# Undefined x in the code

I am new to MATLAB and I am trying to run the Optimization Toolbox. On running the code ,

``````function f = objfun(x)
f = exp(x(1))*(4*(x(1)^2)+2*x(2)^2);

x0 = [-1,1];
options = optimset('LargeScale','off');
[x,fval,exitflag,output] = fminunc(@objfun,x0,options);
``````

I get the following error ,

??? Input argument "x" is undefined.

Error in ==> square at 2
f = exp(x(1))(4(x(1)^2)+2*x(2)^2);

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The function `objfun` should either be in a different file from the main optimization function, or a subfunction (which comes after the main function in Matlab. Also, there seems to be an inconsistency in naming between the code you posted and the error-message. It seems that the objective function was called `square` in your case. Can you run the code as posted, please, and report the error? –  Jonas Dec 31 '12 at 2:58
I thought on the same line but it gave me the same error `??? Input argument "x" is undefined.` `` `Error in ==> objfun at 2` `f = exp(x(1))*(4*(x(1)^2)+2*x(2)^2);` –  Jugesh Sundram Dec 31 '12 at 3:55

I cannot reproduce the error. Maybe it has something to do with the way you set up your code, or wrote it into a function?

When I put the following into a file and save it as "testJugeshOptimization.m":

``````function x = testJugeshOptimization

x0 = [-1,1];
options = optimset('LargeScale','off');
[x,fval,exitflag,output] = fminunc(@objfun,x0,options);

%% subfunction objfun
function f = objfun(x)
f = exp(x(1))*(4*(x(1)^2)+2*x(2)^2);
``````

And run the function as

``````x = testJugeshOptimization
``````

I get the result

``````Local minimum found.

Optimization completed because the size of the gradient is less than
the default value of the function tolerance.

<stopping criteria details>

ans =

1.0e-07 *

-0.1679    0.0773
``````
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Thanks a tonne Jonas ! It works perfectly now ... So the trick lies in declaring `x` as a function? –  Jugesh Sundram Dec 31 '12 at 4:47
@JugeshSundram: `x` is the output of the function `testJugeshOptimization`. The trick is to properly define the objective function as a subfunction. –  Jonas Dec 31 '12 at 5:19