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Viète's Formula for PI
06-23-2020, 11:00 PM
Post: #10
RE: Viète's Formula for PI
(06-23-2020 09:58 PM)pinkman Wrote:  
Quote:Yes, but it pales in comparison to the Wallis-Wasicki formula :-)

Here is a quick PPL port of your Wallis-Wasicki implementation:

...

I’m also porting your 314 pi digits algorithm, I had to stop (work...) but it will be ready in a few hours (if I find the time).

Thank you very much for the PPL port!

Perhaps it's time I should get myself a Prime. But I think I will wait until a good arbitrary precision package is available, either built-in or third-party.

Gerson.
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Messages In This Thread
Viète's Formula for PI - pinkman - 06-17-2020, 05:06 PM
RE: Viète's Formula for PI - ramon_ea1gth - 06-17-2020, 09:37 PM
RE: Viète's Formula for PI - pinkman - 06-18-2020, 12:51 PM
RE: Viète's Formula for PI - pinkman - 06-23-2020, 10:04 PM
RE: Viète's Formula for PI - cdmackay - 06-19-2020, 09:00 PM
RE: Viète's Formula for PI - pinkman - 06-23-2020, 09:58 PM
RE: Viète's Formula for PI - Gerson W. Barbosa - 06-23-2020 11:00 PM
RE: Viète's Formula for PI - pinkman - 07-16-2020, 04:42 PM
RE: Viète's Formula for PI - pinkman - 06-24-2020, 01:15 PM
RE: Viète's Formula for PI - CyberAngel - 06-29-2020, 05:52 AM
RE: Viète's Formula for PI - pinkman - 06-29-2020, 10:54 PM
RE: Viète's Formula for PI - compsystems - 06-30-2020, 03:05 PM



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