http://img402.imageshack.us/img402/4223/onesidedkoth.png

This is my new map. I started to figure out the spawns and heights a lot better and think this is a big improvement from my first map. :). Could some experienced peeps look at this or other fellow map makers and tell me what you think

FIXED CODE:

20&20&field&1$1,13^0$18,13^1$4,14^0$15,14^1$7,15^0$12,15^1$3,1 6^0$16,16^1$1,17^0$18,17&0,0$18,2112,0,0^1,0$18,2112,0,0^2,0$2,1201,0,0^3,0 $2,1021,0,0^4,0$24,2112,1,0^5,0$22,1201,1,0^6,0$22 ,1201,1,0^7,0$22,1201,1,0^8,0$22,1201,1,0^9,0$22,1 201,1,0^10,0$22,1201,1,0^11,0$22,1201,1,0^12,0$22, 1201,1,0^13,0$22,1201,1,0^14,0$22,1201,1,0^15,0$24 ,1201,1,0^16,0$2,1201,0,0^17,0$2,1021,0,0^18,0$18, 2112,0,0^19,0$18,2112,0,0^0,1$18,2112,0,0^1,1$18,2 112,0,0^2,1$84,2112,0,0^4,1$22,2112,1,0^5,1$1,2112 ,1,0^6,1$1,2112,1,0^7,1$1,2112,1,0^8,1$1,2112,1,8^ 9,1$1,2112,1,8^10,1$1,2112,1,8^11,1$1,2112,1,8^12, 1$1,2112,1,0^13,1$1,2112,1,0^14,1$1,2112,1,0^15,1$ 22,0110,1,0^17,1$84,2112,0,0^18,1$18,2112,0,0^19,1 $18,2112,0,0^0,2$18,2112,0,0^1,2$18,2112,0,0^4,2$1 2,2112,1,0^5,2$1,2112,1,0^6,2$1,2112,1,0^7,2$1,211 2,1,0^8,2$1,2112,1,8^9,2$1,2112,1,8^10,2$1,2112,1, 8^11,2$1,2112,1,8^12,2$1,2112,1,0^13,2$1,2112,1,0^ 14,2$1,2112,1,0^15,2$12,0110,0,0^18,2$18,2112,0,0^ 19,2$18,2112,0,0^2,3$10,2112,0,0^3,3$10,2112,0,0^4 ,3$24,1021,1,0^5,3$22,1021,1,0^6,3$22,1021,1,0^7,3 $22,1021,1,0^8,3$22,1021,1,0^9,3$22,1021,1,0^10,3$ 22,1021,1,0^11,3$22,1021,1,0^12,3$22,1021,1,0^13,3 $22,1021,1,0^14,3$22,1021,1,0^15,3$24,0110,1,0^16, 3$10,2112,0,0^17,3$10,2112,0,0^1,4$5,1201,0,0^2,4$ 7,1201,0,0^3,4$10,2112,0,0^4,4$10,2112,0,0^5,4$10, 2112,0,0^7,4$98,2112,0,0^8,4$6,1021,2,0^11,4$6,102 1,2,0^12,4$98,2112,0,0^14,4$10,2112,0,0^15,4$10,21 12,0,0^16,4$10,2112,0,0^17,4$7,2112,0,0^18,4$5,102 1,0,0^2,5$5,2112,0,0^5,5$10,2112,0,0^7,5$98,2112,0 ,0^12,5$98,2112,0,0^14,5$10,2112,0,0^17,5$5,2112,0 ,0^4,6$84,2112,0,0^5,6$10,2112,0,0^6,6$10,2112,0,0 ^13,6$10,2112,0,0^14,6$10,2112,0,0^15,6$84,2112,0, 0^1,7$84,2112,0,0^3,7$5,1201,0,0^4,7$5,1021,0,0^5, 7$10,2112,0,0^6,7$5,0110,0,0^7,7$2,0110,0,0^8,7$24 ,2112,1,0^9,7$12,1201,1,0^10,7$12,1201,1,0^11,7$24 ,1201,1,0^12,7$2,0110,0,0^13,7$5,0110,0,0^14,7$10, 2112,0,0^15,7$5,1201,0,0^16,7$5,1021,0,0^18,7$84,2 112,0,0^1,8$84,2112,0,0^3,8$10,2112,0,0^4,8$10,211 2,0,0^6,8$6,2112,0,0^7,8$4,2112,0,0^8,8$22,2112,0, 0^9,8$1,2112,1,0^10,8$1,2112,1,0^11,8$22,0110,0,0^ 12,8$4,2112,0,0^13,8$6,2112,0,0^15,8$10,2112,0,0^1 6,8$10,2112,0,0^18,8$84,2112,0,0^1,9$10,2112,0,0^2 ,9$10,2112,0,0^3,9$10,2112,0,0^4,9$10,2112,0,0^5,9 $84,2112,0,0^6,9$5,2112,0,0^7,9$4,2112,0,0^8,9$24, 1021,1,0^9,9$12,1021,1,0^10,9$12,1021,1,0^11,9$24, 0110,1,0^12,9$4,2112,0,0^13,9$5,2112,0,0^14,9$84,2 112,0,0^15,9$10,2112,0,0^16,9$10,2112,0,0^17,9$10, 2112,0,0^18,9$10,2112,0,0^1,10$10,2112,0,0^2,10$10 ,2112,0,0^3,10$10,2112,0,0^4,10$84,2112,0,0^5,10$8 4,2112,0,0^7,10$2,2112,0,0^8,10$84,2112,0,0^11,10$ 84,2112,0,0^12,10$2,2112,0,0^14,10$84,2112,0,0^15, 10$84,2112,0,0^16,10$10,2112,0,0^17,10$10,2112,0,0 ^18,10$10,2112,0,0^0,11$110,2112,0,0^1,11$109,2112 ,0,0^2,11$111,2112,0,0^3,11$109,2112,0,0^4,11$109, 2112,0,0^5,11$109,2112,0,0^6,11$109,2112,0,0^7,11$ 109,2112,0,0^8,11$109,2112,0,0^9,11$111,2112,0,0^1 0,11$111,2112,0,0^11,11$109,2112,0,0^12,11$109,211 2,0,0^13,11$109,2112,0,0^14,11$109,2112,0,0^15,11$ 109,2112,0,0^16,11$109,2112,0,0^17,11$111,2112,0,0 ^18,11$109,2112,0,0^19,11$110,1201,0,0^0,12$109,10 21,0,0^1,12$55,2112,0,0^2,12$55,2112,0,0^3,12$5,12 01,0,0^4,12$6,1021,0,0^5,12$5,1021,0,0^6,12$55,211 2,0,0^7,12$55,2112,0,0^8,12$55,2112,0,0^9,12$55,21 12,0,0^10,12$55,2112,0,0^11,12$55,2112,0,0^12,12$5 5,2112,0,0^13,12$55,2112,0,0^14,12$5,1201,0,0^15,1 2$6,1021,0,0^16,12$5,1021,0,0^17,12$55,2112,0,0^18 ,12$55,2112,0,0^19,12$109,1201,0,0^0,13$109,1021,0 ,0^1,13$55,2112,0,0^2,13$103,1021,1,0^3,13$100,102 1,1,0^4,13$100,1021,1,0^5,13$103,2112,1,0^6,13$5,1 201,0,0^7,13$6,1021,0,0^8,13$5,1021,0,0^9,13$7,120 1,0,0^10,13$7,2112,0,0^11,13$5,1201,0,0^12,13$6,10 21,0,0^13,13$5,1021,0,0^14,13$103,1021,1,0^15,13$1 00,1021,1,0^16,13$100,1021,1,0^17,13$103,2112,1,0^ 18,13$55,2112,0,0^19,13$109,1201,0,0^0,14$109,1021 ,0,0^1,14$55,2112,0,0^2,14$100,0110,1,0^3,14$102,2 112,1,0^4,14$102,2112,0,0^5,14$100,2112,1,0^6,14$8 4,2112,0,0^7,14$55,2112,0,0^8,14$84,2112,0,0^9,14$ 6,2112,0,0^10,14$6,2112,0,0^11,14$84,2112,0,0^12,1 4$55,2112,0,0^13,14$84,2112,0,0^14,14$100,0110,1,0 ^15,14$102,2112,0,0^16,14$102,2112,1,0^17,14$100,2 112,1,0^18,14$55,2112,0,0^19,14$109,1201,0,0^0,15$ 109,1021,0,0^1,15$55,2112,0,0^2,15$104,0110,1,0^3, 15$102,2112,1,0^4,15$102,2112,1,0^5,15$104,2112,1, 0^6,15$55,2112,0,0^7,15$55,2112,0,0^8,15$55,2112,0 ,0^9,15$6,2112,0,0^10,15$6,2112,0,0^11,15$55,2112, 0,0^12,15$55,2112,0,0^13,15$55,2112,0,0^14,15$104, 0110,1,0^15,15$102,2112,1,0^16,15$102,2112,1,0^17, 15$104,2112,1,0^18,15$55,2112,0,0^19,15$109,1201,0 ,0^0,16$109,1021,0,0^1,16$55,2112,0,0^2,16$100,011 0,1,0^3,16$102,2112,0,0^4,16$102,2112,1,0^5,16$100 ,2112,1,0^6,16$84,2112,0,0^7,16$55,2112,0,0^8,16$8 4,2112,0,0^9,16$6,2112,0,0^10,16$6,2112,0,0^11,16$ 84,2112,0,0^12,16$55,2112,0,0^13,16$84,2112,0,0^14 ,16$100,0110,1,0^15,16$102,2112,1,0^16,16$102,2112 ,0,0^17,16$100,2112,1,0^18,16$55,2112,0,0^19,16$10 9,1201,0,0^0,17$109,1021,0,0^1,17$55,2112,0,0^2,17 $103,0110,1,0^3,17$100,1201,1,0^4,17$100,1201,1,0^ 5,17$103,1201,1,0^6,17$5,1201,0,0^7,17$6,1021,0,0^ 8,17$5,1021,0,0^9,17$7,0110,0,0^10,17$7,1021,0,0^1 1,17$5,1201,0,0^12,17$6,1021,0,0^13,17$5,1021,0,0^ 14,17$103,0110,1,0^15,17$100,1201,1,0^16,17$100,12 01,1,0^17,17$103,1201,1,0^18,17$55,2112,0,0^19,17$ 109,1201,0,0^0,18$109,1021,0,0^1,18$55,2112,0,0^2, 18$55,2112,0,0^3,18$55,2112,0,0^4,18$55,2112,0,0^5 ,18$55,2112,0,0^6,18$55,2112,0,0^7,18$55,2112,0,0^ 8,18$55,2112,0,0^9,18$5,1201,0,0^10,18$5,1021,0,0^ 11,18$55,2112,0,0^12,18$55,2112,0,0^13,18$55,2112, 0,0^14,18$55,2112,0,0^15,18$55,2112,0,0^16,18$55,2 112,0,0^17,18$55,2112,0,0^18,18$55,2112,0,0^19,18$ 109,1201,0,0^0,19$110,1021,0,0^1,19$109,0110,0,0^2 ,19$109,0110,0,0^3,19$109,0110,0,0^4,19$109,0110,0 ,0^5,19$109,0110,0,0^6,19$109,0110,0,0^7,19$109,01 10,0,0^8,19$109,0110,0,0^9,19$109,0110,0,0^10,19$1 09,0110,0,0^11,19$109,0110,0,0^12,19$109,0110,0,0^ 13,19$109,0110,0,0^14,19$109,0110,0,0^15,19$109,01 10,0,0^16,19$109,0110,0,0^17,19$109,0110,0,0^18,19 $109,0110,0,0^19,19$110,0110,0,0&


Could someone help me on how to make code small :( sorry for my incompetence. One more question, what is the number for Koth Tile??? I thought it was 8 but I could be wrong?

(Published I don't have a number sign on my thread options :? Maybe im just stupid...)

Click the number symbol thing to wrap code in. I think the code is small because when i tested map i got this.

http://i35.tinypic.com/2elgu29.jpg

Now as for the actual map. Try to use transition tiles like grass to dirt. It makes the map look better. For a second map this is really good.

All you need to do is work on tile flow.
I see some great idea in this.
One tile cement walls arent there so dont use them, unfortunate, isnt it.
You mostly need grass to dirt tiles and cement wall corner pieces.
And you posted this thread twice i think.

So I should never use one piece of wall??? That is the only thing that works for a barrier though :/... that sucks.

So I should never use one piece of wall??? That is the only thing that works for a barrier though :/... that sucks.

Crate. +5 height is a substitute.

Your map.
When you have red heights, you only need to put heights on the totally red tiles, NOTHING ELSE if your ground level is 0. If it is 1, then the red tile has to be 2, and the other barrier red tiles are 1.

Thanks for the info Sharpkill, I was unsure or not whether to use a level 5 crate due to the fact that I did not want anything glitchy happening on my map.