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Absolute minimum
from class:
College Algebra
Definition
The absolute minimum of a function is the lowest point over its entire domain. It represents the smallest value that the function attains.
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5 Must Know Facts For Your Next Test
- The absolute minimum can occur at a critical point or an endpoint of the function's domain.
- To find the absolute minimum, evaluate the function at all critical points and endpoints, then compare these values.
- A continuous function on a closed interval always has an absolute minimum.
- The first derivative test can help identify critical points where the function changes from decreasing to increasing.
- Not all functions have an absolute minimum if their domain is not closed or they are not bounded below.
Review Questions
- How do you determine if a point is a potential candidate for an absolute minimum?
- What role do endpoints play in finding the absolute minimum of a function on a closed interval?
- Can a function have more than one absolute minimum? Why or why not?
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