Truncate matrix elements to a particular length
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Ok. I am revising my previous question. I have two matrices that have the X and Y coordinates of a trajectory.
X= [ 0 1.1 1.9 2.6 3.01 4.56 5.04]
Y= [ 0 -0.013 0.008 0.008 -0.002 0.034 0.08]
So the trajectory comprises of 7 points and 6 segments. The length of each subsegment is given by the following matrix. The length is calculated by the distance formula
S=[ 1.1001 0.8003 0.7 0.4101 1.5504 0.4822]
The sum of all these subsegments equals sum(S)=5.0431. This is the length of my trajectory. To do further analysis, I want all my trajectories to have the same length (say 5 in this case). I want to interpolate the last point so that it falls on the trajectory and allows the trajectory to have a predefined length. Only the last point should be interpolated.
So my final output should look like this
X= [ 0 1.1 1.9 2.6 3.01 4.56 Xi]
Y= [ 0 -0.013 0.008 0.008 -0.002 0.034 Yi]
I need to find Xi and Yi using interpolation (interp1 probably) so that sum(S) becomes 5.
Can anyone help me write a code for this.
Thanks, Nancy
Accepted Answer
Andrei Bobrov
on 12 Dec 2011
xy = [X;Y];
d = diff(xy(:,end-[1 0]),1,2);
k = 5 - sum(sqrt(sum(diff(xy(:,1:end-1),1,2).^2)))
xy(:,end)= k/sqrt(sum(d.^2))*d+xy(:,end-1)
OR
xy = [X;Y]
d = diff(xy,1,2)
D = hypot(d(1,:),d(2,:))
k = 5 - sum(D(1:end-1))
XYi = k/D(end)*d(:,end) + xy(:,end-1)
5 Comments
Nancy
on 13 Dec 2011
Andrei Bobrov
on 13 Dec 2011
Hi Nancy! My typo! Corrected.
Nancy
on 13 Dec 2011
Sean de Wolski
on 13 Dec 2011
xy vertically concatenates x,y
d = is the horizontal numerical first derivative, e.g. a(i+1)-a(i)
D is the sqrt sum squares (doc hypot) of x and y
k is 5 minus the sum of all hypotenuses except the last
XYi is something.
Nancy
on 13 Dec 2011
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