I recently came across this post. Nice in general, though I don't like the style at some parts. Anyway, at one point it says that the normal distribution equals the convolution with itself (no surprises here), and that that property is equivalent to the differential equation f '(x) + xf(x) = 0. How come? Any idea how that equivalence arises? Or maybe I'm reading it wrong... @flawr

Ew, quora

@LuisMendo I guess that the central limit theorem is written as the integral of g times g, and that is equal to g. taking the derivative on both sides you get to something similar to f’=f.

I don’t know the details of the proof though.

@AndrasDeak--СлаваУкраїні I don't visit it often, and I don't have a clear opinion about it. Out of curiosity, what don't you like about Quora?

@CrisLuengo the central limit theorem is written as the integral of g times g: integral of {g times g} (so g^2), or {integral of g} times g?

@LuisMendo it usually comes up as the antithesis of the stack exchange network. Low-quality and something about a paywall? I never looked too closely.

I never knew it had a paywall. The way I use it is, I search with Google and sometimes the result is on Quora

There is also a lot of shitty answers

and bot generated content

@LuisMendo I guess the DE is equivalent to saying f(x) = c*exp(-x^2/2) so it is "trivial"

I don't think there is much insight there

I' dhave to think about the rules again but I think if you fourier transform the equation it should also be evident

(It's one of my pet peeves: If you search for "normal distribution" images, you'll find way too many curves that people claim are gaussians but are just not gaussian at all! Probably always the same copy of some person drawing them badly with bezier curves or so....)

"fact checked" britannica.com/topic/normal-distribution

@LuisMendo I meant the convolution integral: integral of {g times g}

It leads to a scaled Gaussian, so I don’t know exactly how you’d reduce it to f’=f.

@CrisLuengo I think Luis edited it: it was f' + id * f = 0

@flawr LOL

@flawr Huh, I hadn't noticed! Yes, the picture they use clearly has finite support

@flawr but that's cheating...?

but also the rest of the shape doesn't make much sense!

@flawr ha

The Britannica one is especially heavy-tailed!

@CrisLuengo I still don't get it, but I'm starting to think that the post is not to be taken so seriously anyway

@flawr True. It has gaps :-P

@CrisLuengo maybe a little bit high BMI

found an even more aweful example ml-science.com/normal-distribution

Ugh

oh and what about this? chegg.com/homework-help/definitions/normal-curve-31

Infinite area. Wonderful!

@flawr BMI is a hoax. Think about it. Weight divided by square of height. The square of the height is an area, not a volume.

@flawr Looks better than most, just a little y offset there.

@LuisMendo I guess with this you're never gonna get any outliers:P

@CrisLuengo oh really?

indeed! must have been physicians who came up with something like that

Just measure it in Pascals...

HAHA :D

So BMI 1 means you have the BMI of Pedro Pascal. Minus the Mandalorian armour, of course

hehe

well technically isn't pascals force per area?

Force, mass, who cares, we're all on Earth

well you can still convert it to PSI:)