Section 2.4

1. Section 2.4 Continuity & One-Sided Limits

2. Discontinuous v. Continuous

3. Formal Definition of Continuity

4. Two Types of Discontinuity • Removable & Non-Removable • A discontinuity at is called removable if can be made continuous by appropriately defining (or redefining)

5. One-Sided Limits • “the limit of as approaches from the right” • “the limit of as approaches from the left”

6. When Does a Limit Exist?

7. Example 1 (#6)

8. Calculating One-Sided Limits • Plug in the x-value that you are approaching. • If you get a real number, then that’s your limit. • If not, try some algebra to see if things can cancel. • If that doesn’t work, then plug in x-values extremely close to the number you are approaching or graph it.

9. Example 2 Find the limit if it exists. If not, explain.

10. Example 2 (cont.) Find the limit if it exists. If not, explain. • where • where

11. Continuity on a Closed Interval

12. Pictorial Representation

13. Example 3 Discuss the continuity of the function on the closed interval.

14. Example 4 Find the -values where is discontinuous. If any, which are removable?