The student made a mistake in Step 2. Let's break down the solution to find the error:
- Original equation: \(2(x - 2) + 5x = 24\)
- Step 1 (Correct): Distributing the 2 gives \(2x - 4 + 5x = 24\).
- Step 2 (Incorrect): The student writes \(10x - 4 = 24\), which is wrong. The correct combination of like terms from Step 1 is: \[ 2x + 5x - 4 = 24 \implies 7x - 4 = 24. \]
So instead of \(10x - 4 = 24\), it should have been \(7x - 4 = 24\).
Continuing from this correct step: 4. Step 3 (incorrect based on previous error): The equation would instead be: \[ 7x - 4 + 4 = 24 + 4 \implies 7x = 28. \] 5. Step 4 (now requires correction): Now divide both sides by 7: \[ x = \frac{28}{7} = 4. \]
Thus, the correct solution is \(x = 4\), not \(x = 2.8\). The error occurred in Step 2 where the student incorrectly combined the coefficients of \(x\).
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