Chapter 3

Define a relation on sets by setting \(A \sim B\) if and only if \(|A|=|B| .\) Show that this relation is an equivalence relation.

Let \(I=\\{x: x \in \mathbb{R}, 0 \leq x<1\\}\). Show that a. \(\quad|I|=|\\{x: x \in \mathbb{R}, 0 \leq x \leq 1\\}|\) b. \(|I|=|\\{x: x \in \mathbb{R}, 0

Let \(A\) be the set of even integers. Show that \(|A|=\aleph_{0}\).

Let \(I=\\{x: x \in \mathbb{R}, 0 \leq x<1\\}\) and suppose \(a\) and \(b\) are real numbers with \(a

Verify each of the following: a. If \(A\) is a nonempty subset of \(\mathbb{Z}^{+},\) then \(A\) is either finite or countable. b. If \(A\) is a nonempty subset of a countable set \(B,\) then \(A\) is either finite or countable.

Suppose \(A\) is uncountable and \(B \subset A\) is countable. Show that \(A \backslash B\) is uncountable.