Round and round in calc. we go!

1. Round and round in calc. we go! Get out your assignment

2. Warm up Evaluate the limit

3. Section 2.4Continuity • SWBAT • Define continuity and its types

4. Conceptual continuity

5. 2.4 Continuity • This implies : • f(a) is defined • f(x) has a limit as x approaches a • This limit is actually equal tof(a) .

6. Definition (cont’d)

7. Types of discontinuity Removable Discontinuity: “A hole in the graph” (You can algebraically REMOVE the discontinuity)

8. Types of discontinuity (cont’d) • Infinite discontinuity: • Where the graph approaches an asymptote • It can not be algebraically removed

9. jump discontinuity the function “jumps” from one value to another.

10. Example • Where are each of the following functions discontinuous, and describe the type of discontinuity

11. One-Sided Continuity • Continuity can occur from just one side:

12. Continuity on an Interval • So far continuity has been defined to occur (or not) one point at a time. • We can also consider continuity over an entire interval at a time: • Continuous on an Interval: it is continuous at every point on that interval.

13. Polynomials and Rational Functions • Write the interval where this function is continuous.

14. Types of Continuous Function • We can prove the following theorem: • This means that most of the functions encountered in calculus are continuous wherever defined.

16. Assignment 8 • p. 126 1-31 odd • Quiz tomorrow – 2.1 through 2.4 Continuity