She is derivation, a transform of functions that describes rate of 𝑓(𝑥) changing as 𝑥 changes. (This can be represented visually as the slope of the graph 𝑦=𝑓(𝑥).) He is the exponential function 𝑒𝑥, which is the only non-zero function whose derivative is itself - in other words, unaffected by derivation.
But the derivative of e^x+c is just e^x (which for c!=0 is not the same). That’s why the +c is added during integrating because all +c is derived to 0 and thus indistinguishable.
𝑒𝑥 has been around since the 17th century and it hasn’t changed since. Therefore, it’s a constant with respect to time and gets unceremoniously derived to 0.
Any explanation for the mathematically challenged?
She is derivation, a transform of functions that describes rate of 𝑓(𝑥) changing as 𝑥 changes. (This can be represented visually as the slope of the graph 𝑦=𝑓(𝑥).) He is the exponential function 𝑒𝑥, which is the only non-zero function whose derivative is itself - in other words, unaffected by derivation.
I think you forgot about e^x + 1, and e^x + 2, and … …
(My profs always dunked on me for forgetting the + c and I can’t resist doing it to someone else, I’m sorry)
For real tho, great explanation
But the derivative of e^x+c is just e^x (which for c!=0 is not the same). That’s why the +c is added during integrating because all +c is derived to 0 and thus indistinguishable.
I wish I could say I commented this late at night or something, but nope I’m just dumb lmao thanks
Much appreciated!
https://i.kym-cdn.com/photos/images/original/000/913/758/a12.jpg
The derivative of e^x is e^x
The derivative of e^x is always e^x: https://www.youtube.com/watch?v=oBlHiX6vrQY
If you want to use exponents on the fediverse you have to enclose the entire exponent in carats like so without the spaces:
e ^ x ^
ex
how about derivative with respect to time instead of with respect to x?
𝑒𝑥 has been around since the 17th century and it hasn’t changed since. Therefore, it’s a constant with respect to time and gets unceremoniously derived to 0.
Well played!
very nicely said, I agree