The answer is \displaystyle={\left(\begin{array}{cc} {5}&{1}\\-{5}&{19}\end{array}\right)} Explanation: If you have the multiplication of two matrices \displaystyle{\left(\begin{array}{ccc} {a}&{b}&{c}\\{d}&{e}&{f}\end{array}\right)}\cdot{\left(\begin{array}{cc} {k}&{l}\\{m}&{n}\\{p}&{q}\end{array}\right)} ...

5.\;Again here, since w is not an eigenvector of C we cannot have Cw=\lambda w...so there must be some vector u, so that Cw=u+\lambda w. In fact we can do better, by noticing Aw=1\cdot(\alpha v)+\lambda w ...

You're not being asked about the kernel of A or the kernel of \phi(A), but about the kernel of \phi itself, where \mathbb Q^{2\times 2} is viewed as just a plain old 4-dimensional vector ...

If you conjugate \Gamma(N) by \begin{pmatrix} N & 0 \\ 0 & 1 \end{pmatrix} so it gets sent to a subgroup intermediate between \Gamma_1(N^2) and \Gamma_0(N^2) -- which corresponds to replacing ...

To get some grip on the problem I considered the functions f(x):=4x-x^2 and g(x):=f\bigl(f\bigl(f(x)\bigr)\bigr)-x=63 x - 336 x^2 + 672 x^3 - 660 x^4 + 352 x^5 - 104 x^6 + 16 x^7 - x^8\ . ...

It depends on which chi-square test you're talking about. There are many. One frequently used chi-square test with contingency tables is a test of independence of rows and columns. Consider this ...