Question: Consider two functions y1=f(x) y 1 = f(x) and y2=g(x) y 2 = g(x), and that y1 y2 y 1 y 2 except where

Consider two functions y1=f(x) y 1 = f(x) and y2=g(x) y 2

Consider two functions y1=f(x) y 1 = f(x) and y2=g(x) y 2 = g(x), and that y1 y2 y 1 y 2 except where they intersect. If these two functions intersect at 253 places, how many different integrals do you need to find the total area enclosed by the two curves?

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