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I'm pretty new to this wikia, so I don't get it really. It sounds very similar to me, anyone mind to explain what the difference is really?
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What is the exact difference between High 1-B and low 1-A?
- Thread starter OfficialGilgamesh
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The difference is more or less the difference between countable and uncountable infinities. High 1-B is countable, Low 1-A is uncountable, uncountable is considered a bigger set of numbers.
As a side thing, you can think of countable infinities as an infinite set of numbers, but where you can reach any of the numbers inside of it in a finite amount of time if you counted, no matter how long that finite amount of time is (this is the case for natural numbers).
This isn't the case for any Uncountable set, meaning any set of numbers bigger than the natural numbers.
As a side thing, you can think of countable infinities as an infinite set of numbers, but where you can reach any of the numbers inside of it in a finite amount of time if you counted, no matter how long that finite amount of time is (this is the case for natural numbers).
This isn't the case for any Uncountable set, meaning any set of numbers bigger than the natural numbers.
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Hmm okay, I don't know how this works though, isn't infinity always not countable?LSirLancelotDuLacl said:
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Think of countable infinity as 1,2,3,4...∞.
And uncountable infinite would be something like 1,0000000(infinite 0s)1. And so on and so forth. You can watch this video to get a better idea for it.
And uncountable infinite would be something like 1,0000000(infinite 0s)1. And so on and so forth. You can watch this video to get a better idea for it.
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Yeah sorry, is kinda hard to wrap your head around so is a bit odd to explain
And no, set (as in, a set of things like a set of chairs or a set of numbers) can be countable or uncountable. Even though a countable set is infinite, you could reach any number in it if you counted for long enough.
You can just take away that countable sets are smaller than uncountable sets, even if the general concept is really hard to understand. So destroying an uncountable number of higher dimensions is a bigger feat than a countable set of higher dimensions.
And no, set (as in, a set of things like a set of chairs or a set of numbers) can be countable or uncountable. Even though a countable set is infinite, you could reach any number in it if you counted for long enough.
You can just take away that countable sets are smaller than uncountable sets, even if the general concept is really hard to understand. So destroying an uncountable number of higher dimensions is a bigger feat than a countable set of higher dimensions.
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