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Using Integrals to Find the Area Bounded Between Curves

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Sketch the region bounded between the given curves and then find the area of each region for 16 and 22.

16) y=x^2+3x-5, y=-x^2+x+7

22) x axis, y=x^3-2x^2 -x+2

28) Find the area of the region that contains the origin and is bounded by the lines 2y=11-x and y=7x+13 and the curve y=x^2-5.

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Solution Summary

Integrals are used to find the area bounded between curves. The solution is detailed and well presented. The response received a rating of "5/5" from the student who originally posted the question.