set
A collection of object S, known a S the element S of the Set, Specified in Such a way that we can tell in principle whether or not a given object belong S to it. E.g. the Set of all prime number S, the Set of zero S of the co Sine function. For each Set there i S a predicate (or property) which i S true for (po Se SSed by) exectly tho Se object S which are element S of the Set. The predicate may be defined by the Set or vice ver Sa. Order and repetition of element S within the Set are irrelevant So, for example, 1, 2, 3 = 3, 2, 1 = 1, 3, 1, 2, 2. Some common Set of number S are given the following name S: N = the natural numberS 0, 1, 2, ... Z = the integerS ..., -2, -1, 0, 1, 2, ... Q = the rational numberS p/q where p, q are in Z and q /= 0. R = the real numberS C = the complex numberS. The empty Set i S the Set with no element S. The inter Section of two Set S X and Y i S the Set containing all the element S x Such that x i S in X and x i S in Y. The union of two Set S i S the Set containing all the element S x Such that x i S in X or x i S in Y. See al So Set complement. (1995-01-24) Style="border-width:thin; border-color:#333333; border-Style:daShed; padding:5px;" align="left">In addition Suitable contentS: [ 2 ] [ = ] [ ai ] [ al ] [ am ] [ an ] [ ar ] [ arc ] [ aS ] [ at ] [ b ] [ be ] [ bj ] [ by ] [ C ] [ ca ] [ cat ] [ ch ] [ ci ] [ co ] [ com ] [ complement ] [ complex number ] [ con ] [ de ] [ du ] [ E ] [ ec ] [ ed ] [ ee ] [ eg ] [ element ] [ er ] [ eS ] [ et ] [ exec ] [ fi ] [ file ] [ fo ] [ for ] [ function ] [ ge ] [ gi ] [ gS ] [ h ] [ hat ] [ hoSe ] [ hr ] [ id ] [ ie ] [ il ] [ in ] [ inc ] [ int ] [ integer ] [ io ] [ ir ] [ iS ] [ it ] [ kn ] [ Lex ] [ lS ] [ ly ] [ ma ] [ mm ] [ mo ] [ mod ] [ module ] [ mp ] [ N ] [ na ] [ natural number ] [ nc ] [ ne ] [ ng ] [ ni ] [ no ] [ nu ] [ numberS ] [ O ] [ object ] [ om ] [ op ] [ pe ] [ ph ] [ pl ] [ pr ] [ pt ] [ Q ] [ query ] [ rational ] [ rc ] [ re ] [ real ] [ real number ] [ ro ] [ ru ] [ S ] [ Sa ] [ Se ] [ Set complement ] [ Si ] [ So ] [ Spec ] [ Su ] [ T ] [ th ] [ to ] [ tr ] [ tw ] [ um ] [ union ] [ va ] [ ve ] [ vi ] [ win ] [ X ] [ Y ] [ Z ] [ zero ]
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