1. Chapter 3.2 The Derivative as a Function

2. If f ’ exists at a particular x then f is differentiable (has a derivative) at x Differentiation is the process of calculating a derivative

3. Derivatives from Definition Find f ’

4. Derivatives from Definition Find f ’

5. Tangent Line Last example, the slope of the curve at x = 4 is The tangent is the line through the point (4,2) with slope 1/4

7. Derivative Notations Derivative Values at a specific number x = a

8. Graphing Derivatives Estimating the slopes of the graph by plotting the points (x, f ’(x)) Connect the points to make the curve y = f ’(x) What the graph tells us – Where the rate of change of f is positive, negative or zero – The rough size of the growth rate at any x and its size in relations to the size of f(x) – Where the rate of change itself is increasing or decreasing

9. Interval and One-Sided Derivatives Differentiable on an interval – Derivative at each point on the interval – Differentiable on a closed interval [a,b] if it is differentiable at the interior (a,b) and if the right- hand and left-hand derivatives exist at the end points a and b respectively, that is

11. Interval and One-Sided Derivatives Examples:

12. Function NOT Have a Derivative at a Point

13. Differentiable Functions A function is continuous at every point where it has a derivative