Ordinals under Multiplication form Ordered Monoid

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Theorem

$\struct {\On, \times, \le}$ forms an ordered monoid, where:

$\On$ denotes the class of all ordinals

$\times$ denotes ordinal multiplication.

Proof

The result follows from Ordinals under Multiplication form Monoid and Ordinals under Multiplication form Ordered Semigroup.

$\blacksquare$

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