'Formulate and prove DeMorgan laws for arbitrary unions and intersections_'
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Step 1
This implies \( X \) does not belong to \( A \cup B \). Therefore, \( X \) does not belong to \( A \) and \( X \) does not belong to \( B \). This implies \( X \) belongs to \( A^c \) and \( X \) belongs to \( B^c \). ** Show more…
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Draw Venn diagrams to verify DeMorgan's laws. That is, for any two sets $A$ and $B, \overline{(A \cup B)}=\bar{A} \cap \bar{B}$ and $\overline{(A \cap B)}=\bar{A} \cup \bar{B}$
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