To determine which person's claim about a solution is correct, we first need to solve the compound inequality \( -2 \leq 2x - 2 < 8 \).
We can solve it in two parts.
Part 1: Solve \( -2 \leq 2x - 2 \)
- Add 2 to both sides: \[ -2 + 2 \leq 2x - 2 + 2 \implies 0 \leq 2x \]
- Divide by 2: \[ 0 \leq x \implies x \geq 0 \]
Part 2: Solve \( 2x - 2 < 8 \)
- Add 2 to both sides: \[ 2x - 2 + 2 < 8 + 2 \implies 2x < 10 \]
- Divide by 2: \[ x < 5 \]
Now, combining both parts, we have: \[ 0 \leq x < 5 \]
This means the solution set consists of all \( x \) values such that \( 0 \leq x < 5 \).
Now, let's check each person's claims:
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Sophie claims \( -2 \) is a solution: \( -2 \) does not satisfy \( x \geq 0 \). Therefore, Sophie's claim is incorrect.
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Adola claims \( 5 \) is a solution: \( 5 \) does not satisfy \( x < 5 \). Therefore, Adola's claim is incorrect.
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Gilly claims \( 2 \) is a solution: \( 2 \) satisfies \( 0 \leq 2 < 5 \). Therefore, Gilly's claim is correct.
Since Gilly is the only one whose value is in the solution set, the answer is:
3 for Gilly.
1 answer