Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

If I have an RGB color, with 100% opacity.

I want that same color (or close to it) with a transparent alpha channel. I will paint the transparent color over a white background.

How do I compute the RGBA color?

I guess what I am asking is the opposite of this question.

share|improve this question

1 Answer 1

up vote 4 down vote accepted

You mean you want the RGBA color with maximum transparency which, when drawn on top of a white background, gives the original RGB color?

Let R0, G0 and B0 be the components of the original color, each ranging from 0.0 to 1.0, and let R, G, B and A be the components of the new RGBA color (with A = 1 denoting 100% opacity). We know that the colors must satisfy:

R0 = A·R + (1 − A)
G0 = A·G + (1 − A)
B0 = A·B + (1 − A)

which, if we knew A, we could easily solve for R, G and B:

R = (R0 − 1 + A) / A = 1 − (1 − R0) / A
G = (G0 − 1 + A) / A = 1 − (1 − G0) / A
B = (B0 − 1 + A) / A = 1 − (1 − B0) / A

Since we require that R ≥ 0, G ≥ 0 and B ≥ 0, it follows that 1 − R0 ≥ A, 1 − G0 ≥ A and 1 − B0 ≥ A, and therefore the smallest possible value for A is:

A = max( 1 − R0, 1 − G0, 1 − B0 ) = 1 − min( R0, G0, B0 )

Thus, the color we want is:

A = 1 − min( R0, G0, B0 )
R = 1 − (1 − R0) / A
G = 1 − (1 − G0) / A
B = 1 − (1 − B0) / A


Ps. For a black background, the same formulas would be even simpler:

A = max( R0, G0, B0 )
R = R0 / A
G = G0 / A
B = B0 / A


Pps. Just to clarify, all the formulas above are for non-premultiplied RGBA colors. For premultiplied alpha, just multiply R, G and B as calculated above by A, giving:

R = A · ( 1 − (1 − R0) / A ) = R0 − (1 − A)
G = A · ( 1 − (1 − G0) / A ) = G0 − (1 − A)
B = A · ( 1 − (1 − B0) / A ) = B0 − (1 − A)

(or, for a black background, simply R = R0, G = G0 and B = B0.)

share|improve this answer
    
Thank you! So this solves for max alpha... Is there a formula for min alpha (and, Pushing my luck, the range between)? –  jedierikb Dec 28 '12 at 6:33
1  
@jedierikb: Um... The alpha value given above is the minimum. The maximum is A = 1, with R = R0, G = G0 and B = B0. (And yes, you can interpolate between those: just pick any valid alpha value and use the formulas above to get R, G and B.) –  Ilmari Karonen Dec 28 '12 at 18:03

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.