Consider the statement $\text { For all sets } A \text { and } B , ( A - B ) \cap B = \emptyset \text {. }$
The proof below is the beginning of a proof using the element method for proving that the
set equals the empty set. Complete the proof without using any of the set properties from
Theorem 6.2.2. Proof: Suppose the given statement is false. Then there exist sets $A$ and $B$ such that $( A -$ $B ) \cap B \neq \emptyset$. Thus there is an element $x$ in $( A - B ) \cap B$. By definition of intersection,...

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The Answer of Consider the statement $\text { For all sets } A \text { and } B , ( A - B ) \cap B = \emptyset \text {. }$
The proof below is the beginning of a proof using the element method for proving that the
set equals the empty set. Complete the proof without using any of the set properties from
Theorem 6.2.2. Proof: Suppose the given statement is false. Then there exist sets $A$ and $B$ such that $( A -$ $B ) \cap B \neq \emptyset$. Thus there is an element $x$ in $( A - B ) \cap B$. By definition of intersection,...

Consider the Statement For all sets A and B,(A−B)∩B=∅. \text { For all sets } A \text { and } B , ( A - B ) \cap B = \emptyset \text {. } For all sets A and B,(A−B)∩B=∅.

Consider the Statement $\text { For all sets } A \text { and } B , ( A - B ) \cap B = \emptyset \text {. }$