TPID 6
#1
Question 
(05/01/2009, 09:20 AM)bo198214 Wrote: For a discussion of the topic see http://math.eretrandre.org/tetrationforum/showthread.php?tid=198&pid=2411#pid2411
Conjecture
Let \( b=\sqrt{2} \). Every real function \( f \) on \( (-2,\infty) \) that satisfies:
\( f(0)=1 \)
\( f(x+1)=b^{f(x)} \)
\( f(-f(x))=-x \)

is not continuous at any point..
If I click on the link to that thread it says "The specified thread does not exist.".
Why did that happen?
Please remember to stay hydrated.
ฅ(ミ⚈ ﻌ ⚈ミ)ฅ Sincerely: Catullus /ᐠ_ ꞈ _ᐟ\
Reply
#2
(07/03/2022, 09:39 AM)Catullus Wrote:
(05/01/2009, 09:20 AM)bo198214 Wrote: For a discussion of the topic see http://math.eretrandre.org/tetrationforum/showthread.php?tid=198&pid=2411#pid2411
Conjecture
Let \( b=\sqrt{2} \). Every real function \( f \) on \( (-2,\infty) \) that satisfies:
\( f(0)=1 \)
\( f(x+1)=b^{f(x)} \)
\( f(-f(x))=-x \)

is not continuous at any point..
If I click on the link to that thread it says "The specified thread does not exist.".
Why did that happen?

Yes i confirm these missing or dead links that Cattulus points out !

Are they accidentally in hyperoperations ? 

I cannot find certain posts anymore and I take that serious !


regards

tommy1729
Reply


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