DocumentCode
831464
Title
A few methods for fitting circles to data
Author
Umbach, Dale ; Jones, Kerry N.
Author_Institution
Dept. of Math. Sci., Ball State Univ., Muncie, IN, USA
Volume
52
Issue
6
fYear
2003
Firstpage
1881
Lastpage
1885
Abstract
Five methods are discussed to fit circles to data. Two of the methods are shown to be highly sensitive to measurement error. The other three are shown to be quite stable in this regard. Of the stable methods, two have the advantage of having closed form solutions. A positive aspect of all of these models is that they are coordinate free in the sense that the same estimating circles are produced no matter where the axes of the coordinate system are located nor how they are oriented. A natural extension to fitting spheres to points in 3-space is also given.
Keywords
curve fitting; least squares approximations; measurement errors; average of intersections method; closed form solutions; fitting circles to data; fitting spheres to points; least squares; measurement error; nonclosed form methods; stable methods; Artificial intelligence; Closed-form solution; H infinity control; Helium; Least squares methods; Measurement errors; Metrology; Microwave measurements; Minimization methods; Particle measurements;
fLanguage
English
Journal_Title
Instrumentation and Measurement, IEEE Transactions on
Publisher
ieee
ISSN
0018-9456
Type
jour
DOI
10.1109/TIM.2003.820472
Filename
1246564
Link To Document