• EnPassant
    667
    x = 0.999...
    10x = 9.999...
    Michael

    Nice. But it still begs the question: what does it mean to say x = 0.999...?
    It means an infinity of 9s but what can that mean when infinity is not a number?
    You have to say x = lim 9/10 + 9/100 + 9/1000 + ...
    And we are back to square 1. (Uh, I mean square 0.999...)

    How do you know it's infinity and not, say, an octillion?InPitzotl

    Because I know it is not any nameable number.
  • fdrake
    6.6k


  • EnPassant
    667
    fdrakefdrake

    Yes, but that is the limit which is different from equals. When you say 1 = you are saying 1 = the limit not simply 1 =

    It should be written
    lim
    not simply
  • fdrake
    6.6k
    Yes, but that is the limit which is different from equals. When you say 1 = you are saying 1 = the limit not simply 1 =EnPassant

    What is the limit of the series {0.9,0.99,0.999,...}? Call this x.
    What does the symbol "0.999..." represent? Call this y.

    Is x=y ?
  • EnPassant
    667
    What is the limit of the series {0.9,0.99,0.999,...}? Call this x.
    What does the symbol "0.999..." represent? Call this y.

    Is x=y ?
    fdrake

    It depends on how you read these expressions. I'll grant you that 0.999... can be identical to the limit of the series if that's how you interpret it. But if you do you interpret it as a limit not as equals.
    You can say 0.999...= 1 if by that you mean the limit of 0.999...
  • EnPassant
    667
    fdrakeEnPassant

    What is the difference between
    = x and
    lim = x ?
  • Kenosha Kid
    3.2k
    There isn't. What you're looking for is the infinity symbol above the Sigma.

    Need to figure out that sexy equation mode.
  • InPitzotl
    880
    "How do you know it's infinity and not, say, an octillion?" -- InPitzotl
    Because I know it is not any nameable number.
    EnPassant
    You answered only half of the question... the half about your knowing that it's not any nameable number. What about the other half... how do you know it's infinite?

    ETA: Probably obsolete now... once you accept that it's infinite, we could then enumerate as statements the meaning of each finite decimal expansion, and agree that we have no such infinite statement; then we can define the infinite statement to mean the limit (after possibly a quibble that we're defining the finite expansion's meaning anyway).
  • fdrake
    6.6k
    You can say 0.999...= 1 if by that you mean the limit of 0.999...EnPassant

    That is exactly how it is meant. That is what 0.999... means.



    The infinite sum notation just means , that means; for a sequence , the value is the limit. is the limit of the sequence of partial sums , which is equal to 1.



    Wrote a guide here. It's essentially LateX if you're familiar with it, though without lots of the standard packages.
  • Kenosha Kid
    3.2k
    Wrote a guide here. It's essentially LateX if you're familiar with it, though without lots of the standard packages.fdrake

  • jgill
    3.9k
    Just a comment about posting math material, symbols, equations, etc. I doubt if anyone here uses it, but MathType is very easy to use and is WYSIWYG rather than coding for each symbol. Under cut and paste preferences, choosing the Wikipedia option and pasting on this forum only requires changing <...> to [...], etc.
  • fdrake
    6.6k


    :up:

    <math>
    
    to
    [math][/math]
    
    .
  • EnPassant
    667
    There isn't. What you're looking for is the infinity symbol above the Sigma.Kenosha Kid

    I just left it out for brevity. I'm sure you know what i mean.

    That is exactly how it is meant. That is what 0.999... means.fdrake

    Ok, I'll accept that. But what we are talking about here is subtle and the " = " sign in calculus can be misleading:

    is a literal sum.

    lim is not a sum. It is the limit towards which the sum (over the range) converges.

    That is the difference.
  • EnPassant
    667
    Just a comment about posting math material, symbols, equations, etc. I doubt if anyone here uses it, but MathType is very easy to use and is WYSIWYG rather than coding for each symbol.jgill

    The first post on this math forum explains how to us the math tags.

    https://thephilosophyforum.com/discussion/5224/mathjax-tutorial-typeset-logic-neatly-so-that-people-read-your-posts
  • fdrake
    6.6k
    Ok, I'll accept that.EnPassant

    Great. That means you accept !
  • EnPassant
    667
    Great. That means you accept
    0.999... = 1
    fdrake
    Only according to a strict interpretation of the ' = ' sign: 1 is not the sum. It is the limit of the sum. So 0.999... = 1 does not mean it is literally 1. It means 1 is the limit.
  • fdrake
    6.6k
    It means 1 is the limit.EnPassant

    Ok, I'll accept that.EnPassant

    You just accepted that 0.999... is the limit of {0.9,0.99,0.999,...}, and equal to 1.
  • EnPassant
    667
    You just accepted that 0.999... is the limit of {0.9,0.99,0.999,...}, and equal to 1fdrake

    Yes of course. I have not said it is not the limit. I said 0.999... is not equal to 1 if we are talking about a literal sum. If we are talking about a limit, yes, the limit is 1. I keep saying a sum and a limit are not the same thing.
  • tim wood
    9.3k
    Try this: .999... is not a number because it has a indefinite extension.Metaphysician Undercover

    .999... is obviously not a number. It is a numeral. 1, 2, 3, ..., are obviously not numbers. They are numerals. It's a difference that makes a difference. I'm surprised you need to have that pointed out to you.
  • EnPassant
    667
    is the limit of the sequence of partial sums fdrake

    Yes, 'partial' sums. That means the sums are finite. Calculus does not speak about literal infinite sums. It speaks about finite sums approaching a limit. As more terms are added indefinitely, the limit is approached more closely. That is what calculus is saying.

    What I am saying is that a literal infinite sum is probably an incoherent concept.
  • Pfhorrest
    4.6k
    Calculus does not speak about literal infinite sums. It speaks about finite sums approaching a limit.EnPassant

    It does though. It defines the sum of an infinite series as the limit that the partial sums approach.
  • Metaphysician Undercover
    13.2k
    .999... is obviously not a number. It is a numeral. 1, 2, 3, ..., are obviously not numbers. They are numerals. It's a difference that makes a difference. I'm surprised you need to have that pointed out to you.tim wood

    Whether or not .999...qualifies as a numeral is a matter of interpretation. What I meant, as you seem to have difficulty in understanding, is that it does not signify a number. Whether or not .999... is a numeral is a semantic issue involving the meaning or definition of "numeral" being applied, and is irrelevant to the point that I was making, that .999... does not signify a number. If you'd like to discuss this point, please do not just create a distraction like that.
  • tim wood
    9.3k
    Whether or not .999...qualifies as a numeral is a matter of interpretation.Metaphysician Undercover
    How so? What else would it be?
    As a numeral, it's nothing in itself but a sign of something. But a sign of what? Well, the people who define these things have told us. Except that some people don't care and jump into the middle of the thing and with no sense at all say approximately that everyone else is wrong and they alone are correct - forgetting that the sign is nothing but a matter of definition, being in itself nothing. So go back to the OP, read it, understand it, and then tell us what is wrong with it - but that you cannot do; that you will not do. As to telling us that the definition is wrong, that's simply delusional.
  • Metaphysician Undercover
    13.2k
    As a numeral, it's nothing in itself but a sign of something. But a sign of what? Well, the people who define these things have told us.tim wood

    A numeral is a special type of sign. To know whether .999... qualifies as a numeral would require a definition which dictates the criteria for being a numeral.

    But as I said, that issue is just a distraction. What matters to the present discussion is that .999... does not represent a number. Nor does .111... represent a number, and that's the problem with the op. Whether or not these could still be numerals, which do not represent numbers, is a matter of one's interpretation of "numeral", and this is not relevant.

    The rest of your post doesn't seem to make any sense.
  • Banno
    25k
    Try this: .999... is not a number because it has a indefinite extension. A number is an object and an object cannot have an indefinite extension.Metaphysician Undercover

    Hm. So present the object 1; that object to which "1" refers. Then your point will be made.

    But you cannot. Numbers are not objects.

    "1" does not refer to anything.
  • jgill
    3.9k
    Whether or not .999...qualifies as a numeral is a matter of interpretation. What I meant, as you seem to have difficulty in understanding, is that it does not signify a numberMetaphysician Undercover

    .999... is obviously not a number. It is a numeral.tim wood

    :rofl:
  • jorndoe
    3.6k
    , indeed, calling infinitesimals

    Ghosts of departed Quantities — Berkeley

    goes along with (contemporary) calculus. They do occasionally come up as matters of convenience or tradition (e.g. in notation), but not of necessity.

    Another possible source of confusion could be the Archimedean properties[23][24][25]: neither ∞ nor infinitesimals[26] are real numbers[27][28].

    Ghosts couldn't comprise a "boundary" between 0.999... and 1.


    23, 24, 25, 26, 27, 28
  • InPitzotl
    880
    What matters to the present discussion is that .999... does not represent a number. Nor does .111... represent a number, and that's the problem with the op.Metaphysician Undercover
    What a silly thing to say. .999, eighteen, XVI, and .999... all represent numbers.
  • TheMadFool
    13.8k
    I suggest that we look at this issue from the standpoint of expressions. Just like someone might say, "I love you to death" and then express the very same thing as, "I love you more than anything else in this world", the quantity 1 can be expressed as 0.999...

    In other words, the quantity 1 = the quantity 0.999...

    The only difference is in the expression.

    The difficulty with accepting the truth of 1 = 0.999...is in no small part due to the fact that the one's place in 0.999... is vacant while that in 1 is occupied by the digit 1. Quite obviously there's a discrepancy here - how can 1.000... be equal to 0.999...?

    But seeing it that way is to ignore the infinite 9's that follow the decimal point in 0.999... Infinity should never be ignored is the main lesson here.
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