If the first derivative has a cusp at x=3, is there a point of inflection at x=3 even though the second derivative doesn't exist there?

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If the first derivative has a cusp at x=3, is there a point of inflection at x=3 even though the second derivative doesn't exist there?

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Answer 1 · 2018-04-11T15:18:03

It depends, in part, on the definition of inflection point being used.

Explanation:

I have seen some who insist that the second derivative must exist to have an IP.

I am more used to the definition:

An inflection point is a point on the graph at which concavity changes..

So I consider the point $(0, 0)$ $(0,0)$ an inflection point for $f (x) = \sqrt[3]{x}$ $f(x) = root(3)x$ in spite of the non-existence of $f'(0)$ and $f''(0)$ .

Similarly, the function $f(x) = 1/2xabsx$ has derivative $f'(x)=absx$ . So the derivative has a cusp at $0$ .
Since the graph of $f$ is concave down on $(-oo,0)$ and concave up on $(0,oo)$ and $f(0)$ exists (it is $= 0$ ), I count $(0,0)$ as an inflection point.

In the graph below, you see $f$ in blue, $f'$ in red and $f''$ in orange.

enter image source here

Translate 3 to the right to get an example at $3$ .

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If the first derivative has a cusp at x=3, is there a point of inflection at x=3 even though the second derivative doesn't exist there?

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Explanation:

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