The solution is \displaystyle{x}\in{\left(-\infty,-{2}\right)}\cup{\left[{0},{4}\right]} Explanation: First, plot the graph graph{(x(4-x))/(x+2) [-18.02, 18.04, -9.01, 9.01]} The function is \displaystyle\frac{{{x}{\left({4}-{x}\right)}}}{{{x}+{2}}}\ge{0} ...

Yes. Equation isnot algebraically correct. For any value of x, the L H S is always \displaystyle\le{4} Explanation: This equation may have to be corrected as \displaystyle\frac{{-{12}}}{{-{x}+{12}}}\le{4}

\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 ...

\displaystyle{x}\in{\left(-{2},{1}\right]}. . Explanation: If \displaystyle{x}\succ{2},{x}+{2}{i}{s}{p}{o}{s}{i}{t}{i}{v}{e},{C}{r}{o}{s}{s}\mu{<}{i}{p}{l}{i}{c}{a}{t}{i}{o}{n}{w}{o}\underline{{d}}\neg{c}{h}{a}{n}\ge{t}{h}{e}\in-{b}{e}{t}{w}{e}{e}{n}\in{e}{q}{u}{a}{l}{i}{t}{y}{s}{i}{g}{n}.{S}{o}, ...

Once you ensure that A(x)=\frac{1}{x^2-1} is defined, then also e^{A(x)} is defined (and positive), so you can take any nonnegative number to the power 1/(e^{A(x)}). This requires x\ne-1 ...

\frac ab > 0 means either 1) !!BOTH!! a > 0; b>0 OR 2) !!BOTH!! a < 0; b< 0. And as \frac ab existing means b \ne 0 then \frac ab > 0 means either 1) both a \ge 0; b < 0 or both a \le 0; b < 0 ...