Let A={1,2,4,5}, B={2,3,5,6}, C={4,5,6,7} Verify the following identity : A∪(B∩C) = (A∪B)∩(A∪C)

Verify A∪(B∩C) = (A∪B)∩(A∪C)

Question:

Let \[ A=\{1,2,4,5\},\quad B=\{2,3,5,6\},\quad C=\{4,5,6,7\} \] Verify the identity: \[ A\cup(B\cap C)=(A\cup B)\cap(A\cup C) \]

Solution

First find \( B\cap C \):

\[ B\cap C=\{5,6\} \]

Now find \( A\cup(B\cap C) \):

\[ A\cup(B\cap C) = \{1,2,4,5\}\cup\{5,6\} \] \[ A\cup(B\cap C)=\{1,2,4,5,6\} \]

Now find \( A\cup B \):

\[ A\cup B = \{1,2,4,5\}\cup\{2,3,5,6\} \] \[ A\cup B=\{1,2,3,4,5,6\} \]

Next find \( A\cup C \):

\[ A\cup C = \{1,2,4,5\}\cup\{4,5,6,7\} \] \[ A\cup C=\{1,2,4,5,6,7\} \]

Now find \( (A\cup B)\cap(A\cup C) \):

\[ (A\cup B)\cap(A\cup C) = \{1,2,3,4,5,6\}\cap\{1,2,4,5,6,7\} \] \[ (A\cup B)\cap(A\cup C)=\{1,2,4,5,6\} \]

Therefore,

\[ A\cup(B\cap C)=(A\cup B)\cap(A\cup C) \]

Hence verified.

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