FlippysKnife
04-10-2009, 06:25 PM
If someone already has this name, sorry cause i didn't look.
Domination - 2 Team DeathMatch.
Uhm, i think i got the levels right..
[The CTF tiles represent like a statue or something, i could take them out..]
http://i203.photobucket.com/albums/aa226/flippyok/wutname.png
31&61&field&1$13,1^1$19,1^1$2,3^1$5,3^1$9,3^1$11,3^1$19,3^1$23 ,3^1$28,4^1$7,5^1$21,5^1$25,5^1$11,7^1$19,7^0$11,5 3^0$19,53^0$6,55^0$9,55^0$21,55^0$25,55^0$1,56^0$2 9,56^0$8,57^0$11,57^0$19,57^0$22,57^0$13,58^0$17,5 8&0,0$0,2112,1,0^1,0$0,2112,1,0^2,0$0,2112,1,0^3,0$0 ,2112,1,0^4,0$0,2112,1,0^5,0$0,2112,1,0^6,0$0,2112 ,1,0^7,0$0,2112,1,0^8,0$39,2112,1,0^9,0$40,2112,1, 0^10,0$41,2112,1,0^11,0$42,2112,1,0^12,0$43,2112,1 ,0^13,0$0,2112,1,0^14,0$0,2112,1,0^15,0$0,2112,1,0 ^16,0$0,2112,1,0^17,0$0,2112,1,0^18,0$0,2112,1,0^1 9,0$44,2112,1,0^20,0$45,2112,1,0^21,0$46,2112,1,0^ 22,0$47,2112,1,0^23,0$48,2112,1,0^24,0$0,2112,1,0^ 25,0$0,2112,1,0^26,0$0,2112,1,0^27,0$29,2112,1,0^2 8,0$30,2112,1,0^29,0$31,2112,1,0^30,0$32,2112,1,0^ 0,1$0,2112,1,0^1,1$0,2112,1,0^2,1$0,2112,1,0^3,1$0 ,2112,1,0^4,1$0,2112,1,0^5,1$0,2112,1,0^6,1$0,2112 ,1,0^7,1$0,2112,1,0^8,1$44,2112,1,0^9,1$45,2112,1, 0^10,1$46,2112,1,0^11,1$47,2112,1,0^12,1$48,2112,1 ,0^13,1$0,2112,1,0^14,1$0,2112,1,0^15,1$0,2112,1,0 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10,45$47,2112,0,0^11,45$48,2112,0,0^0,46$12,1021,-1,0^1,46$8,1021,-1,0^2,46$8,1021,-1,0^3,46$10,1021,-1,0^4,46$8,1021,-1,0^5,46$8,1021,-1,0^6,46$8,1021,-1,0^7,46$8,1021,-1,0^8,46$8,1021,-1,0^9,46$8,1021,-1,0^10,46$8,1021,-1,0^11,46$8,1021,-1,0^12,46$8,1021,-1,0^13,46$8,1021,-1,0^14,46$8,1021,-1,0^15,46$10,1021,-1,0^16,46$8,1021,-1,0^17,46$8,1021,-1,0^18,46$8,1021,-1,0^19,46$8,1021,-1,0^20,46$8,1021,-1,0^21,46$8,1021,-1,0^22,46$8,1021,-1,0^23,46$8,1021,-1,0^24,46$8,1021,-1,0^25,46$8,1021,-1,0^26,46$8,1021,-1,0^27,46$10,1021,-1,0^28,46$8,1021,-1,0^29,46$8,1021,-1,0^30,46$12,1001,-1,0^0,47$8,0110,5,0^1,47$9,2112,-1,0^2,47$9,2112,-1,0^3,47$9,2112,-1,0^4,47$9,2112,-1,0^5,47$9,2112,-1,0^6,47$9,2112,-1,0^7,47$9,2112,-1,0^8,47$9,2112,-1,0^9,47$9,2112,-1,0^10,47$9,2112,-1,0^11,47$9,2112,-1,0^12,47$9,2112,-1,0^13,47$9,2112,-1,0^14,47$9,2112,-1,0^15,47$9,2112,-1,0^16,47$9,2112,-1,0^17,47$9,2112,-1,0^18,47$9,2112,-1,0^19,47$9,2112,-1,0^20,47$9,2112,-1,0^21,47$9,2112,-1,0^22,47$9,2112,-1,0^23,47$9,2112,-1,0^24,47$9,2112,-1,0^25,47$9,2112,-1,0^26,47$9,2112,-1,0^27,47$9,2112,-1,0^28,47$9,2112,-1,0^29,47$9,2112,-1,0^30,47$8,2112,5,0^0,48$8,0110,5,0^1,48$9,2112,-1,0^2,48$9,2112,-1,0^3,48$9,2112,-1,0^4,48$9,2112,-1,0^5,48$9,2112,-1,0^6,48$9,2112,-1,0^7,48$9,2112,-1,0^8,48$9,2112,-1,0^9,48$9,2112,-1,0^10,48$9,2112,-1,0^11,48$9,2112,-1,0^12,48$9,2112,-1,0^13,48$9,2112,-1,0^14,48$9,2112,-1,0^15,48$9,2112,-1,0^16,48$9,2112,-1,0^17,48$9,2112,-1,0^18,48$9,2112,-1,0^19,48$9,2112,-1,0^20,48$9,2112,-1,0^21,48$9,2112,-1,0^22,48$9,2112,-1,0^23,48$9,2112,-1,0^24,48$9,2112,-1,0^25,48$9,2112,-1,0^26,48$9,2112,-1,0^27,48$9,2112,-1,0^28,48$9,2112,-1,0^29,48$9,2112,-1,0^30,48$8,2112,5,0^0,49$12,0110,-1,0^1,49$8,1201,-1,0^2,49$8,1201,-1,0^3,49$10,1201,-1,0^4,49$8,1201,-1,0^5,49$8,1201,-1,0^6,49$8,1201,-1,0^7,49$8,1201,-1,0^8,49$8,1201,-1,0^9,49$8,1201,-1,0^10,49$8,1201,-1,0^11,49$8,1201,-1,0^12,49$8,1201,-1,0^13,49$8,1201,-1,0^14,49$10,1201,-1,0^15,49$10,1201,-1,0^16,49$10,1201,-1,0^17,49$8,1201,-1,0^18,49$8,1201,-1,0^19,49$8,1201,-1,0^20,49$8,1201,-1,0^21,49$8,1201,-1,0^22,49$8,1201,-1,0^23,49$8,1201,-1,0^24,49$8,1201,-1,0^25,49$8,1201,-1,0^26,49$8,1201,-1,0^27,49$10,1201,-1,0^28,49$8,1201,-1,0^29,49$8,1201,-1,0^30,49$12,1201,-1,0^0,50$98,1021,0,0^1,50$98,1021,0,0^2,50$99,1201 ,0,0^4,50$99,1021,0,0^5,50$98,1021,0,0^6,50$98,102 1,0,0^7,50$98,1021,0,0^8,50$98,1021,0,0^9,50$98,10 21,0,0^10,50$98,1021,0,0^11,50$98,1021,0,0^12,50$9 8,1021,0,0^13,50$99,1201,0,0^17,50$99,1021,0,0^18, 50$98,1021,0,0^19,50$98,1021,0,0^20,50$98,1021,0,0 ^21,50$98,1021,0,0^22,50$98,1021,0,0^23,50$98,1021 ,0,0^24,50$98,1021,0,0^25,50$98,1021,0,0^26,50$99, 1201,0,0^28,50$99,1021,0,0^29,50$98,1021,0,0^30,50 $98,1021,0,0^0,51$21,1201,0,0^1,51$21,1201,0,0^2,5 1$21,1201,0,0^3,51$11,1201,0,0^4,51$21,1201,0,0^5, 51$21,1201,0,0^6,51$21,1201,0,0^7,51$21,1201,0,0^8 ,51$21,1201,0,0^9,51$21,1201,0,0^10,51$21,1201,0,0 ^11,51$21,1201,0,0^12,51$21,1201,0,0^13,51$21,1201 ,0,0^14,51$11,1201,0,0^15,51$11,1201,0,0^16,51$11, 1201,0,0^17,51$21,1201,0,0^18,51$21,1201,0,0^19,51 $21,1201,0,0^20,51$21,1201,0,0^21,51$21,1201,0,0^2 2,51$21,1201,0,0^23,51$21,1201,0,0^24,51$21,1201,0 ,0^25,51$21,1201,0,0^26,51$21,1201,0,0^27,51$11,12 01,0,0^28,51$21,1201,0,0^29,51$21,1201,0,0^30,51$2 1,1201,0,0^0,52$5,1021,0,0^1,52$5,1021,0,0^2,52$4, 1021,0,0^3,52$0,2112,1,0^4,52$4,1201,0,0^5,52$5,10 21,0,0^6,52$5,1021,0,0^7,52$5,1021,0,0^8,52$5,1021 ,0,0^9,52$5,1021,0,0^10,52$5,1021,0,0^11,52$5,1021 ,0,0^12,52$5,1021,0,0^13,52$4,1021,0,0^14,52$0,211 2,1,0^15,52$0,2112,1,0^16,52$0,2112,1,0^17,52$4,12 01,0,0^18,52$5,1021,0,0^19,52$5,1021,0,0^20,52$5,1 021,0,0^21,52$5,1021,0,0^22,52$5,1021,0,0^23,52$5, 1021,0,0^24,52$5,1021,0,0^25,52$5,1021,0,0^26,52$4 ,1021,0,0^27,52$0,2112,1,0^28,52$4,1201,0,0^29,52$ 5,1021,0,0^30,52$5,1021,0,0^0,53$36,2112,1,0^1,53$ 37,2112,1,0^2,53$38,2112,1,0^3,53$0,2112,1,0^4,53$ 0,2112,1,0^5,53$0,2112,1,0^6,53$0,2112,1,0^7,53$0, 2112,1,0^8,53$0,2112,1,0^9,53$0,2112,1,0^10,53$0,2 112,1,0^11,53$0,2112,1,0^12,53$0,2112,1,0^13,53$24 ,2112,1,0^14,53$25,2112,1,0^15,53$26,2112,1,0^16,5 3$27,2112,1,0^17,53$28,2112,1,0^18,53$0,2112,1,0^1 9,53$0,2112,1,0^20,53$0,2112,1,0^21,53$0,2112,1,0^ 22,53$0,2112,1,0^23,53$0,2112,1,0^24,53$0,2112,1,0 ^25,53$0,2112,1,0^26,53$0,2112,1,0^27,53$0,2112,1, 0^28,53$0,2112,1,0^29,53$0,2112,1,0^30,53$0,2112,1 ,0^0,54$41,2112,1,0^1,54$42,2112,1,0^2,54$43,2112, 1,0^3,54$0,2112,1,0^4,54$110,2112,1,0^5,54$109,211 2,1,0^6,54$109,2112,1,0^7,54$109,2112,1,0^8,54$111 ,2112,1,0^9,54$109,2112,1,0^10,54$109,2112,1,0^11, 54$109,2112,1,0^12,54$110,1201,1,0^13,54$29,2112,1 ,0^14,54$30,2112,1,0^15,54$31,2112,1,0^16,54$32,21 12,1,0^17,54$33,2112,1,0^18,54$110,2112,1,0^19,54$ 109,2112,1,0^20,54$109,2112,1,0^21,54$109,2112,1,0 ^22,54$111,2112,1,0^23,54$109,2112,1,0^24,54$109,2 112,1,0^25,54$109,2112,1,0^26,54$110,1201,1,0^27,5 4$0,2112,1,0^28,54$0,2112,1,0^29,54$0,2112,1,0^30, 54$0,2112,1,0^0,55$46,2112,1,0^1,55$47,2112,1,0^2, 55$48,2112,0,0^3,55$0,2112,1,0^4,55$109,1021,1,0^5 ,55$84,2112,1,0^6,55$55,2112,1,0^7,55$55,2112,1,0^ 8,55$55,2112,1,0^9,55$55,2112,1,0^10,55$85,2112,0, 0^11,55$86,2112,0,0^12,55$109,1201,1,0^13,55$34,21 12,1,0^14,55$35,2112,1,0^15,55$36,2112,1,0^16,55$3 7,2112,1,0^17,55$38,2112,1,0^18,55$109,1021,1,0^19 ,55$85,2112,0,0^20,55$86,2112,0,0^21,55$55,2112,1, 0^22,55$55,2112,1,0^23,55$55,2112,1,0^24,55$84,211 2,1,0^25,55$55,2112,1,0^26,55$109,1201,1,0^27,55$0 ,2112,1,0^28,55$0,2112,1,0^29,55$0,2112,1,0^30,55$ 0,2112,1,0^0,56$0,2112,1,0^1,56$0,2112,1,0^2,56$0, 2112,1,0^3,56$0,2112,1,0^4,56$111,1021,1,0^5,56$55 ,2112,1,0^6,56$55,2112,1,0^7,56$55,2112,1,0^8,56$5 5,2112,1,0^9,56$55,2112,1,0^10,56$87,2112,0,0^11,5 6$88,2112,0,0^12,56$109,1201,1,0^13,56$39,2112,1,0 ^14,56$40,2112,1,0^15,56$41,2112,1,0^16,56$42,2112 ,1,0^17,56$43,2112,1,0^18,56$109,1021,1,0^19,56$87 ,2112,0,0^20,56$88,2112,0,0^21,56$55,2112,1,0^22,5 6$55,2112,1,0^23,56$55,2112,1,0^24,56$55,2112,1,0^ 25,56$55,2112,1,0^26,56$111,1201,1,0^27,56$0,2112, 1,0^28,56$0,2112,1,0^29,56$0,2112,1,0^30,56$0,2112 ,1,0^0,57$25,2112,1,0^1,57$26,2112,1,0^2,57$27,211 2,1,0^3,57$28,2112,1,0^4,57$109,1021,1,0^5,57$84,2 112,1,0^6,57$84,2112,1,0^7,57$55,2112,1,0^8,57$55, 2112,1,0^9,57$55,2112,1,0^10,57$55,2112,1,0^11,57$ 55,2112,1,0^12,57$111,1201,1,0^13,57$44,2112,1,0^1 4,57$45,2112,1,0^15,57$46,2112,1,0^16,57$47,2112,1 ,0^17,57$48,2112,1,0^18,57$111,1021,1,0^19,57$55,2 112,1,0^20,57$55,2112,1,0^21,57$55,2112,1,0^22,57$ 55,2112,1,0^23,57$55,2112,1,0^24,57$84,2112,1,0^25 ,57$84,2112,1,0^26,57$109,1201,1,0^27,57$0,2112,1, 0^28,57$0,2112,1,0^29,57$0,2112,1,0^30,57$0,2112,1 ,0^0,58$30,2112,1,0^1,58$31,2112,1,0^2,58$32,2112, 1,0^3,58$33,2112,1,0^4,58$110,1021,1,0^5,58$109,01 10,1,0^6,58$109,0110,1,0^7,58$109,0110,1,0^8,58$11 1,0110,1,0^9,58$109,0110,1,0^10,58$109,0110,1,0^11 ,58$109,0110,1,0^12,58$110,0110,1,0^13,58$0,2112,1 ,0^14,58$0,2112,1,0^15,58$0,2112,1,0^16,58$0,2112, 1,0^17,58$0,2112,1,0^18,58$110,1021,1,0^19,58$109, 0110,1,0^20,58$109,0110,1,0^21,58$109,0110,1,0^22, 58$111,0110,1,0^23,58$109,0110,1,0^24,58$109,0110, 1,0^25,58$109,0110,1,0^26,58$110,0110,1,0^27,58$0, 2112,1,0^28,58$24,2112,1,0^29,58$25,2112,1,0^30,58 $26,2112,1,0^0,59$35,2112,1,0^1,59$36,2112,1,0^2,5 9$37,2112,1,0^3,59$38,2112,1,0^4,59$0,2112,1,0^5,5 9$0,2112,1,0^6,59$0,2112,1,0^7,59$0,2112,1,0^8,59$ 0,2112,1,0^9,59$0,2112,1,0^10,59$0,2112,1,0^11,59$ 0,2112,1,0^12,59$0,2112,1,0^13,59$0,2112,1,0^14,59 $0,2112,1,0^15,59$0,2112,1,0^16,59$0,2112,1,0^17,5 9$0,2112,1,0^18,59$0,2112,1,0^19,59$0,2112,1,0^20, 59$0,2112,1,0^21,59$0,2112,1,0^22,59$0,2112,1,0^23 ,59$0,2112,1,0^24,59$0,2112,1,0^25,59$0,2112,1,0^2 6,59$0,2112,1,0^27,59$0,2112,1,0^28,59$29,2112,1,0 ^29,59$30,2112,1,0^30,59$31,2112,1,0^0,60$40,2112, 1,0^1,60$41,2112,1,0^2,60$42,2112,1,0^3,60$43,2112 ,1,0^4,60$0,2112,1,0^5,60$0,2112,1,0^6,60$0,2112,1 ,0^7,60$0,2112,1,0^8,60$0,2112,1,0^9,60$0,2112,1,0 ^10,60$24,2112,1,0^11,60$25,2112,1,0^12,60$26,2112 ,1,0^13,60$27,2112,1,0^14,60$28,2112,1,0^15,60$0,2 112,1,0^16,60$0,2112,1,0^17,60$0,2112,1,0^18,60$0, 2112,1,0^19,60$0,2112,1,0^20,60$0,2112,1,0^21,60$0 ,2112,1,0^22,60$0,2112,1,0^23,60$0,2112,1,0^24,60$ 0,2112,1,0^25,60$0,2112,1,0^26,60$0,2112,1,0^27,60 $0,2112,1,0^28,60$34,2112,1,0^29,60$35,2112,1,0^30 ,60$36,2112,1,0&
Love it OR Hate it.
Domination - 2 Team DeathMatch.
Uhm, i think i got the levels right..
[The CTF tiles represent like a statue or something, i could take them out..]
http://i203.photobucket.com/albums/aa226/flippyok/wutname.png
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