l) 2Z; 2) mZ; 3) Q; 4) Z ; 5) 2Z ; 6) Q ;

3. Matritsalarni odatdagidek qo‘shish va ko‘paytirish amallariga nisbatan quyidagi to‘plamlarning qaysi biri maydon tashkil qiladi?

1) 2)

Bu halqalarning qaysi biri birlik elementga ega, biri ikkinchisiga qism halqa bo‘lgan ikkita halqani ko‘rsating.

1b₁>,2,b₂>ZxZ), 1,b₁>=a₂,b₂>a₁=a₂b₁=b₂
1) 1,b₁>+2,b₂>=1+a₂; b₁+b₂>, 1,b₁>2,b₂>=1a₂; b₁b₂>;
2) (1,b₁>+2,b₂>=1+a₂; b₁+b₂>, 1,b₁>2,b₂>=
=1a₂+b₁b₂; a₁b₂+a₂b₁>;
3) (+ ₂,b₂>=₂; b,+b₂>, ₁ , b₁>₂,b₂>=
=₁ a₂+2b₁b₂; a₁ b₂+a₂b₁>;
4) (₁,b₁>+ ₂,b₂>=*₁+a₂; b₁+b₂>, ₁ ,b₁>-₂,b₂>=^:
=₁ a₂- 2b₁b₂; a₁b₂+a₂b₁>.
Agar Q[ ]={a+b +c[ :a.b.cÎQ] bo‘lsa, (Q[ ];+,  ,0,1) ni maydon bo‘lishini isbotlang.
Maydon nolning bo‘luvchilariga ega emasligini isbotlang
5. Agar (P;+,,0,1) maydon bo‘lsa, u holda quyidagilarni isbotlang:
1) " (a,bÎP) ab=1a0b=a^-1; 2) " (a,bÎP)ab=ac.b=a;
3) " (a,bÎP)ab=0(a=0b=0);4) "(abÎP)a0(a0b0);
5) "(a,b,c,dÎP)b0,d0  ad=bc;
" (a,b,c,dÎP) b0,d0
" (a,b,c,d ÎP) b¹0,
" (a,b,c,d ÎP) b¹0,d¹0 
" (a,b,c,d ÎP) b¹0,d¹0 ;
10) " (a,b,c,d "P) b¹0,c¹0 

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