<span class="searchmatch">multiplicative</span> <span class="searchmatch">subsets</span> plural of <span class="searchmatch">multiplicative</span> <span class="searchmatch">subset</span>...
an article on: <span class="searchmatch">multiplicatively</span> closed set Wikipedia <span class="searchmatch">multiplicative</span> <span class="searchmatch">subset</span> (plural <span class="searchmatch">multiplicative</span> <span class="searchmatch">subsets</span>) (commutative algebra) A <span class="searchmatch">subset</span> of a ring which...
numeral <span class="searchmatch">multiplicative</span> operation <span class="searchmatch">multiplicative</span> <span class="searchmatch">subset</span> nonmultiplicative submultiplicative supermultiplicative of or pertaining to <span class="searchmatch">multiplication</span> distributive...
English Wikipedia has an article on: <span class="searchmatch">subset</span> Wikipedia From sub- + set. (UK) IPA(key): /ˈsʌbˌsɛt/ <span class="searchmatch">subset</span> (plural <span class="searchmatch">subsets</span>) (set theory, of a set S) A set A...
element is in the said <span class="searchmatch">subset</span>, or it is the zero (additive identity), or its product with −1 (the additive inverse of the <span class="searchmatch">multiplicative</span> identity) belongs...
subspaces) (linear algebra) A <span class="searchmatch">subset</span> of vectors of a vector space which is closed under the addition and scalar <span class="searchmatch">multiplication</span> of that vector space. Translations...
the <span class="searchmatch">multiplicative</span> semigroup is solvable and (ii) it does not contain a subsemiring with an additive identity 0 {\displaystyle 0} and a <span class="searchmatch">multiplicative</span> identity...
left ideal (plural left ideals) (algebra) A <span class="searchmatch">subset</span> of a ring which is closed under left-<span class="searchmatch">multiplication</span> by any element of the ring. If I is a left ideal...
right ideal (plural right ideals) (algebra) A <span class="searchmatch">subset</span> of a ring which is closed under right-<span class="searchmatch">multiplication</span> by any element of the ring. If I is a right ideal...
whose denominators belong to a <span class="searchmatch">multiplicatively</span> closed unital <span class="searchmatch">subset</span> D of that given ring. Addition and <span class="searchmatch">multiplication</span> of such fractions is defined just...