Jan 1, 2017 · Not to mention, it is far from useful to prove more complicated cardinalities and ones of actual mathematical interest. If you want to actually understand "cardinality" and countable …

My friend and I were discussing infinity and stuff about it and ran into some disagreements regarding countable and uncountable infinity. As far as I understand, the list of all natural …

May 16, 2024 · We know the interval [0, 1] [0, 1] is uncountable. You can think of the binary expansions of all numbers in [0, 1] [0, 1]. This will give you an uncountable collection of …

Dec 3, 2025 · There is something I don't understand about the proof that non-empty perfect sets are uncountable. The same proof is present in Rudin's Principles of Mathematical Analysis. Do …

Jun 4, 2023 · And since $\aleph_0$ is the cardinality of any countable set, this means that this power set must be uncountable. Some other ways to construct infinite sets are simply to add …

Nov 5, 2023 · Whether the uncountable sum of zeros is zero or not simply depends on the definition of uncountable sum you're using. After all, concepts in mathematics require formal …

Jun 24, 2018 · Countable. Uncountable. Countable or uncountable. Finite. At most countable. I understand it has to be countable, that is option 3. But the answer given was option 7 - "at …

A set $A$ is countable if $A\approx\mathbb {N}$, and uncountable if it is neither finite nor countably infinite.

The problem is that one can go on like this forever without generating an uncountable ordinal, and Cantor knew that there were uncountable sets. Therefore something wholly new was needed …

If there is no such bijection, then we say that A A is not countable or uncountable. If there is a bijection from a finite subset of N N to the set A A then we say that A A is finite countable.