Talk:Unary numeral system

Latest comment: 2 years ago by Bando26 in topic Quinary?

Multiplication and Division

edit

The article asserts that "Multiplication and division are more cumbersome"

Addition and subtraction are particularly simple in the unary system, as they involve little more than string concatenation. Multiplication and division are more cumbersome, however.

They seem pretty trivial to me. There is no citation for this assertion. If Addition is "little more than string concatenation", then surely multiplication is simply "repeated concatenation". Division is a little odd, but I would not call it cumbersome. —Preceding unsigned comment added by Kwerle (talkcontribs) 17:20, 4 February 2010 (UTC)Reply

Unary 8 image

edit

er... the bottom graphic for '8' seems to actually be 9... the tally on the left has 5 vertical bars and 1 horizontal, instead of 4 vertical and 1 horizontal. Someone might want to fix that.

Image:Unary_numeral_eight.png fixed --Henrygb 03:24, 18 Mar 2005 (UTC)
Whoa. I got to this article just as you made that change. It was five when I got the article, and four when I got to the image page. - Vague | Rant 12:51, Mar 18, 2005 (UTC)
Well, judging by the timestamps, I'd say I actually arrived as the cache was being cleared. Same difference. - Vague | Rant 12:52, Mar 18, 2005 (UTC)

0 in unary

edit

I am top-posting. Sorry if anyone is offended. The notion of zero is a relatively recent one - see http://en.wikipedia.org/wiki/Zero#History . There is no zero in unary. Kwerle (talk) 03:20, 22 November 2010 (UTC)Reply

Am I correct in assuming the unary numeral system is incapable of showing 0? Negative numbers work by putting a minus-sign in front of the digits, just like with any other system, but 0 doesn't seem possible. Of course you'd sort of expect unary's first digit to be the 0, just like every other system's, but that obviously wouldn't work either. :) So, can anyone with the proper knowhow add something sensible about 0 (and negative numbers) to the article? Thanks! Retodon8 18:19, 13 October 2005 (UTC)Reply

This whole page is inaccurate since following the pattern set by other bases (the first digit in the set of available digits being 0) would lead to any unary system equating to zero (0, 00, 000, 0000, ... all equal zero). ThomasWinwood 12:11, 26 October 2005 (UTC)Reply
Well, since n in all other n-ary bases is represented as 10, it could possibly be 0, 10, 100, 1000. But... that's be retarded. I think a problem here is that, in all other n-ary bases, adding a zero to the end of a number multiplies it by n. In my above attempt at consistency with other bases, adding a 0 would add 1, it wouldn't multiply by 1 (since that gets you nowhere). There doesn't seem to be any way to make it rationally system with the other systems. It seems that, due to the explicitly multiplicative nature of a position number system, there's no way to make a consistent base 1 system; 2 is the smallest integer that can be used multiplicatively.98.95.203.214 (talk) 03:54, 29 September 2011 (UTC)Reply
Yes, that's (part of) what I said, but how does that make this page inaccurate? I'd call it incomplete, because I'd like to see the 0 thing talked about. It does make unary an exceptional base system. Basically it is another symptom for the problem my question was about... how to show the value 0 in unary. I guess it's really as simple as I assumed... it's just not possible. Retodon8 17:35, 26 October 2005 (UTC)Reply
Unary is basically the system of using strike marks. If you try to write zero in strike marks -- well, you're basically done before you start. "|" is one. "||" is two. || - || = nothing, or null, or the null symbol. But it is not "0" in that you can't do the usual things you can do with a zero. You can not write "||0" and mean twenty; if you do, it really is not unary.

I Don't see why there wouldn't be a zero in unary. 68.118.248.157

Well, I don't know another way to explain. Maybe... try figuring out how you would write zero if you only have the "1" character" (or "|" or whatever), and you'll reach the same conclusion. You can't. You can just not write anything at all, but not having a character for zero disallows a lot of useful stuff in calculations. Retodon8 23:07, 4 January 2006 (UTC)Reply
For example? Kwerle (talk) 03:20, 22 November 2010 (UTC)Reply

The thing is, 'the unary numeral system' is a misnomer. It's something that doesn't exist. For any numeral system, you need an origin (zero) and a unit (one). Your 'digits' go from the origin to the number of the base minus one. A number is the summation of each digit times the base to the power of the position of the digit, where the last digit has position zero. So '||||' in unary is 0 * 1^3 + 0 * 1^2 + 0 * 1^1 + 0 * 1^0. Therefore, the smallest possible base is 2. Talking about zero or negative numbers doesn't make sense, because the 'unary' system doesn't make mathematical sense to begin with. SeverityOne 21:06, 6 February 2006 (UTC)Reply

You are off by one - though I don't know that your definition is required for unary. So '||||' in unary is 1 * 1^4 + 1 * 1^3 + 1*1^2 + 1*1^1 + 1*1^0 = 5 (base 10). So by your definition, unary works just fine. -1 in unary is just "-|". Nothing in unary is null or nothing. "" Kwerle (talk) 03:20, 22 November 2010 (UTC)Reply

Further to your point, if "unary" is defined as a base system with only one mark, what is the correct name for a positional base-1 system following the normal rules of positional notation?

  • Decimal: value of digit n in position x = n×10^x
  • Binary: value of digit n in position x = n×2^x
  • Base 1: value of digit n in position x = n×1^x
  • Phinary: value of digit n in position x = n×φ^x

If Phinary can allow 0 and 1 as standard digits, why can't base 1 have them? --Slashme (talk) 01:31, 18 July 2011 (UTC)Reply

Perhaps the difficulty in representing zero in a system like this can be a possible explanation of the late arrival of the concept of zero. Non-positional systems don't need a zero. it wasn't invented until the numbers being counted grew so large that a non-positional system was unfeasible. Any body know of a similar conjecture in a reliable source? Cliff (talk) 04:25, 29 September 2011 (UTC)Reply

Off-topic original research, not related to improvement of the article based on published reliable sources
The following discussion has been closed. Please do not modify it.

Here is a Unary Radix Positional System that makes sense of both Zero and Fractions, but i saw no place to insert it in an article as yet.

First: Invent a Unary Point.

One might use u for such, but when it is assumed that we are using radix unary, good old . will do just fine.

Every digit position x left of a Unary Point has a value of

For x = 0,1,2,3... 1^x = 1

So this Is a positional radix system.

There is an infinite number of ways to represent each Integer:

111. = 1011. = 110. = 111000. = 00010110. etc.

Though we might make it an Unary Convention to Eliminate all Zeros to show a Unary number in its most compact form, unless otherwise required.

Fractions are Entirely A Comvention; An Abbreviated Unary Fraction.

Omitting a Unary point as redundant for Integers, we have:

1111 ÷ 1111 = 4/4 0111 ÷ 1111 = 3/4 0011 ÷ 1111 = 2/4 0001 ÷ 1111 = 1/4 0000 ÷ 1111 = 0/4

All are Proper Unary Fractions, although 4/4 would by convention be handled by placing another 1 nearest left of Unary Point, and 0 can be simply shown as 0 if desired.

Also:

.1111 ÷ 1111 = 4/4 = 1 .0111 ÷ 1111 = 3/4 .0011 ÷ 1111 = 2/4 = 1/2 .0001 ÷ 1111 = 1/4 .0000 ÷ 1111 = 0/4 = 0

If by Convention we always choose this above form for Every Unary fraction:

.00111 ÷ 11111 = 3/5 .00000001 ÷ 11111111 = 1/8 Etc.

We observe that each denominator has as many 1s in it as its rightmost position value [1^-x], Simply x.

So we can by Convention omit all denominators.

111.001 = 3+1/3 = 3.3333...

Now There is a curious result:

A Terminating Unary Fraction that represents a Repeating Decimal Fraction.

So Why Not ?

I don't see this as damaging Foundations of Mathematics.

Do you ?

🐱🐱🐱

FritzYCat (talk) 23:17, 22 February 2020 (UTC)Reply

A decent integer representation of Pi is 3+16/113 = 3.14159292035... just 2.6676... units high in y 7th decimal place.

Approximately Pi in Unary: 111.00000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001111111111111111

There, it's been did.

🐱🐱🐱 FritzYCat (talk) 00:13, 23 February 2020 (UTC)Reply

Base26: (let Z = Zero = 0)

1 = A = .YYYYYYY...

Hex:

1 = .FFFFFFF...

Decimal:

1 = .9999999...

Octal:

1 = .7777777...

Bin:

1 = .1111111...

Unary:

1 = .1111111...

Looking better and better.

🐱🐱🐱

FritzYCat (talk) 00:51, 23 February 2020 (UTC)Reply

I think a suitable neural net could learn to do nearly instant addition in this Unary system.

🐱🐱🐱

FritzYCat (talk) 01:55, 23 February 2020 (UTC)Reply

How to indicate Zero; 0 in Conventional Unary ?

Simple !

Let me count ye ways:

.....Etc. 3 = 111. 2 = 11. 1 = 1.

0 = 0. = .0 = . = = =

1/1 =.1 = 1. = 1/1 = .1/1 1/2 = .01 = 1/11 = .1/11 2/2 = .11 = 11/11 = .1 = 1. 1/3 = .001 = 1/111 2/3 = .011 = .11/111 3/3 = .111 = .111/111 = .1 Etc......

Empty [Space] is Zero:

2 = 11 = 1 1 = 101 = 1  1 = 1001 ETC. 

If you're Zero Key 0 is broken on your typewriter, Then . Alone implys Zero: No 1s, No Fractions, Unoccupied Space, Therefore 0 it Shall be.

A NonTautological Zero If you wish:

0 is Tautological because First one defines a Space, Then one puts a Null Symbol in that Space in order to Explicitly Indicate that There Is Nothing In This Space, Therefore Coincidentally Filling This Space.

One may Logically, then, Knowing that there is Nothing In This Space, Even though a 0 fills this Space, Ignore This Tautology.

0 x = 0 x 0 = Space = 0

0 is Infinitely Tautological: An Infinitely Identical Identity

0 = 0 + 0 + 0 + 0 + 0 +...

0 = 0 x 0 x 0 x 0 x 0 x...

0 = 0^0 = 0^1 = 0^2 = 0^...

0 = 0/0 = / =/= 0/0 = 0/1 = 0/2 = 0/...

In Unary: O^0 is No Space is No 0 0^1 is 1 Space is 0 0^2 = 00 0^3 = 000 Etc.

Handy for anbreviating Long strings of 0 and 1 Because 0^N and 1^N have trivial meaning and little practical use, In Unary; if we so desire, We Shall use ^ Thusly within Unary Point Fractions:

Pi approx = 22/7 = 3 1/7

3 1/7 = 111.0000001 or

3 1/7 = 111.0^6,1 6 + 1 = 7

3 16/113 = 111.0^97,1^16

97 + 16 = 113


1 way of conceiving 0 is as Totally Independent of These Operators: Space . + - x / ^


Quoth Captain Picard:

Make It So.


So It Is.

There, it's been did.

🐱🐱🐱

FritzYCat (talk) 18:34, 29 February 2020 (UTC)Reply

These are the 1-adic numbers!

edit

The numeral system described here as "unary numeral system", but without 0, is rather the 1-adic numeral system. Consider

  • in the p-ary numeral system there are p number symbols, the first one with value 0, the last one with value p-1. As SeverityOne points out, it does not make sence below base 2. In the true unuary numeral system, the only number symbol would be 0. The only representable number would be zero as well, represented by all possible strings: 0, 00, 000, -0, -00, -000, etc.
  • in the p-adic numeral system there are p number symbols, the first one with value 1, the last one with value p. This would mean the only symbol in the 1-adic numeral system has value 1. This (and all the other properties of 1-adic numbers) are in accordance with the system described in this article.

Adhemar 13:01, 21 February 2007 (UTC)Reply

I don't think that's quite accurate, p-adic numbers are usually considered to be expressions
 
where   are taken over the set {0, 1, ... p-1}. Thus there is still only 1 1-adic number, 0. Cheers, — sligocki (talk) 05:59, 26 October 2009 (UTC)Reply
Cheers. But nobody is talking about p-adic numbers here. 1-adic numbers are k-adic or bijective numbers. — Preceding unsigned comment added by 77.169.168.165 (talk) 18:23, 2 December 2012 (UTC)Reply

Non-standard positional numeral systems

edit
I have addressed certain issues by creating the article Non-standard positional numeral systems, and making related changes to Unary numeral system, Golden ratio base, Quater-imaginary base, Positional notation, Base (mathematics), and Category:Positional numeral systems. I suggest further discussion of these issues takes place at talk:Non-standard positional numeral systems.--Niels Ø 14:30, 26 February 2006 (UTC)Reply

Unary is not a positional system, even a nonstandard one (though the others you listed are). The "digits" in unary do not depend on position: five tally marks represent the number five, and will still unambiguously represent the number five if you write the same five tally marks in a different order. -- Milo

I initially held the same point of view, but others did consider unary a pos.num.syst., which basically is what made me create the non-std. article. I will now revert your changes; I think the matter should be discussed here first.--Niels Ø 07:41, 2 November 2006 (UTC)Reply
The unary numeral system (base-1, a non-standard positional numeral system) ...

How is unary a positional system? -- Jao 11:43, 27 February 2006 (UTC)Reply

Read the article Non-standard positional numeral systems. One can argue either way, hence non-standard. If you can find an elegant way of putting it, perhaps something like unary, arguably a non-standard positional..., please go ahead and edit accordingly.--Niels Ø 16:52, 27 February 2006 (UTC)Reply
If it is truly "arguably" a positional system, then this is the place to start arguing for it. I have not seen any such arguments, so at the moment the statement is completely unfounded. Incidentally, Non-standard positional numeral systems argues that unary is a non-standard system (which is quite clear), but not that it is a positional system. -- Jao 14:23, 2 November 2006 (UTC)Reply
From Non-standard positional numeral systems:
In a standard positional numeral system, the base b is a positive integer, and b different numerals are used to represent all non-negative integers. Each numeral represents one of the values 0, 1, 2, etc., up to b-1, but the value also depends on the position of the digit in a number. The value of a digit string like   in base b is
 .
So what applies to unary, and what not? (Surely, not everything must apply; that's the whole point of considering it a "non-std." system.) The base b=1 is a positive integer; b different numreals are used to represent all non-negative integers (or at least the positive ones; zero only if you allow an null string to represent it); the numeral represents 1 instead b-1=0 as it "should"; the value does not depend on the position, but the equation above applies all the same - because all powers of b are 1. So, many of the standard features do apply, including the equation  , but of course, your objections are caused by the fact that a feature that does not apply is the one implied by the word "position" in the name "positional numeral system". This is a strong argument, but consider that unary undeniably is the bijective numeration system base 1, and all the other bijective numeration systems are positional numeral systems. This proves nothing, but it means that Unary should remain closely linked to Positional numeral system and other related articles. Suppose pos.num.syst.s were called "weighted digit numeration systems" instead (as the digits are assigned weights depending on their position); then we could all agree to include unary as a special case where the weights happen to be all equal.
I suggest we leave unary in the non-std. category, but I also think it's a good idea to mention the doubts one may have about this classification in the article. If unary is not a positional system, it is at least intimately connected to the positional systems, and that must be reflected in our articles. Entirely deleting the section on unary from the article Non-standard positional numeral systems and deleting references to positional systems from Unary is not the way.--Niels Ø 15:00, 2 November 2006 (UTC)Reply

One can consider uniary as a standard number system by noting that it does not require the number value zero. In other standard number systems the sybmol 0 is used for the value zero because it is used as a place holder (e.g. in the decimal number 105). This place holder requirement does not exist in unary so the glyph 0 is free to be used for the value 1. This yields a system using only the glyph 0 and is different from the marking system. 69.118.118.118 05:39, 29 January 2007 (UTC)Reply

Unary in theoretical computer science

edit

The article makes out the use of unary in theoretical computer science to be sneaky. I'm sure the reasons unary is used is nothing of the sort. It is used to make formal models of computation manageable. Try writing a Turing machine that multiplies together two numbers given in binary. It is not easy.

Incidentally, in the theory of computation, a modified unary system is often used. In this modified system, "1" means 0, "11" means 1, and so on, so that 0 is representable. CyborgTosser (Only half the battle) 14:04, 17 February 2006 (UTC)Reply

definitely

Proposed merge of Tally mark into this article

edit

Someone added merge tags to Unary numeral system and Tally mark, but failed (I think) to provide arguments or start a discussion, which I hereby do:

  • Oppose: While the things are closely related, I think it's reasonable to have separate articles. Tally marks are unary numeral systems all right, but they are more than that. They have a cultural history, and take different forms in different cultures.--Niels Ø (noe) (talk) 13:34, 19 November 2007 (UTC)Reply

Does the Unary System even exist?

edit

I'm not sure if it is possible to have a unary system, for when you try the unary system it always relies on a nothing to differentiate it between the something hence using 2 numerals. Does that make sense? It does to me anyway. —Preceding unsigned comment added by 65.30.72.135 (talk) 07:28, 4 June 2008 (UTC)Reply

Unary is not a positional notation but a bijective notation. The base-1 positional notation doesn't exist. The base-10 bijective goes like 1, 2, 3, 4, 5, 6, 7, 8, 9, A, 11, 12, ..., 19, 1A, 21, ..., 99, 9A, A1, ... - TAKASUGI Shinji (talk) 08:14, 4 June 2008 (UTC)Reply
See Non-standard positional numeral systems.--Noe (talk) 16:00, 4 June 2008 (UTC)Reply
I also agree on the fact that Base 1 is not even possible. Since Base 1 does not have a character "0", any number in Base 1 would equal to infinity because the number would continue on both the left and right sides of the number. For example, the number 410 is equal to the number 00000000000000004.0000000000010 because the zeros go on infinitely on both the left and right sides of the number however, the extra zeros are cut off because they are irrelevant. However, in Base 1, there is only one kind of number so therefore the number 111111111 in Base 1 is equal to 111111111111111111 and is also equivalent to 1 and is also equal to 1.11111111111(etc.). If all numbers are equal to infinity then you cannot do math using Base 1. If you cannot do math or represent numbers in a finite way than you really do not have a base at all. Also, another way to think about Base 1 is to think of a blackboard. A blank blackboard, in reality, is Base 1. There is only one kind of color and therefore there is nothing you can do with a blank blackboard. However, once you start to use chalk then you have two colors, black and white.(aka binary)--JavaBinaryUser (talk) 04:21, 15 August 2013 (UTC)Reply

Simplest?

edit

Really? From the number of confused asking questions here, it seems that many people find the system they learned in (usually denary) to be the simplest. I suggest removal of this term. Objections?Cliff (talk) 18:26, 14 February 2011 (UTC)Reply

Of course it's the simplest; it is one-to-one: Three cows, three cats, three dollars, three points, three whatever, is represented by three (often indentical) glyphs. People may misunderstand or have questions about the explanations and other things in the article; they are not misunderstanding unary numbers. Does the simplicity have to be mentioned in the first sentence of the article? Perhaps not, but it certainly makes sense to me.-- (talk) 22:07, 14 February 2011 (UTC)Reply

Base 1 Redirect

edit

I feel Unary system is different from base 1 in many ways, for example not being base 1, therefore the redirect from Base 1 should be removed and an article created describing a numeral system in which only 0 may exist because the maximimum is 1. Does anyone object? Does anyone agree?--Sonez1113 (talk) 18:43, 15 March 2011 (UTC)Reply

That does not sound like a notable system. The whole point of having number systems in the first place is to represent all numbers, why would you have one that represented only one number? Although this is not a positional number system, it is a base 1 bijective number system and AFAIK the only system commonly called base 1. Cheers, — sligocki (talk) 01:07, 16 March 2011 (UTC)Reply

The redirect from Base 1 needs to be removed for several reasons. First, mentioned specifically in the Unary page is that Unary is a bijective base-1 numeral system. That is not the same thing as a base otherwise it would be mentioned that Unary was a base and not a bijective numeral system. Since Unary is not a base, then most definitely Base 1 should not be redirected to Unary. Second of all, I would argue that Base 1 does not exist, whereas, Unary does. A Base-1 chart is shown in the same fashion of a binary chart:

1^-3=1

1^-2=1

1^-1=1

1^0=1

1^1=1

1^2=1

1^3=1

1^4=1

Given the Base 1 chart and using one's reasoning skills, it can be seen that in Base 1 one cannot represent 0 in decimal or any other number in decimal that is not an integer. All other bases have an equal counterpart to any random number in another base. Following are some examples in case you are not following this: The number 10 in binary is equal to the number 2 in decimal. The number 10 in decimal is equal to "a" in hexadecimal. The number 20 in Octal is equal to the number 10 in hexadecimal. All bases have a number that is an equal counterpart to any random number of any other base. Yet, Base 1 fails to do so. For the number 10.5 in decimal, there is no Base 1 counterpart. Again, for the binary number 101.10110, there is no Base 1 counterpart. Once again, for the hexadecimal number 41.245, there is no Base 1 counterpart. Recalling upon the event upon which the now dwarf-planet Pluto was no longer accepted as a planet, what was the foundation reason for why Pluto was not longer accepted as a planet? The reason was that Pluto did not meet the requirements to be a planet. What were the requirements modeled after? They were modeled after our own planets. I take it that essentially the reason why it was not considered a planet any longer was because it was substantially different from the other planets. Is not Base 1 the same? In addition to Base 1 not being able to have a number equal to any random number of another base, Base 1 is clearly symmetrical based off the Base 1 Chart diagramed before, and Base 1 is infinite. I will further expound upon the other two reasons now to demonstrate my point. First of all, Base 1 is symmetrical. The Base 1 Chart clearly dictates that the Base 1 number 1111 is equivalent to the Base 1 number .1111, therefore making it symmetrical. Both numbers are equal to 4 in decimal because the addition of 1^1,1^2,1^3, and 1^4 is equal to 4 in decimal as is the addition of 1^-1,1^-2,1^-3, and 1^-4. Calling again upon the reasoning of the dwarf planet Pluto, no other base has numbers that when reflected about the "." are the same equivalent in decimal still. Secondly, Base 1 is infinite. In all other bases there is a number zero that can be left off when redundant, and at least another number that is greater than 0 making them numbers with value rather than just place holders. As mentioned in the "Does the Unary System even exist?" section later down on this page, if there are not any zeros, then the number would be forced to go on forever as each number greater than zero will never be redundant except to the point in saying that each number in Base 1 is infinite. (Seriously, if you have any arguments for me, post them on this page or cause there to be some way for me to see them. I have pondered this whole concept through immensely and I would rather hear counterarguments than have readers brush this off thinking that I don't know anything.) --JavaBinaryUser (talk) 22:25, 28 October 2013 (UTC)Reply

Having a redirect from Base 1 does not mean it is equivalent to 'base 1': it simply means that this is the article that best covers that term. Any mention of 'base 1', even one explaining that it is not proper for indicating 'unary' makes it a good candidate for the redirect. I don't think any better target exists, nor that one is needed. Bcharles (talk) 22:32, 15 June 2014 (UTC)Reply

trying to be too clever, you've introduced an inconsistency into these wiki pages

edit

Bijective-unary is not "base 1". This business about "bijectivity" screws up the meaning of the word "radix / base". Bijectivity seems to remove "the symbol for zero" from the set of symbols, yet the definition of "radix / base" is itself based on including the symbol for zero. It's gotta be one way or the other; without rewriting all the definitions, you are going to have a problem if you "change the rules for base 1" and try to pretend it's consistent. Bijective-unary is not "base 1". 108.14.125.186 (talk) 19:15, 11 May 2013 (UTC)Reply

Empty References section

edit

Hey, i'm new to WP here. Is it proper to have an empty references section? Should it be removed or kept? Perhaps does the page deserve a missing refs templates? Scimonster (talk) 16:32, 5 March 2014 (UTC)Reply

The article has references now so no need to remove the References section. Blackbombchu (talk) 03:50, 13 November 2014 (UTC)Reply

Positional unary numeral system

edit

@David Eppstein: By regualar numeral system, I meant Positional numeral system where you have a digit for all numbers from 0 to 1 less than the base as opposed to Bijective numeral where you have a digit for all numbers from 1 to the base. Maybe the sentence you removed should get added back in except for the phrase "regular numeral system" getting replaced by "positional numeral system". Blackbombchu (talk) 03:46, 13 November 2014 (UTC)Reply

I don't think so. It seems a confusing and longwinded way of saying "this is not a positional number system". Since it isn't a positional number system, what do we care about how a nonexistent positional number system would behave? —David Eppstein (talk) 04:12, 13 November 2014 (UTC)Reply

example of multiplication

edit

"However, multiplication is more cumbersome", can somebody please add a numeral example? --Backinstadiums (talk) 14:50, 24 February 2019 (UTC)Reply

Perhaps "cumbersome" is the wrong word. The procedure itself is very straightforward: for example, to multiply ||||| by |||||||, you take each | of ||||||| and replace it by ||||| (5 × 7 = 35). However, trying to apply this to numbers of any significant size should explain pretty well without words the disadvantages of the unary system. Double sharp (talk) 05:01, 25 February 2019 (UTC)Reply

Tally marks

edit

@David Eppstein:

1. Please explain why you disagree with modification of the lead sentence on tally marks that I made here.

2. The removal of some narrative on the Chinese characters and lack of their relevance to the subject I already briefly explained in another edit summary - so if you separately disagree with that as well, please explain also.

These are two different topics. Please don't combine them in your explanation if you can :) cherkash (talk) 18:01, 22 January 2022 (UTC)Reply

Tally marks are clearly a use of the unary number system and their long historical usage should not be removed from this article. As for whether the Chinese idiograms for 1, 2, 3 are an instance of this use, my opinion is only that we should follow what the reliable sources say, as I have no particular expertise in Chinese writing myself. Do you have a good reason to doubt the sources we are using for this claim? Or do you have sources that say the opposite, that the resemblance to tally marks for these characters is only coincidental? —David Eppstein (talk) 18:50, 22 January 2022 (UTC)Reply
1. Tally marks are only strenuously related to the unary system. Neither of them derives from the other: the tally marks are clearly just a pictorial indication of separate objects (no direct relation to the unary system), whereas the unary system comes to be a particular case of a base-n system (hence again, no direct relation to the tally marks). The fact they happen to resemble each other (especially when "1" is used as a digit) is just a coincidence. The world is full of such distant relations. So we should name them what they are: superficially related things.
2. Now, based on 1 above, since any elaboration on Chinese (or any other characters) relates only to the tally marks (but not to the unary system), any mention of them better be left to the tally marks article. It doesn't need to be here. Generally, the article on X may (but doesn't have to) mention Y if it's somehow related to X. But it definitely shouldn't mention Z just because it relates to Y which in turn relates to X, without any direct link between X and Z - otherwise, we are stretching narrative too much in my opinion. cherkash (talk) 09:47, 23 January 2022 (UTC)Reply
The unary system is not a base-n system. It derives from different principles, in fact the same principles as tally marks: one mark per unit. So your whole argument is based on a false premise. —David Eppstein (talk) 20:01, 23 January 2022 (UTC)Reply

Quinary?

edit

The section "Comparison with tally mark systems" states that (real-life) tally marks are a mix of unary and quinary because they group tallies in segments of five. I believe quinary is a positional system, and while the bijective positional system base 1 is identical to unary, there is nothing positional about the way the grouping in fives work. Therefore, I'm inclined to say it is not quinary at all. Perhaps, rather than removing the statement completely, we can find a way to state it in a more correct way ("a grouping in fives, but without the positionality of the quinary system", or sth like that).-- (talk) 10:16, 29 May 2022 (UTC)Reply

While it is tempting to compare tally marks and quinary because they both group in 5’s, that’s where the similarities end. The argument falls apart after counting to 2510 (1005) where we don’t see a third “digit” added to the number. I think that tally mark groupings are for ease of reading, as we have in thousands separators. I’m reverting the edit that added this section; it was original research (admittedly so in the edit notes). —Bando26 (talk) 15:35, 3 July 2022 (UTC)Reply