# How to set an arbitrary direction on a contour plot to perform operation in Matlab

I am looking for help for my particular problem.

I have a contour plot created from XYZ data. This plot contains 2 broad peaks with one more intense than the other.

When the most intense peak is aligned with the Y axis, I can perform a fitting of every YZ curve at each X values. I usually do a gaussian fit to plot the peak center on the same graph.

In some cases I need to perform the same fitting but no along the Y axis direction (in this case I just plot YZ scan at every different X values) but along another arbitrary direction.

For the moment the only way I found is the following: -plot the contour plot and find for the position of the most intense peak -if the position is not aligned with the Y axis, then rotate all the datas and plot again the contour -perform the YZ gaussian fit for every X value - Rotate the resulting XY position to go back to the original plot -plot the XY position as a line on the original contour plot

this is quite long and requires a lot of memory. i would like ot know if there is a more elegant/faster way.

David

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Sorry I answered to quickly. You answer is very useful but I still lack something. I want to extract the data along each perpendicular directions of the arbitrary line and make a fit on them. I guess that if I know the (x1,y1) (x2,y2) points for my line (let's call it Master line), there should be an easy way to obtain the data along perpendicular lines from this Master line. –  Dav Mar 19 '13 at 5:50

I take it you want to extract data from the (x,y,z) data along some arbitrary line in order to make a fit. A contour plot will show only part of the data, the full `z(x,y)` data can be shown with `imagesc` etc. Say you want the data along line defined by two points `(x1,y1) -> (x2,y2)`. According to the eq of the line, the line `y=a*x+b` the slope `a` is `(y2-y1)/(x2-x1)` and `b=y1-a*x1`. For example, I'll select (x,y) coordinates in the following contour:

Create data and end points:

``````m=peaks(100);
x1=11 ; x2=97;
y1=66; y2=40;
``````

Thus the line parameters are:

``````a=(y2-y1)/(x2-x1);
b=y1-a*x1;
``````

and the line is:

``````x=x1:x2;
y=round(a*x+b);
``````

select the proper (x,y) elements using linear indexing:

``````ind=sub2ind(size(m),y,x)
``````

plot:

``````subplot(2,1,1)
contour(m,10); hold on
line([x1 x2],[y1 y2],'Color',[1 0 0]);

subplot(2,1,2)
plot(m(ind))
``````

You can now use `vec=m(ind)` to fit your function.

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Sorry I answered to quickly. You answer is very useful but I still lack something. I want to extract the data along each perpendicular directions of the arbitrary line and make a fit on them. I guess that if I know the (x1,y1) (x2,y2) points for my line (let's call it Master line), there should be an easy way to obtain the data along perpendicular lines from this Master line. –  Dav Mar 19 '13 at 5:51
The answer deals with a line defined between arbitrary two points `(x1,y1)->(x2,y2)`. Note that I'm not treating vertical lines (infinite slope), this require some more lines but I'm sure you can handle it. For getting the perpendicular lines see stackoverflow.com/questions/1811549/… –  natan Mar 19 '13 at 6:26
OK thank you for your answer. For the case of vertical line, I just have to look through the XZ line along each Y values. –  Dav Mar 19 '13 at 7:15
ok sorry for the delay. done :) –  Dav Mar 20 '13 at 1:25