See a solution process below: Explanation: We can rewrite this system of inequalities as: \displaystyle{x}{>}-{4} and \displaystyle{x}\le{4} To graph this we will draw vertical lines at \displaystyle-{4} ...

Yes, they are equivalent. Explanation: \displaystyle-{3}{x}\le-{2} Divide both sides by \displaystyle-{3} . \displaystyle{x}\le\frac{{-{2}}}{{-{3}}} The negative signs cancel each ...

\displaystyle{x}\ge{2} Explanation: \displaystyle-{3}{x}\le-{6} We solve inequalities similarly to equations. However, there is one very important difference: sign change. There are two ...

\displaystyle{18}\le{x} Explanation: \displaystyle-{2}{x}\le-{36} \displaystyle{36}\le{2}{x} \displaystyle\frac{{36}}{{2}}\le\frac{{{2}{x}}}{{2}} \displaystyle{18}\le{x} or ...

\displaystyle{x}\le{6} Explanation: First, minus the 7 from both sides of the equation and get this: \displaystyle{2}{x}\le{12} Then divide both sides by 2 to get x on itself and get the ...

\displaystyle{x}\ge{2} Explanation: The first thing I see is the negative sign by the \displaystyle{x} . I don't mess with negative division in inequalities. Instead, I'll add \displaystyle{3}{x} ...