Absolute maximum - (College Algebra) - Vocab, Definition, Explanations | Fiveable

Definition

The absolute maximum of a function is the highest value that the function attains over its entire domain. It represents the peak point on the graph of the function.

5 Must Know Facts For Your Next Test

The absolute maximum can occur at a critical point or at an endpoint of the domain.
To find the absolute maximum, evaluate the function at all critical points and endpoints, then compare these values.
A function may have more than one local maximum but only one absolute maximum over its domain.
If a function is continuous on a closed interval $[a, b]$, it must have both an absolute maximum and minimum according to the Extreme Value Theorem.
The first derivative test and second derivative test are helpful tools in identifying whether a critical point is an absolute maximum.

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Related terms

Critical Point: A point where the first derivative of a function is zero or undefined, indicating potential maxima, minima, or saddle points.

Local Maximum:

A value where the function reaches its highest point within a certain interval around that value but not necessarily over its entire domain.

Extreme Value Theorem: \text{If } f \text{ is continuous on a closed interval } [a,b], \text{ then } f \text{ has both an absolute maximum and minimum on that interval.}

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key term - Absolute maximum

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