\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} ...

\displaystyle-{1}{<}{x}{<}{2}{\quad\text{or}\quad}{x}\ge{5} or, in interval notation: \displaystyle{]}-{1};{2}{\left[\cup{\left[{5};\infty{[}\right.}\right.} Explanation: The inequality ...

As Carlos Eugenio Thompson Pinzón has commented, we need \displaystyle4x-1\ne0 Method 1: If \displaystyle4x-1\ne0, (4x-1)^2>0 Multiplying either sides of \displaystyle\frac{5x+1}{4x-1}\ge1 ...

Solution is \displaystyle{x}{>}-{4} Explanation: It is apparent that the denominator cannot take the value \displaystyle{0} and hence \displaystyle{x}+{4}\ne{0} or \displaystyle{x}\ne-{4} ...

The solution is \displaystyle{x}\in{\left[-{2},{0}\right)}\cup{\left({1},{2}\right]} Explanation: Let's rearrange the inequality \displaystyle\frac{{3}}{{{x}-{1}}}-\frac{{4}}{{x}}\ge{1} \displaystyle\frac{{3}}{{{x}-{1}}}-\frac{{4}}{{x}}-{1}\ge{0} ...

\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}} ...