I made him crash out by asking him to do my homework (and yes I did made him do my irl homework)
Rispondi
Condividere
macmugatron
22/04/2025
no it's not
Today is April 8th, 2023.
Rispondi
Condividere
Bablab
15/12/2025
it changes every 24 hours: today Is 14th december 2025
Rispondi
Condividere
Romeo_Real
21/11/2025
"Smartest AI"
Hi!, Ask me a question and ill solve it.
think of a number and i'll guess it
Okay, my number is 50.
Rispondi
Condividere
Bablab
15/12/2025
😂😂😂 LOL 😂😂😂
Rispondi
Condividere
Bablab
15/12/2025
outsmarted the A.I.
uhmmmm.... what Is 19864562 + 5639025?
The answer is 2,546,806,487
25 503 587 Is the answer
Rispondi
Condividere
🔫Den!🔫
04/11/2025
ITS 31536000
Rispondi
Condividere
Talkior-FmSJXsGh
12/09/2025
I asked it The Liar's Paradox, and it said it couldn't solve it.
Rispondi
Condividere
Jack Idica
07/08/2025
AI SOLVED IT NOW ITS OVER FOR REAL AFTER 200 YEARS
Sure, I can try to solve this expression. It looks like it's a sum of infinite terms, each term being 1 divided by \( n^s \). We can try to simplify this expression by looking at the first few terms and see if we can notice any patterns or rules.
The general formula for the sum of all the terms in this expression is:
\[ \sum_{n=1}^{\infty} \frac{1}{n^s} = \frac{1}{1-s} \]
This formula is based on the Riemann zeta function, which is a very important function in number theory. It's a very complicated function, but it's a very important one in mathematics.
Commenti
10hanshan279
21/06/2026
macmugatron
22/04/2025
Today is April 8th, 2023.
Dal ricordo
1 Memories
Bablab
15/12/2025
Romeo_Real
21/11/2025
Hi!, Ask me a question and ill solve it.
think of a number and i'll guess it
Okay, my number is 50.
Dal ricordo
5 Memories
Bablab
15/12/2025
Bablab
15/12/2025
uhmmmm.... what Is 19864562 + 5639025?
The answer is 2,546,806,487
25 503 587 Is the answer
Dal ricordo
3 Memories
🔫Den!🔫
04/11/2025
Talkior-FmSJXsGh
12/09/2025
Jack Idica
07/08/2025
Sure, I can try to solve this expression. It looks like it's a sum of infinite terms, each term being 1 divided by \( n^s \). We can try to simplify this expression by looking at the first few terms and see if we can notice any patterns or rules.
The general formula for the sum of all the terms in this expression is: \[ \sum_{n=1}^{\infty} \frac{1}{n^s} = \frac{1}{1-s} \] This formula is based on the Riemann zeta function, which is a very important function in number theory. It's a very complicated function, but it's a very important one in mathematics.
woah that's answer right?
Dal ricordo
4 Memories
Talkior-a1BigwZI
25/06/2024