Pandigital RPL algebraic pi approximation

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Pandigital RPL algebraic pi approximation

10-16-2024, 02:20 PM (This post was last modified: 10-16-2024 05:37 PM by naddy.)

Post: #4

naddy

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Posts: 65
Joined: Sep 2024

RE: Pandigital RPL algebraic pi approximation

What's "alog"?

I thought anti-logarithm to base 10, so 10^, but that doesn't make sense.

Edit: Never mind, it works out with alog as 10^. I was lost among the parentheses.

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Messages In This Thread

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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