Let $V$ be a finite dimensional vector space, $\beta$ an ordered basis of $V$, $T$ a linear operator on $V$ and $A$ the associated matrix of $T$ in the basis $\beta$. I have to prove that $T$ is invertible if and only if $A$ is invertible.
I was thinking that I only need to consider $T^{-1}$ and its associated matrix $A^{-1}$, but I don't know if it's that easy because this problem is supposed to be not too easy. Maybe there's something I'm not considereing, which makes the problem a not too easy problem, but I don't see it. Do you?
Thanks in advance.