Split up the inequalities first Explanation: (1) \displaystyle{x}-{5}{<}{7}-{2}{x} add 5 and add \displaystyle{2}{x} on both sides: \displaystyle\to{3}{x}{<}{12}\to{x}{<}{4} (2) \displaystyle{7}-{2}{x}\le{3} ...

\displaystyle{x}\ge\frac{{8}}{{3}} by properties of inequality. Explanation: The first step would be to distribute each number to the parenthesis. So you would have \displaystyle{5}{x}+{20}\le{8}{x}+{12} ...

\displaystyle{x}\in{\left[{5},{18}\right]} Explanation: The first thing to do here is get \displaystyle{x} alone in the middle of the compound inequality by adding \displaystyle{7} to ...

\displaystyle{x}=\frac{\pi}{{2}} Explanation: \displaystyle{{\cos}^{{2}}{x}}={1}-{{\sin}^{{2}}{x}} \displaystyle{2}{\left({1}-{{\sin}^{{2}}{x}}\right)}-{\sin{{x}}}+{1}={0} \displaystyle{2}-{2}{{\sin}^{{2}}{x}}-{\sin{{x}}}+{1}={0} ...

\displaystyle{44}^{\circ}{43};{90}^{\circ};{155}^{\circ}{57};{270}^{\circ};{224}^{\circ}{43};{450}^{\circ};{515}^{\circ}{57};{630}^{\circ} Explanation: Cross multiply: 5sin 2x = 7cos x 5sin 2x - ...

\displaystyle{x}\le{8} Explanation: First, subtract \displaystyle{4}{x} from both sides. \displaystyle{10}{x}-{6}-{\left({4}{x}\right)}\le{4}{x}+{42}-{\left({4}{x}\right)} \displaystyle{6}{x}-{6}\le\cancel{{{4}{x}}}+{42}-\cancel{{{\left({4}{x}\right)}}} ...