Math

QuestionDraw Venn diagrams for sets AA and BB to show that A=(AB)(ABˉ)A = (A \cap B) \cup (A \cap \bar{B}).

Studdy Solution

STEP 1

Assumptions1. AA and BB are two sets. . \cap denotes the intersection of two sets.
3. \cup denotes the union of two sets.
4. Bˉ\bar{B} denotes the complement of set BB.

STEP 2

First, let's understand the expression A=(AB)(ABˉ)A=(A \cap B) \cup(A \cap \bar{B}).
This expression states that set AA can be expressed as the union of the intersection of sets AA and BB and the intersection of sets AA and the complement of BB.

STEP 3

Draw two overlapping circles to represent sets AA and BB in a Venn diagram. Label the circles as AA and BB respectively.

STEP 4

The intersection of sets AA and BB (ABA \cap B) is represented by the area where the two circles overlap.

STEP 5

The complement of set BB (Bˉ\bar{B}) is represented by the area outside circle BB but within the universal set.

STEP 6

The intersection of sets AA and the complement of BB (ABˉA \cap \bar{B}) is represented by the area within circle AA but outside circle BB.

STEP 7

The union of the intersection of sets AA and BB and the intersection of sets AA and the complement of BB ((AB)(ABˉ)A \cap B) \cup(A \cap \bar{B})) is represented by the entire area within circle AA.

STEP 8

From the Venn diagram, it is clear that the entire area within circle AA is equal to the union of the intersection of sets AA and BB and the intersection of sets AA and the complement of BB. Hence, the Venn diagram verifies the given expression A=(AB)(ABˉ)A=(A \cap B) \cup(A \cap \bar{B}).

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