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Question
problem set 2: solving absolute value equations and inequalities
match each compound inequality to its equivalent absolute value inequality.
1
① $-15 < -3x + 7 < 15$
$|-3x + 7| < 15$
② $-3x + 7 \leq -15$ or $-3x + 7 \geq 15$
$|-3x + 7| \geq 15$
③ $-15 \leq -3x + 7 \leq 15$
$|-3x + 7| \leq 15$
④ $-3x + 7 < -15$ or $-3x + 7 > 15$
$|-3x + 7| > 15$
$|-3x + 7| \leq 15$
$|-3x + 7| > 15$
$|-3x + 7| < 15$
$|-3x + 7| \geq 15$
2
① $-2 \leq 6x - 5 \leq 2$
$|6x - 5| > 2$
② $6x - 5 < -2$ or $6x - 5 > 2$
$|6x - 5| \geq 2$
③ $6x - 5 \leq -2$ or $6x - 5 \geq 2$
$|6x - 5| < 2$
④ $-2 < 6x - 5 < 2$
$|6x - 5| \leq 2$
3
① $-11 < -x - 10 < 11$
$|-x - 10| \leq 11$
② $-x - 10 \leq -11$ or $-x - 10 \geq 11$
$|-x - 10| > 11$
③ $-11 \leq -x - 10 \leq 11$
$|-x - 10| < 11$
④ $-x - 10 < -11$ or $-x - 10 > 11$
$|-x - 10| \geq 11$
Step1: Recall absolute value rules
For any expression $A$ and positive number $k$:
- $|A| < k$ is equivalent to $-k < A < k$
- $|A| > k$ is equivalent to $A < -k$ or $A > k$
- $|A| \leq k$ is equivalent to $-k \leq A \leq k$
- $|A| \geq k$ is equivalent to $A \leq -k$ or $A \geq k$
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Problem 1 Matching
Step1: Match (a) to absolute value
$-15 < -3x+7 < 15$ matches $|-3x+7| < 15$
Step2: Match (b) to absolute value
$-3x+7 \leq -15$ or $-3x+7 \geq 15$ matches $|-3x+7| \geq 15$
Step3: Match (c) to absolute value
$-15 \leq -3x+7 \leq 15$ matches $|-3x+7| \leq 15$
Step4: Match (d) to absolute value
$-3x+7 < -15$ or $-3x+7 > 15$ matches $|-3x+7| > 15$
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Problem 2 Matching
Step1: Match (a) to absolute value
$-2 \leq 6x-5 \leq 2$ matches $|6x-5| \leq 2$
Step2: Match (b) to absolute value
$6x-5 < -2$ or $6x-5 > 2$ matches $|6x-5| > 2$
Step3: Match (c) to absolute value
$6x-5 \leq -2$ or $6x-5 \geq 2$ matches $|6x-5| \geq 2$
Step4: Match (d) to absolute value
$-2 < 6x-5 < 2$ matches $|6x-5| < 2$
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Problem 3 Matching
Step1: Match (a) to absolute value
$-11 < -x-10 < 11$ matches $|-x-10| < 11$
Step2: Match (b) to absolute value
$-x-10 \leq -11$ or $-x-10 \geq 11$ matches $|-x-10| \geq 11$
Step3: Match (c) to absolute value
$-11 \leq -x-10 \leq 11$ matches $|-x-10| \leq 11$
Step4: Match (d) to absolute value
$-x-10 < -11$ or $-x-10 > 11$ matches $|-x-10| > 11$
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Problem 1
- (a) $\boldsymbol{|-3x+7| < 15}$
- (b) $\boldsymbol{|-3x+7| \geq 15}$
- (c) $\boldsymbol{|-3x+7| \leq 15}$
- (d) $\boldsymbol{|-3x+7| > 15}$
Problem 2
- (a) $\boldsymbol{|6x-5| \leq 2}$
- (b) $\boldsymbol{|6x-5| > 2}$
- (c) $\boldsymbol{|6x-5| \geq 2}$
- (d) $\boldsymbol{|6x-5| < 2}$
Problem 3
- (a) $\boldsymbol{|-x-10| < 11}$
- (b) $\boldsymbol{|-x-10| \geq 11}$
- (c) $\boldsymbol{|-x-10| \leq 11}$
- (d) $\boldsymbol{|-x-10| > 11}$