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I have a problem. I made a program for "Newton-Raphson method for vectorial function" but I have a problem.

Let's suppose to have the function f(x,y)=(x-y,x+y^2). The Jacobian matrix is [1,-1;1,2*y]. Then I put r=symvar(jacobian) and to evaluate I use subs(jacobian,r,x0):

So my problem is: how can I evaluate the matrix in x0=(0,0) if the first variable x doesn't appear?

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@lax "Newton-Raphson method for vectorial function" is not code. Please don't mark it up as such. –  Flexo Jan 20 '13 at 11:56
    
How do you evaluate function y(x) = 5 at x = 1? It's just constant, meaning that it'll be the same for every value of x. By the way, it's more of a mathematical question than MATLAB. –  Eitan T Jan 20 '13 at 12:50
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3 Answers

I'm scratching my head over why you are trying to complicate your (and my) life.

  1. You don't need to calculate the jacobian: Matlab does it for you with the jacobian function (first you must remove the jacobian variable instance from your workspace)

    jak = jacobian(f);
    
  2. Next, you can use the eval function to do your bidding:

    x = 0, y = 0;
    eval(jak)
    
    ans =
    
      1.00         -1.00
      1.00             0
    
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If x does not appear in the expression for the jacobian, it means its value does not impact the resulting jacobian.

If your question is how to evaluate:

[1,-1;1,2*y]

when x and y are both equal to 0, the answer is very simple:

[1,-1;1,2*0]

Which boils down to:

[1,-1
 1, 0]
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As the other users already suggested, you may follow this alternative solution

syms x y
jacobian([x - y,x + y.^2])

For evaluating in x = 0 just type in

subs(jacobian([x - y,x + y.^2]),0)

I hope this helps.

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@user1994492: you might evaluate the idea of accepting one of the proposed answer to your question. –  fpe Jan 21 '13 at 11:27
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