\displaystyle{x}=\frac{{15}}{{4}} \displaystyle{y}=\frac{{11}}{{4}} Explanation: Given - \displaystyle{x}+{3}{y}={12} ---------------(1) \displaystyle-{3}{x}+{3}{y}=-{3} ...

\displaystyle\text{see explanation} Explanation: \displaystyle\text{to find the intercepts, that is where the graph crosses} \displaystyle\text{the x and y axes} \displaystyle•\ \text{ let x = 0, in the equation for y-intercept} ...

\displaystyle{x}=\frac{{193}}{{22}}{\quad\text{and}\quad}{y}=\frac{{1410}}{{11}} Explanation: \displaystyle{4}{x}+{3}{y}=-{22}---{e}{q}{n}{1} \displaystyle-{8}{x}+{y}={58}---{e}{q}{n}{2} ...

x=-3, y= -8 Explanation: The required solution would be given by the coordinates of the point of intersection. As shown in the graph below the point of intersection of the two lines is (-3,-8). Hence ...

\displaystyle{x}={6} and \displaystyle{y}=-{3} Explanation: \displaystyle{5}\cdot{\left(-{4}{x}+{3}{y}\right)}+{4}\cdot{\left({5}{x}+{2}{y}\right)}={5}\cdot{\left(-{33}\right)}+{4}\cdot{24} ...

\displaystyle{x}={2},{y}=-{12} Explanation: Apply substitution, since one of the equations basically gives a formula for one variable. \displaystyle{y}=-{3}{x}-{6} and \displaystyle-{4}{x}+{y}=-{20} ...