\displaystyle\text{x-intercept }\ =-\frac{{5}}{{3}},\ \text{ y-intercept }\ =-\frac{{5}}{{2}} Explanation: \displaystyle\text{to find the intercepts, that is where the graph crosses} \displaystyle\text{the x and y axes} ...

See a solution process below: Explanation: Step 1) Solve both equations for \displaystyle{4}{y} : - Equation 1: \displaystyle{6}{x}+{4}{y}=-{4} \displaystyle-{\left({6}{x}\right)}+{6}{x}+{4}{y}=-{\left({6}{x}\right)}-{4} ...

The two equations are inconsistent and there is no solution to the systems of equation. Explanation: We have been given two equations, one \displaystyle-{6}{x}-{4}{y}={2} and the other \displaystyle{6}{x}+{4}{y}=-{6} ...

See full solution process below: Explanation: Step 1) Solve the second equation for \displaystyle{x} : \displaystyle{x}+{4}{y}=-{18} \displaystyle{x}+{4}{y}-{\left({4}{y}\right)}=-{18}-{\left({4}{y}\right)} ...

y=-2x-10 Geometric figure: Straight Line   Slope = -4.000/2.000 = -2.000   x-intercept = -10/2 = -5   y-intercept = -10/1 = -10.00000 Rearrange: Rearrange the equation by subtracting what ...

There is no (single) solution Explanation: The second equation: \displaystyle-{6}{x}+{4}{y}=-{12} is simply the first equation: \displaystyle{3}{x}-{2}{y}={6} multiplied by \displaystyle{\left(-{2}\right)} ...