I call it: the N872yt3r Sequence!

n872yt3r · 2013-03-17 23:30:25

Here's a strategy I use for the awesome topic "Post more bigger numbers".
For the N872yt3r sequence, take a number, X. Let's say X = 2, just so my calculator doesn't explode. (Try doing this with 8)
First, you add it to itself: 2+2=4.
Then multiply the result by itself and X: 4*2*4=32.
Then do that to the power of 2, 4, 2*4 (8) and itself (round it if you get an e+y on your calculator): 149088121440417.
Then find the factorial (Ugh) *Gulp*: Awww... my calculator exploded. Someone find the factorial of 149088121440417.
(Wolfram-Alpha can't do it!)
OK, so the N872yt3r equivalent to 2 is... 149088121440417!.

n872yt3r · 2013-03-17 23:31:47

And that's why on the post "Post more bigger numbers" we usually put a formula like this, not an actual number...

bobbym · 2013-03-17 23:38:21

Hi;

n872yt3r · 2013-03-17 23:42:37

Thanks.

bobbym · 2013-03-17 23:47:27

Those numbers still cannot compare to numbers like Graham's number.

n872yt3r · 2013-03-17 23:49:25

Then try putting Graham's number into the N872yt3r Sequence!

anonimnystefy · 2013-03-18 03:52:43

The last number there is still much, much larger than the n872t3r equivalent of the Graham's number.

Math Is Fun Forum

#1 2013-03-17 23:30:25

I call it: the N872yt3r Sequence!

#2 2013-03-17 23:31:47

Re: I call it: the N872yt3r Sequence!

#3 2013-03-17 23:38:21

Re: I call it: the N872yt3r Sequence!

#4 2013-03-17 23:42:37

Re: I call it: the N872yt3r Sequence!

#5 2013-03-17 23:47:27

Re: I call it: the N872yt3r Sequence!

#6 2013-03-17 23:49:25

Re: I call it: the N872yt3r Sequence!

#7 2013-03-18 03:52:43

Re: I call it: the N872yt3r Sequence!

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