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**ganesh****Moderator**- Registered: 2005-06-28
- Posts: 14,871

(1) 1.444667861...............

(a) This is the maximum value of xth root of x for any value of x.

(b) This number is also the maximum value such that

x^x^x^x^x...............ad infinitum is finite.

The number is eth root of e, the Natural logarithm base.

e is approximately 2.7182818284.

2. 1787109376

It is known that the square or any higher power of a number ending in 6 is always 6.

This holds good for 76, 376, 9376, etc.

The ten digit number given also has this property.

This can be continued indefinitely, and you get more and more digits.

PS:- Try searching with Google for these numbers. You'd be surprised by the result

Character is who you are when no one is looking.

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**mathsyperson****Moderator**- Registered: 2005-06-22
- Posts: 4,900

I remember that 2nd number! There was a topic about it a while ago.

Then further investigation revealed that there was a similar number to that, but it ended in 5.

8212890625 was the last bit. And there was the very peculiar property that if you added together the last n digits of both numbers, you always got 1000...0001, with (n-1) zeroes.

Why did the vector cross the road?

It wanted to be normal.

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**namealreadychosen****Member**- Registered: 2011-07-23
- Posts: 16

I agree with (a) but I thought that x^x^x... would be infinite if x>1 because x^x^x>x^x>x, and time ^x is added the amount by which it increases also increases.

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**bobbym****Administrator**- From: Bumpkinland
- Registered: 2009-04-12
- Posts: 89,077

Hi;

Which is approximately

1.111782011041844...

Welcome to the forum!

**In mathematics, you don't understand things. You just get used to them.**

**I agree with you regarding the satisfaction and importance of actually computing some numbers. I can't tell you how often I see time and money wasted because someone didn't bother to run the numbers.**

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**anonimnystefy****Real Member**- From: The Foundation
- Registered: 2011-05-23
- Posts: 15,609

hi

actualy the value of x^x^x^x^...:

Let s=x^x^x^...

s=x^(x^x^x^...)

s=x^s

So once we can sole this equation in terms of x then we get the value of s.

Here lies the reader who will never open this book. He is forever dead.

Taking a new step, uttering a new word, is what people fear most. ― Fyodor Dostoyevsky, Crime and Punishment

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