x \displaystyle\ge -2.2 Explanation: If one subtracts x from both sides of the inequality, one gets \displaystyle-\frac{{1}}{{2}}{x}-\frac{{1}}{{10}}\le{1} . So, by adding \displaystyle\frac{{1}}{{10}} ...

There’s another way to handle a problem of this sort, and it involves less inequality-juggling. You take advantage of the fact that a rational function such as (x+2)/(3-x) can change sign only at ...

\displaystyle{x}\in{\left(-\infty,-{3}\right)}\cup{\left[-\frac{{5}}{{3}},-{1}\right)} Explanation: \displaystyle{\frac{{{x}+{3}+{2}{x}+{2}}}{{{\left({x}+{1}\right)}{\left({x}+{3}\right)}}}}\le{0} ...

The answer is \displaystyle={x}\in{]}-\frac{{4}}{{3}},{2}{]} Explanation: Let \displaystyle{f{{\left({x}\right)}}}=\frac{{{4}-{2}{x}}}{{{3}{x}+{4}}} The domain of \displaystyle{f{{\left({x}\right)}}} ...

The solution is \displaystyle{x}\in{\left(-\infty,-{1}\right)}\cup{\left[-\frac{{2}}{{5}},{0}\right]} Explanation: We cannot do crossing over, we simplify the inequality \displaystyle{5}{x}-{1}\le\frac{{{2}{x}-{1}}}{{{x}+{1}}} ...

The answer is \displaystyle-\infty{<}{x}\le-{4} or \displaystyle{1}{<}{x}{<}+\infty \displaystyle{x}\in{]}-\infty,-{4}{]}\cup{]}{1},+\infty{[} in interval notation Explanation: We solve ...