5 Must Know Facts For Your Next Test

1. A local maximum occurs where the first derivative is zero and changes from positive to negative.
2. The second derivative test can confirm a local maximum if it is negative at that critical point.
3. A polynomial function of degree $n$ can have up to $n-1$ local maxima or minima.
4. Local maxima are useful for understanding the behavior and turning points of polynomial functions.
5. Examining intervals around critical points helps determine whether they are local maxima or minima.

Review Questions

• What condition must be met by the first derivative for a point to be considered as a potential local maximum?
• How does the second derivative test help in identifying a local maximum?
• If a cubic polynomial has three distinct real roots, how many local maxima can it have?

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