1. Look at website on slide 5 for review on deriving area of a circle formula Mean girls clip: the limit does not exist https://www.youtube.com/watch?v=oDAK KQuBtDohttps://www.youtube.com/watch?v=oDAK KQuBtDo

2. Introduction to Limits Section 12.1 You’ll need a graphing calculator

3. What is a limit? Let’s discuss the derivation of the area of a circle (and circumference) (and circumference)

4. A Geometric Example Look at a polygon inscribed in a circle As the number of sides of the polygon increases, the polygon is getting closer to becoming a circle.

5. http://www.mathopenref.com/circleareader ive.htmlhttp://www.mathopenref.com/circleareader ive.html

6. If we refer to the polygon as an n-gon, where n is the number of sides we can make some mathematical statements: As n gets larger, the n-gon gets closer to being a circle As n approaches infinity, the n-gon approaches the circle The limit of the n-gon, as n goes to infinity is the circle

7. The symbolic statement is: The n-gon never really gets to be the circle, but it gets close - really, really close, and for all practical purposes, it may as well be the circle. That is what limits are all about!

8. FYI WAY Archimedes used this method WAY before calculus to find the area of a circle.

9. An Informal Description If f(x) becomes arbitrarily close to a single number L as x approaches c from either side, the limit for f(x) as x approaches c, is L. This limit is written as

10. Numerical Examples

11. Numerical Example 1 Let’s look at a sequence whose n th term is given by: What will the sequence look like? ½, 2/3, ¾, 4/5, ….99/100,...99999/100000…

12. What is happening to the terms of the sequence? Will they ever get to 1? ½, 2/3, ¾, 4/5, ….99/100,….99999/100000…

13. Let’s look at the sequence whose n th term is given by 1, ½, 1/3, ¼, …..1/10000,....1/10000000000000… As n is getting bigger, what are these terms approaching ? Numerical Example 2

15. Graphical Examples

16. Graphical Example 1 As x gets really, really big, what is happening to the height, f(x)?

18. As x gets really, really small, what is happening to the height, f(x)? Does the height, or f(x) ever get to 0?

20. Graphical Example 2 As x gets really, really close to 2, what is happening to the height, f(x)?

21. Find Graphical Example 3 -4 -7 6

22. Use your graphing calculator to graph the following: Graphical Example 4

23. Find As x gets closer and closer to 2, what is the value of f(x) getting closer to? TRACE: what is it approaching? TABLE: Set table to start at 1.997 with increments of.001 (TBLSET)

24. Does the value of f(x) exist when x = 2?

25. ZOOM Decimal

26. Limits that Fail to Exist

27. What happens as x approaches zero? The limit as x approaches zero does not exist. Nonexistence Example 1: Behavior that Differs from the Right and Left

28. Nonexistence Example 2: Unbounded Behavior Discuss the existence of the limit

29. Nonexistence Example 3: Oscillating Behavior X2/π2/3π2/5π2/7π2/9π2/11πX 0 Sin(1/x)11 1 Limit does not exist Discuss the existence of the limit Put this into your calc set table to start at -.003 with increments of.001

30. Common Types of Behavior Associated with Nonexistence of a Limit

31. When can I use substitution to find the limit? When you have a polynomial or rational function with nonzero denominators

32. H Dub 12.1 #3-22, 23-47odd