Crossword Solver > found answer > ALMOST

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CROSSWORD
ANSWER

almost

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The answer ALMOST has 254 possible clue(s) in existing crosswords.

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The word ALMOST is VALID in some board games. Check ALMOST in word games in Scrabble, Words With Friends, see scores, anagrams etc.

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Definitions of almost in various dictionaries:

adv - (of actions or states) slightly short of or not quite accomplished

adv - very nearly

ALMOST - In set theory, when dealing with sets of infinite size, the term almost or nearly is used to mean all the elements except for finitely many. In other...

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Keep reading for additional results and analysis below.

Possible Crossword Clues
Approaching
Nearly
Not quite
'You just missed!'
Very nearly
Just about
A bit under
Bordering on
'Close but no cigar'
That's not quite all this is - so it's in the malt

Last Seen in these Crosswords & Puzzles
May 29 2019 The Times - Concise
Apr 19 2019 The Guardian - Quick crossword
Mar 12 2019 The Sun - Two Speed
Mar 12 2019 The Sun - Two Speed
Feb 16 2019 Eugene Sheffer - King Feature Syndicate
Jan 22 2019 USA Today
Jan 9 2019 The Times - Cryptic
Dec 14 2018 The Times - Cryptic
Dec 13 2018 Irish Times (Simplex)
Nov 12 2018 The Guardian - Cryptic crossword

Possible Jeopardy Clues
Please resist the temptation to spell this adverb meaning "very nearly" with 2 L's

Possible Dictionary Clues
not quite very nearly.
(of actions or states) slightly short of or not quite accomplished near' is sometimes used informally for nearly' and most' is sometimes used informally for almost'
Not quite very nearly.
nearly:
nearly but not quite:

Almost description
In set theory, when dealing with sets of infinite size, the term almost or nearly is used to mean all the elements except for finitely many. * In other words, an infinite set S that is a subset of another infinite set L, is almost L if the subtracted set L\S is of finite size. * Examples:* The set * * * * S * = * { * n * * * N * * * \| * * n * * k * } * * * {\displaystyle S=\{n\in \mathbf {N} \|n\geq k\}} * is almost N for any k in N, because only finitely many natural numbers are less than k. * The set of prime numbers is not almost N because there are infinitely many natural numbers that are not prime numbers.This is conceptually similar to the almost everywhere concept of measure theory, but is not the same. For example, the Cantor set is uncountably infinite, but has Lebesgue measure zero. So a real number in (0, 1) is a member of the complement of the Cantor set almos

Almost description

In set theory, when dealing with sets of infinite size, the term almost or nearly is used to mean all the elements except for finitely many.
* In other words, an infinite set S that is a subset of another infinite set L, is almost L if the subtracted set L\S is of finite size.
* Examples:* The set
*
*
*
* S
* =
* {
* n
*
*
* N
*
*
* |
*
* n
*
* k
* }
*
*
* {\displaystyle S=\{n\in \mathbf {N} |n\geq k\}}
* is almost N for any k in N, because only finitely many natural numbers are less than k.
* The set of prime numbers is not almost N because there are infinitely many natural numbers that are not prime numbers.This is conceptually similar to the almost everywhere concept of measure theory, but is not the same. For example, the Cantor set is uncountably infinite, but has Lebesgue measure zero. So a real number in (0, 1) is a member of the complement of the Cantor set almos

Related Answers
ABOUT
AIRLESS
ALLBUT
ALMOSTTHERE
ASGOODAS
ATHAND
BYANOSE
CLOSETO
COMING
END

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