If $A$ is any $n\times n$ non-singular matrix, then $\mathrm{cond}(A) = \mathrm{cond}(A^{-1})$? True or False?
I'm not sure how to answer this question.
2026-03-25 11:25:37.1774437937
Singularity of a matix
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Generally, we define $\mathrm{cond}(A)$ as
$$\mathrm{cond}(A):=\vert\vert A\vert\vert\cdot \vert\vert A^{-1}\vert\vert.$$
So we do have
$$\mathrm{cond}(A)=\vert\vert A\vert\vert\cdot \vert\vert A^{-1}\vert\vert=\vert\vert A^{—1}\vert\vert\cdot \vert\vert A\vert\vert=\mathrm{cond}(A^{-1}).$$