Message from @EndangeredProdigy
Discord ID: 541051773465395200
I am
k
Here is how to calculate that a random individual from one normal distribution is higher than that of another.
is this porn
this is porn
i called it immidiately
the second I saw that girl's face
I knew it
and then i laughed my way throught the rest of the vid
For example, the chance that someone has an IQ above 120 in a 100 mean, 15 SD population is:
1 - normcdf(120, 100, 15)
ans = 0.091211
its so like Magog
are there websites to bet on election results ?
😆
Vegas
How liberal is Vegas?
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<:NPC:500042527231967262>
lame
recently?
the 2020 us election is free money
Besides Bernie is there anyone that the left has that could stand a chance against the god emperor?
I KNOW
gambling in america has always been a bit tough, vegas and such wanna keep their stranglehold lol
Geo-fenced for nations that outlawed it
1 - normcdf((100-105)/(sqrt(15^2+10^2)), 0, 1)
Ah, I got it
ans = 0.60924
it got to the point in the UK people were betting if a guy was gunna eat a pie during a football match, then there was some drama about bet fixing with the pie lol
let's see so far they have Wakanda Harris, Pocahontas, and Snory Booker
The chances that a randomly selected individual from a normal distributed population of 105 is smarter than someone from one with a 100 mean is 61%.
Pocahontas 😆 😆
I'm dead
Hay Timcast, I want my Pochantas playlist!
60% aint that high tbh
The chances that somebody has an IQ ≤ 120 is 91%, given a population of 100 IQ mean, and standard deviation of 15. Naturally, the chances that one is above 120 is then (100 - 91)% = 9%.
Therefor, the total number of individuals then depends on the size of the population, of course, so in a town with a random sampling that only has 100 inhabitants, we would expect only 9 such individuals, while a city of 100,000 would have 9,000 such individuals.
If we had a school that selects purely on IQ, then one would expect 59/41=1.44 as many Japanese as Europeans, but if there were 1.44 times as many Europeans in the population as Japanese, then one would expect the same number of Japanese as Europeans in the class. So, if one had 100 Japanese and 144 Europeans, and one sets a cutoff at a certain IQ, one would expect the same number of Japanese as Europeans in that school.
I had written a series of posts on Gab about this.
You forgot about creepy uncle Joe Biden
Hmm ... okay. No Math then.