Written by the Fiveable Content Team • Last updated August 2025
Written by the Fiveable Content Team • Last updated August 2025
Definition
Fermat's theorem states that if a function has a local maximum or minimum at some point, and the derivative exists at that point, then the derivative must be zero. It is essential for finding critical points in calculus.
Fermat's theorem applies to differentiable functions.
If $f'(c)=0$, then $c$ is called a critical point.
Critical points are potential locations for local maxima and minima.
The theorem does not guarantee that a function with $f'(c)=0$ has a local extremum at $c$; it only indicates potential extremum points.
To determine if a critical point is an actual maximum or minimum, further tests like the second derivative test may be required.
Review Questions
Related terms
Critical Point: A point on the graph of a function where its derivative is zero or undefined.
Second Derivative Test: A method to determine whether a critical point is a local minimum, local maximum, or neither by analyzing the sign of the second derivative.
$f'(x)$: The first derivative of the function $f(x)$, representing the rate of change of $f(x)$ with respect to $x$.