# Plotting the result of a 2 parameter function in matlab (3D Graph)

Basically, I have a function f(X,Y) that would return one value for each X,Y that I give. Is there any function in matlab where I can pass the function f, the ranges for X,Y so that it plots a 3d graph showing the magnitude of f (along the z axis) for all values within the given range.

ezplot3, does this kind of, but it takes only one parameter 't'. I am very new to matlab and am trying my best to learn it fast, but I couldnt find much regarding this. Any help would be appreciated

-

Keep in mind, that with matlab, you're never really plotting "functions"; You're plotting arrays/vectors. So instead of trying to plot g = f(X,Y), you'll actually by plotting the vectors X, Y, and g, where X and Y are your original inputs and g is a vector containing your outputs.

I'm having a hard time visualizing what exactly you're trying to plot but basically, you can follow any standard matlab plotting example such as: http://web.cecs.pdx.edu/~gerry/MATLAB/plotting/plotting.html

-
well yes, I know that, I was looking for something like ezplot, where I just give them my function, and it samples and prints it automatically... what I want is something like a contour plot or any 3d plot, where i can see the variation of the function, across both parameters x & y –  Nicomoto Oct 17 '12 at 2:47

Well, this is what I was going for : http://www.mathworks.com/help/matlab/ref/ezsurf.html

if i do this

``````ezsurf('f(x,y)');
``````

I get the 3d graph I wanted.

Thanks anyways!

-

It does not produce a 3D plot, but I have found the 2D scatter plot useful for this kind of task before:

``````scatter(x, y, 5, z)
``````

Where `z` is the value of the function at the point `(x, y)` will produce something similar to what you want. Its perhaps not quite as pretty as a full 3D plot but can be used to good effect.

See:

http://www.mathworks.com/matlabcentral/fileexchange/35287-matlab-plot-gallery-scatter-plot-2d/content/html/Scatter_Plot_2D.html

Here is some (very ugly) code I put together to demonstrate the difference:

``````j=1;
y = -100:1:100;
for i = -100:1:100
y = [y -100:1:100];
count = 0;
while count < 202;
x(j) = i;
j = j+1;
count = count + 1;
end
end

z = (abs(x) + abs(y));

figure(1)
scatter(x, y, 10, z)
h=colorbar;

figure(2)
ezsurf('(abs(x) + abs(y))')
``````
-