Let's solve each equation step-by-step and find the solutions.
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Equation: \( 2x - 6 = 24 \)
- Add 6 to both sides: \[ 2x = 30 \]
- Divide by 2: \[ x = 15 \]
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Equation: \( 2x + 6 = 24 \)
- Subtract 6 from both sides: \[ 2x = 18 \]
- Divide by 2: \[ x = 9 \]
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Equation: \( 2(x + 6) = 24 \)
- Divide by 2: \[ x + 6 = 12 \]
- Subtract 6 from both sides: \[ x = 6 \]
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Equation: \( 2(x - 6) = 24 \)
- Divide by 2: \[ x - 6 = 12 \]
- Add 6 to both sides: \[ x = 18 \]
Now, let's summarize the solutions for each equation:
- For \( 2x - 6 = 24 \), the solution is \( x = 15 \).
- For \( 2x + 6 = 24 \), the solution is \( x = 9 \).
- For \( 2(x + 6) = 24 \), the solution is \( x = 6 \).
- For \( 2(x - 6) = 24 \), the solution is \( x = 18 \).
So the final results and their corresponding equations are:
- \( 2x - 6 = 24 \) → \( x = 15 \)
- \( 2x + 6 = 24 \) → \( x = 9 \)
- \( 2(x + 6) = 24 \) → \( x = 6 \)
- \( 2(x - 6) = 24 \) → \( x = 18 \)
Match them accordingly with the input sections.