यदि \(U=\mathbb{R}\), (A=\(-\infty,0\)\cup\(4,\infty\)) और (B=[-2,6]), तो \(A'\cap B\) क्या है?
If \(U=\mathbb{R}\), (A=\(-\infty,0\)\cup\(4,\infty\)), and (B=[-2,6]), what is \(A'\cap B\)?
Explanation opens after your attempt
A. ([0,4])
Concept
(A') contains all real values from (0) to (4). Intersecting with (B) still gives ([0,4]).
Why this answer is correct
The correct answer is A. ([0,4]). (A') contains all real values from (0) to (4). Intersecting with (B) still gives ([0,4]).
Exam Tip
(A') में (0) से (4) तक सभी वास्तविक मान आते हैं। इसे (B) से काटने पर ([0,4]) ही मिलता है।
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