Least Squares Fitting Method with a Circle

62 views (last 30 days)
Hi everyone,
Forgive me, I am no expert at MATLAB. I would appreciate it greatly if someone could explain to me the method of nonlinear least squares and how to fit it with a circle of random points. Here's what I have so far:
% radius information-------------------------------------------------------
r = 10; % constant radius
Rc = @(x,y,z) (x.^2 + y.^2 + z.^2).^(1/2); % radius as a function
n = rand(1000,3); % generate random points on nominal circle
xc = n(:,1);
yc = n(:,2); % separate into coordinates
zc = n(:,3);
%--------------------------------------------------------------------------
% angular information------------------------------------------------------
theta = linspace(0,2*pi,1000); % plot bounds
theta = theta';
%--------------------------------------------------------------------------
% generate random radii----------------------------------------------------
R = Rc(xc,yc,zc);
R(:,2) = R(:,1); % same radii in all directions
R(:,3) = R(:,1);
p = n + (r/100)*R; % generate plot points around the circle
figure(1)
polar(theta,Rc(xc,yc,zc))
%--------------------------------------------------------------------------
% Least Squares fitting----------------------------------------------------
e = dist(p,R');
perf = sse(e);
lsqrfit = lsqr(e,Rc(xc,yc,zc),[],1000);
%--------------------------------------------------------------------------
So from what I understand, the residuals (errors) need to be found and then the sum of squares of the residuals need to be found. After that I am not sure where to go. Thanks for all the help.
Ian
  2 Comments
Andrew Newell
Andrew Newell on 1 Jul 2011
I'm having trouble figuring out what this code is supposed to be doing. First, the data: are they random points on a circle, or scattered near a circle? Can the center and the radius of the circle vary? What is your fitting criterion? (I would think sum of squares of the distance from the circle would be best).
Ian Wood
Ian Wood on 1 Jul 2011
They are supposed to be scattered near a circle, and then fitted with the least squares method. The location of the center of the circle doesn't matter.
If you look at the last section of my code entitled "Least Squares Fitting", that's what I'm attempting to do (I think..) The "dist" function gives me the minimum distances, "sse" is the sum squared of the errors (residuals) and "lsqr" is supposed to solve for the least squares parameters, though I am unsure if the parameters in that function are correct to do what I intend. Note that they are all pre-defined functions within the library.

Sign in to comment.

Accepted Answer

bym
bym on 2 Jul 2011
Maybe this will help, it is adapted from "measuring the radius of a roll of tape" demo in the image processing toolbox:
r = 5+.5*rand(100,1); %100 random radii
ang = linspace(0,2*pi,100)'; % angles
x = r.*cos(ang)+2; y = r.*sin(ang)+3; % x,y coordinates centered [2,3]
plot(x,y,'+')
axis equal; hold on;
c = [x y ones(length(x),1)]\-(x.^2+y.^2); %least squares fit
xhat = -c(1)/2;
yhat = -c(2)/2;
rhat = sqrt(xhat^2+yhat^2-c(3));
plot(rhat*cos(ang)+xhat,rhat*sin(ang)+yhat,...
'g','linewidth',2) %best fit circle
  4 Comments
Image Analyst
Image Analyst on 11 Apr 2020
For a fixed radius, where would you want the center? At the mean of the point?
xCenter = mean(x);
yCenter = mean(y);
Rajdeep Chowdhury
Rajdeep Chowdhury on 11 Apr 2020
I want a least square type fitting to obtain the center (x,y) when the radius is predefined.

Sign in to comment.

More Answers (2)

Daniel Shub
Daniel Shub on 1 Jul 2011
  2 Comments
Ian Wood
Ian Wood on 1 Jul 2011
No I haven't, but that should help me somewhat. Thanks!
Ian Wood
Ian Wood on 1 Jul 2011
It's the right idea, but I want to write my own code for the fit. I noticed that none of the files used the polar plot. Is there a reason for this, or am I able to do the fit on polar coordinates?

Sign in to comment.


Ian Wood
Ian Wood on 2 Jul 2011
Is there a problem with my code? Like maybe I shouldn't use a polar plot in this case, or something that could be done better.

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!