How can I make curve form data?

3 views (last 30 days)
Riyadh Muttaleb
Riyadh Muttaleb on 6 Feb 2020
Commented: Riyadh Muttaleb on 9 Feb 2020
Hi All,
I would like to make a convex curve from this (x,y) data that I have. The curve must connect the first and last points of y.
x= 7000,7050,7100,7150,7200
y= -92.9,-125.6,-158.5,-190.9,-223.5
The help would be apprecited,
Thanks in advance,
Riyadh
  7 Comments
Riyadh Muttaleb
Riyadh Muttaleb on 7 Feb 2020
I got a straight line!
Walter Roberson
Walter Roberson on 7 Feb 2020
No you didn't -- you get a curved line that was sampled over a small enough region that it looked flat.
If you look at diff(y) you will see that the differences between adjacent y values is approximately constant, which is what you would expect for a straight line.
If you fit as a polynomial of degree 2, then the minimum of that polynomial is at 23425 and the zero crossings are at 6859 and 39990

Sign in to comment.

Answers (1)

David Goodmanson
David Goodmanson on 8 Feb 2020
Edited: David Goodmanson on 8 Feb 2020
Riyadh;
The differences from a straight line are small, so it make sense to look at that difference.
x = [7000,7050,7100,7150,7200]'
y = [-92.9,-125.6,-158.5,-190.9,-223.5]'
ylin = linspace(y(1),y(end),5)'
ydiff = y - ylin;
figure(1)
plot(x,ydiff,'o-');
grid on
The three differences are all negative, so absent any other information it can just be fit with a parabola that is zero at the end points. This will lead to a curve that is convex downwards.
p = (x-x(1)).*(x-x(end)); % parabola, zero at end points
c = p\ydiff; % least squares fit
xnew = linspace(7000,7200,500); % grid with more points
ydiffnew = c*(xnew-x(1)).*(xnew-x(end)); % fitted parabola, zero at end points
figure(2)
plot(x,ydiff,'o-',xnew,ydiffnew)
grid on
Then the final result ynew is this plus the linear line
slope = (y(end)-y(1))/(x(end)-x(1));
ylinnew = y(1) + slope*(xnew-x(1));
ynew = ylinnew + ydiffnew;
figure(3)
plot(x,y,'o-',xnew,ynew)
grid on
  1 Comment
Riyadh Muttaleb
Riyadh Muttaleb on 9 Feb 2020
Thank you so much for your great work, However, the seconed part the curve is very good while in the third part it looks like a straight line!

Sign in to comment.

Categories

Find more on Curve Fitting Toolbox in Help Center and File Exchange

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!