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Alonso Urbano · Answer 1 · 2023-10-12T01:25:24+0000

$|4x-6|\leq14$

apply the absolute rule,

$\begin{gathered} -(4x-6)\leq14 \\ 4x-6\leq14 \end{gathered}$

solve each inequality independently,

$\begin{gathered} \text{ divide both sides by -1 and switch the sign, } \\ 4x-6\ge-14 \\ \text{ solve for x} \\ 4x\ge-8 \\ x\ge-(8)/(4) \\ x\ge-2 \end{gathered}$
$\begin{gathered} 4x-6\leq14 \\ 4x\leq20 \\ x\leq(20)/(4) \\ x\leq5 \end{gathered}$

find the intersection of both solutions

$\begin{gathered} x\ge-2\rightarrow\lbrack-2,\infty) \\ x\leq5\rightarrow(-\infty,5\rbrack \\ \lbrack-2,\infty)\cap(-\infty,5\rbrack\rightarrow\lbrack-2,5\rbrack \end{gathered}$

Answer:

The solution to the inequality in interval notation is:

$\lbrack-2,5\rbrack$

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