Update: x could be any real number but \displaystyle{x}\ne{2} Explanation: First off, \displaystyle{x}\ne{2} because then you would be dividing by 0. So, \displaystyle\frac{{{x}-{1}}}{{{x}-{2}}}-{3}\ge{0} ...

Just analise the signal of each function: f(x)=ax-x-a-1=x(a-1)-(a+1) and g(x)=x^2-1. Looking to the roots -1,\frac{a+1}{a-1}, 1 we have to know what is the relation between them. Once a>1 ...

Let’s start by dissecting the question. The equation y=ax+b defines a non-vertical line in the plane. For each such line, if we restrict ourselves to x\in[1,4], we’ll get a line segment. Let ...

The solution is \displaystyle{x}\in{\left[-{2},{0}\right)}\cup{\left({1},{2}\right]} Explanation: Let's rearrange the inequality \displaystyle\frac{{3}}{{{x}-{1}}}-\frac{{4}}{{x}}\ge{1} \displaystyle\frac{{3}}{{{x}-{1}}}-\frac{{4}}{{x}}-{1}\ge{0} ...

The answer is \displaystyle{x}\in{\left[-{7},{1}{\left[\cup{\left[{3},+\infty{[}\right.}\right.}\right.} Explanation: Let \displaystyle{f{{\left({x}\right)}}}=\frac{{{\left({x}+{7}\right)}{\left({x}-{3}\right)}}}{{{x}-{1}}} ...

\dfrac{1}{x} - \dfrac{x}{2x-1} \geq 1 \iff \dfrac{1}{x} - \dfrac{x}{2x-1} - 1 \geq 0 \iff \dfrac{2x-1 - x^2 - x(2x - 1)}{x(2x - 1)} \geq 0 \iff \dfrac{-3x^2 + 3x - 1}{x(2x - 1)} \geq 0. Observe ...