Sphere Intersection Curve
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Hi,
I am interested in visualizing (and locating) the points of intersection of three (or four) spheres.
*Region of my interest is the volume (of air or other material of the room) enclosed between intersecting spheres.
**The Center and Radius of both the spheres are known
This problem has me completely stuck.
Thank you.
2 comentarios
Sven
el 13 de Nov. de 2011
This link gives a very thorough mathematical overview of the intersection between spheres.
http://mathworld.wolfram.com/Sphere-SphereIntersection.html
That's a good place to start.
Respuestas (1)
nick
el 30 de En. de 2024
Hi Manish,
I understand from your query that you are interested in visualizing the points of intersection of three spheres.
You can use MATLAB to find a numerical approximation of the intersection. Below is an example MATLAB script that finds and plots the approximate intersection lines between three spheres:
% Define sphere centers and radii
centers = [-5 5 0; 5 5 0; 5 -5 0];
radii = [6.3245, 10, 8.9443];
% Create a finer grid of points to sample the space
[x, y, z] = meshgrid(linspace(-15, 15, 200), ...
linspace(-15, 15, 200), ...
linspace(-15, 15, 200));
% Initialize logical arrays for sphere inclusion
insideSphere1 = false(size(x));
insideSphere2 = false(size(x));
insideSphere3 = false(size(x));
% Check each point in the grid for inclusion in each sphere
for i = 1:3
r = radii(i);
c = centers(i, :);
% Compute the distance from the current sphere center
distances = sqrt((x - c(1)).^2 + (y - c(2)).^2 + (z - c(3)).^2);
% Points within a tolerance from the sphere surface are considered as intersecting
tolerance = 0.1; % Reduced tolerance for higher accuracy
if i == 1
insideSphere1 = distances < r + tolerance;
elseif i == 2
insideSphere2 = distances < r + tolerance;
else
insideSphere3 = distances < r + tolerance;
end
end
% Find points that lie on the intersection of all three spheres
intersectionPoints = insideSphere1 & insideSphere2 & insideSphere3;
% Extract the intersection points
xi = x(intersectionPoints);
yi = y(intersectionPoints);
zi = z(intersectionPoints);
% Plot the spheres
figure;
hold on;
for i = 1:3
[sx, sy, sz] = sphere(30);
sx = sx * radii(i) + centers(i, 1);
sy = sy * radii(i) + centers(i, 2);
sz = sz * radii(i) + centers(i, 3);
mesh(sx, sy, sz, 'FaceAlpha', 0.3);
end
% Plot the approximate intersection curve
plot3(xi, yi, zi, 'r.', 'MarkerSize', 5);
% Adjust the view
view(30, 30);
axis equal;
grid on;
xlabel('X');
ylabel('Y');
zlabel('Z');
title('Intersection of Three Spheres with High Density');
hold off;
This script uses a brute-force approach to check for points that are close to the surface of all three spheres within a specified tolerance. It's not the most efficient method, but it can give you a visual approximation of the intersection curves as shown:
Hope this helps.
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