@radudelaradauti1: #Remediu de calmare #creat de radudelaradauti #versuri Ion Pribeagu

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Tuesday 02 June 2026 20:21:48 GMT

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~☆𝕾𝖙𝖆𝖗𝖉𝖚𝖘𝖙☆~ :

2026-06-02 20:40:47

1

Stef :

Nu,e nici o ingrijorare!trebuieste,ceva de calmare!!😳😏🥰😍🥰😍🥰😍🥰❤️❤️❤️❤️❤️❤️

2026-06-03 02:12:31

1

Ramos :

Ceva de cal( mare) ...😂

2026-06-03 08:45:25

1

Nicu Toma :

😂😂😂

2026-06-03 08:55:25

1

Rechinul :

👍

2026-06-03 12:35:45

1

Maria 🍀❤️Măriuca 🍀❤️ :

🥰🥰🥰

2026-06-02 20:42:54

1

Marta M. :

❤️❤️❤️

2026-06-02 20:50:50

1

anonima :

😂😂😂

2026-06-02 20:28:18

1

doinaraducanu4 :

🤗🤗

2026-06-04 13:54:02

1

Gabi Oprescu :

🥰🥰🥰

2026-06-03 02:28:20

1

camelia.dinu0 :

😂😂😂😂😂

2026-06-03 07:08:58

1

Costel Botezatu :

🥰🥰🥰

2026-06-03 14:04:07

1

Veronica 986 :

🙋💥🎩👏👏

2026-06-04 18:31:44

0

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Other Videos

Masters desobedece a Gregory House y la despide. - Dr. House- Diagnóstico Médico-3

Masters desobedece a Gregory House y la despide. - Dr. House- Diagnóstico Médico-3

$-51☪️ Graham’s number, usually written as G, comes from a combinatorics problem in Ramsey theory. The question was about coloring edges of a high-dimensional cube (a hypercube) and trying to guarantee that a certain kind of pattern appears no matter how you color it. The exact details are the kind of thing that makes normal people close the tab instantly, but the key point is this: Graham needed a finite upper bound, and what he got was... completely absurd. Now, the real reason this number is famous isn’t the problem. It’s how it’s built. Regular numbers grow like this: Addition → kinda slow Multiplication → faster Exponentiation (powers) → way faster Example: $2^3 = 8$ $2^{10} = 1024$ $2^{100}$ is already huge Then mathematicians said “not enough chaos” and invented tetration: $3 \uparrow\uparrow 3 = 3^{(3^3)} = 3^{27} = 7,625,597,484,987$ Already dumb big. Then comes Knuth’s up-arrow notation: $\uparrow$ = exponentiation $\uparrow\uparrow$ = tetration $\uparrow\uparrow\uparrow$ = power towers of tetration $\uparrow\uparrow\uparrow\uparrow$ = yeah... good luck So something like: $3 \uparrow\uparrow\uparrow\uparrow 3$ is not just big, it’s “you can’t even meaningfully imagine the process”$
-51☪️ Graham’s number, usually written as G, comes from a combinatorics problem in Ramsey theory. The question was about coloring edges of a high-dimensional cube (a hypercube) and trying to guarantee that a certain kind of pattern appears no matter how you color it. The exact details are the kind of thing that makes normal people close the tab instantly, but the key point is this: Graham needed a finite upper bound, and what he got was... completely absurd. Now, the real reason this number is famous isn’t the problem. It’s how it’s built. Regular numbers grow like this: Addition → kinda slow Multiplication → faster Exponentiation (powers) → way faster Example: $2^3 = 8$ $2^{10} = 1024$ $2^{100}$ is already huge Then mathematicians said “not enough chaos” and invented tetration: $3 \uparrow\uparrow 3 = 3^{(3^3)} = 3^{27} = 7,625,597,484,987$ Already dumb big. Then comes Knuth’s up-arrow notation: $\uparrow$ = exponentiation $\uparrow\uparrow$ = tetration $\uparrow\uparrow\uparrow$ = power towers of tetration $\uparrow\uparrow\uparrow\uparrow$ = yeah... good luck So something like: $3 \uparrow\uparrow\uparrow\uparrow 3$ is not just big, it’s “you can’t even meaningfully imagine the process”

Cô ấy tốt hơn em ahh

Cô ấy tốt hơn em ahh

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