5 Must Know Facts For Your Next Test

1. A local minimum occurs where the first derivative, $f'(x)$, changes from negative to positive.
2. At a local minimum, the first derivative equals zero or does not exist.
3. The second derivative test can confirm if a critical point is a local minimum: if $f''(x) > 0$, it's a local minimum.
4. Local minima are important for understanding the behavior of polynomial functions within certain intervals.
5. Graphically, a local minimum appears as the bottom point of a valley on the graph of the function.

Review Questions

• What condition must be met by the first derivative at a local minimum?
• How can you use the second derivative to confirm that a critical point is a local minimum?
• Explain how you would identify a local minimum on the graph of a polynomial function.

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