Welcome to Anagrammer Crossword Genius! Keep reading below to see if expiring is an answer to any crossword puzzle or word game (Scrabble, Words With Friends etc). Scroll down to see all the info we have compiled on expiring.
expiring
Searching in Crosswords ...
The answer EXPIRING has 3 possible clue(s) in existing crosswords.
Searching in Word Games ...
The word EXPIRING is VALID in some board games. Check EXPIRING in word games in Scrabble, Words With Friends, see scores, anagrams etc.
Searching in Dictionaries ...
Definitions of expiring in various dictionaries:
verb - lose validity
verb - pass from physical life and lose all bodily attributes and functions necessary to sustain life
verb - expel air
more
Word Research / Anagrams and more ...
Keep reading for additional results and analysis below.
Possible Crossword Clues |
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With my last breath I use the phone at last |
Former religious group ceasing to exist |
Running out of validity |
Last Seen in these Crosswords & Puzzles |
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Sep 10 2014 The Times - Concise |
Apr 1 2011 The Times - Cryptic |
Aug 4 2006 Irish Times (Crosaire) |
Possible Dictionary Clues |
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Ending, terminating, dying. |
Present participle of expire. |
(of a document, authorization, or agreement) come to the end of the period of validity. |
(of a person) die. |
Exhale (air) from the lungs. |
Expiring might refer to |
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In mathematics, an Exp algebra is a Hopf algebra Exp(G) constructed from an abelian group G, and is the universal ring R such that there is an exponential map from G to the group of the power series in R[[t]] with constant term 1. In other words the functor Exp from abelian groups to commutative rings is adjoint to the functor from commutative rings to abelian groups taking a ring to the group of formal power series with constant term 1. * The definition of the exp ring of G is similar to that of the group ring Z[G] of G, which is the universal ring such that there is an exponential homomorphism from the group to its units. In particular there is a natural homomorphism from the group ring to a completion of the exp ring. However in general the Exp ring can be much larger than the group ring: for example, the group ring of the integers is the ring of Laurent polynomials in 1 variable, while the exp ring is a polynomial ring in countably many generators. |