Formula for the Taylor Series for Tetration

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Formula for the Taylor Series for Tetration

Catullus Offline

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06/12/2022, 06:04 AM

(06/12/2022, 05:53 AM)JmsNxn Wrote: Using Kneser using fatou.gp I am totally unsure. I know how to find fraction iterations of exponentials in Shell-thron as efficient as possible, using either beta or Schroder. But for \(e\) and using Kneser. I do not know. I'm sure Sheldon has something built in which might find that. I don't know though. Interesting question though.

What about for other bases?

Please remember to stay hydrated.
ฅ(ﾐ⚈ ﻌ ⚈ﾐ)ฅ Sincerely: Catullus /ᐠ_ ꞈ _ᐟ\

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Messages In This Thread

Formula for the Taylor Series for Tetration - by Catullus - 06/12/2022, 03:33 AM

RE: Formula for the Talor Series for Tetration - by JmsNxn - 06/12/2022, 04:24 AM

RE: Formula for the Talor Series for Tetration - by Catullus - 06/12/2022, 05:30 AM

RE: Formula for the Talor Series for Tetration - by JmsNxn - 06/12/2022, 05:53 AM

RE: Formula for the Talor Series for Tetration - by Catullus - 06/12/2022, 06:04 AM

RE: Formula for the Talor Series for Tetration - by Daniel - 06/12/2022, 06:17 AM

RE: Formula for the Talor Series for Tetration - by JmsNxn - 06/12/2022, 06:33 AM

RE: Formula for the Talor Series for Tetration - by Daniel - 06/12/2022, 06:50 AM

RE: Formula for the Talor Series for Tetration - by JmsNxn - 06/12/2022, 07:32 AM

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