In many of my videos I have stated that the derivative can be viewed as the instantaneous rate of change of a function so I thought it would be good to do a video explaining further on this. In this video I go over how the derivative can be viewed as the instantaneous rate of change and show how the definition of instantaneous rate of change is the exact same as the definition of derivative.
Download the notes in my video: https://1drv.ms/b/s!As32ynv0LoaIiMFl4CtGPKVBlQWNug?e=Ev9YLF
View video notes on the Hive blockchain: https://peakd.com/hive-128780/@mes/interpretation-of-the-derivative-as-rate-of-change
Definition of Derivative Simple Explanation: http://youtu.be/0rjGMpM06Eg
Definition of Derivative: Example 1: http://youtu.be/5tFmJShACF4
Definition of Derivative: Example 2: http://youtu.be/Zo8YAbddCJI
What are Limits? A Simple Explanation: http://youtu.be/FbV7TzlkTZk
The Limit of a Function: http://youtu.be/0RX1o7KeZ28
Derivative Application: Deriving the Velocity from the Distance Function: http://youtu.be/3oT83konhlU .
SUBSCRIBE via EMAIL: https://mes.fm/subscribe
DONATE! ʕ •ᴥ•ʔ https://mes.fm/donate
Like, Subscribe, Favorite, and Comment Below!
Follow us on:
Official Website: https://MES.fm
Email me: firstname.lastname@example.org
Try our Free Calculators: https://mes.fm/calculators
BMI Calculator: https://bmicalculator.mes.fm
Grade Calculator: https://gradecalculator.mes.fm
Mortgage Calculator: https://mortgagecalculator.mes.fm
Percentage Calculator: https://percentagecalculator.mes.fm
Try our Free Online Tools: https://mes.fm/tools
iPhone and Android Apps: https://mes.fm/mobile-apps