यदि \(A\triangle B=(A-B)\cup(B-A)\) और (n\(A\triangle B\)=26), (n\(A\cap B\)=9) है, तो (n\(A\cup B\)) कितना है?
If \(A\triangle B=(A-B)\cup(B-A)\) and (n\(A\triangle B\)=26), (n\(A\cap B\)=9), what is (n\(A\cup B\))?
Explanation opens after your attempt
A. (,35,)
Concept
\(A\cup B\) is made of the disjoint parts symmetric difference and intersection. Hence (n\(A\cup B\)=26+9=35).
Why this answer is correct
The correct answer is A. (,35,). \(A\cup B\) is made of the disjoint parts symmetric difference and intersection. Hence (n\(A\cup B\)=26+9=35).
Exam Tip
\(A\cup B\) सममित अंतर और प्रतिच्छेद के अलग भागों से बनता है। इसलिए (n\(A\cup B\)=26+9=35)।
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