यदि (\(A\cup B'\)\cap\(A'\cup B'\)=B'), तो कौन सा सरल रूप इसे सही दिखाता है?
If (\(A\cup B'\)\cap\(A'\cup B'\)=B'), which simplification shows it correctly?
Explanation opens after your attempt
A. (B'\cup\(A\cap A'\)=B')
Concept
By distributive law, (\(A\cup B'\)\cap\(A'\cup B'\)=B'\cup\(A\cap A'\)). Since \(A\cap A'=\varnothing\), the result is (B').
Why this answer is correct
The correct answer is A. (B'\cup\(A\cap A'\)=B'). By distributive law, (\(A\cup B'\)\cap\(A'\cup B'\)=B'\cup\(A\cap A'\)). Since \(A\cap A'=\varnothing\), the result is (B').
Exam Tip
वितरण नियम से (\(A\cup B'\)\cap\(A'\cup B'\)=B'\cup\(A\cap A'\))। चूंकि \(A\cap A'=\varnothing\), परिणाम (B') है।
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