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is the numbers between 0 and 1 infinite?


Ice_Phoenix87

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The amount of integers between 0 and 1 is zero.

The amount of rational numbers between 0 and 1 is countable (infinite).

The amount of real numbers between 0 and 1 is uncountable (one could say: Even more infinite).

There is no "between 0 and 1" for complex numbers unless further specification.

The question is not valid for imaginary numbers because 1 isn´t an imaginary number.

What numbers do you talk about?

I´m drunk.

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countable infinity is where you can find a bijection between the set S and the set of natural numbers, or equivalently vice versa.

 

uncountable is when you cannot do that.

 

its easy to show that the rationals are countable.

 

while irrationals are not

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Countable and uncountable are mathematical terms describing a 1st approx of the cardinality of a set. A set is countable if there´s on a bijection on a subset of the natural numbers. It´s uncountable if there´s not.

Might sound stupid to you but it´s elementary (1st semester) math and also quite important for integration in the sense of Lebesque-integration (sets with a measurement of zero can be left out of the integration - countable sets usually have a measurement of zero) and other scientific areas (Poincare´s theorem about the return of orbits would come to my mind, spontaneously).

Still drunk

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"still drunk"

 

and still managing to put that post together? impressive.

 

"Might sound stupid to you but it´s elementary (1st semester) math "

 

actually i just wanted to use the word tomfoolery. but where is that first semester math? you mean in college?

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proof of countability of rational numbers:

 

All rational numbers can be expressed in the form n/d where n and d are integers. Then you plot a matrix of all the rational numbers such that the columns represent all values for n from 0 to infinity in increasing order, and the rows represent all values for d from 1 to infinity in increasing order (or visa-versa). Then for any arbitrary rational number, there is an entry for it in the matrix. To count them, begin in the corner (0/1) and enumerate diagonally. To take into account the negative numbers, for every positive rational number you count, also count its negative counterpart.

 

Pretty neat, huh?

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Countability is taught in the first term at both Cambridge and Bristol Universities to mathematicians.

 

Surely the most elegant proofs are the simplest:

 

send a/b to 3^a.5^b if it is a positive rational 2.3^a.5^b if it is negative. Clearly this shows the rationals are countable, and is a very powerful technique that works on many such 'show something is countable' questions.

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  • 2 weeks later...
Guest Doron Shadmi

From a non-standard point of view about the Infinite concept, we first have to distinguish between two kinds of this concept, which are:

 

1) Actual Infinity.

 

2) Potential Infinity.

 

 

Please look at http://www.geocities.com/complementarytheory/RiemannsLimits.pdf

 

There are indeed (from the abstract point of view) infinitely many levels of infinitely many collections of elements.

 

But I wish to add that according to my point of view Alef0+1 > Alef0, 2^Alef0 < 3^Alef0, etc...

 

To understand why I do not accept the Cantorian point of view about infinitely many elements, please look at:

 

http://www.geocities.com/complementarytheory/NewDiagonalView.pdf

 

http://www.geocities.com/complementarytheory/Anyx.pdf

 

http://www.geocities.com/complementarytheory/9999.pdf

 

http://www.geocities.com/complementarytheory/Russell1.pdf

 

http://www.geocities.com/complementarytheory/No-Naive-Math.pdf

 

 

Thank you.

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