# What is an irrational number relevant to computer science? [closed]

For a project we're working on right now, we want to pull a Donald Knuth and have a version number that converged towards some irrational number. However, we don't want to use something boring like pi, e, sqrt(2), etc. Is there an irrational number that is particularly relevant to computer science that we could employ?

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## closed as too broad by Antti Haapala, emmanuel, Zero Piraeus, AstroCB, JuergenMar 9 at 2:04

There are either too many possible answers, or good answers would be too long for this format. Please add details to narrow the answer set or to isolate an issue that can be answered in a few paragraphs. If this question can be reworded to fit the rules in the help center, please edit the question.

I'd ask that question on mathoverflow.net I'm sure they can give you pretty awesome numbers. –  Georg Schölly Nov 27 '09 at 16:49
Do the world a favor and use sensible version numbers. Donald Knuth may get away with it, because his software is so stable, but others shouldn't even try. –  starblue Nov 27 '09 at 17:18
@starblue: If you don't dream of the impossible, no one else will. –  Aaron Digulla Nov 27 '09 at 18:01
I'm voting to close this question as off-topic because it appears to be more about mathematics than programming; this is approaching "boat programming." –  AstroCB Mar 9 at 0:12

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I made myself a beaded bracelet with this number on it. It is the best number ever. Truly! –  Ether Nov 27 '09 at 16:33
The golden ratio is traditionally associated with perfection, so as your version numbers increase your program asymptotically tends towards perfection :) –  thecoop Nov 27 '09 at 16:46
And makes for a great logo, too. –  Aaron Digulla Nov 27 '09 at 16:59
In certain circles, the golden ratio is seen a bit negatively. It's like mathematical homeopathy. I wouldn't attach it to a project. An article: laputanlogic.com/articles/2005/04/14-1647-4601.html –  otakucode Mar 8 at 17:42

0.1123581321345589144233377...

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[citation needed] –  Ether Nov 27 '09 at 17:31

pi and e are also transcendental numbers.

Check out some known transcendental numbers.

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The amount of money on Bill Gates bank account divided by the number of bugs in M\$'s product? Pretty irrational to me ;) Only it's always shifting ... So you may end up with version numbers that are going backwards ... Or would they ... hmmm ...

The number would get smaller if Bill's bank account would shrink (okay, that happens: He's spending billions on charity) or when the number of bugs goes up.

Conclusion: It would be version number that's a) irrational, b) steadily shrinking over a longer period of time and c) funny. Bill's bank account can be found in Forbes list. It's updated every year which should be OK unless you plan for more releases. It's not 100% accurate but we're dealing with such big numbers, it shouldn't matter until you need more than 5 digits of precision.

Now the number of bugs might be somewhat hard to get by. Maybe ask the guy who posted "still 65'000 bugs left in Vista"?

SCNR

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Dude, it's not 1995 anymore, Bill Gates/Microsoft bashing is soooo nineties and 2010 is just around the corner... You have stay up to date, cool people hate staticly typed languages this week. –  Tamas Czinege Nov 27 '09 at 17:30
Yeah, it's true ... but still ... couldn't really pass this one up. Makes me wonder if that number would be >> 1, around 1 or << 1 :) –  Aaron Digulla Nov 27 '09 at 17:59

π in Base 3: 10.0102110…

Or iⁱ = 0.207879576… or whatever that is in base 3.

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