@jan30011998:

Jan😎
Jan😎
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Sunday 05 July 2026 10:55:54 GMT
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alexanderriegner
Alex :
würde gerne mal
2026-07-06 22:59:39
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juppi170
juppi170 :
2026-07-05 10:59:42
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y..dijksman
Y. Dijksman :
2026-07-05 21:04:48
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rolandk201
Roland :
2026-07-05 20:07:12
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rolandk201
Roland :
2026-07-05 20:06:52
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rolandkitschischi66
Roland Kitschischi :
🙏🙏🙏🥵
2026-07-06 16:49:39
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dorfkind1987
Dorf Kind927 :
😋😋😋
2026-07-05 11:01:33
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chris45341
Chris :
Du bist eine wahnsinnig attraktive und sympathische Frau. Liebe Grüße 🌹 🌹 🌹
2026-07-05 11:59:28
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Graham's Number (Mathematics)Named after mathematician Ronald Graham, this is an immense number that serves as an upper bound to a complex problem in Ramsey theory.The Scale: It is so incredibly large that it cannot be written using ordinary scientific notation or standard power towers. If you attempted to write it out in full, the observable universe would be far too small to hold all the digits, even if each digit were microscopic (the size of a Planck volume).How It's Written: It is expressed using Knuth's up-arrow notation and is arrived at through a recursive 64-step process. Step 1 (G₁) involves 3 followed by 4 arrows and another 3 (where each arrow represents repeated exponentiation). Each subsequent step uses the number of arrows defined by the previous step, repeated up to G₆₄.Read More: For an intuitive breakdown of its size, see the Wait But Why explanation.2. The Graham Number (Investing)Popularized by the legendary
Graham's Number (Mathematics)Named after mathematician Ronald Graham, this is an immense number that serves as an upper bound to a complex problem in Ramsey theory.The Scale: It is so incredibly large that it cannot be written using ordinary scientific notation or standard power towers. If you attempted to write it out in full, the observable universe would be far too small to hold all the digits, even if each digit were microscopic (the size of a Planck volume).How It's Written: It is expressed using Knuth's up-arrow notation and is arrived at through a recursive 64-step process. Step 1 (G₁) involves 3 followed by 4 arrows and another 3 (where each arrow represents repeated exponentiation). Each subsequent step uses the number of arrows defined by the previous step, repeated up to G₆₄.Read More: For an intuitive breakdown of its size, see the Wait But Why explanation.2. The Graham Number (Investing)Popularized by the legendary "father of value investing," Benjamin Graham, this number calculates the maximum price a defensive investor should pay for a stock to ensure an adequate margin of safety.The Formula: It is calculated using the square root of the following equation:\(\text{Graham Number} = \sqrt{22.5 \times \text{Earnings Per Share (EPS)} \times \text{Book Value Per Share (BVPS)}}\)How It Works: The formula assumes a baseline price-to-earnings (P/E) ratio of 15 and a price-to-book (P/B) ratio of 1.5. Multiplying these together yields the constant 22.5. Any stock with a market price below its calculated Graham number is theoretically considered undervalued.#🍵🌊🌊 #larp #truecringecomunity #sinister #fyp

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