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**KrazyHorse** · September 21, 2002, 00:47

Originally posted by alofatti
Quoted from Frogger:
"Under the standard metric for real numbers, all closed sets are complete (can't remember what this property is called)."

That is because the real number system is complete and each closed set of a complete set is in itself complete.
But what about it?

Just realised something...

This is not true for unbounded subsets of reals (including whole set).

Take x_n = n^1/2

This is Cauchy sequence but not convergent.

You require compactness on the part of the space to demonstrate that closed subsets are complete.

Then Bolzano-Weierstrass states that every bounded subset of reals is compact...

Compactness can be defined either sequentially (every sequence in set has a convergent subsequence) or topologically (every covering of the set has a finite subcovering)

Ah...the good old stuff is beginning to flow back now...

**Asher** · September 21, 2002, 00:48

Originally posted by alofatti
That is a somewhat difficult question to answer since there are not branches of study over here.
We study general concepts from computer organization + theory + software engineering (aghh!!) and then we choose some some optative courses. That would, perhaps, qualify as specializations.
To be honest with you, I am not perfectly sure about what would be my specialization, I have taken extra courses in some logic themes, game theory and (very little) of computer graphics.

Ah, cool.
I'm doing the software engineering (

) and computer graphics mostly, with a strong concentration in logic (5 logic courses in the Philosophy department, gotta love it).

Sounds like you're more into the theory aspect more? The math behind everything?

**Felch** · September 21, 2002, 00:49

Asher I'm with you on that rejection of the .3333... times 3 equaling .9999.... The main problem with it is that it pretends that 1/3 = .33..., whereas .33... is just an approximation, I think. I'm probably wrong about that, but that's the problem I see with it.

Basically I was taught that the decimal places have meaning, and a number with zero in the ones place and nothing greater than that (e.g. 0.999...) is less than 1, and if numbers are greater than or less than each other, they are not equal.

I'm guessing Frogger is cross-posting with me some explanation as to why I'm wrong, so you all can probably disregard this.

**KrazyHorse** · September 21, 2002, 00:51

Originally posted by Felch X
I like the way Squid put it, but it all seems like some sort of logical lapse.

I recognize Frogger's expertise, but I don't understand what he's saying. As I understand it 0.99... < 1, and if x<>y then x!=y.

Bear in mind I'm a history major, and make no claim that I'm correct in this. It just seems to make sense.

1-0.9 = 0.1

1-0.99 = 0.01

1-0.999 = 0.001

etc.

The numbers get closer and closer to 1, right (therefore the difference between 1 and them gets closer to zero). Now, real numbers have the nice property that if a doesn't equal b, a-b doesn't equal zero. So what does 1-0.999999.... equal? It's greaer than or equal to zero...but it's less than 0.1, and less than 0.01, and less than 0.001, and less than 0.0000000001, etc.

The only number that satisfies these requirements is 0. Therefore a-b = 0 and therefore a=b

Consider this your 30 second introduction to limits...

**alofatti** · September 21, 2002, 00:51

Quoted from Felch:
"I recognize Frogger's expertise, but I don't understand what he's saying. As I understand it 0.99... < 1, and if x<>y then x!=y."

Well, it is like you said it before, it is somewhat of a logical trickery. The thing is that 0.99... is not < than 1, IF we are talking about the real numbers.
You could actually redefine the meaning of "<" so that 0.999... is < than 1, but then you would be talking of a different number system which is, in some aspects, not "as good" as the real system. For example, it would allow for "lagoons" in the continuum, between 0.999... and 1 you would not have any number, something that does not happen in both the rational and real numbers.

**KrazyHorse** · September 21, 2002, 00:54

Originally posted by Felch X
Asher I'm with you on that rejection of the .3333... times 3 equaling .9999.... The main problem with it is that it pretends that 1/3 = .33..., whereas .33... is just an approximation, I think. I'm probably wrong about that, but that's the problem I see with it.

Basically I was taught that the decimal places have meaning, and a number with zero in the ones place and nothing greater than that (e.g. 0.999...) is less than 1, and if numbers are greater than or less than each other, they are not equal.

I'm guessing Frogger is cross-posting with me some explanation as to why I'm wrong, so you all can probably disregard this.

1/3 is exactly equal to 0.33333...

But the way to show this is true in the first place is exactly the same as the way to show that 0.9999...=1

**Capt Dizle** · September 21, 2002, 00:55

Are you guys the fellows thats been running the elections down in Florida?

They have trouble counting too.

One man, one vote. Or is that one man, .999999999~ votes?

**Felch** · September 21, 2002, 00:55

Okay, but I was taught (In an American school) that limits are not reached. For example 1/x will approach zero, but never reach it.

It seems like this is all bull**** people make up so they can get research grants. Mathematicians need to grow some cajones and fess up that they're just bull****ting like we in the Humanities do.

Now I have to get to work writing up a proposal that will convince UMBC to send me to Amsterdam to research the effects of decriminalizing cannabis.

**KrazyHorse** · September 21, 2002, 00:56

I'm going to start discussing the Baire Catewgory theorem soon...

I need to take a serious pure math course. It's been 1.5 years now, and I forgot how fun it is...

**KrazyHorse** · September 21, 2002, 00:59

Originally posted by Felch X
Okay, but I was taught (In an American school) that limits are not reached. For example 1/x will approach zero, but never reach it.

It seems like this is all bull**** people make up so they can get research grants. Mathematicians need to grow some cajones and fess up that they're just bull****ting like we in the Humanities do.

Now I have to get to work writing up a proposal that will convince UMBC to send me to Amsterdam to research the effects of decriminalizing cannabis.

That's cool, Felch...but while 1/x may never equal 0, it approaches it in a way that mathematicians have taken to terming "the limit of 1/x as x approaches infinity is 0"

Same in the number problem. The limit of 0.9999... as the number of nines approaches infinity is 1. And since the decimal system allows infinite strings (for some very good reasons) then we're allowed to create a beast with an infinite number of 9s...even if we could never hope to actually write it down.

**Felch** · September 21, 2002, 01:01

Aight, so saying .9...=1 is simply a shorthand?

**alofatti** · September 21, 2002, 01:07

Quoted from Frogger:

Just realised something...

This is not true for unbounded subsets of reals (including whole set).

Take xn = n^1/2

This is Cauchy sequence but not convergent.

xn = n^1/2 is not a Cauchy sequence, it is not bounded (every Cauchy sequence is bounded).

**Promethus** · September 21, 2002, 01:11

As a practial matter if something is priced at $999.99 is that not $1000.00? Would you consider the two numbers different when you payed for something?

**KrazyHorse** · September 21, 2002, 01:14

Yup...

Mixed up convergence and uniform convergence...

I'm not on the ball tonight.

**Asher** · September 21, 2002, 01:14

Originally posted by Frogger
Yup...

Mixed up convergence and uniform convergence...

I'm not on the ball tonight.

We all love you regardless.

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does .9 repeating equal one?

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