Talk:Persistence of a number

Latest comment: 1 year ago by Nucg5040 in topic title

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I'm dubious about the words 'simplest form,' since I don't see how we can call 9 the 'simplest form' of 2781. How is 9 a form of 2781?! Usually when we say "simplest form" (reducing fractions, simplifying algebraic expressions, etc.), we're making only a cosmetic change. Changing 2781 into 9 is more than cosmetic. Doops 16:49, 30 Apr 2004 (UTC)

Presumably the term persistence can be used in other ways, other than referring to digital roots by addition or multiplication. Let me try and fix that sentence. Dysprosia 00:40, 1 May 2004 (UTC)Reply
Of course, the wording simplest form is too fuzzy; instead, it is a fixed point of the operation, i.e. a number on which the operation yields the same number again. I have majorly rewritten the article to account for that. By the way, I don't think the term persistence of a number is used in mathematics for anything but the additive and multiplicative persistence. Therefore, I think we can get rid of the overly abstract first sentence and just say what additive and multiplicative persistence is. Comments? --Yogi de 22:17, 5 Jun 2005 (UTC)

Reading this article is a good example of the need for some way of easily reading large digits if one wants to quickly know the size. I prefer commas, 234,234,234,234.0234, but I don't mind spaces 234 234 234 234 023 4, as either is better than 234234234234.0234. Without such a visual aid, it is annoying and I suppose stubborn persistence not to make a decision on whether or not to use commas or spaces, use ISO or not. —Preceding unsigned comment added by 75.55.127.248 (talk) 03:05, 31 July 2009 (UTC)Reply

Are any results known for non-decimal bases? Double sharp (talk) 10:19, 20 June 2014 (UTC)Reply

Clarifying the simple algorithm for calculating the persistence of a number.

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In the article, it says "By cleverly using the specific properties of numbers in this sequence, the above terms can be calculated in a fraction of a second.". Is it possible if a citation to this algorithm, or a brief explanation could be provided? I think that would provide a clearer understanding of the mathematics to the reader. — Preceding unsigned comment added by Svdsps (talkcontribs) 20:55, 23 January 2017 (UTC)Reply

I agree that this sentence was not very helpful. I replaced it by a more precise description of the properties that help speed the search. —David Eppstein (talk) 23:07, 23 January 2017 (UTC)Reply
Oh yee of uncertain faith, to wit: function multiplicativePersistence(a,b){for(var d=0,f=a.toString(b);console.log(d+":"+f),!(1>=f.length);)f=[...f].map(h=>parseInt(h,b)).reduce((h,i)=>h*i,1).toString(b),d++;return d} multiplicativePersistence(277777788888899,10); WurmWoodeT 14:34, 29 March 2019 (UTC)Reply

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i think the current title, "Persistence of a number", is a bit too wordy and i propose moving it to "Persistence (mathematics)"

Nucg5040 (talk) 13:25, 22 November 2022 (UTC)Reply