how to calculate the intersection area of two ellipses

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hello, how can i calculte the intersection area of two ellipses, each ellipse is characterized by(x,y,a,b,w).I thought of solving the system of equations of the two ellipses ,then calculate the area bounded by the points found as solution. would you please help me ?
  2 Commenti
Hongchu Yu
Hongchu Yu il 1 Dic 2018
Had you solved the problem? I have the same problem now. Could you tell me the solution?
Image Analyst
Image Analyst il 2 Dic 2018
The only solution I've seen is a numerical one, not an analytical one.

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Risposte (2)

Kevin Claytor
Kevin Claytor il 18 Feb 2016
Here is an arxiv paper on ellipse intersection algorithms.

Image Analyst
Image Analyst il 18 Feb 2016
To create an ellipse numerically in 2-D is very easy - just see the FAQ. http://matlab.wikia.com/wiki/FAQ#How_do_I_create_an_ellipse.3F To rotate it, just multiply the coordinates by the rotation matrix [cos(theta), -sin(theta); cos(theta), sin(theta)]. Then just AND the two ellipse images
intersectionArea = ellipsoid1 & ellipsoid2;
pixelArea = sum(intersectionArea (:)); % Compute the area in pixels.
  3 Commenti
Image Analyst
Image Analyst il 19 Feb 2016
what do you consider the "real" area? Do you have anlytical formulas for your ellipses?
amal Mbarki
amal Mbarki il 19 Feb 2016
Modificato: amal Mbarki il 19 Feb 2016
In fact each ellipse is characterized by (x,y)its center coordinate, it big and small axes(a,b) and it's orientation w. I’ve read a code which calculate the intersection area of two circles analytically .the equation is: when (d(i,j)> abs(ri-rj)) & (d(i,j)<(ri+rj), d is the distance between the centers of the two objects) then the intersection area is M(i,j) = f(xi,yi,ri,xj,yj,rj) = ri^2*arctan2(yk,xk)+rj^2*arctan2(yk,d(i,j)-xd(i,j)*yk where xk = (ri^2-rj^2+d(i,j)^2)/(2*d(i,j)) and yk = sqrt(ri^2-xk^2). So I thought why not i calculate the intersection area of two ellipse with the same way.But i don't know how to extract the analytical formula?

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