\displaystyle{x}\le-{1} and \displaystyle{4}\le{x} Explanation: Zeros of the function \displaystyle{\left({x}-{4}\right)}{\left({x}+{1}\right)} are \displaystyle{\left\lbrace-{1},{4}\right\rbrace} ...

Combined inequality solution : \displaystyle-{1}{<}{x}\le{4}{\quad\text{or}\quad}{\left(-{1},{4}\right]} Explanation: \displaystyle{4}{x}+{4}{>}{0}{\quad\text{or}\quad}{4}{x}{>}-{4}{\quad\text{or}\quad}{x}{>}-{1}{\quad\text{or}\quad}{\left(-{1},\infty\right)} ...

Up until this point (x-7)(x+1)\ge 0 your reasoning to correct. But now look at the expression. It is a product of two numbers. Ask yourself: When is a product of two real numbers positive? The ...

Hint: separate the cases: x<\frac12 \frac 12<x<3 and x>3.

We have, for all real numbers a,b, a\le0,\quad b\le0 \implies a+b \le 0 and we don't have a\le0,\quad b\le0 \iff a+b \le 0 since for example -11+1=-10\le0 \quad\text{but}\quad 1>0.

Inequalities are not defined when talking about complex numbers so x has to be a real number otherwise the equation does not make sense.