When Dim eigenspace = 1, any 2\times 2 complex matrix A is similar to \left(\begin{array}{ll} \lambda & 1\\ 0 & \lambda \end{array}\right).

A is a 3x3 matrix and \displaystyle{A}^{{-{{1}}}}={\left(\begin{array}{ccc} {3}&{0}&-{1}\\{0}&{8}&{7}\\-{2}&{3}&{4}\end{array}\right)} . If B is another matrix and \displaystyle{B}{A}={\left(\begin{array}{ccc} {4}&-{3}&{7}\\-{1}&{0}&{2}\end{array}\right)} ...

Any 2\times 2 complex matrix A is similar to one of these three: (See first line of the question)

Find the possible value from the following.

If \chi^2=0 for a dataset, are the frequencies of the values in the contingency table all the same?

Relational Notations for “must be” and “occasionally”