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2. Equinumerosity - Wikipedia

   en.wikipedia.org/wiki/Equinumerosity

   In his controversial 1878 paper, Cantor explicitly defined the notion of "power" of sets and used it to prove that the set of all natural numbers ⁠ ⁠ and the set of all rational numbers ⁠ ⁠ are equinumerous (an example where a proper subset of an infinite set is equinumerous to the original set), and that the Cartesian product of even a ...

3. Cardinality - Wikipedia

   en.wikipedia.org/wiki/Cardinality

   The cardinality of the natural numbers is denoted aleph-null (), while the cardinality of the real numbers is denoted by "" (a lowercase fraktur script "c"), and is also referred to as the cardinality of the continuum.

4. Continuum hypothesis - Wikipedia

   en.wikipedia.org/wiki/Continuum_hypothesis

   Hence, the set {banana, apple, pear} has the same cardinality as {yellow, red, green}. With infinite sets such as the set of integers or rational numbers, the existence of a bijection between two sets becomes more difficult to demonstrate. The rational numbers seemingly form a counterexample to the continuum hypothesis: the integers form a ...

5. Cardinality of the continuum - Wikipedia

   en.wikipedia.org/wiki/Cardinality_of_the_continuum

   The set of real algebraic numbers is countably infinite (assign to each formula its Gödel number.) So the cardinality of the real algebraic numbers is . Furthermore, the real algebraic numbers and the real transcendental numbers are disjoint sets whose union is .

6. Cardinal number - Wikipedia

   en.wikipedia.org/wiki/Cardinal_number

   A bijective function, f: X → Y, from set X to set Y demonstrates that the sets have the same cardinality, in this case equal to the cardinal number 4. Aleph-null, the smallest infinite cardinal. In mathematics, a cardinal number, or cardinal for short, is what is commonly called the number of elements of a set.

7. Continuum (set theory) - Wikipedia

   en.wikipedia.org/wiki/Continuum_(set_theory)

   The cardinality of the continuum is the size of the set of real numbers. The continuum hypothesis is sometimes stated by saying that no cardinality lies between that of the continuum and that of the natural numbers , ℵ 0 {\displaystyle \aleph _{0}} , or alternatively, that c = ℵ 1 {\displaystyle {\mathfrak {c}}=\aleph _{1}} .

8. Aleph number - Wikipedia

   en.wikipedia.org/wiki/Aleph_number

   Notably, ℵ ω is the first uncountable cardinal number that can be demonstrated within Zermelo–Fraenkel set theory not to be equal to the cardinality of the set of all real numbers 2 ℵ 0: For any natural number n ≥ 1, we can consistently assume that 2 ℵ 0 = ℵ n, and moreover it is possible to assume that 2 ℵ 0 is as least as large ...

9. Cardinal characteristic of the continuum - Wikipedia

   en.wikipedia.org/wiki/Cardinal_characteristic_of...

   In the mathematical discipline of set theory, a cardinal characteristic of the continuum is an infinite cardinal number that may consistently lie strictly between (the cardinality of the set of natural numbers), and the cardinality of the continuum, that is, the cardinality of the set of all real numbers. The latter cardinal is denoted or .