\displaystyle{\left[\frac{{12}}{{7}},+\infty\right)} Explanation: Multiply ALL terms on both sides of the inequality by 12, the LCM of 4 and 3 \displaystyle{\left(\cancel{{{12}}}^{{3}}\times\frac{{x}}{\cancel{{{4}}}^{{1}}}\right)}+{\left({12}\times{3}\right)}\ge{\left({12}\times{4}\right)}-{\left(\cancel{{{12}}}^{{4}}\times\frac{{x}}{\cancel{{{3}}}^{{1}}}\right)} ...

See a solution process below: Explanation: First, multiply each side of the inequality by \displaystyle{\left({6}\right)} to eliminate the factions while keeping the inequality balanced. \displaystyle{\left({6}\right)} ...

\displaystyle{x}\in{\left[{8};{12}\right]} Explanation: It is useful to multiply all terms by 2 to eliminate fractions: \displaystyle{6}\ge{14}-{x}\ge{2} and then you can subtract 14: \displaystyle{6}-{14}\ge-{x}\ge{2}-{14} ...

Write X = X \mathbf{1}_{\left\{X \geq \frac{E[X]}{2}\right\}} + X \mathbf{1}_{\left\{X < \frac{E[X]}{2}\right\}}, and note that X \mathbf{1}_{\left\{X < \frac{E[X]}{2}\right\}} \leq \frac{E[X]}{2}. ...

\displaystyle{x}-{6}\ge{0} Explanation: The first step is to put everything that \displaystyle{x} multiplies in the same side of the equation: \displaystyle\frac{{x}}{{3}}\ge{1}+\frac{{x}}{{6}} ...

Looking at a graph it seems plausible that your result holds for x>36, but it does not hold for 35\le x <36 where the right side is zero. The flaw in this case is that \{x/b_3\}>13/16, allowing ...