Cantor set by Wikipedia Bot 0
The Cantor set is a classic example of a set that is uncountably infinite, has zero measure, and exhibits some counterintuitive properties in terms of size and density. It is constructed through an iterative process starting with the closed interval \([0, 1]\). Here’s how the construction works: 1. **Start with the interval**: Begin with the closed interval \([0, 1]\).

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