\displaystyle{x}=\frac{{325}}{{102}} \displaystyle{y}=-\frac{{165495}}{{2601}} \displaystyle{z}=\frac{{470}}{{51}} Explanation: \displaystyle{6}{x}+{2}{y}+{7}{z}={20} \displaystyle-{4}{x}+{2}{y}+{3}{z}={15} ...

\displaystyle{x}={1}\frac{{32}}{{99}} , \displaystyle{y}=-{5}\frac{{131}}{{198}} , \displaystyle{z}=\frac{{9}}{{22}} Explanation: To solve the system of linear equations \displaystyle{\left\lbrace\begin{array}{c} {5}{x}+{y}+{5}{z}={3}\\{4}{x}-{y}+{5}{z}={13}\\{5}{x}+{2}{y}+{2}{z}={2}\end{array}\right.} ...

Use Cramer's Rule (with Determinants) to get \displaystyle{\left(\text{XXX}\right)}{\left({x},{y},{z}\right)}={\left(-{3},{0},{1}\right)} Explanation: Using the coefficient of \displaystyle{x},{y},{\quad\text{and}\quad}{z} ...

\displaystyle\vec{{n}}={\left(-{1},{6},{5}\right)} \displaystyle{p}_{{0}}={\left({0},{0},\frac{{21}}{{5}}\right)} Explanation: A plane can be represented as \displaystyle\Pi\to{\left\langle{p}-{p}_{{0}},\vec{{n}}\right\rangle}={0} ...

Sure. The direction perpendicular to a plane with an equation like ax + by + cz = d is always (a, b, c). That means that in your case, this direction is (-9, 6, 2). So the ray from A ...

Here's a proof that T is continuous in the strong operator topology. As noted in the question, for each x\in X, the map t\mapsto T_tx is right-continuous under the weak topology, and ...