\(\mathbb{R}\) पर (aRb) तभी जब (a-b) परिमेय है। (R) के equivalence classes किस प्रकार बनते हैं?

On \(\mathbb{R}\), (aRb) if and only if (a-b) is rational. How are the equivalence classes of (R) formed?

Explanation opens after your attempt
Correct Answer

A. \([a]={a+q:q\in\mathbb{Q}}\)

Step 1

Concept

(xRa) means \(x-a\in\mathbb{Q}\), so (x=a+q) where \(q\in\mathbb{Q}\). When writing a class, solve the relation condition for the variable.

Step 2

Why this answer is correct

The correct answer is A. \([a]={a+q:q\in\mathbb{Q}}\). (xRa) means \(x-a\in\mathbb{Q}\), so (x=a+q) where \(q\in\mathbb{Q}\). When writing a class, solve the relation condition for the variable.

Step 3

Exam Tip

(xRa) का अर्थ \(x-a\in\mathbb{Q}\), यानी (x=a+q) जहाँ \(q\in\mathbb{Q}\)। Class लिखते समय variable को relation condition से निकालें।

Question me issue ya doubt hai?

Answer, explanation, typing mistake ya suggestion directly hamari team ko bhejein. 📱Helpline (Call / WhatsApp): +91 7272824365

Related Mathematics Questions

FAQs

Mathematics Answer, Explanation and Revision Hints

\(\mathbb{R}\) पर (aRb) तभी जब (a-b) परिमेय है। (R) के equivalence classes किस प्रकार बनते हैं? / On \(\mathbb{R}\), (aRb) if and only if (a-b) is rational. How are the equivalence classes of (R) formed?

Correct Answer: A. \([a]={a+q:q\in\mathbb{Q}}\). Explanation: (xRa) का अर्थ \(x-a\in\mathbb{Q}\), यानी (x=a+q) जहाँ \(q\in\mathbb{Q}\)। Class लिखते समय variable को relation condition से निकालें। / (xRa) means \(x-a\in\mathbb{Q}\), so (x=a+q) where \(q\in\mathbb{Q}\). When writing a class, solve the relation condition for the variable.

Which concept should I revise for this Mathematics MCQ?

(xRa) means \(x-a\in\mathbb{Q}\), so (x=a+q) where \(q\in\mathbb{Q}\). When writing a class, solve the relation condition for the variable.

What exam hint can help solve this Mathematics question?

(xRa) का अर्थ \(x-a\in\mathbb{Q}\), यानी (x=a+q) जहाँ \(q\in\mathbb{Q}\)। Class लिखते समय variable को relation condition से निकालें।