Answer:
-5/2 < x < 3/2
In interval notation: (-5/2, 3/2)
Step-by-step explanation:
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Rule
To solve an absolute value inequality of the form
|X| < k
where X is an expression in x and k is a non-negative number,
solve the following compound inequality
-k < X < k
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For this problem, X is 4x + 2, an expression in x. k is 8.
Follow the rule above, and change the absolute value inequality
|4x + 2| < 8 into
-8 < 4x + 2 < 8
Now we solve the compound inequality.
Subtract 2 from the three sides.
-10 < 4x < 6
Divide the three sides by 4.
-10/4 < x < 6/4
Reduce the fractions.
-5/2 < x < 3/2
Answer:
-5/2 < x < 3/2
In interval notation: (-5/2, 3/2)
