यदि (n\(A\setminus B\)=9), (n\(A\cap B\)=6) और (n\(B\setminus A\)=11) हैं, तो (n\(A\cup B\)) कितना है?
If (n\(A\setminus B\)=9), (n\(A\cap B\)=6), and (n\(B\setminus A\)=11), what is (n\(A\cup B\))?
Explanation opens after your attempt
C. (26)
Concept
The union is made of three disjoint parts: \(A\setminus B\), \(A\cap B\), and \(B\setminus A\). Hence (9+6+11=26).
Why this answer is correct
The correct answer is C. (26). The union is made of three disjoint parts: \(A\setminus B\), \(A\cap B\), and \(B\setminus A\). Hence (9+6+11=26).
Exam Tip
संघ तीन अलग-अलग भागों \(A\setminus B\), \(A\cap B\), और \(B\setminus A\) से बनता है। इसलिए (9+6+11=26)।
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