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Find the area bounded by the curve y = |x² - 9| and the line y = 3.
- 4*(2*sqrt(3) + sqrt(6) - 4)
- 4*(4*sqrt(3) + sqrt(6) - 4)
- 8*(4*sqrt(3) + 3*sqrt(6) - 9)
- 8*(4*sqrt(3) + 2*sqrt(6) - 9)
Correct answer: 8*(4*sqrt(3) + 2*sqrt(6) - 9)
Solution
The curve and line meet at x = +-sqrt(6) and x = +-2*sqrt(3); integrating the absolute difference (using symmetry) gives 8*(4*sqrt(3) + 2*sqrt(6) - 9).
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