# How to plot a specific function in matlab

I have this function:

and I want plot it, I think the result is a periodic function...

I tried this but got only one point :(

``````x1=-50:0.1:50;
x2=-50:0.1:50;
plot(cos(sqrt(power(x1,2)+power(x2,2)))/(power(x1,2)+power(x2,2)));
``````

where is my problem and what is the correct way?
appreciate any help.

-

1. That's a 3d plot, since there are two inputs `x1` and `x2`. So you've got to use plot3 (or surf as @EitanT points out, or any 3d plotting function).

2. You're now only plotting the pairs `(-50;-50)`, `(-49.9;-49.9)`,...,`(50;50)`, because you start from two vectors, you probably want to cover all the combinations. Therefore, use meshgrid (for higher dimensions, there is also ndgrid):

``````x1=-50:0.1:50;
x2=-50:0.1:50;
[X1, X2] = meshgrid(x1,x2);
``````
3. You now use matrix operations, read through this link and you'll see that you need elementwise operations: `a.*b` instead of `a*b`, etc. `power(a,b)` is already the element-wise operation (the same as `a.^b`), matrix equivalent is `mpower(a,b)` or `a^b`.

``````f = cos(sqrt(power(X1,2)+power(X2,2)))./(power(X1,2)+power(X2,2)+1);
plot3(X1,X2,f);
``````
-
thank you very much –  zhilevan Dec 16 '12 at 11:21

You need to plot it as a 3-D surface. For example, use `surf`:

``````[X1, X2] = meshgrid(-5:0.25:5, -5:0.25:5);
F = cos(sqrt(X1 .^ 2 + X2 .^ 2)) ./ (X1 .^ 2 + X2 .^ 2 + 1);
surf(X1, X2, F)
``````

Note two things:

1. You forgot the "+1" in the denominator.
2. I've reduced the range of x1 and x2 coordinates, for better visualization.

If the black edges look annoying and seem to clutter the plot, you can remove the edge lines by disabling the `EdgeColor` property (as user Shai pointed out):

``````surf(X1, X2, F, 'EdgeColor', 'None')
``````

The final result should look something like this:

-
thank you very much –  zhilevan Dec 16 '12 at 11:24
@EitanT - regarding resolution of x1 and x2, you can turn off edge color to avoid the "all black" surface: `surf( x1, x2, F, 'EdgeColor', 'none' )` –  Shai Dec 16 '12 at 12:10
@Shai Good point! –  Eitan T Dec 16 '12 at 14:14