1 / 29

Warm Up: No Calc

Pick up new packet!. Warm Up: No Calc. 1. Find all asymptotes for (A) x=1, x=-1, y=1 (B) x=1, y=1 (C) x=1, x=-1, y=0 (D) x=1, x=-1 (E) y=1 2. 3. Use properties of logarithms to decide which of the following is largest.

Télécharger la présentation

Warm Up: No Calc

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Pick up new packet! Warm Up: No Calc 1. Find all asymptotes for (A) x=1, x=-1, y=1 (B) x=1, y=1 (C) x=1, x=-1, y=0 (D) x=1, x=-1 (E) y=1 2. 3. Use properties of logarithms to decide which of the following is largest.

  2. If we increase the number of sides of the polygon, what can you say about the polygon with respect to the circle?

  3. What is a limit? Limit is the value of Y as X approaches a given #:

  4. 3 Kinds of Limits: Limit (double – sided) Left – Hand Limit Right – Hand Limit As x approaches from the right side of c. As X approaches c from either direction. Only exists if left-hand and right-hand are the same. As x approaches from the left side of c

  5. When do limits not exist? DNE Video

  6. THM: Existence of a Limit

  7. Example 1: Find the following limits

  8. Practice

  9. 1 1- 1 0

  10. 0 0- 0 -3

  11. -2 -2- -2 2

  12. Grab a graphing board, marker, and towel

  13. Limit Properties These are important!

  14. Limits to Know Let b & c be real numbers and let n be a positive integer. 1. The limit of a constant function is the constant. 2. The limit at any x-value on the line y=x IS the x-value itself. 3. The limit at any x-value of any function of the form y = xn is the x-value raised to the nth power.

  15. Practice:

  16. Properties of Limits Let b & c be real # and n a positive int. and Scalar multiple Sum or Differ. Product Quotient Power

  17. Practice 1. 2.

  18. Another nice thing about limits… • They help us find holes in the graph. • Ex: What will happen at x=1?

  19. While f(1) D.N.E., as x moves arbitrarily close to 1 from the left and right, f(x) moves arbitrarily close to 3. “The limit of f(x) as x approaches 1 is 3”

  20. Example: Graph

  21. Homework: pg. 65 (1 – 4, 37 – 48, 79-82) Packet pg. 1

More Related