How can I solve a system of non-linear equations for positive values only?

5 views (last 30 days)
Hello,
I wrote a code to solve a system of non-linear equations, but I am not getting the right answer when I run it. I thought the initial guess was the problem, so I used experimental values from a research paper, but the solution is not even close it. Additionally, I get a comment that the solver was stopped prematurely. I am not very experienced in Matlab. Could someone help me find what I am doing wrong?
function f = root(x)
%data
delta = [0.1]*1e-4; QA = 3.57; QB = 20; QC = 60; QD = 1000; ph = [9.86923]*76; pl = [0.986923]*76;
nF = 277778; yAF = 0.7841; yBF = 0.2084; yCF = 0.0003; yDF = 1-yAF-yBF-yCF; A = 2260000;
% Material Balance
f(1) = x(13)*x(1) + x(14)*x(5) - nF*yAF;
f(2) = x(13)*x(2) + x(14)*x(6) - nF*yBF;
f(3) = x(13)*x(3) + x(14)*x(7) - nF*yCF;
f(4) = x(13)*x(4) + x(14)*x(8) - nF*yDF;
% Material Balance in terms of flux
f(5) = x(9)*A - x(13)*x(1);
f(6) = x(10)*A - x(13)*x(2);
f(7) = x(11)*A - x(13)*x(3);
f(8) = x(12)*A - x(13)*x(4);
% Flux Equations
f(9) = x(9) - (QA/delta)*(ph*x(5) - pl*x(1));
f(10) = x(10) - (QB/delta)*(ph*x(6) - pl*x(2));
f(11) = x(11) - (QC/delta)*(ph*x(7) - pl*x(3));
f(12) = x(12) - (QD/delta)*(ph*x(8) - pl*x(4));
% Component Equations
f(13) = x(5) + x(6) + x(7) + x(8) - 1;
f(14) = x(1) + x(2) + x(3) + x(4) - 1;
end
followed by:
x0 = [0.42, 0.48, 0.05, 0.05, 0.825, 0.075, 0.05, 0.05, 0.00258, 0.00295, 0.00031, 00031, 13888.9, 263889]';
[x, fval] = fsolve(@root, x0)
The output I get is:
Solver stopped prematurely.
fsolve stopped because it exceeded the function evaluation limit,
options.MaxFunctionEvaluations = 1.400000e+03.
x =
1.0e+11 *
0.0000
0.0000
0.0000
0.0000
0.0000
0.0000
0.0000
0.0000
0.0000
0.0000
0.0000
0.0000
1.6223
-1.9271

Accepted Answer

Ayush Gupta
Ayush Gupta on 3 Sep 2020
Edited: Ayush Gupta on 3 Sep 2020
fsolve doesn’t allow bounds but lsqnonlin does. Change the last piece of code to get answers for positive values only.
x = lsqnonlin(@root,x0,zeros(size(x0)))

More Answers (0)

Categories

Find more on Systems of Nonlinear Equations 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!