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Pandigital RPL algebraic pi approximation
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Pandigital RPL algebraic pi approximation
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Pandigital RPL algebraic pi approximation
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10-16-2024, 04:12 PM
Post: #7
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RE: Pandigital RPL algebraic pi approximation
(10-16-2024 02:32 PM)Maximilian Hohmann Wrote: I have never seen that written as "alog". And why square root of nine minus factorial of zero? Yeah. I'd write "alog" as "e^x" and "9-0!" as "8" (9-1) but that's just me. Ln is fine (natural log = log base e where e = 2.718 approx). A1 HP-15C (2234A02xxx), HP-16C (2403A02xxx), HP-15C CE (9CJ323-03xxx), HP-20S (2844A16xxx), HP-12C+ (9CJ251) |
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| Messages In This Thread |
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Pandigital RPL algebraic pi approximation - Gerson W. Barbosa - 10-16-2024, 03:41 AM
RE: Pandigital RPL algebraic pi approximation - Gerson W. Barbosa - 10-16-2024, 11:43 AM
RE: Pandigital RPL algebraic pi approximation - EdS2 - 10-16-2024, 01:51 PM
RE: Pandigital RPL algebraic pi approximation - Gerson W. Barbosa - 10-18-2024, 05:17 PM
RE: Pandigital RPL algebraic pi approximation - naddy - 10-16-2024, 02:20 PM
RE: Pandigital RPL algebraic pi approximation - Maximilian Hohmann - 10-16-2024, 02:32 PM
RE: Pandigital RPL algebraic pi approximation - AnnoyedOne - 10-16-2024 04:12 PM
RE: Pandigital RPL algebraic pi approximation - Gerson W. Barbosa - 10-16-2024, 04:14 PM
RE: Pandigital RPL algebraic pi approximation - klesl - 10-16-2024, 03:51 PM
RE: Pandigital RPL algebraic pi approximation - KeithB - 10-18-2024, 05:39 PM
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