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Subtract rational expressions \( \frac{8 x+2}{3 x-3}-\frac{5 x+5}{3 x-3} \)

Ask by Harmon Harper. in the United States
Feb 22,2025

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The simplified expression is 1, provided that \( x \) is not equal to 1.

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Beyond the Answer

To subtract the rational expressions, you notice that both fractions share the same denominator, which is \(3x - 3\). So you simply subtract the numerators: \[ \frac{(8x + 2) - (5x + 5)}{3x - 3} \] Now, simplify the numerator: \[ 8x + 2 - 5x - 5 = (8x - 5x) + (2 - 5) = 3x - 3 \] So you have: \[ \frac{3x - 3}{3x - 3} \] Now, as long as \(3x - 3 \neq 0\), you can simplify: \[ 1 \] Thus, the final answer is \(1\), as long as \(x \neq 1\) (since \(3x - 3 = 0\) when \(x = 1\)).

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