The answer is \displaystyle{x}\in{\left[-{2},-{1}\right]}\cup{\left[{1},+\infty{[}\right.} Explanation: Let \displaystyle{f{{\left({x}\right)}}}={x}^{{3}}+{2}{x}^{{2}}-{x}-{2} \displaystyle{f{{\left({1}\right)}}}={1}+{2}-{1}-{2}={0} ...

The answer is \displaystyle{x}\in{]}-\infty,-{4}{]}\cup{\left[\frac{{3}}{{2}},\infty{[}\right.} Explanation: Let's find the roots of the equation \displaystyle{2}{x}^{{2}}+{5}{x}-{12}={0} ...

Calculate the desired number of data points, and put them on an appropriate graph paper. SOLVING may be done by factoring or graph analysis. Explanation: ANY graphing or plotting must start with a ...

Solution set: (-inf., -3] and [6, +inf.) Explanation: Bring the inequality to the standard form of a quadratic inequality: @f(x) = x^2 - 3x - 18 >= 0#. First, solve f(x) = 0 Find 2 real roots knowing ...

Solution is \displaystyle-\infty\le{x}\le-{3} or \displaystyle-{1}\le{x}\le{1} , or \displaystyle{3}\le{x}\le\infty and in interval form it can be written as \displaystyle{\left[-\infty,-{3}\right]}\cup{\left[-{1},{1}\right]}\cup{\left[{3},\infty\right]} ...

Here is the complete solution: The domain of g(x): x\in (-\infty, -2]\cup[6,+\infty). The domain of f(x): \ 1)\begin{cases}\sqrt{x^2-4x-12}\le \sqrt{20} \\ \sqrt{x^2-4x-12}<3\end{cases} \text{or} \ \ 2)\begin{cases}\sqrt{x^2-4x-12}\ge \sqrt{20} \\ \sqrt{x^2-4x-12}>3\end{cases} \Rightarrow ...