2T-CTF AType Combat Series 3 [Archive] - Pawn

Sharpkill

10-27-2009, 06:28 PM

Yup.
Epic A right there.
Remastered into S-iii.

http://i282.photobucket.com/albums/kk246/phildai401/AtypeCombatSeries3.png

Lets do this.
My best so far.
In my opinion. :|

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0,0^2,26$8,2112,0,0^3,26$12,0110,0,0^4,26$10,1201,-1,0^5,26$8,1201,0,0^6,26$12,2110,0,0^7,26$6,2112,0 ,0^8,26$5,1021,0,0^9,26$6,0110,0,0^10,26$55,2112,0 ,0^11,26$55,2112,0,0^12,26$55,2112,0,0^13,26$55,21 12,0,0^14,26$55,2112,0,0^15,26$55,2112,0,0^16,26$1 04,0112,0,0^17,26$102,2112,1,0^18,26$102,2112,1,0^ 19,26$102,2112,1,0^20,26$84,2112,1,0^21,26$102,211 2,1,0^22,26$102,2112,1,0^23,26$102,2112,1,0^24,26$ 84,2112,1,0^25,26$102,2112,1,0^26,26$102,2112,1,0^ 27,26$102,2112,1,0^28,26$104,2112,0,0^29,26$55,211 2,0,0^30,26$55,2112,0,0^31,26$55,2112,0,0^32,26$55 ,2112,0,0^33,26$55,2112,0,0^34,26$55,2112,0,0^35,2 6$6,2110,0,0^36,26$5,1021,0,0^37,26$6,0112,0,0^38, 26$12,0110,0,0^39,26$8,1201,0,0^40,26$10,1201,-1,0^41,26$12,2110,0,0^42,26$8,0112,0,0^43,26$9,211 2,0,0^44,26$9,2112,0,0^0,27$9,2112,0,0^1,27$9,2112 ,0,0^2,27$8,2112,0,0^3,27$0,2112,0,0^4,27$0,2112,0 ,0^5,27$0,2112,0,0^6,27$6,2112,0,0^7,27$6,0110,0,0 ^8,27$55,2112,0,0^9,27$55,2112,0,0^10,27$55,2112,0 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1,0,0^38,30$0,2112,0,0^39,30$0,2112,0,0^40,30$0,21 12,0,0^41,30$0,2112,0,0^42,30$8,0112,0,0^43,30$9,2 112,0,0^44,30$9,2112,0,0^0,31$9,2112,0,0^1,31$9,21 12,0,0^2,31$8,2112,0,0^3,31$0,2112,0,0^4,31$0,2112 ,0,0^5,31$0,2112,0,0^6,31$6,2112,0,0^7,31$5,1021,0 ,0^8,31$6,0110,0,0^9,31$100,1021,0,0^10,31$100,102 1,0,0^11,31$103,2112,0,0^12,31$55,2112,0,0^13,31$5 5,2112,0,0^14,31$55,2112,0,0^15,31$55,2112,0,0^16, 31$55,2112,0,0^17,31$90,2112,0,0^18,31$5,2112,0,0^ 19,31$0,2112,0,0^20,31$0,2112,0,0^21,31$0,2112,0,0 ^22,31$0,2112,0,0^23,31$0,2112,0,0^24,31$0,2112,0, 0^25,31$0,2112,0,0^26,31$5,2112,0,0^27,31$90,0112, 0,0^28,31$55,2112,0,0^29,31$55,2112,0,0^30,31$55,2 112,0,0^31,31$55,2112,0,0^32,31$55,2112,0,0^33,31$ 103,0112,0,0^34,31$100,1021,0,0^35,31$100,1021,0,0 ^36,31$6,2110,0,0^37,31$5,1021,0,0^38,31$6,0112,0, 0^39,31$0,2112,0,0^40,31$0,2112,0,0^41,31$0,2112,0 ,0^42,31$8,0112,0,0^43,31$9,2112,0,0^44,31$9,2112, 0,0^0,32$9,2112,0,0^1,32$9,2112,0,0^2,32$8,2112,0, 0^3,32$0,2112,0,0^4,32$0,2112,0,0^5,32$6,2112,0,0^ 6,32$6,0110,0,0^7,32$102,2112,1,0^8,32$102,2112,1, 0^9,32$102,2112,1,0^10,32$102,2112,1,0^11,32$104,2 112,0,0^12,32$55,2112,0,0^13,32$55,2112,0,0^14,32$ 55,2112,0,0^15,32$55,2112,0,0^16,32$6,2112,0,0^17, 32$5,1021,0,0^18,32$6,0110,0,0^19,32$0,2112,0,0^20 ,32$0,2112,0,0^21,32$0,2112,0,0^22,32$0,2112,0,0^2 3,32$0,2112,0,0^24,32$0,2112,0,0^25,32$0,2112,0,0^ 26,32$6,2110,0,0^27,32$5,1021,0,0^28,32$6,0112,0,0 ^29,32$55,2112,0,0^30,32$55,2112,0,0^31,32$55,2112 ,0,0^32,32$55,2112,0,0^33,32$104,0112,0,0^34,32$10 2,2112,1,0^35,32$102,2112,1,0^36,32$102,2112,1,0^3 7,32$102,2112,1,0^38,32$6,2110,0,0^39,32$6,0112,0, 0^40,32$0,2112,0,0^41,32$0,2112,0,0^42,32$8,0112,0 ,0^43,32$9,2112,0,0^44,32$9,2112,0,0^0,33$9,2112,0 ,0^1,33$9,2112,0,0^2,33$8,2112,0,0^3,33$0,2112,0,0 ^4,33$0,2112,0,0^5,33$5,2112,0,0^6,33$100,0112,0,0 ^7,33$102,2112,1,0^8,33$102,2112,1,0^9,33$102,2112 ,1,0^10,33$102,2112,1,0^11,33$100,2112,0,0^12,33$5 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,35$0,2112,0,0^32,35$0,2112,0,0^33,35$4,1001,0,0^3 4,35$6,1201,1,0^35,35$100,0112,0,0^36,35$102,2112, 1,0^37,35$102,2112,1,0^38,35$100,2112,0,0^39,35$6, 2110,0,0^40,35$5,1021,0,0^41,35$6,0112,0,0^42,35$8 ,0112,0,0^43,35$9,2112,0,0^44,35$9,2112,0,0^0,36$9 ,2112,0,0^1,36$9,2112,0,0^2,36$8,2112,0,0^3,36$5,2 112,0,0^4,36$56,1021,0,0^5,36$55,2112,0,0^6,36$104 ,0112,0,0^7,36$102,2112,1,0^8,36$102,2112,1,0^9,36 $100,2112,0,0^10,36$5,2112,0,0^11,36$0,2112,0,0^12 ,36$0,2112,0,0^13,36$0,2112,0,0^14,36$0,2112,0,0^1 5,36$0,2112,0,0^16,36$0,2112,0,0^17,36$0,2112,0,0^ 18,36$84,2112,0,0^19,36$0,2112,0,0^20,36$110,2110, 0,0^21,36$109,2110,0,0^22,36$111,2110,0,0^23,36$10 9,2110,0,0^24,36$110,0110,0,0^25,36$0,2112,0,0^26, 36$84,2112,0,0^27,36$0,2112,0,0^28,36$0,2112,0,0^2 9,36$0,2112,0,0^30,36$0,2112,0,0^31,36$0,2112,0,0^ 32,36$0,2112,0,0^33,36$0,2112,0,0^34,36$5,2112,0,0 ^35,36$100,0112,0,0^36,36$102,2112,1,0^37,36$102,2 112,1,0^38,36$104,2112,0,0^39,36$55,2112,0,0^40,36 $56,1201,0,0^41,36$5,2112,0,0^42,36$8,0112,0,0^43, 36$9,2112,0,0^44,36$9,2112,0,0^0,37$9,2112,0,0^1,3 7$9,2112,0,0^2,37$8,2112,0,0^3,37$5,2112,0,0^4,37$ 56,1021,0,0^5,37$55,2112,0,0^6,37$103,0110,0,0^7,3 7$100,1201,0,0^8,37$100,1201,0,0^9,37$6,2112,0,0^1 0,37$6,0110,0,0^11,37$0,2112,0,0^12,37$0,2112,0,0^ 13,37$110,2112,0,0^14,37$109,2112,0,0^15,37$109,21 12,0,0^16,37$109,2112,0,0^17,37$110,0112,0,0^18,37 $0,2112,0,0^19,37$0,2112,0,0^20,37$0,2112,0,0^21,3 7$0,2112,0,0^22,37$0,2112,0,0^23,37$0,2112,0,0^24, 37$0,2112,0,0^25,37$0,2112,0,0^26,37$0,2112,0,0^27 ,37$110,2112,0,0^28,37$109,2112,0,0^29,37$109,2112 ,0,0^30,37$109,2112,0,0^31,37$110,0112,0,0^32,37$0 ,2112,0,0^33,37$0,2112,0,0^34,37$6,2110,0,0^35,37$ 6,0112,0,0^36,37$100,1201,0,0^37,37$100,1201,0,0^3 8,37$103,2110,0,0^39,37$55,2112,0,0^40,37$56,1201, 0,0^41,37$5,2112,0,0^42,37$8,0112,0,0^43,37$9,2112 ,0,0^44,37$9,2112,0,0^0,38$9,2112,0,0^1,38$9,2112, 0,0^2,38$8,2112,0,0^3,38$4,2112,0,0^4,38$56,1021,0 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40$21,1001,0,0^25,40$23,0110,0,0^26,40$0,2112,0,0^ 27,40$110,2110,0,0^28,40$111,2110,0,0^29,40$109,21 10,0,0^30,40$109,2110,0,0^31,40$110,0110,0,0^32,40 $0,2112,0,0^33,40$0,2112,0,0^34,40$0,2112,0,0^35,4 0$84,2112,0,0^36,40$0,2112,0,0^37,40$6,2110,0,0^38 ,40$4,1021,0,0^39,40$56,2110,0,0^40,40$57,1201,0,0 ^41,40$0,2112,0,0^42,40$8,0112,0,0^43,40$9,2112,0, 0^44,40$9,2112,0,0^0,41$9,2112,0,0^1,41$9,2112,0,0 ^2,41$8,2112,0,0^3,41$0,2112,0,0^4,41$0,2112,0,0^5 ,41$0,2112,0,0^6,41$0,2112,0,0^7,41$0,2112,0,0^8,4 1$0,2112,0,0^9,41$0,2112,0,0^10,41$0,2112,0,0^11,4 1$0,2112,0,0^12,41$0,2112,0,0^13,41$0,2112,0,0^14, 41$0,2112,0,0^15,41$0,2112,0,0^16,41$0,2112,0,0^17 ,41$0,2112,0,0^18,41$0,2112,0,0^19,41$0,2112,0,0^2 0,41$0,2112,0,0^21,41$0,2112,0,0^22,41$0,2112,0,0^ 23,41$0,2112,0,0^24,41$0,2112,0,0^25,41$0,2112,0,0 ^26,41$0,2112,0,0^27,41$0,2112,0,0^28,41$0,2112,0, 0^29,41$0,2112,0,0^30,41$0,2112,0,0^31,41$0,2112,0 ,0^32,41$0,2112,0,0^33,41$0,2112,0,0^34,41$0,2112, 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Rate/Hate.
Personally i LOVE it.