यदि \(U=\mathbb{R}\), (A=(-5,2]) और (B=[-1,6)), तो (\(A\cap B\)') क्या है?

If \(U=\mathbb{R}\), (A=(-5,2]) and (B=[-1,6)), what is (\(A\cap B\)')?

Explanation opens after your attempt
Correct Answer

A. (\(-\infty,-1\)\cup\(2,\infty\))

Step 1

Concept

\(A\cap B=[-1,2]\), so its complement is (\(-\infty,-1\)\cup\(2,\infty\)). Watch the endpoints in interval questions.

Step 2

Why this answer is correct

The correct answer is A. (\(-\infty,-1\)\cup\(2,\infty\)). \(A\cap B=[-1,2]\), so its complement is (\(-\infty,-1\)\cup\(2,\infty\)). Watch the endpoints in interval questions.

Step 3

Exam Tip

\(A\cap B=[-1,2]\), इसलिए उसका पूरक (\(-\infty,-1\)\cup\(2,\infty\)) है। अंतरालों में सीमा बिंदुओं पर ध्यान दें।

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FAQs

Mathematics Answer, Explanation and Revision Hints

यदि \(U=\mathbb{R}\), (A=(-5,2]) और (B=[-1,6)), तो (\(A\cap B\)') क्या है? / If \(U=\mathbb{R}\), (A=(-5,2]) and (B=[-1,6)), what is (\(A\cap B\)')?

Correct Answer: A. (\(-\infty,-1\)\cup\(2,\infty\)). Explanation: \(A\cap B=[-1,2]\), इसलिए उसका पूरक (\(-\infty,-1\)\cup\(2,\infty\)) है। अंतरालों में सीमा बिंदुओं पर ध्यान दें। / \(A\cap B=[-1,2]\), so its complement is (\(-\infty,-1\)\cup\(2,\infty\)). Watch the endpoints in interval questions.

Which concept should I revise for this Mathematics MCQ?

\(A\cap B=[-1,2]\), so its complement is (\(-\infty,-1\)\cup\(2,\infty\)). Watch the endpoints in interval questions.

What exam hint can help solve this Mathematics question?

\(A\cap B=[-1,2]\), इसलिए उसका पूरक (\(-\infty,-1\)\cup\(2,\infty\)) है। अंतरालों में सीमा बिंदुओं पर ध्यान दें।