Wize University Calculus 1 Textbook > Applications of Differentiation
Critical Points and Extrema
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Critical Points and Extrema
Since our first derivative can tell us intervals of increasing/decreasing, it can also give us locations of Extrema.
Critical Points
A critical point of a function is a point ,in its domain, for which
Singular Points
A singular point of a function is a point ,in its domain, for which does not exist.
Relative Extrema
A function has a relative (local) maximum at a point , in its domain, if there is a small interval , around , such that for every in .

A function has a relative (local) minimum at a point , in its domain, if there is a small interval , around , such that for every in .

Wize Tip
Relative extrema occur at either critical points or singular points!
Example: Critical Points and Extrema
Find the critical points and extrema of .
Taking the derivative of the given function, we get
Critical points: set
Setting implies that which are the two values for . Now, consider the following table

From the table above, we can conclude that the given function is increasing on and and decreasing on . Therefore has a relative maximum at and a relative minimum at .
Conclusion: is relative maximum, is relative minimum.
Find the critical points for