\displaystyle{\left(\begin{array}{ccc} {1}&{0}&{0}\\-{3}&{4}&-{1}\\{2}&-{4}&{2}\end{array}\right)} Explanation: Create an augmented matrix by adding three more columns in the form of an identity ...

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} ...

The eigenvalues of A (or D) satisfy |\lambda | = { 1\over \sqrt{2}} <1. Hence |\lambda|^n \to 0.

When you check you answer you have to check it by PA = LU. What I did first was put A in an upper triangle. A = \left[ {\begin{array}{ccc} 1 & 1 & 1\\ 0 & 0 & 1\\ 2 & 3 & 4\\ \end{array} } \right] ...

The greedy algorithm gives the triple \frac{1}{3} + \frac{1}{11} +\frac{1}{231} This leads to three quadruples using \frac{1}{a} = \frac{1}{a+1} +\frac{1}{a^2 + a} These would be ...

b_1 = 2+x = a_{11} c_1 + a_{21} c_2\\ 2+x = a_{11}(1+x) + a_{21}(1-x)\\ a_{11}+a_{21} = 2\\ a_{11}-a_{21} = 1\\ a_{11} = \frac 32, a_{21} = \frac 12 and b_2 = 1+2x = a_{12} c_1 + a_{22} c_2\\ a_{12} + a_{22} = 1\\ a_{12} - a_{22} = 2\\ a_{12} = \frac 32, a_{22} = - \frac 12 ...