Inscribed Angle Theorem: Inscribed on Minor Arc
In this video I go further into the inscribed angle theorem (or Central Angle Theorem) and extend it to account for when the inscribed angle is subtended on the minor arc as opposed to the major arc. The difference becomes the inscribed angle on the minor arc is supplementary to half the central angle.
Watch Video On:
- DTube: https://d.tube/#!/v/mes/iw1m8mzl782
- BitChute: https://www.bitchute.com/video/xNJp4lbhgQ25/
- YouTube: https://youtu.be/53ueXQa8OEM
Download Video Notes: https://1drv.ms/b/s!As32ynv0LoaIg9MYJrz7nwUCXDaKgw
View Video Notes Below!
Download These Notes: Link is in Video Description.
View These Notes as an Article: https://steemit.com/@mes
Subscribe via Email: http://mes.fm/subscribe
Donate! :) https://mes.fm/donateReuse of My Videos:
- Feel free to make use of / re-upload / monetize my videos as long as you provide a link to the original video.
Fight Back Against Censorship:
- Bookmark sites/channels/accounts and check periodically
- Remember to always archive website pages in case they get deleted/changed.
Join my private Discord Chat Room: https://mes.fm/chatroom
Check out my Reddit and Voat Math Forums:
Buy "Where Did The Towers Go?" by Dr. Judy Wood: https://mes.fm/judywoodbook
Follow My #FreeEnergy Video Series: https://mes.fm/freeenergy-playlist
Watch my #AntiGravity Video Series: https://steemit.com/antigravity/@mes/series
- See Part 6 for my Self Appointed PhD and #MESDuality Breakthrough Concept!
Follow My #MESExperiments Video Series: https://steemit.com/mesexperiments/@mes/list
NOTE #1: If you don't have time to watch this whole video:
- Skip to the end for Summary and Conclusions (If Available)
- Play this video at a faster speed.
-- TOP SECRET LIFE HACK: Your brain gets used to faster speed. (#Try2xSpeed)
-- Try 4X+ Speed by Browser Extensions or Modifying Source Code.
-- Browser Extension Recommendation: https://mes.fm/videospeed-extension
-- See my tutorial to learn more: https://steemit.com/video/@mes/play-videos-at-faster-or-slower-speeds-on-any-website- Download and Read Notes.
- Read notes on Steemit #GetOnSteem
- Watch the video in parts.
NOTE #2: If video volume is too low at any part of the video:
- Download this Browser Extension Recommendation: https://mes.fm/volume-extension
Inscribed Angle Theorem: Subtended on Minor Arc
From my earlier video I went over the inscribed angle theorem:
The Inscribed Angle Theorem (or Central Angle Theorem) states that:
- The angle inscribed in a circle is half of the central angle that subtends that same arc on the circle.
- This relation holds only if the angles are subtended on the major arc.
What is the relation between the inscribed angle and the central angle if the inscribed angle is inscribed in the minor arc?