- #1
MiLara
- 15
- 0
I know that taking the derivative of certain functions that explain physical phenomena can lead to another statement describing the physical system, the most famous being the derivatives of position. That is,
position-->velocity-->acceleration-->jerk-->jounce...and taking any other further derivatives suddenly becomes physically meaningless. Is there any intuitive way of thinking about the "limits" of derivatives when it comes to describing physical or geometric systems?
position-->velocity-->acceleration-->jerk-->jounce...and taking any other further derivatives suddenly becomes physically meaningless. Is there any intuitive way of thinking about the "limits" of derivatives when it comes to describing physical or geometric systems?