how to find the end of major and minor axis of an ellipsoid

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nadia nadi
nadia nadi on 10 Mar 2017
Edited: Walter Roberson on 21 Apr 2017
Dear,
I have this information of an ellipse
a=29.2139; b=17.7345; xC= 43.9666; yC=42.9211; angle=29.7207;
can any one tell me why the end of the major and minor axis are not in the right place. I tried to rotate them using matrix H, but still it gives me wrong places. can any one help please.
Many thanks,
Nadia,

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Answers (3)

Image Analyst
Image Analyst on 10 Mar 2017
Looks like you forgot to apply your rotation matrix to the "g" coordinates.
Roger Stafford
Roger Stafford on 13 Mar 2017
I think you need
axis equal
so that scaling is the same for both axes.
Roger Stafford
Roger Stafford on 21 Apr 2017
Edited: Walter Roberson on 21 Apr 2017
I will make some assumptions about the ellipse you describe:
  1. The ‘a’ and ‘b’ values are the lengths of the ellipse’s semi-major and semi-minor axes, respectively.
  2. xC and yC are the cartesian coordinates of the ellipse’s center.
  3. The ‘angle’ is the angle in degrees, measured counterclockwise, from the x-axis to the ellipse major axis.
The ellipse axes’ four ends will then be:
Major axis, upper right: x1 = xC+a*cosd(angle)
y1 = yC+a*sind(angle)
lower left: x2 = xC-a*cosd(angle)
y2 = yC-a*sind(angle)
Minor axis, upper left: x3 = xC-b*sind(angle)
y3 = yC+b*cosd(angle)
lower right: x4 = xC+b*sind(angle)
y4 = yC-b*cosd(angle)
You can make a plot of the ellipse as:
t = linspace(-180,180,1000);
x = xC+a*cosd(t)*cosd(angle)-b*sind(t)*sind(angle);
y = yC+a*cosd(t)*sind(angle)+b*sind(t)*cosd(angle);
plot(x,y,y-,[x1,x2],[y1,y2],r*,[x3,x4],[y3,y4],g*)
axis equal
Note: It is not a good practice to use 'angle' for the name of your variable, since that is a reserved name for one of matlab's functions.

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