Given:

A point P, circle 1 and circle 2's positions and radii

What is:

The equation for T, the 'mix level' between color 1 and 2 (a value between 0 to 1)

Many radial gradient equations only apply to concentric circles or circles that share a position. I'm looking for something that matches the image below, created using Quartz (Core Graphics). I am writing a GLSL shader, but I need to understand the math first.

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How do you know that P is on the shape? It seems to me that if you have an equation for the shape itself, the gradient should fall out easily. –  user1697490 Dec 21 '12 at 23:12
What are we looking at here? Is this drawn in 2D or 3D? You say you're using Quartz, but writing a GLSL shader. Since Quartz doesn't directly support GLSL shaders, what are you applying the shader to? –  user1118321 Dec 21 '12 at 23:13
Quartz is CPU-bound (slow), so I'm looking to write a GLSL fragment shader to replace Quartz for this purpose, but it has to behave the same. It is drawn in 2D. –  Jacob Jennings Dec 21 '12 at 23:17
It will probably be implemented as a GPUImage filter once I get it working –  Jacob Jennings Dec 21 '12 at 23:35

If this is in 2D, then you can write the parameters of the circle that your point lies on as:

``````x3=T*x1+(1-T)*x2
y3=T*y1+(1-T)*y2
r3=T*r1+(1-T)*r2
``````

EDIT: Of course, that circle can be represented as:

``````(x3-xP)^2+(y3-yP)^2=r3^2
``````

You can substitute the first 3 equations into the last (and remember that (xP, yP) is your point) to get 1 equation with only T as a variable that is quadratic in T, so it is easy to solve for T. Doing so gives us:

``````T=(-r2*(r1-r2)+(x1-x2)*(x2-xP)+(y1-y2)(y2-yP)
{+-}sqrt(r2^2*((x1-xP)^2+(y1-yP)^2)-2*r1*r2*((x1-xP)*(x2-xP)
+(y1-yP)*(y2-yP))+r1^2*((x2-xP)^2+(y2-yP)^2)
-(x2*y1-xP*y1-x1*y2+xP*y2+x1*yP-x2*yP)^2))
/((r1-r2)^2-(x1-x2)^2-(y1-y2)^2)
``````

I know that that is a bit hard to read, but it is not actually that bad mathematically. It is just addition, multiplication, and squaring (which is really just multiplication).

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Attempted to use this formula here: glsl.heroku.com/e#5553.1 without success. I ran the content of the sqrt through alpha to produce a simplified version: wolframalpha.com/input/?i=r1%5E2+*+x3%5E2+-+2+*+r1+*+r2+*+x3%5E2+%2B+‌​r2%5E2+*+x3%5E2+%2B+r1%5E2+*+y3%5E2-2+*+r1+*+r2+*+y3%5E2+%2B+r2%5E2+*+y3%5E2 –  Jacob Jennings Dec 22 '12 at 1:56
You forgot the parentheses around the entire numerator (starting at the very beginning and ending after the square root. –  user1697490 Dec 22 '12 at 2:22
Ah, sure enough. glsl.heroku.com/e#5553.2 A gradient appears! I think the circle positions got lost in the equation, though (the hard part) –  Jacob Jennings Dec 22 '12 at 2:36
You are very right; I completely butchered the math. Give me a moment... –  user1697490 Dec 22 '12 at 2:53
glsl.heroku.com/e#5553.7 It's done. I'll be using this in my GPUImage fork @ github.com/jacobjennings –  Jacob Jennings Dec 22 '12 at 9:02