Inverse of a Matrix

MathsIsFun · 2011-06-23 11:46:32

I have three new pages for you all to look at (and comment on):

Inverse of a Matrix

Inverse of a Matrix using Elementary Row Operations Gauss-Jordan

Inverse of a Matrix using Minors Cofactors and Adjugate

Enjoy! (And find any faults, too, please)

bobbym · 2011-06-23 12:57:13

Hi MIF;

On the first one, Inverse of a matrix.

It is all correct, appealing to the eye and well thought out. Why did you choose the form of row vectors rather than the more common form of column vectors?

MathsIsFun · 2011-06-23 13:58:33

I think perhaps I should, as it is the more common form. But it leads people to think that the heights (number of rows) are "naturally" matched ... if you see what I mean. When you approach it the other way then you need to think more about sizes of rows and columns.

Please let me know your thoughts.

bobbym · 2011-06-23 16:54:59

That is okay with me. Then keep it the way that is more didactic.

Second page is excellent.

Third page also fine as far as I can tell. I never used that method before. Actually I have never computed an adjoint or cofactor of a matrix.

Thanks for providing the pages.

Math Is Fun Forum

#1 2011-06-23 11:46:32

Inverse of a Matrix

#2 2011-06-23 12:57:13

Re: Inverse of a Matrix

#3 2011-06-23 13:58:33

Re: Inverse of a Matrix

#4 2011-06-23 16:54:59

Re: Inverse of a Matrix

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