I can't calm my heart rate or breathe or keep a thought in my head for two seconds. Let's talk about whatever.
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Sorta, so a countable infinity can be tracked to the set of natural numbers. Which is to say it is {1,2,3,4,5,6,...} but you're doing something to it like multiplying it by two or whatever Uncountable is recursive. Think the distance between 0 and 1 and you keep subdividing
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What's really cool about this is because to track back to the set of natural numbers means there has to be one number in the set of natural numbers all countable infinities are the same size N = {1,2,3,4,...} 2N = {2,4,6,8,...} Which is why proving a countable infinity matters
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