# Algorithm to generate colors that can easily be read on a white font?

Given either HSV or RGB, is there an algorithm that can prodice random colors for a background that are guaranteed to be readable on a pure white font?

It does not have to be a language specific implementation, though I am using C#.

Thanks

I made this, but I am sure it could be improved:

public static System.Drawing.Color GenerateRandomLiteColor()
{
var rnd = new Random(DateTime.Now.Millisecond);
double mul = 240.0;
HSLColor c = new HSLColor(rnd.NextDouble() * mul,
((rnd.NextDouble() * 0.6) + 0.5) * mul, ((rnd.NextDouble() * 0.35) + 0.5) * mul);

string s = c.ToRGBString();
return c;
}
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black, black, black, black, ...; is that random enough? –  Jan Dvorak Mar 8 '13 at 16:49
I was hoping there would not be any silly response like this. Obviously it is a bit subjective... but within reason... –  user2043533 Mar 8 '13 at 16:50
Guaranteed? That's a bit subjective. One person's readable is another's unreadable. Also, you need to be more specific. I can choose 2 different dark color values and randomly pick from those 2 and satisfy your current question. –  hatchet Mar 8 '13 at 16:52
Clarification: should we try to generate a sequence of distinct colors, or the samples may be independent? –  Jan Dvorak Mar 8 '13 at 16:53
@JanDvorak, you're obviously a fan of this random number generator: dilbert.com/strips/comic/2001-10-25 –  Mark Ransom Mar 8 '13 at 17:30

For RGB there is a formula which calculates brightness of color:

0.299 * R + 0.587 * G + 0.114 * B

As you see each of R,G,B colors has its own brightness coefficient. To generate readable font on white background, generate completely random color. Then check if its brightness is less than some predefined constant C. If it exceeds C and equals to some D > C, then multiply each of R, G, B values by C / D to make the brightness equal to C.

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Instead of multiplying by C/D, multiply by a random number from 0 to C/D. Otherwise your distribution will tend to favor the lighter colors. –  Mark Ransom Mar 8 '13 at 18:52
Yep, you're completely right. –  aram90 Mar 9 '13 at 8:19
I thought about a better approach, we should denote by D the brightness of white color, and thus we get D = 255 by the formula above. Then each color should be multiplied by C / D without checking any condition. –  aram90 Mar 9 '13 at 8:21

Using HSL you could say anything with L below a certain value is visible, it has sufficient darkness for enough contrast. But this would be a subjective value. You could make H and S random. HSL can be then converted to HSV or RGB.

L should not be random. Or it could be but within a range that you have predefined to give sufficient contrast. ie below a fixed Lmax.

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