# MATLAB calculates INV wrong (for singular matrices)

MATLAB calculate INV wrong sometimes:

See this example

``````[ 8617412867597445*2^(-25), 5859840749966268*2^(-28)]
[ 5859840749966268*2^(-28), 7969383419954132*2^(-32)]
``````

If you put this in MATLAB it doesn't have inverse but in s calculator it has one.

What is going on?

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MATLAB tells you that the matrix is singular to working precision. Why do you need the inverse anyway? MATLAB's backslash operator is much more useful. –  Edric Jul 9 '10 at 10:30

Next, don't compute the inverse anyway. An inverse matrix is almost never necessary, except in textbooks, where it is convenient to write. Sadly, many authors do not appreciate this fact anyway, because they had learned from textbooks by other people who also failed to understand that an inverse matrix is a bad thing to do in general.

Since this matrix is numerically singular in double precision arithmetic, the inverse of that matrix is meaningless.

Use of the matlab backslash operator will be better and faster in general than will inverse. Or use pinv, which will be more robust to problems.

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Hi I wanted to comment on Woodchips' answer but since I'm a new user I can't seem to do that, that is one very interesting article and I must read it in more detail when I have the time...

With regards to matrix inversion, you could always use the 'cond' command to calculate the condition number of the matrix, for a non-singular matrix the value should be approaching unity. As Woodchips suggested, 'pinv' does come in handy if you need to find the psuedo-inverse of a non-square matrix.

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You say that cond for a non-singular matrix will be something that approaches unity. This statement may confuse some, since it is only the rare matrix that has a condition number near 1. The problem is when the condition number is many orders of magnitude greater than 1. You are correct that cond is a very useful tool to diagnose problems. –  user85109 Jul 31 '12 at 1:59