# Get the base colours from a set of hex colours

I have a set of colours and would like to break them down into 10 to 20 base colours.

This should not be a pallet of what is passed in, rather independent of what is passed in. So if an image was used that was just various shades of red, it would return only red, possibly with light / dark red.

EG: the colours I have are the boxes below, with an example of the output as lines. So from 21 colours the list is down to 8 in this example.

The hex values for above:

``````#000000
#ffffff
#003e9f
#d61517
#00a7bd
#001070
#a0210c
#dc9103
#e6151e
#fdfdfd
#011171
#fbfd10
#ffc500
#fdc605
#e6141d
#faf703
#544b20
#796a3a
#7a6b3a
``````

Final output could be something like the outer ring of this colour wheel

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I have no idea what you're asking for, here. What determines a "base" color? If you want to reduce the number of colors in an image, there are plenty of algorithms for that... –  Mark Reed Dec 19 '12 at 2:23
+1 for the hand-drawn lines. (though needs more circles). –  Brad Christie Dec 19 '12 at 2:23
base colours would be similar to the colour wheel example, eg: it should not output 20 various shades of the same colour. –  dogmatic69 Dec 19 '12 at 2:33
Is this kind of like what's done on Dribbble, when you select a post, on the right you have the color palette? –  cheesemacfly Dec 19 '12 at 2:40
Why not just pick 20 colors "evenly spaced" and palletize/dither the image to them? –  Ignacio Vazquez-Abrams Dec 19 '12 at 2:43

Pick your `base` colors in advance and make an array - you could use the 12 in the outer ring of the color wheel. Use an associative array as a set for the output: for each input color, find the closest base color and add it as a key to the output array. Then return the keys of that array.

To find color distance, you can just treat the colors as points in three-dimensional space, (x,y,z) = (r,g,b), and use the Euclidian distance. After extracting the components from the hex string, that's just something like this:

``````\$dr = \$r2 - \$r1;
\$dg = \$g2 - \$g1;
\$db = \$b2 - \$b1;
\$dist = sqrt(\$dr * \$dr + \$dg * \$dg + \$db * \$db);
``````

You could do something fancy with octrees if you want, but with a small list of colors just looping over them and finding the smallest distance will work fine.

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This is roughly what I was thinking. will look into the 3d distance. –  dogmatic69 Dec 19 '12 at 12:02

I think this would be a lot easier to do (and to understand) if you used hsla notation.

If your base colors are always the same, you could define 20 values for your hue parameter (which is basically an angle from 0° to 360°), and group all the different colors you have to the closest 'base color' only with the hue.

If your base colors are dependant on the input (it is not clear in your question), then @Mark Reed's option to find color distance can be done in hsl as well, only with the hue, which would be more accurate to the notion of 'shades of color' IMHO.

NB : A handy tool for hsl : http://mothereffinghsl.com/

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