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8 January, 22:32

Let A, B, C and D be sets. Prove that A / B and C / D are disjoint if and only if A ∩ C ⊆ B ∪ D

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  1. 9 January, 02:12
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    Step-by-step explanation:

    We have to prove both implications of the affirmation.

    1) Let's assume that A / B and C / D are disjoint, we have to prove that A ∩ C ⊆ B ∪ D.

    We'll prove it by reducing to absurd.

    Let's suppose that A ∩ C ⊄ B ∪ D. That means that there is an element x that belongs to A ∩ C but not to B ∪ D.

    As x belongs to A ∩ C, x ∈ A and x ∈ C.

    As x doesn't belong to B ∪ D, x ∉ B and x ∉ D.

    With this, we can say that x ∈ A / B and x ∈ C / D.

    Therefore, x ∈ (A / B) ∩ (C / D), absurd!

    It's absurd because we were assuming that A / B and C / D were disjoint, therefore their intersection must be empty.

    The absurd came from assuming that A ∩ C ⊄ B ∪ D.

    That proves that A ∩ C ⊆ B ∪ D.

    2) Let's assume that A ∩ C ⊆ B ∪ D, we have to prove that A / B and C / D are disjoint (i. e. A / B ∩ C / D is empty)

    We'll prove it again by reducing to absurd.

    Let's suppose that A / B ∩ C / D is not empty. That means there is an element x that belongs to A / B ∩ C / D. Therefore, x ∈ A / B and x ∈ C / D.

    As x ∈ A / B, x belongs to A but x doesn't belong to B.

    As x ∈ C / D, x belongs to C but x doesn't belong to D.

    With this, we can say that x ∈ A ∩ C and x ∉ B ∪ D.

    So, there is an element that belongs to A ∩ C but not to B∪D, absurd!

    It's absurd because we were assuming that A ∩ C ⊆ B ∪ D, therefore every element of A ∩ C must belong to B ∪ D.

    The absurd came from assuming that A / B ∩ C / D is not empty.

    That proves that A / B ∩ C / D is empty, i. e. A / B and C / D are disjoint.
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