Edit the limits in least squares line.

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Dimitrios Bentis 2018년 3월 31일

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https://kr.mathworks.com/matlabcentral/answers/391879-edit-the-limits-in-least-squares-line

편집: Adam Danz 2021년 4월 30일

Hi everyone!

Plotting the lsline in a scatter plot I get the least squares line but it is stretched out of the period with the data as can be seen below. Is there anyway I can have it only above the period of interest (the period that I have data, 1976-2016)?

Thanks in advance!

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dpb 2018년 3월 31일

Well, unfortunately, lsline doesn't help much for anything other than the default case; there's no way to find out what the coefficients are so nothing you can do with it.

That kind of thing is why asked about how you'd created the line...

Adam Danz 2021년 4월 30일

편집: Adam Danz 2021년 4월 30일

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Using polyfit or fitlm is the way to go but because I'm drawn to finding alternatives, here's a workaround that only relies on lsline.

Before calling lsline, set axis tight or set xlim to the range of your data, then call lsline, then set your desired axis limits.

x = linspace(1975,2017,50);

y = rand(size(x))*50+130;

plot(x, y, 'o')

axis tight

lsline

xlim([1970,2020])

ylim([0,350])

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Answer 1

dpb 2018년 3월 31일

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https://kr.mathworks.com/matlabcentral/answers/391879-edit-the-limits-in-least-squares-line#answer_312927

편집: dpb 2018년 3월 31일

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If you need to do more than what lsline does which is to draw the line from the axis limits but not give anything else useful for modifying it; then you have to fit the line itself. I really don't understand TMW's thinking on a bunch of this stuff... :(

You've got a time axis; none of the fitting routines I tried here with R2016b are datetime aware so will illustrate with datenum; same idea if you have a more recent release and does work with datetime

>> dn=datenum(1975,1:3:128,1).';        % a stretch of datenums 
>> w=50*rand(size(dn))+140;             % some data to go with it
>> plot(dn,w,'0')
>> ylim([0 350])
>> datetick('x','keeplimits')       
>> lsline             % put the default lsline on for comparison later...
>> b=fitlm(dn,w,'linear')  % do a linear fit...
b = 
Linear regression model:
  y ~ 1 + x1
Estimated Coefficients:
                 Estimate        SE         tStat      pValue 
                 _________    _________    ________    _______
  (Intercept)      -1333.7       1376.8    -0.96873    0.33836
  x1             0.0020712    0.0019036      1.0881    0.28291
Number of observations: 43, Error degrees of freedom: 41
Root Mean Squared Error: 14.1
R-squared: 0.0281,  Adjusted R-Squared 0.00436
F-statistic vs. constant model: 1.18, p-value = 0.283
>> hold on  % to add to the plot
>> hLS=plot([dn(1);dn(end)],b.predict([dn(1);dn(end)]),'r-');  % add the LS fit over data range

This gives:

so you can see is the same line just limited to the range of the data.

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Answer 2

Scott MacKenzie 2021년 4월 17일

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https://kr.mathworks.com/matlabcentral/answers/391879-edit-the-limits-in-least-squares-line#answer_677406

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As noted, lsline isn't very useful beyond its default behaviour. To constrain the limits of the regression line, a simple option is to use polyfit and line, as below.

x = [5 7 3 8 6 9];
y = [4 5 3 6 5 7];
scatter(x,y);
axis([0 10 0 10]);
p = polyfit(x, y, 1);
m = p(1); % slope
b = p(2); % intercept
line([min(x) max(x)], [m*min(x)+b m*max(x)+b], 'color', 'r');