Weak Hyper-Operational Etas and Euler Numbers Catullus Fellow Posts: 213 Threads: 47 Joined: Jun 2022   06/17/2022, 09:45 AM (This post was last modified: 07/04/2022, 11:13 PM by Catullus.) The largest real number a such that, a weakly pentated to the x converges, as x grows larger and larger is about 1.584. It converges to about 2.439. Does anyone know of any closed forms for any of these numbers? Also maybe there should be symbols for those numbers. Do the etas and Eulers of weak hyper-operations converge? If so what do they converge to? Please remember to stay hydrated. ฅ(ﾐ⚈ ﻌ ⚈ﾐ)ฅ Sincerely: Catullus /ᐠ_ ꞈ _ᐟ\ « Next Oldest | Next Newest »

 Possibly Related Threads… Thread Author Replies Views Last Post Base Pi Hyper-Operations Catullus 3 749 11/08/2022, 06:51 AM Last Post: Catullus How could we define negative hyper operators? Shanghai46 1 131 10/23/2022, 11:12 AM Last Post: MphLee Hyper-Operational Salad Numbers Catullus 9 1,105 09/17/2022, 01:15 AM Last Post: Catullus Rank-Wise Approximations of Hyper-Operations Catullus 48 9,577 09/08/2022, 02:52 AM Last Post: JmsNxn Octonion Hyper-Operations Catullus 3 984 07/05/2022, 08:53 AM Last Post: Catullus Thoughts on hyper-operations of rational but non-integer orders? VSO 4 5,284 06/30/2022, 11:41 PM Last Post: MphLee On my old fractional calculus approach to hyper-operations JmsNxn 14 7,131 07/07/2021, 07:35 AM Last Post: JmsNxn hyper 0 dantheman163 2 6,364 03/09/2021, 10:28 PM Last Post: MphLee On to C^\infty--and attempts at C^\infty hyper-operations JmsNxn 11 7,102 03/02/2021, 09:55 PM Last Post: JmsNxn Operational iteration Xorter 2 6,803 07/27/2017, 12:24 AM Last Post: tommy1729

Users browsing this thread: 1 Guest(s)