So I've managed myself to write the first part (algorithm) to calculate each tile's position where should it be placed while drawing this map (see bellow). However I need to be able to convert mouse location to the appropriate cell and I've been almost pulling my hair off because I can't figure out a way how to get the cell from mouse location. My concern is that it involves some pretty high math or something i'm just something easy i'm not capable to notice.
For example if the mouse position is 112;35 how do i calculate/transform it to to get that the cell is 2;3 at that position? Maybe there is some really good math-thinking programmer here who would help me on this or someone who knows how to do it or can give some information?

enter image description here

var cord:Point = new Point();
cord.x = (x - 1) * 28 + (y - 1) * 28;
cord.y = (y - 1) * 14 + (x - 1) * (- 14);

Speaking of the map, each cell (transparent tile 56x28 pixels) is placed in the center of the previous cell (or at zero position for the cell 1;1), above is the code I use for converting cell-to-position. I tried lot of things and calculations for position-to-cell but each of them failed.

Edit: After reading lot of information it seems that using off screen color map (where colors are mapped to tiles) is the fastest and most efficient solution?

up vote 6 down vote accepted
(1) x` = 28x -28 + 28y -28  = 28x + 28y -56
(2) y` = -14x +14 +14y -14 = -14x + 14y

Transformation table:

[x] [28  28 -56 ] = [x`]
[y] [-14 14  0  ]   [y`]
[1] [0    0  1  ]   [1 ]

[28  28 -56 ] ^ -1 
[-14 14  0  ]
[0    0  1  ] 

Calculate that with a plotter ( I like wims )

[1/56 -1/28  1 ]
[1/56  1/28  1 ]
[0      0    1 ]

x = 1/56*x` - 1/28y` + 1
y = 1/56*x` + 1/28y` + 1
  • 1
    Could you give some light on what it does and how works? – Rihards Aug 2 '11 at 17:38
  • en.wikipedia.org/wiki/Transformation_matrix .. Basically if you know one side of the transformation, it's easy to get the other side.. So you have V*A=V` .. Multiply A(-1) on both sides and you get V*1=V`*A(-1) – Yochai Timmer Aug 2 '11 at 17:41
  • What I'm transforming? The whole map image to make it rectangle based and then easy calculating the cell? – Rihards Aug 2 '11 at 17:46
  • Is there a way to calculate the mouse position-to-cell with math without having to rotate the map image? – Rihards Aug 2 '11 at 18:01
  • @Yochai Timmer Nice solution. Is not it just an Affine Transformation? – Nikiton Aug 2 '11 at 18:03

I know this is an old post, but I want to update this since some people might still look for answers to this issue, just like I was earlier today. However, I figured this out myself. There is also a much better way to render this so you don't get tile overlapping issues.

The code is as simple as this:

mouse_grid_x = floor((mouse_y / tile_height) + (mouse_x / tile_width));
mouse_grid_y = floor((-mouse_x / tile_width) + (mouse_y / tile_height));

mouse_x and mouse_y are mouse screen coordinates.

tile_height and tile_width are actual tile size, not the image itself. As you see on my example picture I've added dirt under my tile, this is just for easier rendering, actual size is 24 x 12. The coordinates are also "floored" to keep the result grid x and y rounded down.

Also notice that I render these tiles from the y=0 and x=tile_with / 2 (red dot). This means my 0,0 actually starts at the top corner of the tile (tilted) and not out in open air. See these tiles as rotated squares, you still want to start from the 0,0 pixel.

Tiles will be rendered beginning with the Y = 0 and X = 0 to map size. After first row is rendered you skip a few pixels down and to the left. This will make the next line of tiles overlap the first one, which is a great way to keep the layers overlapping coorectly. You should render tiles, then whatever in on that tile before moving on to the next.

I'll add a render example too:

for (yy = 0; yy < map_height; yy++)
{
     for (xx = 0; xx < map_width; xx++)
     {
          draw tiles here with tile coordinates:
          tile_x = (xx * 12) - (yy * 12) - (tile_width / 2)
          tile_y = (yy * 6) + (xx * 6)

          also draw whatever is on this tile here before moving on
     }
}

Isometric Image

enter image description here

I rendered the tiles like above.

the sollution is VERY simple!

first thing:

my Tile width and height are both = 32 this means that in isometric view, the width = 32 and height = 16! Mapheight in this case is 5 (max. Y value)

y_iso & x_iso == 0 when y_mouse=MapHeight/tilewidth/2 and x_mouse = 0

when x_mouse +=1, y_iso -=1

so first of all I calculate the "per-pixel transformation"

TileY = ((y_mouse*2)-((MapHeight*tilewidth)/2)+x_mouse)/2;

TileX = x_mouse-TileY;

to find the tile coordinates I just devide both by tilewidth

TileY = TileY/32; TileX = TileX/32;

DONE!! never had any problems!

I've found algorithm on this site http://www.tonypa.pri.ee/tbw/tut18.html. I couldn't get it to work for me properly, but I change it by trial and error to this form and it works for me now.

int x = mouse.x + offset.x - tile[0;0].x; //tile[0;0].x is the value of x form witch map was drawn
int y = mouse.y + offset.y;
double _x =((2 * y + x) / 2);
double _y= ((2 * y - x) / 2);
double tileX = Math.round(_x / (tile.height - 1)) - 1;
double tileY = Math.round(_y / (tile.height - 1));

This is my map generation

for(int x=0;x<max_X;x++)
for(int y=0;y<max_Y;y++)
map.drawImage(image, ((max_X - 1) * tile.width / 2) - ((tile.width - 1) / 2 * (y - x)), ((tile.height - 1) / 2) * (y + x));

One way would be to rotate it back to a square projection:

First translate y so that the dimensions are relative to the origin:

 x0 = x_mouse;
 y0 = y_mouse-14

Then scale by your tile size:

 x1 = x/28;   //or maybe 56?
 y1 = y/28

Then rotate by the projection angle

 a = atan(2/1);   
 x_tile = x1 * cos(a) - y1 * sin(a);
 y_tile = y1 * cos(a) + x1 * sin(a);

I may be missing a minus sign, but that's the general idea.

  • Rotating back the whole map image yes? To make it rectangle based? – Rihards Aug 2 '11 at 17:54
  • you wouldn't really have to rotate the whole map. Just apply the rotation to the mouse location, and you get the equivalent location in coordinates as if the map had been rotated. However, I think @yochai's answer is a more practical solution. – AShelly Aug 2 '11 at 18:40
  • Does it applies rotation only to mouse location in @yochai's example too? Or not? Because I don't see how can I skew or rotate mouse location, for example, (112,35). – Rihards Aug 2 '11 at 18:49

Although you didn't mention it in your original question, in comments I think you said you're programming this in Flash. In which case Flash comes with Matrix transformation functions. The most robust way to convert between coordinate systems (eg. to isometric coordinates) is using Matrix transformations:

http://help.adobe.com/en_US/FlashPlatform/reference/actionscript/3/flash/geom/Matrix.html

You would want to rotate and scale the matrix in the inverse of how you rotated and scaled the graphics.

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