alyssa @alyssa@cat.family
🧚♀️
Joined May 2022
@aschmitz they’re all good
today i made a list of my opinion on every vegetable and fruit (that i have an opinion on)
@aschmitz i don't think my hands got sore writing notes in school
re: programming question
@wallhackio all good. probably not what i'd wanna go for but things for the suggestion :)
really lacking the student muscles these days. i can't spend hours writing with a pencil without my hand getting sore anymore
rpgposting, cemeteries
i hope this published campaign i'm running includes a good explanation for how putting the family cemetery in a swamp is not a bad idea so i don't have to figure it out myself.
re: programming question
@wallhackio did you have suggestions?
re: programming question
@wallhackio initially pretty simple forms-style, tho with slightly fancy rich text editing. eventually i probably will end up wanting more complicated stuff like dragging widgets around freely on a canvas
programming question
does there exist a way to make gui applications that isn't extremely annoying to either user (electron/etc.) or developer (everything else?)
poképosting
maybe i should get into pogo again? 🤔
re: bad takes from pokémon fans
@Lady can recommend ♟️
n·y·times screenshot
@Lady you could say that :3
ttrpgposting
i have won the monster mash
pokémon
@Lady somehow this remains true even after go/let's go
trying to figure out which pokémon characters in my fanfic will be using like
@Lady i don't really understand but i see bug so yayyyy
more shiny math
@wallhackio @aescling sorry, *not the same as your average number of attempts before seeing a shiny
more shiny math
@wallhackio kind of yes, kind of no.
yes the average (expected value) number of shinies after x attempts is, but that's not the same as your number
your chances of actually seeing at least one after x attempts is either approximately 1/e or 1 - 1/e (i can't remember whether @aescling and i's calculations from april were for chance of not seeing a shiny or chance of seeing at least one shiny)
(1/e is the limit as x goes to infinity of.... whichever probability we were looking at, with the value for a given x monotonically decreasing as x increases)
oh huh i didn't know walruses were dogs
🧚♀️
Joined May 2022
