Let $\mathbb{R}$ be equipped with the standard topology.
Let $E$ be the set of irrational numbers.
How do i prove that $E$ is not a countable union of closed subsets, using Baire Category Theorem?
2026-03-26 02:47:51.1774493271
how do i prove that the the set of irrationals cannot be a countable union of closed subsets?
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