证明1.Let A,B,and C be sets.Prove thatA∪包含 (A∪B ∪C).2.Let A,B,and C be sets.Prove that(A-C)∩(C -B) = 空集
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证明1.Let A,B,and C be sets.Prove thatA∪包含 (A∪B ∪C).2.Let A,B,and C be sets.Prove that(A-C)∩(C -B) = 空集
证明
1.Let A,B,and C be sets.Prove that
A∪包含 (A∪B ∪C).
2.Let A,B,and C be sets.Prove that
(A-C)∩(C -B) = 空集
证明1.Let A,B,and C be sets.Prove thatA∪包含 (A∪B ∪C).2.Let A,B,and C be sets.Prove that(A-C)∩(C -B) = 空集
1、
Pick a∈A∪B ,then a a∈A or a∈B.
there are two cases:
case 1 :a∈A,then a must be a member of
one of A,B,C.that means a a∈A∪B ∪C
case 2:a∈B,similarly discuss.
so in both cases,a must be member of A∪B ∪C
that means A∪B is subset of ∪B ∪C
2.Pick a∈(A-C),a must be in A and not in C.because a is not C,a is not in C-B.
so,for every element a ,a can not be in both (A-C) and (B-C).that means (A-C)∩(C -B) has no element.
therefore,(A-C)∩(C -B) is empty set.
1,如果证明A∪B包含 (A∪B ∪C)
任取x属于A∪B
它要么在A中,要么在B中
所以也一定在 (A∪B ∪C)中
所以成立
2,因为(A-C)里的元素是不属于C的,而(C -B) 中的元素都是属于C的
所以它们不相交,所以是空集