The answer is \displaystyle{x}{<}-{5} Explanation: Multiply LHS and RHS by \displaystyle{\left({x}+{5}\right)}^{{2}} Therefore, \displaystyle\frac{{{x}+{2}}}{{{x}+{5}}}\cdot{\left({x}+{5}\right)}^{{2}}\ge{1}\cdot{\left({x}+{5}\right)}^{{2}} ...

The solution is \displaystyle{x}\in{\left[-{5},-{3}\right]}\cup{]}-{2},+\infty{[} Explanation: We solve this inequality with a sign chart Let \displaystyle{f{{\left({x}\right)}}}=\frac{{{\left({x}+{3}\right)}{\left({x}+{5}\right)}}}{{{x}+{2}}} ...

Your proof works quite all right! Arthur already gave the proper comment, this is just an alternative way to prove the statement - maybe a bit more straight forward, to elaborate a bit: We want to ...

You have multiplied by x+4 but you have considered only the case x+4>0. We can also have x+4<0 so the given inequality is equivalent to the two systems: \begin {cases} x+4>0\\ 3x+1\ge x+4 \end{cases} \qquad \lor \qquad \begin {cases} x+4<0\\ 3x+1\le x+4 \end{cases} ...

The answer is \displaystyle{x}\in{\left[-{4},{2}{[}\right.} Explanation: You cannot do crossing over \displaystyle\frac{{x}}{{{x}+{2}}}\ge{2} \displaystyle\frac{{x}}{{{x}+{2}}}-{2}\ge{0} ...

\displaystyle{x}\in{\left(-\infty,-{26}\right]}\cup{\left(-{5},\infty\right)} Explanation: If \displaystyle{x}=-{5} then the denominator of the rational expression is zero and the quotient ...