I want to make curve fitting to these points
4 Ansichten (letzte 30 Tage)
Ältere Kommentare anzeigen
I want to make curve fitting to these points but when i made it the blue straight line appeared. What does it mean ?
2 Kommentare
Umar
am 29 Jul. 2024
Hi @noura,
If you don’t mind, can you share your code with us to help resolve your issue.
dpb
am 29 Jul. 2024
You don't need his code; the answer is obvious by inspection. Put any set of symmetric points in and overall OLS will always return the mean; it's inevitable conclusion from the basis of the method to minimize the overall error sum of squares.
Akzeptierte Antwort
dpb
am 29 Jul. 2024
Bearbeitet: dpb
am 29 Jul. 2024
The top and bottom are identical pairs above and below the mean; hence when/if you fit the whole dataset, the single line that best fits all the data is (drum roll, please...) the mean.
You need two fits; one for the upper and one for the lower. The slope of one will be exactly the negative of the other, but the two intercepts will be different.
X=[16 17.5 20 25 32.5 37 42.5 45 48].';
Y=[0 9 17 21 27 34 41 48 55 ];
DY=Y-Y(end);
Y=[Y;Y(end)-DY].';
scatter(X,Y,'filled')
box on, grid on
ylim([-5 118])
b1=polyfit(X,Y(:,1),3)
b2=polyfit(X,Y(:,2),3)
y1=polyval(b1,X);
y2=polyval(b2,X);
hold on
plot(X,y1,'b-')
plot(X,y2,'r-')
7 Kommentare
Umar
am 29 Jul. 2024
@dpb, thanks for your contribution and sharing your thoughts, really appreciated. @noura, please go ahead accept @dpb answer and give him a vote. If there are still further questions or issues, please let us know, we will be more happy to help.
dpb
am 30 Jul. 2024
Bearbeitet: dpb
am 30 Jul. 2024
"...the coefficients of the two are the negative of each other for the terms in X while the intercepts are different."
Also, notice that
X=[16 17.5 20 25 32.5 37 42.5 45 48].';
Y=[0 9 17 21 27 34 41 48 55 ];
DY=Y-Y(end);
Y=[Y;Y(end)-DY].';
b1=polyfit(X,Y(:,1),3);
b2=polyfit(X,Y(:,2),3);
mean_intercept=mean([b1(end) b2(end)])
mean_y=mean(Y,'all')
The average of the two intercepts is the mean of the overall data to within machine precision/roundoff in the fitting calculations...
That being so, it is in one sense only one polynomial, the second is completely known by only fitting the first; the issue still being there isn't any convenient way to return the double-valued function from only a f(x).
Weitere Antworten (0)
Siehe auch
Kategorien
Mehr zu Get Started with Curve Fitting Toolbox finden Sie in Help Center und File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!