Rotate Normal Around Tangent
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I want to rotate a normal vector around a tangent vector to create a circle. I have not been able to find anything to do this. Does such a function exist? Or how would I generate one?
Thanks.
2 Kommentare
Matt J
am 5 Okt. 2012
Clarify what this is supposed to do. What data are you given and in what form? What will the output data be, and in what form?
Paul Huter
am 5 Okt. 2012
Akzeptierte Antwort
I'm assuming you're choosing the radius, R, of this circle. Then if T and N are the tangent and normal vectors at point P on the curve (all in column vector form):
n=1000;
theta=linspace(0,2*pi,n+1);
theta(end)=[];
refcircle = [R*cos(theta);R*sin(theta);zeros(1,n);ones(1,n)] ;
T=T/norm(T);
N=N/norm(N);
E=cross(N,T);
A=[0 0 0; R 0 0; 0 R 0].';
B=[P,P+R*N,P+R*E];
params=absor(A,B); %get this function from FEX
C = params.M*refcircle; %circle points at 3D curve
plot3(C(1,:), C(2,:), C(3,:)) %plot the circle
The above uses ABSOR, available here
8 Kommentare
Paul Huter
am 6 Okt. 2012
As I mentioned in the preamble to the code "T and N are the tangent and normal vectors at point P on the curve". Here's an alternative sans-ABSOR
n=1000;
theta=linspace(0,2*pi,n+1);
theta(end)=[];
refcircle = [R*cos(theta);R*sin(theta)] ;
T=T/norm(T);
N=N/norm(N);
C=bsxfun(@plus, [N,T]*refcircle, P);
plot3(C(1,:), C(2,:), C(3,:)) %plot the circle
Paul Huter
am 6 Okt. 2012
Paul Huter
am 6 Okt. 2012
There's nothing wrong with refcircle having more than 2 columns. Since this is matrix multiplication, it's only critical that refcircle have 2 rows. I've tested all versions of the routine before giving them to you and they run with no MATLAB errors on my end.
One small issue, though, is that I did have the circle tangent to the curve instead of normal to it. The version below should fix that.
n=1000;
theta=linspace(0,2*pi,n+1);
theta(end)=[];
refcircle = [R*cos(theta);R*sin(theta)] ;
T=T/norm(T);
N=N/norm(N);
E=cross(N,T);
C=bsxfun(@plus, [N,E]*refcircle, P);
plot3(C(1,:), C(2,:), C(3,:)) %plot the circle
Paul Huter
am 7 Okt. 2012
Clarify whether the plot you're talking about is from the code as I gave it to you, or the result of you adapting/inserting it into your larger problem. If the latter, I'd have to see what you did.
However, when I run it in isolation with the sample data P,T,N,R data below, I definitely get a plot of a circle floating in 3D space. Verify first that you can reproduce this.
P=[1;1;1];
T=[1;1;1];
N=[-1;2;-1];
R=3;
n=1000;
theta=linspace(0,2*pi,n+1);
theta(end)=[];
refcircle = [R*cos(theta);R*sin(theta)] ;
T=T/norm(T);
N=N/norm(N);
E=cross(N,T);
C=bsxfun(@plus, [N,E]*refcircle, P);
plot3(C(1,:), C(2,:), C(3,:)) %plot the circle
Paul Huter
am 7 Okt. 2012
Weitere Antworten (2)
Muthu Annamalai
am 5 Okt. 2012
0 Stimmen
Paul, You need to find the points of a 2D rotation transform using the equations, for example affine transformation http://en.wikipedia.org/wiki/Rotation_(mathematics), and then you may visualize it using plot() commands. HTH, -Muthu
1 Kommentar
Paul Huter
am 5 Okt. 2012
Image Analyst
am 6 Okt. 2012
Bearbeitet: Image Analyst
am 6 Okt. 2012
0 Stimmen
Sounds like the streamtube() function. Could that be used? Or maybe morphological dilation, imdilate(). For morphological dilation, imagine a sphere whose center is tracing out your 3D curve. The dilated volumetric image is the volume swept out by that sphere as it travels along your curve.
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am 5 Okt. 2012
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