QuestionSolve the inequality and express the solution set in interval notation.
Studdy Solution
STEP 1
Assumptions1. We are dealing with an absolute value inequality.
. The inequality is .
3. We need to solve for .
4. The solution should be given in interval notation.
STEP 2
First, we need to isolate the absolute value expression. We can do this by subtracting from both sides of the inequality.
STEP 3
implify the inequality.
STEP 4
An absolute value inequality (where ) can be rewritten as a compound inequality or . We can apply this to our inequality.
STEP 5
Now we have two inequalities to solve. Let's start with the first one, . We can solve for by first subtracting from both sides.
STEP 6
implify the inequality.
STEP 7
Now, divide both sides by4 to solve for .
STEP 8
implify the inequality.
STEP 9
Now let's solve the second inequality, . We can solve for by first subtracting6 from both sides.
STEP 10
implify the inequality.
STEP 11
Now, divide both sides by4 to solve for .
STEP 12
implify the inequality.
STEP 13
Now, we have two inequalities, and . In interval notation, this is represented as .
The solution set is .
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