समुच्चय (A) में (5) अवयव हैं। (A) पर प्रतिवर्ती और सममित दोनों संबंधों की संख्या कितनी होगी?

A set (A) has (5) elements. How many relations on (A) are both reflexive and symmetric?

Explanation opens after your attempt
Correct Answer

A. \(2^{10}\)

Step 1

Concept

Reflexivity fixes the (5) diagonal pairs. Symmetry leaves only (\frac{5(5-1)}{2}=10) off-diagonal blocks free, so the answer is \(2^{10}\).

Step 2

Why this answer is correct

The correct answer is A. \(2^{10}\). Reflexivity fixes the (5) diagonal pairs. Symmetry leaves only (\frac{5(5-1)}{2}=10) off-diagonal blocks free, so the answer is \(2^{10}\).

Step 3

Exam Tip

प्रतिवर्ती होने से (5) diagonal pairs fixed हैं। सममिति में केवल (\frac{5(5-1)}{2}=10) off-diagonal blocks स्वतंत्र हैं, इसलिए \(2^{10}\)।

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समुच्चय (A) में (5) अवयव हैं। (A) पर प्रतिवर्ती और सममित दोनों संबंधों की संख्या कितनी होगी? / A set (A) has (5) elements. How many relations on (A) are both reflexive and symmetric?

Correct Answer: A. \(2^{10}\). Explanation: प्रतिवर्ती होने से (5) diagonal pairs fixed हैं। सममिति में केवल (\frac{5(5-1)}{2}=10) off-diagonal blocks स्वतंत्र हैं, इसलिए \(2^{10}\)। / Reflexivity fixes the (5) diagonal pairs. Symmetry leaves only (\frac{5(5-1)}{2}=10) off-diagonal blocks free, so the answer is \(2^{10}\).

Which concept should I revise for this Mathematics MCQ?

Reflexivity fixes the (5) diagonal pairs. Symmetry leaves only (\frac{5(5-1)}{2}=10) off-diagonal blocks free, so the answer is \(2^{10}\).

What exam hint can help solve this Mathematics question?

प्रतिवर्ती होने से (5) diagonal pairs fixed हैं। सममिति में केवल (\frac{5(5-1)}{2}=10) off-diagonal blocks स्वतंत्र हैं, इसलिए \(2^{10}\)।