# MapEdit

Comments5196pages on
this wiki **Anthropus Camps** contain invaders and resources and can be spied on or attacked.

- Conquerig savannas, and lakes will increase food production.
- Mysterious Clouds are testing sites (just ignore them).
- Conquering
**forests**will increase lumber production. - Conquering
**hills**will increase your stone production. - Conquering
**mountains**will increase your metals production. - Conquering plains gains nothing, but you need them to build
**outposts**.

## Production Increase by wildernessesEditEdit

Level | Increasing |
---|---|

Level 1 | 5% |

Level 2 | 10% |

Level 3 | 15% |

Level 4 | 20% |

Level 5 | 25% |

Level 6 | 30% |

Level 7 | 35% |

Level 8
| 40% |

Level 9 | 45% |

Level 10 | 50% |

Clouds.jpgfield of clouds. When clicked it just says Mysterious Cloud lvl 10. One cannot attack, spy or send a message. Add a photo to this gallery==The Dark Secrets of the DoA Coordinate SystemEdit== Are you always getting lost with those coordinate numbers when scrolling along the map? Well not anymore after you read this article!

This is no surprise, because DoA uses a very strange coordinate system. I dont see any advantage in it, maybe part of the out-of-this-world atmosphere in this game.

the reason is the 3D effect

So throw away everything you learned in school about maps and coordinates, you really gonna have to learn how to read maps like an Atlantean.

Coordinates are written in the form x/y. The x axis runs __horizontal__, increasing toward the *right* of the map. This is what you would expect.

Now you would expect the y axis to run vertical, increasing toward the top or bottom. But no, Surprisingly it runs __diagonal__, increasing toward the *lower right* corner of the map.

To make things clearer, I made a drawing: centered around square 10/10 (to avoid the map rollover) [1]DoA Coordinate systemAdded by BelbearYou can see two very weird properties about this kind of coordinates:

The squares 9/9 and 11/11 (in green) are __not adjacent to 10/10__ in any direction.

The y coordinate changes __per two__ along the vertical axis.

However the map is endless and as soon as it reaches 749 (the highest coordinate for both x and y) it goes back to 0.

## Calculating Travel TimeEditEdit

In the example map, the four spaces shown adjacent to 10/10 non-diagionally are 10/9, 11/9, 10/11 and 9/11. But, in travel time, the four adjacent spaces are actually 10/9, 11/10, 10/11 and 9/10. This makes alot more sense. Unfortunately, it means that the map is misleading in judging travel time. Looking at the map, you'd think that if you start at 10/10, the travel time to 10/9 and 11/9 would not be the same. They are not. Instead, the travel time to 10/9 and 11/10 are the same.

The total travel time for an attacker is its muster time (the time it spends just getting ready to go out on an attack) plus a factor based on distance. With level 5 Rapid Deployment and Level 6 Dragonry, LBMs take 16s to travel one unit of distance and SSDs take 4s. Travel time for other units and research levels can be calculated by setting up a dummy attack that's one unit away, noting the time, and then setting up a second dummy attack that's two units away and then taking the difference. So, if a city is in 400/300, the first dummy attack could be to 400/301 and the second to 400/302.

The muster time is always 30 seconds.

The distance can be calculated with a little algebra. The first step is to determine the x and y distance. Since the map is 750 units wide and wraps in both directions, this will be either the larger coordinate minus the smaller coordinate or 750 plus the smaller coordinate minus the larger coordinate, whichever is less. Next, add the square of the x distance to the square of the y distance and then take the square root of the sum. That's the Pythagorean Theory. Multiply the distance by the travel time per unit and add the muster time and that's the total travel time.

For example, if a city is in 400/300, an attack is sent to 427/281 and the attackers take 16s per unit of travel, then total travel time would be 9m 18s. The calculation is as follows:

x = 27 (the lesser of 427 - 400 or 750 + 400 - 427) y = 19 (the lesser of 300 - 281 or 750 + 281 - 300)

((27^2 + 19^2)^.5) * 16 + 30