Theorem 1(ii) (For any three set A;B;C ;...

Theorem 1(ii) (For any three set `A;B;C` ; prove that `Axx(BnnC)=(AxxB)nn(AxxC)`

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Theorem 1 (ii) (For any three set A;B;C ; prove that A xx(B nn C)=(A xx B)nn(A xx C)

Theorem 1(i) (For any three set A;B;C ; prove that Axx(BuuC)=(AxxB)uu(AxxC))

Theorem 2 (For any three set A;B;C ; prove that A xx(B-C)=(A xx B)-(A xx C)

For any three sets A, B, C, prove that : Axx(B nn C)=(A xx B)nn (Axx C) .

For any three sets A,B and C prove that, Axx(B-C)=(AxxB)-(AxxC) .

Prove that Axx(BcupC)=(AxxB)cup(AxxC)

Prove that Axx(BcupC)=(AxxB)cup(AxxC)

Prove that Axx(BcupC)=(AxxB)cup(AxxC)

For any three sets A, B,C prove that : Axx (B uu C)= (AxxB) uu (AxxC) .

For any three sets A, B,C prove that : Axx (B uu C)= (AxxB) uu (AxxC) .

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