\displaystyle{x}{<}{0} Explanation: Simplify the inequalities: \displaystyle{3}{x}+{3}{<}{3} => \displaystyle{x}{<}{0} and \displaystyle-{8}{x}+{6}\ge{0} => \displaystyle{x}\le\frac{{6}}{{8}} ...

See a solution process below: Explanation: For \displaystyle{f{{\left(-{1}\right)}}} , \displaystyle{x}{<}{1} , therefore we use the formula: \displaystyle{f{{\left({\left({x}\right)}\right)}}}={\left({x}\right)}^{{5}} ...

\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} ...

The answer is \displaystyle{x}\in{]}-\infty,-{5}{]}\cup{\left[{2},+\infty{[}\right.} Explanation: Let \displaystyle{f{{\left({x}\right)}}}={\left({x}+{5}\right)}{\left({x}-{2}\right)} Now, ...

No, this coordinate system has not before been studied in-depth, and so doesn't have a name. But it's not trivial as you say. That's not the right word. It's just very specific or particular . ...

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 ...