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Given the graph of f ′(x), the derivative of f(x), which of the following statements are true about the graph of f(x)?

Graph is an inverted parabola with x intercepts at x equals 0 and 4 and vertex at x equals 2.


The graph of f does not have a point of inflection.

The graph of f has a point of inflection at x = 2.

The graph of f has a critical point at x = 2.

I only

II only

III only

I and III only

Given the graph of f x the derivative of fx which of the following statements are true about the graph of fx Graph is an inverted parabola with x intercepts at class=

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LammettHash

[tex]f'[/tex] has a horizontal tangent line at [tex]x=2[/tex], and it's clear from the plot that [tex]f'[/tex] is increasing to the left and descreasing to the right. This means [tex]f''=0[/tex] when [tex]x=2[/tex], so there is an inflection point there and only statement II is true.

Statement III is not true because critical points only occur where [tex]f'=0[/tex] or (possibly) when [tex]f'[/tex] is undefined. Clearly [tex]f'\neq0[/tex] when [tex]x=2[/tex].

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