1 / 15

Interior Angles

Interior Angles. We learned about two, now here comes the third. Central Angle & Inscribed Angle. chord. radius. Intersecting Chords. Measuring the angles created by intersecting chords. Definition of Intersecting Chords. D.

randi
Download Presentation

Interior Angles

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. Interior Angles We learned about two, now here comes the third

  2. Central Angle & Inscribed Angle chord radius

  3. Intersecting Chords

  4. Measuring the angles created by intersecting chords Definition of Intersecting Chords D • When two chords cross each other within a circle, their intersection creates four angles. How can we measure these angles? The vertex is not in the center, nor is it on the circle. A 4 1 3 2 C B

  5. Measuring the angles created by intersecting chords D • First we see that ∡1 and ∡3 are opposite angles, so ∡1 = ∡3 • ∡2 and ∡4 are also opposite angles, so ∡2 = ∡4 • This means there are really only two angle measures to find! A 4 2 1 1 3 2 C B

  6. How to Find∡1 D • Make a triangle with ∡2, ∡B, and ∡C. • ∡B is an inscribed angle capturing DC • ∡C is an inscribed angle capturing AB • ∡B = ½mDC and ∡C = ½mAB A 2 1 1 2 ½ AB ½ DC C B

  7. How to Find∡1 D • Then since it is a triangle, m∡B + m∡C + m∡2 = 180 ̊ • We notice that ∡1 and ∡2 are a linear pair, m∡1 + m∡2 = 180 ̊ • This means… m∡1+m∡2=m∡B+m∡C+m∡2 • Cancel like terms to get m∡1= m∡B + m∡C • Which means that m∡1= ½mAB + ½mDC. A 2 1 1 2 ½ AB ½ DC C B

  8. The formula for finding the measure of an angle created by intersecting chords m∡1 =½mAB+ ½mCD Which can also be written as m∡1 =½(mAB+ mCD)

  9. Let’s Try Some Examples

  10. m∠1 =½( mAB + mCD ) A D 1 1 C B

  11. m∠1 =½( mAB 40° + mCD ) + 30° ) = 35° A D 1 1 30° 40° C B

  12. m∠2 =½( mAD + mBC ) A D 2 30° 35° m∠1=35° 40° 2 C B

  13. m∠2 =½( 210° mAD + mBC ) + 80° ) = 145° 210° A D 2 35° 30° 35° 40° 2 C 80° B

  14. m∠5 =½( 170° + 90° ) = 130° mAD + mBC ) m∠4 = 180° – 130° = 50° 170° A D 5 4 C 90° B

  15. In Class Assignment Watch the screen, answer the questions in your notebook (10 questions total)

More Related