MATRIX COFACTOR

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Mariana on 2 Feb 2012

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https://uk.mathworks.com/matlabcentral/answers/27891-matrix-cofactor

Commented: Walter Roberson on 11 Oct 2021

Accepted Answer: Walter Roberson

I need to know a function to calculate the cofactor of a matrix, thank a lot!

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Natasha St Hilaire on 7 Oct 2021

What is "menor" short for?

Walter Roberson on 8 Oct 2021

@Natasha St Hilaire

I suspect that the English word would be "minor". The Spanish word "menor" can be translated as English "minor" in some situations.

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Walter Roberson on 2 Feb 2012

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https://uk.mathworks.com/matlabcentral/answers/27891-matrix-cofactor#answer_36135

http://www.mathworks.com/matlabcentral/fileexchange/2284-introductory-linear-algebra-with-applications/content/kolman/ILA6/cofactor.m

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Mariana on 7 Feb 2012

Yes, I right-click on the shortcut and select to run as administrator. And I save the function on the lib file, and the function work with matrix.. But when I close and open again the function when I try to use the function a message say that it is Undefined..

Mariana on 7 Feb 2012

Walter,

I thing I get it.. I forget to add the function to the PATH through the SET PATH in the menu file.. Thank you very much for all..

Just one question more.. Matlab run in linux? what distribution is better?

More Answers (2)

Dr. Murtaza Ali Khan on 28 Sep 2019

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https://uk.mathworks.com/matlabcentral/answers/27891-matrix-cofactor#answer_393947

A = [
    2 4 1
    4 3 7
    2 1 3
    ]
detA = det(A)
invA = inv(A)
cofactorA = transpose(detA*invA)

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Franco Salcedo Lópezz on 14 Nov 2019

Edited: Franco Salcedo Lópezz on 14 Nov 2019

Here I leave this code, I hope it helps. Regards

function v = adj(M,i,j)
  t=length(M);
  v=zeros(t-1,t-1);
ii=1;
ban=0;
for k=1:t
   jj=1;
  for m=1:t
    if ( (i~=k)&&(j~=m) )
      v(ii,jj)=M(k,m);
      jj++;
      ban=1;
    endif 
  endfor
   if(ban==1)ii++;ban=0;endif
endfor

Walter Roberson on 11 Oct 2021

This is not MATLAB code. It might be Octave.

Francisco Trigo on 6 Feb 2020

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https://uk.mathworks.com/matlabcentral/answers/27891-matrix-cofactor#answer_414149

The matrix confactor of a given matrix A can be calculated as det(A)*inv(A), but also as the adjoint(A). And this strange, because in most texts the adjoint of a matrix and the cofactor of that matrix are tranposed to each other. But in MATLAB are equal. I found a bit strange the MATLAB definition of the adjoint of a matrix.

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Zuhri Zuhri on 28 Sep 2021

adjoint matrix is the transpose of the cofactor matrix so the above result is correct

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