Question on Stationary Points/Inflexion Points... (1 Viewer)

gr_111 · Jun 12, 2012

Is there ever any point on a graph where f'(x) = 0 and f"(x) = 0 and it is not a horizontal inflexion point?

In other words, is f'(x)=0, f"(x)=0 always a horizontal inflexion??

Thanks

Carrotsticks · Jun 12, 2012

gr_111 said:
Is there ever any point on a graph where f'(x) = 0 and f"(x) = 0 and it is not a horizontal inflexion point?

In other words, is f'(x)=0, f"(x)=0 always a horizontal inflexion??

Thanks

No, not always a horizontal inflexion.

Counterexample: y=x^4.

gr_111 · Jun 12, 2012

Carrotsticks said:
Counterexample: y=x^4.

Ok... didn't think about that one. Thanks.

Fus Ro Dah · Jun 12, 2012

gr_111 said:
Ok... didn't think about that one. Thanks.

To really confirm for some classes of functions, say Polynomials, you could actually differentiate the function until it reduces to a constant and by observing whether that constant is positive, negative, or equal to 0, we can immediately observe its 'nature'.

We have 3 cases essentially, quite similarly to how we have 3 cases for the discriminant being less than 0, equal to 0, or greater than 0.

Case #1

Suppose we have some function f satisfying the following:

$\frac{d^n }{dx^n} f(x_m) = 0 $ where $ n \in \left [ 2,2k-1 \right ] $ and $ k,m,n \in \mathbb{N}$

and

$\frac{d^{2k}}{dx^n} f(x_m) < 0$

then the point $\left ( x_m , f(x_m)\right )$ is a minimum but not necessarily $\min(f(x)) \forall x \in \mathbb{R}$

Case #2

Suppose we have some function f satisfying the following:

$\frac{d^n }{dx^n} f(x_m) = 0 $ where $ n \in \left [ 2,2k \right ] $ and $ k,m,n \in \mathbb{N}$

and

$\frac{d^{2k+1}}{dx^n} f(x_m) \in \mathbb{R} $ and is non-zero.$$

then the point $\left ( x_m , f(x_m)\right )$ is an inflexion point.

Case #3

Suppose we have some function f satisfying the following:

$\frac{d^n }{dx^n} f(x_m) = 0 $ where $ n \in \left [ 2,2k-1 \right ] $ and $ k,m,n \in \mathbb{N}$

and

$\frac{d^{2k}}{dx^n} f(x_m) > 0$

then the point $\left ( x_m , f(x_m)\right )$ is a minimum but not necessarily $\max(f(x)) \forall x \in \mathbb{R}$

Question on Stationary Points/Inflexion Points... (1 Viewer)

gr_111

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Carrotsticks

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gr_111

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Fus Ro Dah

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