So what you're saying is that you don't get the word "infinite".
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There are different sizes of infinity. Trust me my brother teaches math
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Would you like an example?
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Sure, why not.
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OK, how many numbers are in between 1 and 2? The answer should be an infinite amount. Same amount in between 2 and 3, But when we count the numbers between 1 and 3 it's still infinite, but infinitely more than in between 1 and 2.
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That is not proof or an example of what you said at all, try again.
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We can put it in finite numbers Like in between 1 and 2 is 1 whole number And in between 1 and 3 is 2 whole numbers We can put this in infinite terms. As in we know there is an infinite amount of numbers in between 1 and 2, and twice as much in between 1 and 3. So there is an amount of numbers in between 1 and 3 twice as large as in between 1 and 2. While both are still infinity
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There are indeed an infinite amount of numbers between 1 and 2, 2abd 3 and so on. But we have number of 1, 2, 3, etc because we need them. So instead of saying 1.99999999999999999..... We just say 2. It's for practical uses. Just because we have the number 2, doesn't mean 1.999999999999999.... Has an end.
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Dude, you're thinking of infinity like it's a finite number when it's not. Hate to tell you but your thinking on this topic is incorrect.
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Bearbeitet von NotCanon: 9/14/2016 2:47:18 AMInfinity isn't even a number, it's an idea. Another example There is an infinite amount of numbers above 0. If we factor in negatives it's also infinite. Both of those infinities combined is more than just one of them.
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Again, you are treating infinity like a finite number, which it isn't. Sorry mate but you are dead set wrong.
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The way I'm describing it is wrong, but there are different levels or "sets" of infinity. As in a set of every integers is countable. But a set of every single real number is uncountable. There are an infinitely larger amount of real numbers, as real numbers include every single number in between the integers, thus being to large, and not really possible, to count, as there is an infinite amount in between any two numbers.
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A set of infinite numbers is uncountably infinite. We are comparing 2 sets of infinitely uncountable numbers so they are equal.
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A set of whole numbers and prime numbers are countable infinities, so they are equal, they are countable because they have a defined first number. 1 for whole numbers and 2 for prime. What makes an infinity uncountable is that it has no defined starting point, such as the set of real numbers. As it encompasses every single number (Excluding imaginary numbers).
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Sorry mate, you don't have a proper grasp of infinity.
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Bearbeitet von NotCanon: 9/14/2016 1:37:45 PM[quote]Any set which can be put in a one-to-one correspondence with the natural numbers (or integers) so that a prescription can be given for identifying its members one at a time is called a countably infinite (or denumerably infinite) set. Once one countable set S is given, any other set which can be put into a one-to-one correspondence with S is also countable. Countably infinite sets have cardinal number aleph-0.[/quote] Weisstein, Eric W. "Countably Infinite." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/CountablyInfinite.html This is what a countable infinity is, an uncountable infinity does not have these one-to-one correspondences, such as the list of real numbers.
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Dude, I don't know what else to say.....if you don't get it at this point you never will.
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What I'm saying is a theory, it hasn't been proven. But it is used in mathematics today.
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Infinity > Infinity? I don't think so. That's not how infinity works
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One has more
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[b][u]Infinite[/u][/b]