Talk:2450: Post Vaccine Social Scheduling

Explain xkcd: It's 'cause you're dumb.
Revision as of 12:00, 15 April 2021 by (talk) (Possibly SAT?)
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That third line down in the cartoon, shouldn't the first 2 be a 1? 02:56, 15 April 2021 (UTC)

Plus, should they really be going to a movie during their two weeks? NixillUmbreon (talk) 03:20, 15 April 2021 (UTC)
Third line down may have gotten a spoiled batch on their second shot (or could be lying, thereby creating errors the schedule), but it does look to me like a typo. NixellUmbreon correctly notes that Third Line also does not wait the requisite period after 2nd dose before going to a movie!
ProphetZarquon (talk) 03:50, 15 April 2021 (UTC)
Or perhaps they think that as soon as they've had their second shot, they're Good To Go? Not lying deliberately, but just plain old misinformed 04:19, 15 April 2021 (UTC)

It seems unfair to attend any birthdays this year, considering how many could not be attended. Bobby gets a party but Susie doesn't? Hmm... Time is cruel.

Also, unrelated, but it's entirely possible that Lines 1, 2, 5, 7 & 8 are scheduling to gather on Line 3's birthday, while 3 isn't vaccinated yet.

Line 3 doesn't attend the birthday. She's going to the movie with 4 & 5 just after the 2nd shot. Every one at the bday has had the 2nd shot for 2+ weeks. 08:40, 15 April 2021 (UTC)

Edit: Also, also, what is a chungus? (I don't come to explainxkcd because I want to search random words on DuckDuckGo...) ProphetZarquon (talk) 03:50, 15 April 2021 (UTC)

according to, “Chungus is a meme featuring a chunky version of the cartoon character Bugs Bunny, typically captioned Big Chungus. It began as gaming joke that spread online as a slang term for anything ‘(adorably) chunky,’ similar to chonky.“ (which begs the question, what does that have to do with the explanation of this comic being written by a “big chungus”) 04:18, 15 April 2021 (UTC)

Just wondering, how is Big Chungus related to this? Confuuusion Eelitee (talk) 04:29, 15 April 2021 (UTC)

Question as a European: Don't Americans use the Johnson & Johnson vaccine which just needs 1 shot (in addition to those that need 2 shots)? Everyone in this chart gets a "2" shot (and in the case of the 3rd person even two "2" shots.) --Lupo (talk) 05:03, 15 April 2021 (UTC)

When scheduled for an immunisation an American may find that they are being administered Moderna, Pfizer, or until recently the J&J vaccine (currently that rollout is paused until an investigation into blood clot incidence can be concluded). The second shot if it exists needs to be the same as the first, but otherwise there is little local favouring of one manufacturer over the others. 06:36, 15 April 2021 (UTC)
Thanks for the information, but my question was about how J&J is applied (if it is applied at all), as to my knowledge it doesn't need a 2nd shot, but is fully functional few weeks after the first shot. But noone in this graph is getting only 1 shot. So it looks like this graph already ignores J&J/depicts a group of people in which noone got J&J. --Lupo (talk) 06:39, 15 April 2021 (UTC)

I thought this comic was also about the CDC guidance even after getting vaccinated to stay in small groups, this, there is no group of > 4 people or so. 05:17, 15 April 2021 (UTC)

Cabin and birthday are 5 people each. --Lupo (talk) 05:20, 15 April 2021 (UTC)
Hmm, but by "Cabin" everyone has already been vaccinated. So should've they all be able to attend? 05:31, 15 April 2021 (UTC)
Everyone still doesn't want to go everywere. If I'd schedule a Transformers movie night I'd only got most of my brothers to join and maybe two of our significant others. Also some may be unavailable for other reasons to which the alt-text seems to refer. 07:55, 15 April 2021 (UTC)

Might this also a take on the transistor 'NPN hole' diagram? The title text states 'NP-hard' which is something different, but the diagram does look a little like transistor holes and electrons! Emitter's and Collector's? Fan2012 (talk) 06:21, 15 April 2021 (UTC)

Hm, is this possibly the Boolean satisfiability problem (as in whether or not someone can come is TRUE or FALSE)? This is a NP-hard problem: