See below. Explanation: A good tool to handle linear difference equations is the so called Laplace transform. Defined as \displaystyle{L}{\left({x}{\left({t}\right)}\right)}={\int_{{0}}^{\infty}}{e}^{{-{s}{t}}}{f{{\left({t}\right)}}}{\left.{d}{t}\right.}={X}{\left({s}\right)} ...

\displaystyle{x}={16}{\quad\text{and}\quad}{y}=-{6} Explanation: \displaystyle{x}-{0.6}{x}+{0.4}{y}={4};{0.4}{x}+{2.4}{y}=-{8} We need to solve \displaystyle{0.4}{x}+{0.4}{y}={4} for \displaystyle{x} ...

\displaystyle{x}={4} \displaystyle{y}=\frac{{0.5}}{{0.2}} Explanation: Given - \displaystyle{0.3}{x}+{0.2}{y}={1.7} -------------------- (1) \displaystyle{0.9}{x}+{0.8}{y}={5.6} ...

13=3x-y;4y-3x+2z=-3;z=2x-4 Solution : {x,y,z} = {57/13,2/13,62/13}  System of Linear Equations entered : [1] 13=3x-y [2] 4y-3x+2z=-3 [3] z=2x-4 Equations Simplified or Rearranged :  [1] -3x + y = -13 ...

In general it is not true. Consider for example the \mu=\frac{3}{8} \delta_{-1}(x)+\frac{1}{4}\delta_0(x)+\frac38 \delta_1(x) and \nu=\frac12\delta_{-\frac12}(x)+\frac12\delta_{\frac12}(x). You ...

You have misunderstood the model that R is using. (I am assuming you have used R as the output looks identical to what you get with the arima command.) The model with a regressor and an AR(1) term ...