JavaScript

XCritics

20:00

I just had a great idea for a framework that I don't think has been covered time for some fun in the sun

Shmiddty

@Loktar good question...

Benjamin Gruenbaum

@loading... Oh, it probably is and the regex validation is probably what OP will do, but if we're talking about natural numbers as defined in math, with accordance to how the specification defines the conversion of string to int, I think my answer is what I'd use

Loktar

@Shmiddty lol yeah im searching..

cant find a deadline anywhere

maybe in the forums

Benjamin Gruenbaum

@rlemon dramatic music I AM OP

@rlemon also yeah, chat.stackoverflow.com/transcript/message/9676926#9676926

rlemon

lol

he accepted mine :P

one step closer to 10K mod tools :P

Benjamin Gruenbaum

20:03

@rlemon haha, it's really nothing but a bother, I just like answering questions :)

loading...

@BenjaminGruenbaum Yes. It covers exponents too which is nice.

Benjamin Gruenbaum

@rlemon @rlemon all it got me is all the okok flags

loading...

@BenjaminGruenbaum Just wondering: does math regard 1.0 as a natural number?

rlemon

deleted questions!

DELETED QUESTIONS!

#1 reason I want them

to lul at the stupid Qs

Benjamin Gruenbaum

@loading... Of course, why not?

@loading... Can you stick any number between 1.0 and 1 ? That's the test

If you can put a number between two numbers, they're not the same

@rlemon Yeah, that's a good reason

loading...

20:05

@BenjaminGruenbaum :-) I don't know. It has a fractional part, but it's nothing. Intuitively I'd say it was a natural number, but intuition doesn't always lead me down the right path.

Benjamin Gruenbaum

N (the natural numbers) is contained in R the real numbers

It's just how the numbers are constructed

rlemon

issue is: I think OP does not actually want natural numbers

Benjamin Gruenbaum

@rlemon Yeah, me too

Shmiddty

@Loktar thedailywtf.com/Articles/…

> 12:00AM June 28th

Loktar

cool ty

Benjamin Gruenbaum

20:08

@loading... I did that construction once here iirc, starts chat.stackoverflow.com/transcript/17?m=7626576#7626576

rlemon

god how can I make this code more WTF than what some people produce naturally

loading...

@BenjaminGruenbaum So is 1.9 recurring is a natural number, because that's an alternative notation for 2?

Benjamin Gruenbaum

@loading... You mean 1.9999999999999999999999..... ?

rlemon

1.9(repeat) is not an alternative to 2

loading...

@BenjaminGruenbaum yes, 9s to infinity.

Benjamin Gruenbaum

20:09

0.999...

In mathematics, the repeating decimal 0.999... (sometimes written with more or fewer 9s before the final ellipsis, or as 0.9, {{nowrap|\scriptstyle\mathbf{0}.\mathbf{\dot{9}},}} 0.(9)) denotes a real number that can be shown to be the number one. In other words, the symbols "0.999..." and "1" represent the same number. Proofs of this equality have been formulated with varying degrees of mathematical rigor, taking into account preferred development of the real numbers, background assumptions, historical context, and target audience. Every nonzero, terminating decimal has an equal twin r...

@loading... there's even a wikipedia article on it, 1.99999999..... is 2

rlemon

bah

lies

loading...

Oh right! Thanks

Benjamin Gruenbaum

1.9999999999999.... is a natural number :)

rlemon

math for convenience if you ask me

phenomnomnominal

easiest proof

2/3 = ?

0.6666666.....

Loktar

20:10

THE DEVILS MATH

GertV

guys, can annyone check my problem plaese i'm stuck with it for a few days now and i really need it to work asap, hope you can help me.
http://stackoverflow.com/questions/16761175/cant-find-element-in-dom-after-loading-it-with-ajax
thx in advance

Benjamin Gruenbaum

@phenomnomnominal Prove that it's worth 0.6666666666666

phenomnomnominal

I said so: QE :D

Benjamin Gruenbaum

Lol, I should start signing my proofs with QE:D

@GertV make a simplified fiddle, I saw your question before but there was so much cruft and no fiddle.

phenomnomnominal

How do you prove that 2/3 = 0.6666? Do you just go back and define numbers and then build up til you can define division and it just pops out?

Benjamin Gruenbaum

20:13

@phenomnomnominal Basically, you expand the fraction, you can show by induction that the n-th digit is 6 for all n

(because if it's 7 it's bigger than 2/3 and if it's less it's smaller)

GertV

It's very complicated to make a fiddle because it is a very big project and on several pages :/

rlemon

1/3 = .333... (ANS)
ANS * 3 = .999... | 1 <- This assumes rounding at a certain point in the set. If we imagine no rounding .9 repeat is not 1

phenomnomnominal

yes it is

you just said it yourself

Benjamin Gruenbaum

@GertV Then it's too localized, isolate the issue you're having trouble with, don't give us the actual code

phenomnomnominal

1 / 3 * 3 = 1

rlemon

20:14

@phenomnomnominal only if you assume a finite amount of decimal places and round

GertV

i'll try, thx for the advice

rlemon

if you floor the results then it is not 1

phenomnomnominal

No, you have to assume infinite decimal places

rlemon

why wouldn't i?

phenomnomnominal

1 / 3 * 3 is definitely 1

1 / 3 = 0.33333...... -> infinity

therefore 0.333333... * 3 = 1

and 0.33333.... = 0.99999... -> infinity

therefore 0.99999999... === 1

rlemon

20:16

but .9 -> infinity is not 1

phenomnomnominal

why not?

Benjamin Gruenbaum

@rlemon yeah it is

rlemon

it's ever closing in on 1 but it is not.

loading...

So, is 1 to fractions what infinity is to natural numbers?

Benjamin Gruenbaum

@rlemon I'd have a limits talk, but Zirak is not here and I think he'll find it interesting

phenomnomnominal

20:16

what is 1 - 0.999.... infinity?

rlemon

it's like that old physics crap that you can never touch anything. I realize it is bullocks but still, if you have no limits how can you magically turn a infinitly repeating decimal to a rational number?

Benjamin Gruenbaum

0.99... is 1, that requires an understanding of limits

@rlemon it's not a simple manner, you have to define what a limit is

phenomnomnominal

because the difference between 1 and 0.99999.... is infinitely small

Benjamin Gruenbaum

I have to use cool greek letters like epsilon

rlemon

but is a repeating number repeats infinitely... where is the limit?

Benjamin Gruenbaum

20:17

However, I'd rather wait for Zirak :P

phenomnomnominal

that's the point

rlemon

I don't have to define the limit, you are claiming one exists to a infinite repeating fractio.

Benjamin Gruenbaum

@rlemon at infinity! we'll get there

2

rlemon

lol

> Infinity: Infinity (symbol: ∞) refers to something without any limit,

if there is no limit on Infinity, there is no limit to the repeating decimals.

phenomnomnominal

so then there is no limit to the smallness of the difference between them

Benjamin Gruenbaum

20:18

@rlemon @loading... anything I can do to get @Zirak one step closer to a formal degree I'd rather do :P I'd rather wait for him to be in this room for the limit talk

phenomnomnominal

so they are the same

kush

Infinitesimal

Infinitesimals have been used to express the idea of objects so small that there is no way to see them or to measure them. The insight with exploiting infinitesimals was that objects could still retain certain specific properties, such as angle or slope, even though these objects were quantitatively small. The word infinitesimal comes from a 17th-century Modern Latin coinage infinitesimus, which originally referred to the "infinite-th" item in a series. It was originally introduced around 1670 by either Nicolaus Mercator or Gottfried Wilhelm Leibniz. In common speech, an infinitesimal obj...

rlemon

@phenomnomnominal but that is a rational you make to understand it

Kendall Frey

0.999... = 1 | ...999.0 = -1 | ...999.999... = 0

Benjamin Gruenbaum

@rlemon Ok, we'll do this later, but let's go over limits really quickly

loading...

20:19

@BenjaminGruenbaum No probs. Ping me though please, so I can read it later!

rlemon

you are trying to apply limits to a number which by definition is limitless.

Benjamin Gruenbaum

@rlemon sorry, we'll do it later :P

XCritics

@BenjaminGruenbaum me too please

Or you know, just start a blog

Benjamin Gruenbaum

@rlemon 0.9999... is not a number it's a limit :)

rlemon

because it has to be. because the notion of infinity results in us not being able to complete the math.

Benjamin Gruenbaum

20:21

@rlemon We can complete the math, it is well defined and we will get there

Kendall Frey

The artihmetic proof is simpler.

rlemon

lol

Benjamin Gruenbaum

@rlemon we're talking about problems that were solved by Newton and Leibniz hundreds of years ago

rlemon

you cannot have a limit on an infinite

period.

Benjamin Gruenbaum

@rlemon of course you can, that's the point of limits, dealing with infinity

loading...

20:21

But some infinities are bigger than others, right?

phenomnomnominal

of course

Octavian Damiean

@BenjaminGruenbaum I'm sure you've gone through all of this already but maybe it could be interesting for you too. logicmatters.net/resources/pdfs/TeachYourselfLogic9-1.pdf

rlemon

if you put a limit there it is no longer infinitely repeating, and therefore finite.

kush

@loading... yes

GertV

@BenjaminGruenbaum I can't, it's defenitly to complicated for that :/

Benjamin Gruenbaum

20:22

@GertV Sorry.

rlemon

you might view it as an abstract of a infinite number, but it is no longer infinite

Kendall Frey

x = 0.999...
x*10 = 9.999...
x*10-x = 9.000
x*9 = 9
x = 1

Benjamin Gruenbaum

@rlemon define 0.999999.... go ahead

phenomnomnominal

@rlemon, you're not 'putting' a limit on it

rlemon

@BenjaminGruenbaum you define how it can be limited and infinite at the same time.

Kendall Frey

20:22

Not limited.

GertV

there is also python zpt ajax js and several other technologies in it which i can't demonstrate with fiddle :/

phenomnomnominal

you're defining it's behaviour as it approaches that limit

XCritics

!!/artisticpoop

rlemon

and I can define it. 0.9 with an infinite number of '9's repeating it

Kendall Frey

limits as in calculus, not limits as in maximums

Benjamin Gruenbaum

20:23

When you're adding or removing stuff from 0.9999999 you're committing a crime against math. 0.9999 is the series 0+0.9+0.09+... you can't just perform arbitrary arithmetic to it

rlemon

the number of which is incomprehensible to me, hence infinite.

kush

@rlemon now you have to define infinite though

phenomnomnominal

but it is comprehensible to you

because it's 1

Benjamin Gruenbaum

@rlemon that's just because you don't have the mathematical tools yet

Kendall Frey

@rlemon What? So graham's number is infinite?

phenomnomnominal

20:24

@rlemon vs. the limit. Sounds like a sweet power metal band name.

rlemon

@BenjaminGruenbaum my point is that, if you want to work with our math, be willing to make exceptions to rules and funk shit up a bit. Math contradicts itself and you've been trained to think it's coherent, but it's not. It's making up shit to be complete.

XCritics

@phenomnomnominal Agree'd

Benjamin Gruenbaum

@rlemon No, math does not contradict itself, math is pure and beautiful.

rlemon

lol

troll

Math contradicts itself all the time.

Kendall Frey

@rlemon Are you saying that imaginary numbers are made up?

Benjamin Gruenbaum

20:25

@rlemon The difference is that I've spent years studying it and know the proper tools to deal with it, and you haven't, yet.

XCritics

Should I put this hot pocket on my hamburger?

Benjamin Gruenbaum

@rlemon The thing is you're using terms loosely, and you don't even understand those terms, you don't have the tools to even describe what 0.999... is

You don't know how to define a real number, you don't know what real numbers are yet,

rlemon

@BenjaminGruenbaum your point is invalid. I know enough about math to make the assertion that infinite repeating decimals are not the whole number they fall short of (in the case of .9 repeat)

it is conceptually the same number, but in fact is not.

Kendall Frey

Prove it.

Mathematically.

phenomnomnominal

@rlemon just tell me what 1 - 0.999.... is then?

Florian Margaine

20:27

0.111

rlemon

@phenomnomnominal can you?

phenomnomnominal

yes, it's 0

Kendall Frey

@FlorianMargaine WOW

phenomnomnominal

@FlorianMargaine troll

Octavian Damiean

@FlorianMargaine Note the dots behind the nines.

Benjamin Gruenbaum

20:27

@rlemon fine, I wanted to wait for Zirak and be nice, but here goes

rlemon

@phenomnomnominal it is, rationally, but it also isn't. you cannot have more or less than you started with.

Florian Margaine

@OctavianDamiean I'm dot blind. that's why I hate php

Octavian Damiean

You guys should ping me when we discuss stuff like that.

Benjamin Gruenbaum

@rlemon a natural number is just 0, and then there exists a successor for each natural number. 0, succ(0), succ(succ(0)...

phenomnomnominal

You don't you have exactly the same ammount

eazimmerman

20:28

0.000...1

rlemon

^

Benjamin Gruenbaum

@rlemon we define addition, now we want to close the natural numbers under subtraction, so we add the integers,

rlemon

problem is ... is infinite

phenomnomnominal

@eazimmerman but how many ...'s are there

rlemon

so where does the 1 come in

Kendall Frey

20:28

No, that's 1-0.999...999

eazimmerman

@rlemon ^

phenomnomnominal

it doesn't

Kendall Frey

There's a difference.

Benjamin Gruenbaum

@rlemon never, it comes never geez

@rlemon just cooperate and listen for 30 minutes, we'll get there

rlemon

@BenjaminGruenbaum you type, leave it in a gist. i'll read later.

however I'm arguing semantics here, not implementation. you realize that?

Loktar

20:29

@rlemon you need to listen, hes explaining the secret of getting laid.

phenomnomnominal

^ good idea, then put it on a blog

Loktar

Oh wait.

Benjamin Gruenbaum

@rlemon A real number is a natural number, followed by a sequence of digits, do you know what a sequence is?

Kendall Frey

@rlemon Read the wikipedia article.

rlemon

@KendallFrey did

don't agree with all of it

Benjamin Gruenbaum

20:29

@rlemon that's just because you don't understand it, this is not highschool math

rlemon

again, semantics people. Listen to the definitions and tell me one is the other.

phenomnomnominal

!!/mute rlemon "being argumentative" :)

Benjamin Gruenbaum

@rlemon You have to define addition for fractions like 0.99... before you can add and subtract them, you haven't done it

eazimmerman

0.999 + 0.111 = 1.11

rlemon

and you're sounding like a pretentious little SOB @BenjaminGruenbaum - yes you went to university and took math. do not think for one second you are smarter than someone based solely off that assertion. I know you are smart, you don't have to belittle peoples education to prove it.

Loktar

20:31

@rlemon you're better looking, that trumps all so its really a moot point tbh.

Benjamin Gruenbaum

@rlemon I'm not saying that I'm smarter, I am however saying that I know more math

rlemon

now back to my smoke, and back to your gist.

Benjamin Gruenbaum

naa, I'm waiting for @Zirak

rlemon

@BenjaminGruenbaum no you took the assumption you did based on our educations. I could be some pocket math genius

Kendall Frey

I never did math above high school level, and I found the proofs simple.

@rlemon And you could not be.

phenomnomnominal

20:32

@rlemon, did you ever see the definition of differentiation?

Benjamin Gruenbaum

@rlemon I'm not disrespecting you or doubting your intelligence, however, you're arguing with me on something that is very basic first year university material, so yeah, I think my education is relevant.

The fact I know that a real number is a natural number followed by a sequence of digits, and I know the definition of a limit is and what the lim operator means are relevant.

Mainly, the fact that a number is built as a series (that's a sum of sequence elements) and one can show that for all epsilon bigger then zero there exists a big enough N such that for all n>N the sum of the series representing 0.999... is closer to 1 than epsilon

Which is how we define a limit, each decimal number is a limit.

Loktar

N+ is getting a sequel pretty cool eh?

Benjamin Gruenbaum

That's how we define real numbers, using limits, otherwise why wouldn't rational numbers be enough?

Why would we need real numbers to begin with? Wouldn't fractions be enough?

XCritics

Do you microwave a peanut butter and jelly sandwhich

Jan Dvorak

fractions are not closed under ... err...

Loktar

20:36

@XCritics try it

Benjamin Gruenbaum

@JanDvorak Limit, they're not closed under limit

Kendall Frey

Under what?

Loktar

Peanut butter is tasty when warm

XCritics

@Loktar I'm scared

about the jelly

loading...

@BenjaminGruenbaum Comma after the n>N, took me a while to get that! :-)

Jan Dvorak

20:36

@BenjaminGruenbaum I know :-)

Loktar

idk how warm jelly would taste

Benjamin Gruenbaum

sqrt(2) is not a rational number, you can't write it down as a fraction for example

Neither is e nor pi

Kendall Frey

22/7

;)

Jan Dvorak

not pi

Kevin Murphy

has anyone messed around with masonry and different width elements?

Kendall Frey

20:37

Those people bug me

phenomnomnominal

Didn't the egyptians want to define pi as 3?

Kendall Frey

Once one of the States defined it as 4.

phenomnomnominal

~~Texas?~~ haha that's probably racist.

Kendall Frey

Doesn't sound right.

Benjamin Gruenbaum

More compactly, a sequence {a_n} converges to L is defined as:

∀ε>0 ∃N∈ℕ ∀n∈ℕ n>N → |a_n - L| < ε

No matter how small the gap is, we close it

Jan Dvorak

20:39

New York? (Manhattan metric)

Kendall Frey

Indiana I think.

Octavian Damiean

@BenjaminGruenbaum quick off-topic question, did you graduate in maths?

Loktar

> Gaps are always closing when I tell girls about my maths :(

Benjamin Gruenbaum

@OctavianDamiean not yet, soon

Octavian Damiean

cool.

rlemon

20:39

@BenjaminGruenbaum my argument has been , and always will be the one of semantics. You cannot rational a infinite repeating anything with a limit and still call it infinite repeating. you have created a rational to comprehend a number which is otherwise incomprehensible.

phenomnomnominal

this isn't about semantics though

Jan Dvorak

@BenjaminGruenbaum can you replace that with epsilon and delta? I remember the definition with those symbols

Benjamin Gruenbaum

@JanDvorak Delta is for functions, not sequences, but sure :)

phenomnomnominal

It's nothing to do with the english definition of a limit, it's the mathematical definition of a limit

Benjamin Gruenbaum

@rlemon There is no number, when you say 0.9999... you are in fact talking about the sum of a sequence of numbers. It's just that you've never formally defined what a number is.

XCritics

20:41

This is awesome

Loktar

@XCritics you microwaved it?

rlemon

but the definition of infinite is limitless in all cases no? if there is a finite limit to infinite for math I argue that it is no longer infinite, it is a comprehensible abstraction of it.

XCritics

Yeah, I've been living a lie my whole life

Loktar

My kids had a grilled one once, I forgot about that

it was damn good actually

Was at speghetti works or something (restaurant)

GertV

i've placed a bounty of 100 now, can annyone help me plaese
http://stackoverflow.com/questions/16761175/cant-find-element-in-dom-after-loading-it-with-ajax

XCritics

20:42

When I was younger, I would put two slices of bread with cheese in the middle (grilled cheese) into one slot of the toaster, destroyed the toaster (a few times) but it was delicious

Loktar

haha

yeah grilled cheese is great

Benjamin Gruenbaum

@rlemon It's really hard to comprehend how limits work, it takes a whole course :/

Loktar

now Im hungry! Time to go home, later all.

enjoy ze maths!

XCritics

And then I also tried to mix hot chocolate in a magic bullet

Benjamin Gruenbaum

@rlemon Let's try something else, what's 1/2+1/4+1/8+1/16+... ?

Octavian Damiean

20:42

Fuck it ... now I'm all pissed off because I lack the English skills to participate in a higher mathematical discussion ... I feel like Rajesh Koothrappali ...

XCritics

Once I screwed that lid tight and started going, it exploded

Kendall Frey

@BenjaminGruenbaum Easy peasy :)

XCritics

I wish I had spent more time learning math in school than sleeping :/

Kendall Frey

Achilles' Paradox may be relevant.

Jan Dvorak

you slept in school?

Benjamin Gruenbaum

20:44

@KendallFrey You mean Zeno's?

Kendall Frey

Maybe.

XCritics

When I was tired I'd try to sneak a nap yeah, or just skip class go home and sleep

Benjamin Gruenbaum

@KendallFrey this: en.wikipedia.org/wiki/Zeno%27s_paradoxes ?

Kendall Frey

Yep, got the names mixed up.

Benjamin Gruenbaum

( @KendallFrey they seem relevant and Achilles is a character in them)

Jan Dvorak

20:46

@BenjaminGruenbaum all of zeno's paradoxes: the limit of a sequence of values lower than X is not lower than X

Kendall Frey

@BenjaminGruenbaum Right

rlemon

@BenjaminGruenbaum again, I don't care about practice. I realize infinity in mathematics represents the concept and in fact denotes a unbound limit. I'm arguing that this is in fact faking infinity to make the math work. albeit this might be ingrained in all mathematics. but the concept of Infinity limitless.

Benjamin Gruenbaum

@JanDvorak Yeah, just like 0.99999... and 1

Jan Dvorak

@BenjaminGruenbaum 0.111... == 1 is more fun :-)

(binary)

Benjamin Gruenbaum

@rlemon We're not 'faking' infinity, infinity is not a number, which is exactly why 0.9999... == 1, because otherwise, like you said at some point we'd stop and the two numbers would differ

rlemon

20:48

Infinity is a concept that changes when we introduce it to mathematics because without it would result in numbers which we could not otherwise represent or work with because there is no limit

Benjamin Gruenbaum

@rlemon Your argument is why infinity works the way it works, if we were to stop accumulating 9's, then we'd have a 0 afterwards and there would be a difference, because we have infinitely many numbers it converges to 1

Jan Dvorak

@BenjaminGruenbaum does 0.999... == 1 hold in hyperreals?

Benjamin Gruenbaum

@rlemon These numbers are a limit. sqrt(2) is a limit and so is PI, even if you find them in nature just fine

@JanDvorak Probably not

rlemon

proof: if I sat down and started writing out 0.99999... and never stopped writing 9's for the rest of time I would never be at 1. ;)

Jan Dvorak

hyperreals are weird

rlemon

20:50

pen and paper FTW

Benjamin Gruenbaum

@JanDvorak Wait, sure it does

Kendall Frey

@rlemon Because time is finite.

Jan Dvorak

hyperreals are still weird

Benjamin Gruenbaum

@rlemon Right, but if you sit down and write 9's to infinity, and time would never end, it would

rlemon

@KendallFrey you bastard.

and it is assumed to be finite. we do not know ;)

@BenjaminGruenbaum prove it ;)

ohh snap.. that is fun.

loading...

20:51

@BenjaminGruenbaum That's so interesting. I was taught at school that L is what happens as epsilon becomes zero. I never thought about epsilon being bigger than zero.

Benjamin Gruenbaum

@rlemon one proof coming right up

@rlemon how can we tell two numbers are different?

Jan Dvorak

@rlemon the lifetime of a proton is estimated to ~~ 1e53 years or so

rlemon

@JanDvorak that assumes I don't shed protein based life without ever missing a beat on my '9's

Benjamin Gruenbaum

@rlemon I mean, if two numbers a and b are different, there has to be another number c that is not zero, such that a-b=c, right?

Jan Dvorak

@rlemon I said "proton", not "protein"

rlemon

20:52

@BenjaminGruenbaum only if you can define a, b, and c

Benjamin Gruenbaum

I mean, a!=b is the same as a-b!=0

Sam

function f1(){
	var a = 'first';
	function f2(a){
		a = 'second';
		// I understand it is impossible to access the first "a" from this point.
		// Is that right?
	}
}

Benjamin Gruenbaum

@Sam yes.

Jan Dvorak

@Sam correct

rlemon

if any one of a, b, or c is a number we cannot accurately represent because it goes on beyond comprehension then how can we determine either way.

loading...

20:53

I'm slow with math. I'm way behind.

Benjamin Gruenbaum

@rlemon Are we ok with that? Do we agree that if two numbers are different, no matter what, the difference between them is not 0?

@rlemon we're just talking about any number

Sam

@BenjaminGruenbaum @JanDvorak thanks ;)

Jan Dvorak

@rlemon once you say "beyond comprehension" - welcome to pseudo-science

Benjamin Gruenbaum

Nono, let's keep it nice and simple

rlemon

@JanDvorak can you comprehend a limitless number?

Benjamin Gruenbaum

20:54

If two numbers are different, than the difference between them is not 0, and is some number c.

phenomnomnominal

Yep

rlemon

@BenjaminGruenbaum agreed.

Jan Dvorak

@rlemon which one? Aleph null, omega null, or just plain old infinity?

rlemon

infinity

Benjamin Gruenbaum

@rlemon Great :) Now let's look at 0.99999... and 1, let us assume by contradiction that 0.9999.. is not 1, so there has to be some c such that 0.99999...-1 will be c right?

I mean, we just agreed that for two numbers, there has to be a c

(if they are different)

rlemon

20:56

@BenjaminGruenbaum no, because we do not definitively know what 0.99999... is. because it is limitless we can never assert the value to subtract from 1

Kendall Frey

We don't need to.

Jan Dvorak

@rlemon so you claim 0.999... is not a number

Kendall Frey

All we need to do is define c = 1 - 0.999...

rlemon

@JanDvorak it's a representation of a number we cannot define

Jan Dvorak

@rlemon it's a representation of 1

Benjamin Gruenbaum

20:57

^ but

rlemon

ahh, but it is not actually 1

Jan Dvorak

if it's a number, it must be possible to subtract it from another number

rlemon

it represents it

Jan Dvorak

@rlemon word play

Kendall Frey

@rlemon So does the symbol 1

rlemon

20:58

exactly why i'm calling this an argument of semantics.

you cannot have something you cannot comprehend by definition and call it real.

Jan Dvorak

so does the letter Wau

Benjamin Gruenbaum

@rlemon here is how we define 0.9999: it is 0 followed by 9's (that is the first number after the decimal point is 9, and for every other number it is the same number that came before it).

@rlemon is that definition ok?

rlemon

you make it real then work with it

@BenjaminGruenbaum ok, but without a limit how do you work with this in mathematics?

minitech

I just got here and is @rlemon saying that 0.9repeating != 1?

Benjamin Gruenbaum

@minitech and I'm explaining how limits work :)

Kendall Frey

20:59

@JanDvorak e to the i to the e i 0 is e to the wau to the tau wau wau

2

Jan Dvorak

he claims it's not 1, but he also recently admitted it represents 1

Benjamin Gruenbaum

@rlemon no limits yet, so, we've got 0.99999... and 1, and we agree that if they're different than there has to be a c!=0 such that 1-0.999999 is c right?

rlemon

@minitech I know for all intensive purposes it does (in the real world) i'm just arguing the semantics of how an infinite repeating anything cannot be known as a value and therefore must be represented as a part to be used with.

ergo, is no longer infinite.

Kendall Frey

*intents and

Benjamin Gruenbaum

18 secs ago, by Benjamin Gruenbaum

@rlemon no limits yet, so, we've got 0.99999... and 1, and we agree that if they're different than there has to be a c!=0 such that 1-0.999999 is c right?

Kendall Frey

20:59

"for all intensive purposes" is nonsensical

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