Mean Value Theorem for Integrals: Proof
In this video I go over the proof of the mean value theorem for integrals which I covered in my last video. The proof considers a function written as an integral and by applying the original mean value theorem for derivatives the result will yield the mean value theorem for integrals which is very similar to the one for derivatives.
Watch Video On:
- DTube: https://d.tube/#!/v/mes/9njjbx52778
- BitChute: https://www.bitchute.com/video/wMcl9tK3ymr7/
- YouTube: https://youtu.be/HIhDyXM87pI
Download Video Notes: http://1drv.ms/1uOBfcP
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 along my epic video series:
- #MESScience: https://mes.fm/science-playlist
- #MESExperiments: https://steemit.com/mesexperiments/@mes/list
- #AntiGravity: https://steemit.com/antigravity/@mes/series
-- See Part 6 for my Self Appointed PhD and #MESDuality Breakthrough Concept!- #FreeEnergy: https://mes.fm/freeenergy-playlist
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
Mean Value Theorem for Integrals: Proof
The Mean Value Theorem for Integrals:
If f is continuous on [a, b], then there exists a number c in [a, b]such that
The Mean Value Theorem for Integrals is a consequence of the basic or derivative version of the Mean Value Theorem and the Fundamental Theorem of Calculus.
Mean Value Theorem (for Derivatives)
Let f be a function that satisfies the following hypotheses:
- f is continuous on the closed interval [a, b].
- f is differentiable on the open interval (a, b).
Then there is a number c in (a, b) such that:
or, equivalently,
In proofing the Mean Value Theorem for Integrals we can apply the Mean Value Theorem for Derivatives to the following function:
