# How do I plot my function to a mesh

I am a new MATLAB user and I am trying to plot a function:

``````function [ uncertainty ] = uncertain(s1, s2, p)
%UNCERTAIN calculates the measurement uncertainty of a triangulation
% provide two coordinates of known stations and a target coordinate
% of another point, then you get the uncertainty
[theta1, dist1] = cart2pol(p(1)-s1(1), p(2)-s1(2));
[theta2, dist2] = cart2pol(p(1)-s1(1), p(2)-s2(2));
theta=abs(pi-theta2-theta1);
uncertainty = dist1*dist2/abs(sin(theta));
end
``````

called with:

``````uncertain([0 0],[8 0],[4 4])
``````

I get a single result. But i want a whole surface and called:

``````x=-2:.1:10;
y=-2:.1:10;
z = uncertain([0 0],[8 0],[x y]);
mesh(x,y,z)
``````

I get the error: "Z must be a matrix, not a scalar or vector."

How can I modify my code so that my function draws a surface?

-

First I think there's a mistake in your function: your `[theta2, dist2] = cart2pol(p(1)-s1(1), p(2)-s2(2));` should have th first `s1` being a `s2`.

Next, to get a vector answer out for your vector inputs, you have to change your `p(i)` (which selects the ith element of `p`) to `p(i,:)`, which will select the first ith row of `p`.

After that, you change multiplication (`*`) to element-wise multiplication (`.*`).

In summary:

``````function [ uncertainty ] = uncertain(s1, s2, p)
%UNCERTAIN calculates the measurement uncertainty of a triangulation
% provide two coordinates of known stations and a target coordinate
% of another point, then you get the uncertainty
% target coordinates p are 2xn
% output uncertainty is 1xn
[theta1, dist1] = cart2pol(p(1,:)-s1(1), p(2,:)-s1(2));
[theta2, dist2] = cart2pol(p(1,:)-s2(1), p(2,:)-s2(2));
theta=abs(pi-theta2-theta1);
uncertainty = dist1.*dist2./abs(sin(theta));
end
``````

The only changes are `p(i)` -> `p(i,:)`, and `*`->`.*` and `/`->`./`.

To get a surface, you use `meshgrid` to get all sets of `(x,y)` coordinates in a grid, flatten them into a `2xn` matrix for `uncertain`, and then expand them back out to the grid to plot. Example:

``````x=-2:.1:10;  % 121 elements
y=-2:.1:10;  % 121 elements
[xs,ys]=meshgrid(x,y); % xs and ys are each 121 x 121
zs = uncertain([0 0],[8 0],[xs(:) ys(:)]'); %get zs, being 1x(121*121) ie 1x14641
% Reshape zs to be 121x121 in order to plot with mesh
mesh(xs,ys,reshape(zs,size(xs)))
``````

Note: you'll get lots of really big numbers because when `theta` is `0` or `pi` (or very nearly) because then you're dividing by (almost) 0.

-
Thanks for your answer. I try to understand your modifications. But the result is quite unexpected, because the angles should be near 90° and therefore the sin(angle) should be near 1. I have an ugly java code producing an image like this: pastehtml.com/view/bjowk6rbg.html –  Ralf K. Jan 5 '12 at 8:50
But my matlab code is yet missing a limit of 100 like: uncertainty = max (uncertain,100) coordinate wise And the bounds should be narrowed down. –  Ralf K. Jan 5 '12 at 9:03
I have found another error in my code: the three angles must be 180° because they should be the three inner angles of the triangle (s1,s2,p). –  Ralf K. Jan 5 '12 at 9:31
But theta2 = cart2pol... returns the outer angle at station 2, so theta must be theta2-theta1 ? –  Ralf K. Jan 5 '12 at 9:40
The code is sound in that it vectorises the version you wrote in your question - the unexpected results are to do with problems in your maths, I imagine (I can't help you). Why don't you try do the calculation by hand for a single `p`, verify that the result is what you expect, and then use your `uncertain` function agrees with it? –  mathematical.coffee Jan 6 '12 at 0:10