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I'm trying to optimize a function which I know the results but matlab is giving me weird results. Here's what I'm trying to do:

max: f(x)= -1815·x1 - 379·x2

subject to: 

    -1475·x1 - 112013·x2 >= -700000
    (x1,x2) <= 80
    (x1,x2) >= 0

Here is my actual code:

f  = [1815;379]
A  = [-1475 -11203]
b  = [-700000]
ub = (ones(1,2)*80)'
lb = zeros(2,1)
x  = linprog(f,A,b,[],[],lb,ub)

How would you do it?

share|improve this question
At least include the realized outcome, as well as the expected outcome. And while you are editing the post anyway, make sure to put code in a code block (check the buttons in the editor). -- First thing I would check is whether you need to flip signs anywhere. – Dennis Jaheruddin Aug 11 '14 at 15:33
x1=0, x2=62.48 is the result – Gimpy Aug 11 '14 at 15:41
Excel gives me x1=40 and x2= 80 – Gimpy Aug 11 '14 at 15:42
As you've written it, the solution is trivially (0, 0) because you're restricting (x1,x2) to be positive, and trying to maximize a linear function with negative coefficients. The point (0, 0) satisfies your constraints, so it is the solution. Are you sure that all your coefficients have the correct sign, all your inequalities are the right way around etc? – Chris Taylor Aug 11 '14 at 15:49
In your code, A and b have the wrong sign. They encode the constraint A * x <= b but since you actually have a 'greater-than' constraint you need to flip the signs to make it a 'less-than' constraint. – Chris Taylor Aug 11 '14 at 15:51

This problem can easily be solved analitically.

As mentioned in the comments, you currently would expect 0. If however, you actually change your constraint from larger than, into smaller than, the optimum solution is actually close what matlab gives you.

It would basically be 700000/112013 = 6.248...

It is off by a factor 10, but I assume that you made a typo somewhere.

If you are struggeling with how this function works, just try a simple case first (that you can easily verify manually) and then increase the complexity. Either way, your excel solution is nowhere near what would come out of the problem description.

share|improve this answer

Your linear constraint has incorrect sign w.r.t. how it's expected by linprog.

As with many linear problems, it's actually easiest to just make a plot:

[x1,x2] = meshgrid(0:80);
f = -1815*x1 - 379*x2;
f(-1475*x1 - 112013*x2 < -7e5) = NaN;
surf(x1,x2,f, 'edgecolor', 'none')
xlabel('x1'), ylabel('x2')

This makes it obvious that (0,0) is the solution:

enter image description here

share|improve this answer
I did a typo it's: – Gimpy Aug 11 '14 at 16:47
max: f(x)= 1815·x1 + 379·x2 subject to: -1475·x1 - 112013·x2 >= -700000 (x1,x2) <= 80 (x1,x2) >= 0 – Gimpy Aug 11 '14 at 16:48
Excel gives x1=80 and x2=40 – Gimpy Aug 11 '14 at 16:48
I've created a MATLAB chat room for us to discuss things MATLAB related, or for discussions that span beyond the limitations of a single comment. Visit us when you have time! - – rayryeng Jun 30 '15 at 18:04

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