1 / 8

GBK Geometry

GBK Geometry. Jordan Johnson. Today’s plan. Greeting Review Asg #74: Ch. 11 Lesson 2 Set I Exercises 18-30. Bonus: Set II Exercises 37-41. Homework / Questions Clean-up. Open Puzzle. Each digit is replaced by “X”. American Mathematical Monthly, April 1954.

nelson
Download Presentation

GBK Geometry

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. GBK Geometry Jordan Johnson

  2. Today’s plan • Greeting • Review Asg #74: Ch. 11 Lesson 2 • Set I Exercises 18-30. • Bonus: Set II Exercises 37-41. • Homework / Questions • Clean-up

  3. Open Puzzle Each digit is replaced by “X” American Mathematical Monthly, April 1954. Contributed by P.L. Chessin.

  4. Puzzle & Work • Need to show me yesterday’s assignment? Now. • 10+ minutes: Work on long division puzzle. • In pairs or trios, do: • Ch. 11 L1 (p. 431): • Exercises 20-30. • Bonus: Exercises 48-51. • Notify me when you’re done. • Next: • Test Analysis • Complete the “Math Test Analysis” sheet. • Hand in, stapled to the front of your test. • Due Thursday, 5/9 (periods 1 & 2)or Friday, 5/10 (period 7).

  5. Homework • Test Analysis: • Complete the “Math Test Analysis” sheet. • Hand in, stapled to the front of your test. • Due Thursday, 5/9 (periods 1 & 2)or Friday, 5/10 (period 7).

  6. Clean-up / Reminders • Pick up all trash / items. • Push in chairs (at front and back tables). • See you tomorrow!

  7. Overlapping Squares puzzle

  8. Pi Day Puzzle – Progress? • A polygon is inscribed in a circle iff all its vertices are on the circle. • Using 2 colors, is it possible to color every point on a circle (note, on the circle, not in it) such that no isosceles triangle inscribed in the circle has all three vertices the same color?

More Related