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CountScrofula · 41-45, M
That's really not hard to understand.
hotandcool · F
@CountScrofula Provided you completed your basic education.
CountScrofula · 41-45, M
@hotandcool She's 18 and has been swimming in climate info for the past while. This is a very basic line chart.
Elessar · 26-30, M
Greeta?
Also, what am I looking at? Interventional projections, or? Care to provide a link to the full source since the one on top-left is incomplete?
Also, what am I looking at? Interventional projections, or? Care to provide a link to the full source since the one on top-left is incomplete?
hotandcool · F
@Elessar search twitter
Elessar · 26-30, M
@hotandcool I don't consider Twitter a valid, trustable source of information.
Piper · 61-69, F
If you're referring to [b]Greta[/b] Thunberg, I'd guess she can understand the data interpretation of something she feels so passionately about.
MarineBob · 56-60, M
Dumb ass people believing in what is projected in the future
whowasthatmaskedman · 70-79, M
@MarineBob Think of it in terms of Credit cards. If you spend it now, the bill arrives and has to be paid, or its a bigger bill next month and it keeps building up,. In the end if you dont pay it, they take the house..😷
nevergiveup · M
from day one i think she has been used. Her speeches was not written by her. she is just used to say what adults want to say but more will take notice of her than them
Eternity · 26-30, M
Thats awfully optimistic...
vetguy1991 · 51-55, M
She's already made up her mind
MartinTheFirst · 22-25, M
im pretty sure she's well read by now
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MartinTheFirst · 22-25, M
@hotandcool lim x->0 (f(x) = sin(x) -> f'(x) = cos(x) = 1) l'hopitals rule says it's 1
hotandcool · F
@MartinTheFirst Why do we apply L hopital rule? Can you explain it? or its derivation?
MartinTheFirst · 22-25, M
@hotandcool imagine two functions that cross each other in the x-axis. Our limit is x -> 0 so if we zoom in enough on this point eventually we'll have zoomed in enough to make both of the graphs look like straight lines. At this scale the actual linear slopes of the tangent lines to the functions are equal to those of the functions since the functions look linear in this interval. So imagine we have the two derivatives f'(x)*dx/g'(x)*dx which are the respective slopes times the distance that goes towards zero, which will literally be equal to f(x)/g(x). The dx cancels out and therefore we have f(x)/g(x) = f'(x)/g'(x)
Intuitively
Intuitively