Wrapping my head around the mathematical definition of infinity and just curious here: Are there more real numbers than irrational numbers? It would intuitively seem so, but they are both just uncountable infinite sets, right? Some I guess there would be the same number of irrational numbers as real numbers? But I can't imagine a "bijection" between them. (A term I just learned about five minutes ago...)
2026-03-25 06:02:29.1774418549
Are there more real numbers than irrational numbers?
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