Awfully hard to recompile OpenSSH when you’re an ethereal flaming bird-fish
Awfully hard to recompile OpenSSH when you’re an ethereal flaming bird-fish
Previous statement from author is that the girl is a fish
The fish is dead, long live the fish
Dude we literally have that unix_surrealism comic there’s at least some love for BSDs here
If it wasn’t for those rascally penguins I would be flat broke trying to afford the latest system requirements for Windows 12 or a mediocre MacBook instead of a $120 5 year old Dell Latitude, how dare they!!
To be fair waking up sucks
That was really weird when I got that on mine the other day
If you have to gamify book reading, something is wrong, and clearly rampant capitalism is the problem here
I know what you’re getting at and this isn’t directed at you and I know this is why it’s done, but the capabilities of the phone don’t have any bearing on the use of the AI so why gatekeep it? It’s a dumb way to make a profit.
Modern Israel is not Judaism! It’s not the same theocracy described in the old testament. It’s not even religiously pure, there’s a sizeable Christian and Muslim population. It’s perfectly valid to respect Jews and and their beliefs, and to criticize Netanyahu’s government for attempting to crush Palestine and kill its civilians indiscriminately in raids. Jewish folks in the US and abroad are joining in the protests to stop the war - this isn’t about being antisemitic, this is telling a very atrocious government to stop behaving as a similarly atrocious government did 80 years ago
This is why I cringe at cell phone manufacturers selling cloud and AI features based on phone models because wtf you’re not running that cloud on that handset so why do you gatekeep the product behind that model? It can’t require that many resources, it’s a cloud app!
Penguin decides it likes the necklace and keeps it around a bit
Cloudorporate is confused!
Cloudorporate hurt itself in its confusion!
“I don’t know why the laptop is malfunctioning”
Forty PUPs and a keylogger, cat piss all over the keys and a cake of fur and dust blocking the air vent. Also the charge cord is frayed.
If it works anything like the ones some of us use in Puerto Rico it should work well! Cloth coffee filters have been a thing for a while and they’re good at making a strong brew while not requiring a disposable filter. This one tends to lead to muddier coffee but the one you have seems really good and probably filters better. https://www.puertoricocoffeeshop.com/cgi-bin/sc/ss_mb.cgi?storeid=*12d6fca48aa205759c40f5&ss_parm=Abc48d00a6c374ae8bbf4c58167029831
It’s all just small glimpses into a pretty big lore, normal to be lost
Yeah yeah shut up Jack nobody cares
Poor Tux, it’s a rough life
You sure your laptop isn’t splitting graphics to an Nvidia DGPU? Usually it’s flawless unless I’m using Ubuntu specifically
But do you pass ant
I threw this at ChatGPT, it was entertaining.
Q: If you had a chessboard with dimensions comparable to the standard world chess tournament boards, and placed a grain of rice on a square, and then moved to the next square and doubled the amount of rice on that square that you used in the previous one, and kept doing this pattern of picking a square and placing twice as many grains as you did on the last one, approximately how many squares could you fill before the rice starts to overflow into other spaces?
A: Let’s analyze the problem step-by-step to determine how many squares can be filled before the rice starts to overflow.
Understanding the problem: You start with 1 grain of rice on the first square of a chessboard. On each subsequent square, you double the number of grains of rice from the previous square. This means the number of grains on the ( n )-th square is ( 2^{n-1} ).
Capacity and overflow: We need to find the point at which the total amount of rice becomes excessively large, potentially exceeding the board’s capacity. This problem is fundamentally a geometric progression and exponential growth problem.
Chessboard specifics: A standard chessboard has 64 squares.
Exponential growth: Let’s calculate the number of grains of rice on a few key squares to understand the rapid growth:
Total grains on the board: The total number of grains of rice after filling all 64 squares is the sum of the geometric series: [ S = 2^0 + 2^1 + 2^2 + \ldots + 2^{63} ] The sum of this series can be calculated as: [ S = 2^{64} - 1 ] This is a massive number: [ 2^{64} - 1 \approx 18.45 \times 10^{18} \text{ grains} ]
Practical limitations: In reality, the amount of rice that can fit on a square or even within the confines of a board or room will quickly become unrealistic after a relatively small number of squares. For example:
Given the calculations above, the exact square where the rice starts to overflow would depend heavily on the physical capacity of the square, which we’ve assumed to be quite large in this hypothetical.
Therefore, if we were to realistically consider overflow within a standard physical context, you might see overflow happening anywhere from the 20th to 30th squares, given the doubling nature of the sequence.