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Would it be possible to take a rgY color space:

r = R / (R + G + B)
g = G / (R + G + B)
Y = R * 0.299 + G * 0.587 + B * 0.114
(unnecessary) b = 1 - r - g

and convert it back to RGB? If so, how would it be done?

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1  
You can solve the three equations for R, G and B, but converting colorspaces is normally a lossy procedure because of value clamping, so you might not get back in what you took out. – OmnipotentEntity May 20 '12 at 21:46
    
What are you using rgY for, or where is it coming from? – Bobbi Bennett May 22 '12 at 14:15
up vote 3 down vote accepted

Hint: R = r*(R+G+B); G=g*(R+G+B). And now you have a system of three linear equations with 3 unknowns.

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Maybe I'm not getting your hint. It's obvious to me how to do it if instead of using the luminance formula for Y, i simply take the average of R G and B. – Chris_F May 20 '12 at 22:07
    
Do you know how to solve systems of linear equations? In case you do not, here's a link en.wikipedia.org/wiki/Gaussian_elimination – malenkiy_scot May 20 '12 at 22:08
    
I have no idea how to actually apply that to the problem. – Chris_F May 20 '12 at 22:23

(No factorials are in this answer. The syntax is similar to Wolfram-Alpha plain text output standards, exception being spaces are placed before and after the != [not equals] sign and the use of 'if [conditional] then' statements.)

  • if r = 0 and 473 g+114 != 0 and Y != 0 then
    • R = 0 and G = (1000 g Y)/(473 g+114) and B = -(1000 (g-1) Y)/(473 g+114)
  • if Y = 0 and g = 1/473 (-185 r-114) and r != 0 then
    • G = -((185 r+114) R)/(473 r) and B = ((587-288 r) R)/(473 r) and R!=0
  • if Y = 0 and r = 0 and g = -114/473 then
    • R = 0 and B = -(587 G)/114 and G!=0
  • if 473 g+185 r+114 != 0 and r != 0 and r Y != 0
    • R = (1000 r Y)/(473 g+185 r+114) and G = (1000 g Y)/(473 g+185 r+114) and B = -(1000 Y (g+r-1))/(473 g+185 r+114)
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