Wikipedia talk:Wikipediholism test

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so, I got to check "In class? (5)" (use ctrl+f) and I'm doing that right now. shouldn't that be extra? Twineee ^{talk Roc} 00:10, 4 February 2025 (UTC)[reply]

On question 18.1 it should be "one in 6,950,195^2" (or whatever the number is at the time of you reading this) and my mathaholic ass can't handle Wikipedians not grasping basic probability math (even though statistics is the worst kind of math imo).

This page is semi-protected, so can someone please fix this or I might try to make some other edits so I can edit this later. OagNwoeMnoC625 (talk) 05:45, 6 February 2025 (UTC)[reply]

Well my maths skills is on the decline but I think it's right how it is because first you click on an article, which can be anything, then your chance of clicking on that same article is 1 in 6.9 million. It is just 6.9 million because the first article can be anything.

But I believe for the squared to be there, you'd have to choose a specific start article before you click 'random'. So for example you decided that the first article is Carpet again, and the second article is also carpet. Well the probability of the first article being Carpet is 1 in 6.9 million, and the probability of the second article being Carpet is also 6.9 million. So you multiply them together and that would be 1 in 6.9 million squared. ―Panamitsu (talk) 06:01, 6 February 2025 (UTC)[reply]

OK well I did got a bit too carried away with this little math thingy on a supposed humorous essay, but I did some more math on this and I figured out an equation that works for x Random Page clicks and n Wikipedia articles reachable from Random Page:

${\displaystyle RandomPage(x,n)={\frac {n(x-1){\binom {x-2}{n}}}{n^{n}}}={\frac {n(x-1)n!}{n^{n}\Gamma (n-x+3)}}}$

So for example, a clone Wikipedia site with only 5 articles actually can reach a one in 5 probability after approx. 4.49211261370864 clicks or 5 clicks after rounding up (per WolframAlpha).

So technically, a Wikipedian can reach a probability of one in 6,950,195 after some amount of Random Page clicks. It might just take a bit more Wikipediholism than the average Wikipedian to pull up this trick. And I can't calculate the aforementioned some as the number is a bit quite larger than what WolframAlpha can handle.

For some more references, I think it's possible to reach just any desired probabilities, even a 100% chance given the right amount of Random Page clicks. This can be seen as another case of the infinite monkey theorem I believe. OagNwoeMnoC625 (talk) 06:47, 6 February 2025 (UTC)[reply]