Yes, there are methods of fourth order and s>4 satisfying the positiveness condition. For example, the following 5-stage RK method has order p=4 \begin{array}{c|ccccc} 0 & & & & & \\ 2/5 & 2/5 & & & & \\ 3/5 & 1/10 & 1/2 & & & \\ 1/2 & 1/16 & 1/16 & 3/8 & & \\ 1 & 1/10 & 1/10 & 4/15 & 8/15 & \\ \hline & 5/32 & 25/96 & 25/96 & 1/6 & 5/32 \end{array} ...

In your second manipulation step an error occured. If you subtract [2 ,-1, 2| -1] by [2, \frac{4}{3}, \frac{2}{3}| 0] you obtain [0, -\frac{7}{3}, \frac{4}{3}|-1]. Now add the second row to the ...

Using your eigenvectors as columns, form a matrix P such that P^{-1}AP is diagonal. Then you know that (P^{-1}AP)^n = P^{-1}A^nP so A^n =P (P^{-1}AP)^n P^{-1} Since raising a diagonal ...

The matrix A^3 is, in fact (a bit obvious), A \times A \times A. Do the multiplication. For b), (A^{-1})^3 is A^{-1} \times A^{-1} \times A^{-1} , do the multiplication. Since (A^x)^y = A^{xy} ...

HINT: The system of linear equations can have only 0, 1 or infinitely many solutions. Hence no calculations are needed.

Notice that \det \begin{bmatrix} c & 1 & 1 \\ 1 & c & 1 \\ 1 & 1 & c \end{bmatrix} = c^3 - 3c + 2 has two roots: -2 and 1. So, for all other values of c, the system is regular and, hence, ...