# Plotting Lagrange points

I am trying to find the 5 Lagrange points of the Three-Body system by plotting the given potential function in Matlab. The only thing is that I'm not very good at programming. Any assistance would be greatly appreciated. What I want to know is how to make this code give me a decent contour plot:

``````function Lagrange(a)

x = ( -10000: 1 : 10000);
y = ( -10000: 1 : 10000);
Potential = zeros(length(x));

for i = 1: length(x)
for j = 1 : length(y)

Potential(i,j) =  ( 1 - a ) / sqrt( ( x(i) - a )^2 + y(j)^2)  + a / sqrt( ( x(i) + 1    - a )^2 + y(j)^2 ) + ( x(i)^2 + y(j)^2 ) / 2 ;

end

j = 1;
end

contour(Potential);

xlabel('X axis');
ylabel('Y axis');
zlabel('Z axis');
``````
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Yeah please Disregard the limits of `x` and `y` vectors. They are distances measured as unit-less ratios with respect to the two masses' radii. They should vary from (-1.5, 1.5) likeSticky said. Thank you very much –  Cactus BAMF Dec 18 '12 at 22:47

The way the three-body problem is set up, the distance coordinates are normalized to `a`. Thus, you should pick `x` and `y` to be more like:

``````x = linspace(-1.5, 1.5, 1000);
y = linspace(-1.5, 1.5, 1000);
``````

For the contour plot, you can use `meshgrid`, which allows you to avoid that for loop and plot a little easier:

``````[X, Y] = meshgrid(x, y);
``````

For the potential, try plotting 2U - this is called the Jacobi constant and is a bit more informative.

``````U = (1-a)./sqrt(Y.^2 + (X + a).^2) + ...
a./sqrt(Y.^2 + (X + a - 1).^2) + ...
0.5*(Y.^2 + X.^2);
Z = 2*U;
``````

Finally, you'll need contours. You'll want to tweak these for your plot, but I used something like

``````c = [2.988:0.05:3.1, 3.2:0.2:5];
``````

for the Earth-Moon system. Now, to plot, simply use `contourf` as follows:

``````figure
contourf(X, Y, Z, c)
colorbar
``````

Also note that you can solve for the Lagrange points themselves analytically using the equations of motion - you may consider plotting these too, since the contours will only converge on the points but will never hit them.

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+1 for a great answer. –  dinkelk Dec 19 '12 at 8:44

Recommendations

• Try using vector operations (rather than `for` loops), they're much faster. This is done by adding a '.' in front of the operator: `*` becomes `.*`
• The matrix sizes suggested above may be a bit large, you'll likely run out of memory. Try first with a smaller step size, then increase resolution.
• Your 'Z' axis in the Matlab `contour()` plot will be the color of the lines, so there is nothing to label. Try `colorbar` instead.
• Use `...` to continue long statements on multiple lines.
• By convention, words starting with a capital letter are reserved for class definitions.

Suggested Code

``````function lagrange(a)
n = 100000;
stepsize = 100;
[x,y] = ndgrid(-n:stepSize:n, -n:stepSize:n)
potential = ( 1 - a ) ./ sqrt( ( x - a ).^2 + y.^2)  + ...
a ./ sqrt( ( x + 1 - a ).^2 + y.^2 ) + ( x.^2 + y.^2 ) ./ 2 ;

contour(x,y,potential)
xlabel('X axis')
ylabel('Y axis')
colorbar
end
``````
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