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See Lecture 12.4, 12.5, 13.1 and 13.2 for background knowledge and examples. Two main pieces of advice:
\n1) Do a simple estimate to check for big mistakes.
\n2) Remember that you have to think about whether the area is a `positive area' or `negative area'. Thinking about mechanics/distances/changes in position is the most coherent way I know of thinking about this.
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\nThis is the graph of the function $f(x) = \\simplify{{a2}*x^2+{c2}}$.
\nUse integration to calculate the area of the shaded region. Give your answer without any rounding.
\n[[0]]
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\nThis curve has equation $y = \\simplify{x^2-{a3+b3}*x + {a3*b3}}$.
\n(Remember this is a non-calculator question!)
\nCalculate the total area of the shaded regions. Give your answer without any rounding.
\n[[0]]
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