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प्रश्न
For any two sets A and B,\[\left( A - B \right) \cup \left( B - A \right) =\]
पर्याय
(a) \[\left( A - B \right) \cup A\]
(b)\[\left( B - A \right) \cup B\]
(c)\[\left( A \cup B \right) - \left( A \cap B \right)\]
(d)\[\left( A \cup B \right) \cap \left( A \cap B \right)\]
उत्तर
(c)\[\left( A \cup B \right) - \left( A \cap B \right)\]
\[\left( A - B \right) \cup \left( B - A \right) = \left( A \cap B' \right) \cup \left( B \cap A' \right)\]
\[ = \left[ A \cup \left( B \cap A' \right) \right] \cap \left[ B' \cup \left( B \cap A' \right) \right] \left[ \text{ Using distribution law } \right]\]
\[ = \left[ \left( A \cup B \right) \cap \left( A \cup A' \right) \right] \cap \left[ \left( B' \cup B \right) \cap \left( B' \cup A' \right) \right] \left[ \text{ Using distribution law } \right]\]
\[ = \left[ \left( A \cup B \right) \cap \left( U \right) \right] \cap \left[ \left( U \right) \cap \left( B' \cup A' \right) \right] \left[ A \cup A' = U = B' \cup B \right] \]
\[ = \left[ A \cup B \right] \cap \left[ B' \cup A' \right] \left[ \left( A \cup B \right) \cap \left( U \right) = \left( A \cup B \right) \text{ and } \left( U \right) \cap \left( B' \cup A' \right) = \left( B' \cup A' \right) \right] \]
\[ = \left[ A \cup B \right] \cap \left[ \left( A \cap B \right)' \right] \left[ \left( A \cap B \right)' = B' \cup A' \right]\]
\[ = \left[ A \cup B \right] \cap \left[ \left( A \cup B \right) - \left( A \cap B \right) \right]\]
\[ = \left[ \left( A \cup B \right) - \left( A \cap B \right) \right]\]
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