The solution is \displaystyle{x}\in{\left(-{1},{2}\right]} Explanation: Let \displaystyle{f{{\left({x}\right)}}}=\frac{{{x}-{2}}}{{{x}+{1}}} We build a sign chart \displaystyle{\left({a}{a}{a}{a}\right)} ...

The solution is \displaystyle{x}\in{\left(-\infty,-{5}\right)}\cup{\left[{3},+\infty\right)} or \displaystyle{x}{<}-{5} and \displaystyle{x}\ge{3} Explanation: Let \displaystyle{f{{\left({x}\right)}}}=\frac{{{3}-{x}}}{{{x}+{5}}} ...

\displaystyle-{5}{<}{x}\le{0} Explanation: \displaystyle{\left(\text{There is a trap in this question in that there are excluded}\right)} \displaystyle{\left(\text{values for }\ {x}\right)} ...

The solution is \displaystyle{x}\in{\left(-{4},\frac{{3}}{{2}}\right]} or \displaystyle-{4}{<}{x}\le\frac{{3}}{{2}} Explanation: Let's rewrite and simplify the inequality \displaystyle\frac{{{3}{x}+{1}}}{{{x}+{4}}}\le{1} ...

Note that if we have \frac{a}{b} \leq 1, this means that if b>0, then a \leq b and if b<0, then a \geq b. So you will need to split this into cases. First note that you can multiply without ...

\displaystyle{x}\in{\left({4},{12}\right]} . Explanation: The given inequality is the combined inequality for \displaystyle{3}{<}\frac{{x}}{{2}}+{1}{\quad\text{and}\quad}\frac{{x}}{{2}}+{1}\le{7} ...