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CROSSWORD
ANSWER

cosets

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The answer COSETS has 8 possible clue(s) in existing crosswords.

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

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Definitions of cosets in various dictionaries:

noun - a mathematical subset

COSETS - In mathematics, if G is a group, and H is a subgroup of G, and g is an element of G, then gH = {gh : h an element of H} is the left coset of H in G ...

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Possible Crossword Clues
Math groups
High school math subjects
Math subgroups
Mathematical groups
Mathematical subgroups
Mathematical collections studied by group theorists

Last Seen in these Crosswords & Puzzles
Nov 28 2014 USA Today
Sep 15 2011 New York Times
Oct 28 2010 New York Times
Feb 20 2008 The A.V Club
Feb 2 2007 New York Times
Dec 9 2006 Universal
Mar 26 2004 Universal
Mar 31 1998 New York Times

Possible Dictionary Clues
Plural form of coset.
a set composed of all the products obtained by multiplying each element of a subgroup in turn by one particular element of the group containing the subgroup.
A set composed of all the products obtained by multiplying each element of a subgroup in turn by one particular element of the group containing the subgroup.

Cosets might refer to
In mathematics, if G is a group, and H is a subgroup of G, and g is an element of G, then* gH = {gh : h an element of H} is the left Coset of H in G with respect to g, and * Hg = {hg : h an element of H} is the right coset of H in G with respect to g.Only when H is normal will the set of right cosets and the set of left cosets of H coincide, which is one definition of normality of a subgroup. Although derived from a subgroup, cosets are not usually themselves subgroups of G, only subsets. * A coset is a left or right coset of some subgroup in G. Since Hg = g(g1Hg), the right coset Hg (of H with respect to g) and the left coset g(g1Hg) (of the conjugate subgroup g1Hg) are the same. Hence it is not meaningful to speak of a coset as being left or right unless one first specifies the underlying subgroup. In other words: a right coset of one subgroup equals a left coset of a different (conjugate) subgroup. If the left cosets and right cosets are the same, then H is a normal subgroup and the c

Cosets might refer to

In mathematics, if G is a group, and H is a subgroup of G, and g is an element of G, then* gH = {gh : h an element of H} is the left Coset of H in G with respect to g, and
* Hg = {hg : h an element of H} is the right coset of H in G with respect to g.Only when H is normal will the set of right cosets and the set of left cosets of H coincide, which is one definition of normality of a subgroup. Although derived from a subgroup, cosets are not usually themselves subgroups of G, only subsets.
* A coset is a left or right coset of some subgroup in G. Since Hg = g(g1Hg), the right coset Hg (of H with respect to g) and the left coset g(g1Hg) (of the conjugate subgroup g1Hg) are the same. Hence it is not meaningful to speak of a coset as being left or right unless one first specifies the underlying subgroup. In other words: a right coset of one subgroup equals a left coset of a different (conjugate) subgroup. If the left cosets and right cosets are the same, then H is a normal subgroup and the c

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