Said of a set of well-formed formulas: that it is as large as it can be without being inconsistent; i.e. that for any well-formed formula φ, the set contains either φ or ~φ.
The element of a set with the greatest magnitude.
Said of an ideal of a ring or a filter of a lattice: that it is as large as it can be without being trivial (improper).
Largest, greatest (in magnitude), highest, most.
An ordinal value that is represented by an expression ending in 1 such as the (n + 1)th.
A fractional part of an integer ending in one
'first', or other ordinal derivatives of 'one', such as hundred-and-oneth or minus-oneth
Used at the end of algebraic expressions indicating ordinal position that end in 1, such as (k+1)ᵗʰ