Optimise a reference that cuts my curve into 2 equal sections

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fadi awar on 12 Feb 2022

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Edited: Matt J on 12 Feb 2022

Hello,

I am collecting data from excel, then basic idea is that i want to determine a constant value line that cuts my curve into 2 eqaual sections (area above the line and the curve = area under).

The objective is to determine the value of the red line.

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Matt J on 12 Feb 2022

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Edited: Matt J on 12 Feb 2022

Open in MATLAB Online

 %t= time, X=consumption, x=unknown midline
 
 tc=t-t(1);
 Xc=cumtrapz(t,X);
 
 x=optimvar('x');
 sol=solve( optimproblem('Objective',x,'Constraints',Xc-x*tc<=90,'ObjectiveSense','minimize') );
 lb=sol.x; %lower bound
 sol=solve( optimproblem('Objective',x,'Constraints',10<=Xc-x*tc,'ObjectiveSense','maximize') );
 ub=sol.x; %upper bound
 
 if lb>ub
  disp 'Problem is infeasible'
 else
     
  xunc=trapz(t,X)/(t(end)-t(1)); %unconstrained solution
  
  x=min(max(xunc,lb),ub); %constrained solution
  
 end

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Matt J on 12 Feb 2022

Edited: Matt J on 12 Feb 2022

You probably need to upgrade your Matlab version.

If you cannot upgrade, you can try my revised version.

fadi awar on 12 Feb 2022

Yeah, this one worked.

Thank you for your help!

More Answers (2)

William Rose on 12 Feb 2022

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@fadi awar,

If you mean that the area between the red line and the blue curve abve the line equals the area between the red line and the blue curve below the line, then the height of the red line is simply the mean value of the blue line data.

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dpb on 12 Feb 2022

Attach the data as a .mat file.

Just looking at the graph, I'd venture it isn't possible to meet the constraints that the integral of the area be <95 when the magnitudes of the integrand are in the thousands. Just by a very crude approximation of the leftmost area (brown?) as roughly a rectangle of height ~(2800-1800) and a duration of 12, the integral would be roughly 1000*12 --> 12,000. Unless there's a very small scaling factor to be applied, it "just ain't a-gonna' happen".

fadi awar on 12 Feb 2022

Kindly find attached the files.

I am to get the result according to my limits even if in this case of chosen data it wont matter a lot.

But Future wise I will be chaniging the data.

Thank you

Catalytic on 12 Feb 2022

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Edited: Catalytic on 12 Feb 2022

Open in MATLAB Online

midline = trapz(x,y)/(max(x)-min(x))

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