This is my first true map (Paradox was a remake of Paul's version) so I'm hoping its not entirely crap.


http://i30.tinypic.com/23h1t9i.png


41&40&field&1$20,3^1$19,5^1$21,5^1$20,7^1$16,8^1$24,8^0$4,32^2 $36,32^0$1,34^2$39,34^0$4,35^2$36,35^0$0,36^0$7,36 ^2$33,36^2$40,36^0$3,37^0$8,37^2$32,37^2$37,37^0$7 ,38^2$33,38&0,0$21,1201,1,0^1,0$21,1201,1,0^2,0$21,1201,1,0^3, 0$21,1201,1,0^4,0$21,1201,1,0^5,0$23,1201,1,0^6,0$ 0,2112,1,0^7,0$0,2112,1,0^8,0$0,2112,1,0^9,0$0,211 2,1,0^10,0$23,2112,1,0^11,0$21,1201,1,0^12,0$21,12 01,1,0^13,0$21,1201,1,0^14,0$21,1201,1,0^15,0$21,1 201,1,0^16,0$21,1201,1,0^17,0$23,1201,1,0^18,0$84, 2112,1,0^19,0$6,2112,0,0^20,0$5,1021,0,0^21,0$6,12 01,0,0^22,0$84,2112,1,0^23,0$23,2112,1,0^24,0$21,1 201,1,0^25,0$21,1201,1,0^26,0$21,1201,1,0^27,0$21, 1201,1,0^28,0$21,1201,1,0^29,0$21,1201,1,0^30,0$23 ,1201,1,0^31,0$0,2112,1,0^32,0$0,2112,1,0^33,0$0,2 112,1,0^34,0$0,2112,1,0^35,0$23,2112,1,0^36,0$21,1 201,1,0^37,0$21,1201,1,0^38,0$21,1201,1,0^39,0$21, 1201,1,0^40,0$21,1201,1,0^0,1$0,2112,2,0^1,1$0,211 2,2,0^2,1$0,2112,2,0^3,1$0,2112,2,0^4,1$22,1021,1, 0^5,1$23,0110,1,0^6,1$0,2112,1,0^7,1$0,2112,1,0^8, 1$0,2112,1,0^9,1$0,2112,1,0^10,1$11,2112,1,0^11,1$ 0,2112,1,0^12,1$0,2112,1,0^13,1$0,2112,1,0^14,1$0, 2112,1,0^15,1$0,2112,1,0^16,1$0,2112,1,0^17,1$21,0 110,1,0^18,1$6,2112,0,0^19,1$6,0110,0,0^20,1$84,21 12,1,0^21,1$6,1021,0,0^22,1$6,1201,0,0^23,1$21,211 2,1,0^24,1$0,2112,1,0^25,1$0,2112,1,0^26,1$0,2112, 1,0^27,1$0,2112,1,0^28,1$0,2112,1,0^29,1$0,2112,1, 0^30,1$11,0110,1,0^31,1$0,2112,1,0^32,1$0,2112,1,0 ^33,1$0,2112,1,0^34,1$0,2112,1,0^35,1$23,1021,1,0^ 36,1$22,2112,1,0^37,1$0,2112,2,0^38,1$0,2112,2,0^3 9,1$0,2112,2,0^40,1$0,2112,2,0^0,2$0,2112,2,0^1,2$ 0,2112,2,0^2,2$0,2112,2,0^3,2$22,1021,1,0^4,2$23,0 110,1,0^5,2$0,2112,1,0^6,2$0,2112,1,0^7,2$0,2112,1 ,0^8,2$0,2112,1,0^9,2$0,2112,1,0^10,2$23,1021,1,0^ 11,2$22,2112,1,0^12,2$0,2112,1,0^13,2$0,2112,1,0^1 4,2$0,2112,1,0^15,2$0,2112,1,0^16,2$22,1021,1,0^17 ,2$23,0110,1,0^18,2$5,2112,0,0^19,2$103,1021,0,0^2 0,2$100,1021,0,0^21,2$103,2112,0,0^22,2$5,2112,0,0 ^23,2$23,1021,1,0^24,2$22,2112,1,0^25,2$0,2112,1,0 ^26,2$0,2112,1,0^27,2$0,2112,1,0^28,2$0,2112,1,0^2 9,2$22,1021,1,0^30,2$23,0110,1,0^31,2$0,2112,1,0^3 2,2$0,2112,1,0^33,2$0,2112,1,0^34,2$0,2112,1,0^35, 2$0,2112,1,0^36,2$23,1021,1,0^37,2$22,2112,1,0^38, 2$0,2112,2,0^39,2$0,2112,2,0^40,2$0,2112,2,0^0,3$0 ,2112,2,0^1,3$0,2112,2,0^2,3$22,1021,1,0^3,3$23,01 10,1,0^4,3$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$23,1021,1,0^12,3$22,2112,1,0^13, 3$0,2112,1,0^14,3$0,2112,1,0^15,3$0,2112,1,0^16,3$ 21,0110,1,0^17,3$6,2112,0,0^18,3$6,0110,0,0^19,3$1 00,0110,0,0^20,3$102,2112,1,0^21,3$100,2112,0,0^22 ,3$6,1021,0,0^23,3$6,1201,0,0^24,3$21,2112,1,0^25, 3$0,2112,1,0^26,3$0,2112,1,0^27,3$0,2112,1,0^28,3$ 22,1021,1,0^29,3$23,0110,1,0^30,3$0,2112,1,0^31,3$ 0,2112,1,0^32,3$0,2112,1,0^33,3$0,2112,1,0^34,3$0, 2112,1,0^35,3$0,2112,1,0^36,3$0,2112,1,0^37,3$23,1 021,1,0^38,3$22,2112,1,0^39,3$0,2112,2,0^40,3$0,21 12,2,0^0,4$0,2112,2,0^1,4$22,1021,1,0^2,4$23,0110, 1,0^3,4$0,2112,1,0^4,4$0,2112,1,0^5,4$0,2112,1,0^6 ,4$0,2112,1,0^7,4$0,2112,1,0^8,4$0,2112,1,0^9,4$0, 2112,1,0^10,4$0,2112,1,0^11,4$0,2112,1,0^12,4$23,1 021,1,0^13,4$22,2112,1,0^14,4$0,2112,1,0^15,4$22,1 021,1,0^16,4$23,0110,1,0^17,4$5,2112,0,0^18,4$103, 1021,0,0^19,4$101,0110,0,0^20,4$102,2112,1,0^21,4$ 101,1021,0,0^22,4$103,2112,0,0^23,4$5,2112,0,0^24, 4$23,1021,1,0^25,4$22,2112,1,0^26,4$0,2112,1,0^27, 4$22,1021,1,0^28,4$23,0110,1,0^29,4$0,2112,1,0^30, 4$0,2112,1,0^31,4$0,2112,1,0^32,4$0,2112,1,0^33,4$ 0,2112,1,0^34,4$0,2112,1,0^35,4$0,2112,1,0^36,4$0, 2112,1,0^37,4$0,2112,1,0^38,4$23,1021,1,0^39,4$22, 2112,1,0^40,4$0,2112,2,0^0,5$11,1021,1,0^1,5$23,01 10,1,0^2,5$0,2112,1,0^3,5$0,2112,1,0^4,5$0,2112,1, 0^5,5$0,2112,1,0^6,5$0,2112,1,0^7,5$0,2112,1,0^8,5 $0,2112,1,0^9,5$0,2112,1,0^10,5$0,2112,1,0^11,5$0, 2112,1,0^12,5$0,2112,1,0^13,5$23,1021,1,0^14,5$22, 2112,1,0^15,5$21,0110,1,0^16,5$6,2112,0,0^17,5$6,0 110,0,0^18,5$100,0110,0,0^19,5$102,2112,1,0^20,5$1 02,2112,1,0^21,5$102,2112,1,0^22,5$100,2112,0,0^23 ,5$6,1021,0,0^24,5$6,1201,0,0^25,5$21,2112,1,0^26, 5$22,1021,1,0^27,5$23,0110,1,0^28,5$0,2112,1,0^29, 5$0,2112,1,0^30,5$0,2112,1,0^31,5$0,2112,1,0^32,5$ 0,2112,1,0^33,5$0,2112,1,0^34,5$0,2112,1,0^35,5$0, 2112,1,0^36,5$0,2112,1,0^37,5$0,2112,1,0^38,5$0,21 12,1,0^39,5$23,1021,1,0^40,5$11,1021,1,0^0,6$0,211 2,1,0^1,6$0,2112,1,0^2,6$0,2112,1,0^3,6$0,2112,1,0 ^4,6$0,2112,1,0^5,6$0,2112,1,0^6,6$0,2112,1,0^7,6$ 0,2112,1,0^8,6$0,2112,1,0^9,6$23,2112,2,0^10,6$23, 1201,1,0^11,6$0,2112,1,0^12,6$0,2112,1,0^13,6$0,21 12,1,0^14,6$23,1021,1,0^15,6$23,0110,1,0^16,6$5,21 12,0,0^17,6$84,2112,1,0^18,6$103,0110,0,0^19,6$100 ,1201,0,0^20,6$104,1201,0,0^21,6$100,1201,0,0^22,6 $103,1201,0,0^23,6$84,2112,1,0^24,6$5,2112,0,0^25, 6$23,1021,1,0^26,6$23,0110,1,0^27,6$0,2112,1,0^28, 6$0,2112,1,0^29,6$0,2112,1,0^30,6$23,2112,1,0^31,6 $23,1201,1,0^32,6$0,2112,1,0^33,6$0,2112,1,0^34,6$ 0,2112,1,0^35,6$0,2112,1,0^36,6$0,2112,1,0^37,6$0, 2112,1,0^38,6$0,2112,1,0^39,6$0,2112,1,0^40,6$0,21 12,1,0^0,7$0,2112,1,0^1,7$0,2112,1,0^2,7$0,2112,1, 0^3,7$0,2112,1,0^4,7$0,2112,1,0^5,7$0,2112,1,0^6,7 $0,2112,1,0^7,7$0,2112,1,0^8,7$0,2112,1,0^9,7$21,2 112,2,0^10,7$22,0110,1,0^11,7$23,1201,1,0^12,7$0,2 112,1,0^13,7$0,2112,1,0^14,7$0,2112,1,0^15,7$6,211 2,0,0^16,7$6,0110,0,0^17,7$55,2112,0,0^18,7$55,211 2,0,0^19,7$55,2112,0,0^20,7$55,2112,0,0^21,7$55,21 12,0,0^22,7$55,2112,0,0^23,7$55,2112,0,0^24,7$6,10 21,0,0^25,7$6,1201,0,0^26,7$0,2112,1,0^27,7$0,2112 ,1,0^28,7$0,2112,1,0^29,7$23,2112,1,0^30,7$22,1201 ,1,0^31,7$21,0110,1,0^32,7$0,2112,1,0^33,7$0,2112, 1,0^34,7$0,2112,1,0^35,7$0,2112,1,0^36,7$0,2112,1, 0^37,7$0,2112,1,0^38,7$0,2112,1,0^39,7$0,2112,1,0^ 40,7$0,2112,1,0^0,8$23,2112,1,0^1,8$23,1201,1,0^2, 8$0,2112,1,0^3,8$0,2112,1,0^4,8$0,2112,1,0^5,8$0,2 112,1,0^6,8$0,2112,1,0^7,8$0,2112,1,0^8,8$0,2112,1 ,0^9,8$21,2112,1,0^10,8$0,2112,2,0^11,8$22,0110,1, 0^12,8$11,1201,1,0^13,8$21,1201,2,0^14,8$21,1201,2 ,0^15,8$5,2112,0,0^16,8$56,0110,0,0^17,8$56,0110,0 ,0^18,8$56,0110,0,0^19,8$56,0110,0,0^20,8$56,0110, 0,0^21,8$56,0110,0,0^22,8$56,0110,0,0^23,8$56,0110 ,0,0^24,8$56,0110,0,0^25,8$5,2112,0,0^26,8$21,1201 ,1,0^27,8$21,1201,1,0^28,8$11,1201,1,0^29,8$22,120 1,1,0^30,8$0,2112,2,0^31,8$21,0110,1,0^32,8$0,2112 ,1,0^33,8$0,2112,1,0^34,8$0,2112,1,0^35,8$0,2112,1 ,0^36,8$0,2112,1,0^37,8$0,2112,1,0^38,8$0,2112,1,0 ^39,8$23,2112,1,0^40,8$23,1201,1,0^0,9$21,2112,2,0 ^1,9$22,0110,1,0^2,9$23,1201,1,0^3,9$0,2112,1,0^4, 9$0,2112,1,0^5,9$0,2112,1,0^6,9$0,2112,1,0^7,9$0,2 112,1,0^8,9$0,2112,1,0^9,9$11,2112,1,0^10,9$0,2112 ,2,0^11,9$0,2112,2,0^12,9$0,2112,2,0^13,9$0,2112,1 ,0^14,9$4,1201,0,0^15,9$6,0110,0,0^25,9$6,1021,0,0 ^26,9$4,1021,0,0^27,9$0,2112,2,0^28,9$0,2112,2,0^2 9,9$0,2112,2,0^30,9$0,2112,2,0^31,9$11,0110,1,0^32 ,9$0,2112,1,0^33,9$0,2112,1,0^34,9$0,2112,1,0^35,9 $0,2112,1,0^36,9$0,2112,1,0^37,9$0,2112,1,0^38,9$2 3,2112,1,0^39,9$22,1201,1,0^40,9$21,0110,1,0^0,10$ 21,2112,1,0^1,10$0,2112,2,0^2,10$22,0110,1,0^3,10$ 23,1201,1,0^4,10$0,2112,1,0^5,10$0,2112,1,0^6,10$0 ,2112,1,0^7,10$0,2112,1,0^8,10$0,2112,1,0^9,10$21, 2112,1,0^10,10$0,2112,2,0^11,10$0,2112,2,0^12,10$0 ,2112,2,0^13,10$0,2112,1,0^14,10$11,0110,0,0^26,10 $11,2112,0,0^28,10$0,2112,2,0^29,10$0,2112,2,0^30, 10$0,2112,2,0^31,10$21,0110,1,0^32,10$0,2112,1,0^3 3,10$0,2112,1,0^34,10$0,2112,1,0^35,10$0,2112,1,0^ 36,10$0,2112,1,0^37,10$23,2112,1,0^38,10$22,1201,1 ,0^39,10$0,2112,2,0^40,10$21,0110,1,0^0,11$21,2112 ,1,0^1,11$0,2112,2,0^2,11$0,2112,2,0^3,11$11,0110, 1,0^4,11$0,2112,1,0^5,11$0,2112,1,0^6,11$0,2112,1, 0^7,11$0,2112,1,0^8,11$0,2112,1,0^9,11$21,2112,1,0 ^10,11$0,2112,2,0^11,11$0,2112,2,0^12,11$0,2112,2, 0^13,11$6,2112,0,0^14,11$4,1021,0,0^26,11$4,1201,0 ,0^27,11$6,1201,0,0^28,11$0,2112,2,0^29,11$0,2112, 2,0^30,11$0,2112,2,0^31,11$21,0110,1,0^32,11$0,211 2,1,0^33,11$0,2112,1,0^34,11$0,2112,1,0^35,11$0,21 12,1,0^36,11$0,2112,1,0^37,11$11,2112,1,0^38,11$0, 2112,2,0^39,11$0,2112,2,0^40,11$21,0110,1,0^0,12$2 1,2112,1,0^1,12$0,2112,2,0^2,12$22,1021,1,0^3,12$2 3,0110,1,0^4,12$0,2112,1,0^5,12$0,2112,1,0^6,12$0, 2112,1,0^7,12$0,2112,1,0^8,12$0,2112,1,0^9,12$23,1 021,1,0^10,12$11,1021,1,0^11,12$21,1021,1,0^12,12$ 21,1021,2,0^13,12$5,2112,0,0^27,12$5,2112,0,0^28,1 2$21,1021,1,0^29,12$21,1021,1,0^30,12$11,1021,1,0^ 31,12$23,0110,1,0^32,12$0,2112,1,0^33,12$0,2112,1, 0^34,12$0,2112,1,0^35,12$0,2112,1,0^36,12$0,2112,1 ,0^37,12$23,1021,1,0^38,12$22,2112,1,0^39,12$0,211 2,2,0^40,12$21,0110,1,0^0,13$21,2112,1,0^1,13$22,1 021,1,0^2,13$23,1001,1,0^3,13$0,2112,1,0^4,13$0,21 12,1,0^5,13$0,2112,1,0^6,13$0,2112,1,0^7,13$0,2112 ,1,0^8,13$0,2112,1,0^9,13$0,2112,1,0^10,13$0,2112, 1,0^11,13$0,2112,1,0^12,13$6,2112,0,0^13,13$6,0110 ,0,0^15,13$4,1201,0,0^16,13$4,1021,0,0^19,13$4,120 1,0,0^20,13$5,1021,0,0^21,13$4,1021,0,0^24,13$4,12 01,0,0^25,13$4,1021,0,0^27,13$6,1021,0,0^28,13$6,1 201,0,0^29,13$0,2112,1,0^30,13$0,2112,1,0^31,13$0, 2112,1,0^32,13$0,2112,1,0^33,13$0,2112,1,0^34,13$0 ,2112,1,0^35,13$0,2112,1,0^36,13$0,2112,1,0^37,13$ 0,2112,1,0^38,13$23,1021,1,0^39,13$22,2112,1,0^40, 13$21,0110,1,0^0,14$23,1021,1,0^1,14$23,0110,1,0^2 ,14$0,2112,1,0^3,14$0,2112,1,0^4,14$0,2112,1,0^5,1 4$0,2112,1,0^6,14$0,2112,1,0^7,14$0,2112,1,0^8,14$ 0,2112,1,0^9,14$0,2112,1,0^10,14$0,2112,1,0^11,14$ 0,2112,1,0^12,14$5,2112,0,0^13,14$57,1021,0,0^14,1 4$56,2112,0,0^15,14$56,2112,0,0^16,14$56,2112,0,0^ 17,14$56,2112,0,0^18,14$56,2112,0,0^19,14$56,2112, 0,0^20,14$56,2112,0,0^21,14$56,2112,0,0^22,14$56,2 112,0,0^23,14$56,2112,0,0^24,14$56,2112,0,0^25,14$ 56,2112,0,0^26,14$56,2112,0,0^27,14$57,2112,0,0^28 ,14$5,2112,0,0^29,14$0,2112,1,0^30,14$0,2112,1,0^3 1,14$0,2112,1,0^32,14$0,2112,1,0^33,14$0,2112,1,0^ 34,14$0,2112,1,0^35,14$0,2112,1,0^36,14$0,2112,1,0 ^37,14$0,2112,1,0^38,14$0,2112,1,0^39,14$23,1021,1 ,0^40,14$23,0110,1,0^0,15$0,2112,1,0^1,15$0,2112,1 ,0^2,15$0,2112,1,0^3,15$0,2112,1,0^4,15$0,2112,1,0 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9$55,2112,0,0^15,19$100,0110,0,0^16,19$102,2112,1, 0^17,19$101,2112,0,0^18,19$103,1201,0,0^19,19$75,2 112,0,0^20,19$80,2112,0,0^21,19$81,2112,0,0^22,19$ 103,0110,0,0^23,19$101,1201,0,0^24,19$102,2112,1,0 ^25,19$100,2112,0,0^26,19$55,2112,0,0^27,19$56,120 1,0,0^28,19$84,2112,0,0^30,19$6,1021,0,0^31,19$6,1 201,0,0^32,19$0,2112,1,0^33,19$0,2112,1,0^34,19$0, 2112,1,0^35,19$0,2112,1,0^36,19$0,2112,1,0^37,19$2 3,2112,1,0^38,19$22,1201,1,0^39,19$0,2112,2,0^40,1 9$0,2112,2,0^0,20$0,2112,2,0^1,20$0,2112,2,0^2,20$ 0,2112,2,0^3,20$22,0110,1,0^4,20$23,1201,1,0^5,20$ 0,2112,1,0^6,20$0,2112,1,0^7,20$0,2112,1,0^8,20$0, 2112,1,0^9,20$5,2112,0,0^13,20$56,1021,0,0^14,20$5 5,2112,0,0^15,20$104,0110,0,0^16,20$101,2112,0,0^1 7,20$103,1201,0,0^18,20$55,2112,0,0^19,20$76,2112, 0,0^20,20$79,2112,0,0^21,20$76,0110,0,0^22,20$55,2 112,0,0^23,20$103,0110,0,0^24,20$101,1201,0,0^25,2 0$104,2112,0,0^26,20$55,2112,0,0^27,20$56,1201,0,0 ^31,20$5,2112,0,0^32,20$0,2112,1,0^33,20$0,2112,1, 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3,39$5,1201,0,0^24,39$5,1201,0,0^25,39$5,1201,0,0^ 26,39$5,1201,0,0^27,39$5,1201,0,0^28,39$5,1201,0,0 ^29,39$5,1201,0,0^30,39$5,1201,0,0^31,39$5,1201,0, 0^32,39$5,1201,0,0^33,39$5,1201,0,0^34,39$5,1201,0 ,0^35,39$5,1201,0,0^36,39$5,1201,0,0^37,39$5,1201, 0,0^38,39$5,1201,0,0^39,39$5,1201,0,0^40,39$6,0110 ,0,0&

One thing I defiantly know is wrong is the stairs going to the outside area, but the other stairs are just as worst. Any wild ideas on how to fix this?


Map Information:


Spawns:
Red - Bottom Left
Blue - Top Corner
Green - Bottom Right.

Strategy/Game-play:


This map is supposed to be played like Death Cross. The Center is the obvious place to go to find people, but the outside is also a road for player traffic.

u so copy the map u just fix it up or sumthin like that

u so copy the map u just fix it up or sumthin like that

I copied the map? Paradox I remade, this I made by myself. Pauls' Tri Map is nothing like mine.

I think its a pretty good map, I just think something with the middle could be changed. To me, it looks like the 4 formations around the middle rectangle would be really annoying if I was playing on it. Also, the very top right and left corners look like camping central for the Blue Team.

I think its a pretty good map, I just think something with the middle could be changed. To me, it looks like the 4 formations around the middle rectangle would be really annoying if I was playing on it. Also, the very top right and left corners look like camping central for the Blue Team.

Explain why it would be annoying, would think it would be to easy to be killed if your not on the rises?

Camping in the top areas, I have never thought about that, but seeing as its a 3TDM you would be ignored and the other teams would just kill each other.

I'd give a 8.3/10
Middle just need a lil tweek, not sure what though.

Btw, I don't think we really need any more maps other then FFA KoTH.

Thanks for all of your responses. I'm going to tweak the middle a little bit to open the top part of the triangle up.

BTW: Added a poll, vote in it.

It looks to me that blue team has a slight advantage, it can reach the middle fastest.


How do you take that screenie without all the red lines?
I cant figure it out... =/

It looks to me that blue team has a slight advantage, it can reach the middle fastest.


How do you take that screenie without all the red lines?
I cant figure it out... =/

u test the map and look at the mini map

It looks to me that blue team has a slight advantage, it can reach the middle fastest.


How do you take that screenie without all the red lines?
I cant figure it out... =/

Actually, from stair-stair from all bases its the same, +/- 1 or 2 tiles.

(I used a ruler, 1.5 inches from each stair set.)

Actually, from stair-stair from all bases its the same, +/- 1 or 2 tiles.

(I used a ruler, 1.5 inches from each stair set.)


>_<

I used my index finger.
Guess your method is a little more reliant.


But,
Red and Yellow (is it yellow? idk..) Both occupy one of those litle squares. Blue can get two.
Does that make a difference at all?

>_<

I used my index finger.
Guess your method is a little more reliant.


But,
Red and Yellow (is it yellow? idk..) Both occupy one of those litle squares. Blue can get two.
Does that make a difference at all?

Red and Green are the bottom teams.


I'm still trying to figure out if that makes any difference, but the Green Team can also occupy it if they wanted to. I'm making a V2 with a modified center so maybe that wouldn't be a problem.

lol nice map

Looks decent, but you should probably add more detail to the top right and top left sides..

Looks decent, but you should probably add more detail to the top right and top left sides..

Detail, like foxholes in the grass, different/more rises, walls, ect...?

good but blue looks farther away

i like the idea of the map but i think you closed it off too much instead of making the walls so narrow widen it up i think idk i have never made a map but it looks totally sweet to play either way.

i like the idea of the map but i think you closed it off too much instead of making the walls so narrow widen it up i think idk i have never made a map but it looks totally sweet to play either way.

Thing is if I widen up the walls the map also gets bigger and Big TDMs are very boring.

Thing is if I widen up the walls the also gets bigger and Big TDMs are very boring.

ya that would be a disaster

i would hate to run through that, but good effort

Looks good. Are the bases equivilent in length? Because that could be a problem also. 7.5/10

Looks good. Are the bases equivilent in length? Because that could be a problem also. 7.5/10

Size tiles wise, yes they are the same size.

Size tiles wise, yes they are the same size.

Hell Yes. i would hate to run through that, but good effort