Higher-order derivative test

In mathematics, the higher order derivative test is used to find maxima, minima and points of inflection in an n^th degree polynomial's curve.

Let ${\displaystyle f}$ be a differentiable function on the interval ${\displaystyle I}$ and let ${\displaystyle c}$ be a point on it such that

1. ${\displaystyle f'(c)=f''(c)=f'''(c)=...=f^{n-1}(c)=0}$
2. ${\displaystyle f^{n}(c)}$ exists and is non-zero

such that n is made as large as possible.

Then,

1. if n is even

1. ${\displaystyle f^{n}(x)<0\implies x=c}$ is a point of local minima
2. ${\displaystyle f^{n}(x)>0\implies x=c}$ is a point of local minima

1. if n is odd ${\displaystyle \implies x=c}$ is a point of inflection

• Extremum
• First derivative test
• Second derivative test
• Saddle point
• Inflection point
• Saddle-point method
• Stationary point

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