Мысалдар:
1.A={1,2}, B={3,4} берілсін. AхB={ (1,3),(1,4),(2,3),(2,4) };
BхA={ (3,1),(3,2),(4,1),(4,2) };
AхA={ (1,1),(1,2),(2,1),(2,2) }; Бұл мысалдардан AхBBхA.
2. (Шахмат тақтасы).
A={a,b,c,d,e,f,g,h}; B={1,2,3,4,5,6,7,8} жиындары берілсін. Олай болса әр (х,у) жұбына x,yAхB шахмат тақтасының торлар жиыны сәйкес келеді.
3. [0,1]2 жиыны { (a,b) | 0 a 1, 0 b 1 } ;Бұл жиынға жазықтықтың 1-ден аспайтын теріс емес координаттары бар нүктелер жиыны сәйкес келеді.
4. A={a,b,c}; B={1,2}; AхB={(a,1),(a,2),(b,1),(b,2),(c,1),(c,2)}; BхA={(1,a),(2,a),(1,b),(2,b),(1,c),(2,c)}; AхB BхA
5. А={1,2,3}; АхА={(1,1), (1,2), (1,3), (2,1), (2,2), (2,3), (3,1 ), (3,2), (3,3) };
6. ; ; - жиындарының Декарт көбей-тіндісін табайық. Декарт көбейтіндісінің элементтері әр түрлі жиын элементтерінен алынған жұптардан тұратындығы белгілі.
Оларды кестеге орналастырайық: Бұл кестеде m жол, n бағаннан тұратын элементтер жұбын көреміз. - саны х-элементтерінің жиыны мен ү элементтерінің жиындарының көбейтіндісіне тең. (1)
Бұл жиындарды көбейту ережесі. Егер декарт көбейткіштері n жиыннан тұрса, онда (1) төмендегідей жалпылауға болады:
(2)A х B х C; (A х B) х C; A х (B х C) жиындары да әр түрлі. A х B х C- (a,b,c); (A х B) х C-
((a,b),c ) aA, bB, cC; A х (B х C)=(a, (b,c) ); Егер А,В жиындарының бірі бос болса, олардың Декарт көбейтіндісі де бос деп есептеледі. A х = х A = х = ;
Мысал, А={a1,a2,a3}, B={b1,b2,b3} ; 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) ;
Негізгі әдебиет: 1[5-9]; 2[10-16]
Қосымша әдебиет: 7[9-34]
Бақылау сұрақтары:
Қандай жиынды ішкі жиын деп атайды?
Қандай жиындар тең болады?
Жиындармен орындалатын негізгі операцияларды қандай?
Бірігу,қиылысу,толықтыру операцияларының негізгі қасиеттерін атаңыз.
Жиындарды өрнектеудің қандай әдістері бар?
Достарыңызбен бөлісу: |