例句與造句

1. If the ordinals less than ? are closed under addition and contain 0 then ? is occasionally called a ?-number ( see additively indecomposable ordinal ).
2. A ?-number ( see additively indecomposable ordinal # Multiplicatively indecomposable ) is an ordinal greater than 1 such that ?? = ? whenever 0 ? ?.
3. Similarly, one can consider " additively indecomposable ordinals " ( meaning a nonzero ordinal that is not the sum of two strictly smaller ordinals ) : the \ gamma-th additively indecomposable ordinal is indexed as \ omega ^ \ gamma.
4. Similarly, one can consider " additively indecomposable ordinals " ( meaning a nonzero ordinal that is not the sum of two strictly smaller ordinals ) : the \ gamma-th additively indecomposable ordinal is indexed as \ omega ^ \ gamma.
5. defined gamma numbers ( see additively indecomposable ordinal ) to be numbers ? > 0 such that ? + ? = ? whenever ? 1 such that ?? = ? whenever 0 2 such that ? ? = ? whenever 1 ?, and his delta numbers are those of the form ? ? ?.
6. It's difficult to find additively indecomposable ordinal in a sentence. 用additively indecomposable ordinal造句挺難的