Let's evaluate Karim's steps to find the error in his work.
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Step 1: \( x^2 + 8x - 3x - 24 = 0 \)
Here, Karim has rewritten the equation. However, the grouping he has used for the middle terms (8x and -3x) is incorrect as the coefficients should have added up to give the original coefficient of \(5x\). The correct form should reflect breaking down \(5x\) into two numbers that multiply to \(-24\) and add to \(5\), which is \(8\) and \(-3\). Thus, step 1 is incorrect.
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Step 2: \( (x^2 + 8x) + (-3x - 24) = 0 \)
This step continues from the original incorrect grouping. As step 1 was incorrect, this grouping also remains invalid.
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Step 3: \( x(x + 8) + 3(x + 8) = 0 \)
This factorization is based on the incorrect groupings from Step 2.
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Step 4: \( (x + 8)(x + 3) = 0 \)
The factorization assumes the previous steps were correct.
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Step 5: \( x + 8 = 0 \) or \( x + 3 = 0 \)
Solutions come from Step 4, assuming it was factored correctly.
In conclusion, the first step at which Karim makes an error is Step 1 because the grouping of terms does not correctly represent the original quadratic equation. The correct breakdown of the middle term \(5x\) should yield terms that multiply to \(-24\) and add to \(5\), such as \(8\) and \(-3\). Thus, the error is in Step 1.
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