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Asked by Joe Schmo

What is an example of two functions that intersect at least twice in the first quadrant but can neither be a polynomial or a "simple" function (i.e., sin(x), e^x)?
14 years ago

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Answered by Anonymous
Circle x^2+y^2=3^2

and straight line y= -x+3
14 years ago
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What is an example of two functions that intersect at least twice in the first quadrant but can neither be a polynomial or a "simple" function (i.e., sin(x), e^x)?

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