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Solve the Inequality $-6 \leq \frac{3}{4} x-3 \leq 0$ A) $[4, \infty)$

Question 167

Multiple Choice

Solve the inequality. Give the solution set in both interval and graph forms.
- $-6 \leq \frac{3}{4} x-3 \leq 0$
$Solve the inequality. Give the solution set in both interval and graph forms. - -6 \leq \frac{3}{4} x-3 \leq 0 A) [4, \infty) B) (-\infty,-4] \cup[4, \infty) C) [-4,4] D) (-4,4)$

A) $[4, \infty)$
$Solve the inequality. Give the solution set in both interval and graph forms. - -6 \leq \frac{3}{4} x-3 \leq 0 A) [4, \infty) B) (-\infty,-4] \cup[4, \infty) C) [-4,4] D) (-4,4)$

B) $(-\infty,-4] \cup[4, \infty)$
$Solve the inequality. Give the solution set in both interval and graph forms. - -6 \leq \frac{3}{4} x-3 \leq 0 A) [4, \infty) B) (-\infty,-4] \cup[4, \infty) C) [-4,4] D) (-4,4)$

C) $[-4,4]$
$Solve the inequality. Give the solution set in both interval and graph forms. - -6 \leq \frac{3}{4} x-3 \leq 0 A) [4, \infty) B) (-\infty,-4] \cup[4, \infty) C) [-4,4] D) (-4,4)$

D) $(-4,4)$
$Solve the inequality. Give the solution set in both interval and graph forms. - -6 \leq \frac{3}{4} x-3 \leq 0 A) [4, \infty) B) (-\infty,-4] \cup[4, \infty) C) [-4,4] D) (-4,4)$

Solve the Inequality −6≤34x−3≤0-6 \leq \frac{3}{4} x-3 \leq 0−6≤43​x−3≤0 A) [4,∞)[4, \infty)[4,∞)

Multiple Choice

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Solve the Inequality $-6 \leq \frac{3}{4} x-3 \leq 0$ A) $[4, \infty)$

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