Question 21 MarkIf $\frac{|x-2|}{x-2} \geq 0$, then $x \in[2, \infty)$.AnswerFalseView full question & answer→
Question 31 MarkIf $|x+3| \geq 10$, then $x \in(-\infty,-13] \cup[7, \infty)$.AnswerTrueView full question & answer→
Question 41 MarkThe solution of inequality $\left|\frac{2}{x-4}\right|>1, x \neq 4$ is (2, 4) $\cup(4,6)$.AnswerTrueView full question & answer→
Question 51 MarkThe solution of inequality $-5 \leq \frac{2-3 x}{4} \leq 9$ is $\left(-\frac{34}{3}, \frac{22}{3}\right)$.AnswerFalseView full question & answer→
Question 61 MarkThe solution of inequality $\frac{x+3}{x-2}$ is $(-\infty, 2) \cup[7$, $\infty)$.AnswerTrueView full question & answer→
Question 71 MarkThe solution of inequality $\frac{1}{x-2}<0$ is $(2, \infty)$.AnswerFalseView full question & answer→
Question 81 MarkThe solution of inequality $\frac{3(x-2)}{5} \geq \frac{5(2-x)}{3}$ is (2, $\infty)$.AnswerFalseView full question & answer→
Question 91 MarkThe solution of linear inequality $3 x+12 \leq 2(1-x)$ is $(-\infty,-3]$.AnswerTrueView full question & answer→
Question 101 MarkThe solution of linear inequality $7 x+9>30$ is $(3, \infty)$.AnswerTrueView full question & answer→