# How to use plot3 restrict to a certain region in Matlab?

For example, I want to plot the function

``````f(x,y) =sin(x^2+y^2)/(x^2+y^2),       x^2+y^2 <=4π
``````

In Mathematica, I can do it as following:

``````Plot3D[Sin[x^2 + y^2]/(x^2 + y^2), {x, -4, 4}, {y, -4, 4},
RegionFunction -> (#1^2 + #2^2 <= 4 Pi &)]
``````

Where the `RegionFunction` specified the region of x,y to plot.

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have you tried searching for 3d polar plot: f(r) = sin(r^2)/r^2 –  Rasman Nov 14 '12 at 4:29
@Rasman But if the region is not circle area? Like |x|+|y|<=1 –  Eastsun Nov 14 '12 at 4:36

Here's a not particularly elegant solution that sets the function values of the region you don't want to see to -infinity.

``````[x, y] = meshgrid(-4:0.1:4, -4:0.1:4);
z = sin(x.^2+y.^2)./(x.^2+y.^2);
idx = x.^2 + y.^2 > 4*pi;
z(idx) = -Inf;
surf(x, y, z); axis vis3d;
``````

Edit. Actually, if you try a finer grid (say -4:0.01:4) and add `shading interp` it doesn't look too bad.

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MATLAB makes use of `Inf` in its built-in functions extensively, so I don't think there's any issue with elegance here. –  rwong Nov 14 '12 at 6:07
Agree with rwong. The only flaw is that the region's edge of the plot generated by Matlab is not as smooth as Mathematica's, –  Eastsun Nov 14 '12 at 6:25
@Eastsun Re: the smoothness, it is because Mathematica uses adaptive sampling with more points where the function is sharply changing and fewer where it is relatively flat. On the other hand, using `meshgrid` in MATLAB samples the space evenly and can lead to jaggedness and you can end up missing "interesting" features. You can replicate this in Mathematica by setting `MaxRecursions -> 0`. Compare the regular sampling with `MaxRecursions -> 0` here and the default adaptive sampling here (`MaxRecursions -> 2`). –  r.m. Nov 14 '12 at 20:10

A slight variation to 3lectrologos's solution, with emphasis on keeping what you want:

``````x = -4*pi:0.01:4*pi;
y = -4*pi:0.01:4*pi;
[X,Y] = meshgrid(x,y);
Clean = (X.^2 + Y.^2)<=4*pi;
Y = Y.*Clean;
X = X.*Clean;

X(~any(X,2),:) = [];
X(:, ~any(X,1)) = [];
Y(~any(Y,2),:) = [];
Y(:, ~any(Y,1)) = [];

F = sin(X.^2+Y.^2)./(X.^2+Y.^2);
mesh(X,Y,F)
``````

Note that in this case, you need to make sure that (0,0) is in your solution profile.

Edit: compressing matrices for easier plotting

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Thanks for your help. However, I prefer 3lectrologos's solution. –  Eastsun Nov 14 '12 at 6:18