prove that the following functions don't have maxima and minima:(I) x+2
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Y=x+2 where y=f(x)
Y=x+2 represents a straight line. It varies from (-infinity, +infinity) for all real values of x. So it has no maximam or minimum.
Y=x+2 represents a straight line. It varies from (-infinity, +infinity) for all real values of x. So it has no maximam or minimum.
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