^7,7$55,2112,0,0^8,7 $55,2112,0,0^9,7$104,0110,0,0^10,7$104,2112,0,0^11 ,7$55,2112,0,0^12,7$55,2112,0,0^13,7$55,2112,0,0^1 4,7$55,2112,0,0^15,7$55,2112,0,0^16,7$55,2112,0,0^ 17,7$55,2112,0,0^18,7$55,2112,0,0^19,7$109,1201,3, 0^0,8$109,1021,3,0^1,8$84,2112,1,0^2,8$84,2112,1,0 ^3,8$84,2112,1,0^4,8$55,2112,0,0^5,8$55,2112,0,0^6 ,8$103,1021,0,0^7,8$100,1021,0,0^8,8$100,1021,0,0^ 9,8$101,0110,0,0^10,8$101,1021,0,0^11,8$100,1021,0 ,0^12,8$100,1021,0,0^13,8$103,2112,0,0^14,8$55,211 2,0,0^15,8$55,2112,0,0^16,8$84,2112,1,0^17,8$84,21 12,1,0^18,8$84,2112,1,0^19,8$109,1201,3,0^0,9$109, 1021,3,0^1,9$103,1021,0,0^2,9$100,1021,0,0^3,9$100 ,1021,0,0^4,9$104,1021,0,0^5,9$100,1021,0,0^6,9$10 1,0110,0,0^7,9$101,2112,0,0^8,9$100,1201,0,0^9,9$1 00,1201,0,0^10,9$100,1201,0,0^11,9$100,1201,0,0^12 ,9$101,1201,0,0^13,9$101,1021,0,0^14,9$100,1021,0, 0^15,9$104,1021,0,0^16,9$100,1021,0,0^17,9$100,102 1,0,0^18,9$103,2112,0,0^19,9$109,1201,3,0^0,10$109 ,1021,3,0^1,10$100,0110,0,0^2,10$102,2112,1,0^3,10 $102,2112,1,0^4,10$102,2112,1,0^5,10$102,2112,1,0^ 6,10$101,2112,0,0^7,10$103,1201,0,0^8,10$55,2112,0 ,0^9,10$55,2112,0,0^10,10$55,2112,0,0^11,10$55,211 2,0,0^12,10$103,0110,0,0^13,10$101,1201,0,0^14,10$ 102,2112,1,0^15,10$102,2112,1,0^16,10$102,2112,1,0 ^17,10$102,2112,1,0^18,10$100,2112,0,0^19,10$109,1 201,3,0^0,11$109,1021,3,0^1,11$100,0110,0,0^2,11$1 02,2112,1,0^3,11$102,2112,1,0^4,11$102,2112,1,0^5, 11$102,2112,1,0^6,11$100,2112,0,0^7,11$84,2112,1,0 ^8,11$55,2112,0,0^9,11$55,2112,0,0^10,11$55,2112,0 ,0^11,11$55,2112,0,0^12,11$84,2112,1,0^13,11$100,0 110,0,0^14,11$102,2112,1,0^15,11$102,2112,1,0^16,1 1$102,2112,1,0^17,11$102,2112,1,0^18,11$100,2112,0 ,0^19,11$109,1201,3,0^0,12$109,1021,3,0^1,12$100,0 110,0,0^2,12$102,2112,1,0^3,12$102,2112,1,0^4,12$1 02,2112,1,0^5,12$102,2112,1,0^6,12$100,2112,0,0^7, 12$84,2112,1,0^8,12$55,2112,0,0^9,12$55,2112,0,0^1 0,12$55,2112,0,0^11,12$55,2112,0,0^12,12$84,2112,1 ,0^13,12$100,0110,0,0^14,12$102,2112,1,0^15,12$102 ,2112,1,0^16,12$102,2112,1,0^17,12$102,2112,1,0^18 ,12$100,2112,0,0^19,12$109,1201,3,0^0,13$109,1021, 3,0^1,13$103,0110,0,0^2,13$100,1201,0,0^3,13$100,1 201,0,0^4,13$100,1201,0,0^5,13$100,1201,0,0^6,13$1 03,1201,0,0^7,13$84,2112,1,0^8,13$55,2112,0,0^9,13 $55,2112,0,0^10,13$55,2112,0,0^11,13$55,2112,0,0^1 2,13$84,2112,1,0^13,13$103,0110,0,0^14,13$100,1201 ,0,0^15,13$100,1201,0,0^16,13$100,1201,0,0^17,13$1 00,1201,0,0^18,13$103,1201,0,0^19,13$109,1201,3,0^ 0,14$110,1021,3,0^1,14$109,0110,3,0^2,14$109,0110, 3,0^3,14$109,0110,3,0^4,14$109,0110,3,0^5,14$109,0 110,3,0^6,14$109,0110,3,0^7,14$109,0110,3,0^8,14$1 09,0110,3,0^9,14$109,0110,3,0^10,14$109,0110,3,0^1 1,14$109,0110,3,0^12,14$109,0110,3,0^13,14$109,011 0,3,0^14,14$109,0110,3,0^15,14$109,0110,3,0^16,14$ 109,0110,3,0^17,14$109,0110,3,0^18,14$109,0110,3,0 ^19,14$110,0110,3,0&

-Ader453