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Solve the inequality |3x+3| + 3 > 15Write the answer in interval notation

User Frankie
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1 Answer

19 votes
19 votes

Solution:

Given the inequality:


|3x+3|+3>15

To solve the inequality,

step 1: Add -3 to both sides of the inequality.

Thus,


\begin{gathered} |3x+3|+3-3>-3+15 \\ \Rightarrow|3x+3|>12 \end{gathered}

Step 2: Apply the absolute rule.

According to the absolute rule:


\mathrm{If}\:|u|\:>\:a,\:a>0\:\mathrm{then}\:u\:<\:-a\:\quad \mathrm{or}\quad \:u\:>\:a

Thus, from step 1, we have


\begin{gathered} 3x+3<-12\text{ or 3x+3>12} \\ \end{gathered}
\begin{gathered} when \\ 3x+3<-12 \\ add\text{ -3 to both sides of the inequality} \\ 3x-3+3<-3-12 \\ \Rightarrow3x<-15 \\ divide\text{ both sides by the coefficient of x, which is 3} \\ (3x)/(3)<-(15)/(3) \\ \Rightarrow x<-5 \end{gathered}
\begin{gathered} when \\ 3x+3>12 \\ add\text{ -3 to both sides of the inequality} \\ 3x+3-3>12-3 \\ \Rightarrow3x>9 \\ divide\text{ both sides by the coefficient of x, which is 3} \\ (3x)/(3)>(9)/(3) \\ \Rightarrow x>3 \end{gathered}

This implies that


x<-5\quad \mathrm{or}\quad \:x>3

Hence, in interval notation, we have:


\left(-\infty\:,\:-5\right)\cup\left(3,\:\infty\:\right)

User Angeline
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