Class 11 Mathematics - Relations And Functions - Functions as a special kind of relation Expert Quiz

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समुच्चय \(A=\{1,2,3,4,6,12\}\) पर संबंध \(R={(a,b)\in A\times A:a\) संख्या (b) को विभाजित करती है(}) दिया है। इस संबंध के लिए कौन सा कथन सही है?

On the set \(A=\{1,2,3,4,6,12\}\), relation \(R={(a,b)\in A\times A:a\) divides (b)(}) is given. Which statement is correct for this relation?

Explanation opens after your attempt
Correct Answer

A. प्रतिवर्ती और संक्रामी लेकिन सममित नहींReflexive and transitive but not symmetric

Step 1

Concept

For every \(a\in A\), \(a\mid a\), and if \(a\mid b\), \(b\mid c\), then \(a\mid c\). But \(2\mid4\) while \(4\nmid2\), so it is not symmetric.

Step 2

Why this answer is correct

The correct answer is A. प्रतिवर्ती और संक्रामी लेकिन सममित नहीं / Reflexive and transitive but not symmetric. For every \(a\in A\), \(a\mid a\), and if \(a\mid b\), \(b\mid c\), then \(a\mid c\). But \(2\mid4\) while \(4\nmid2\), so it is not symmetric.

Step 3

Exam Tip

हर \(a\in A\) के लिए \(a\mid a\) और यदि \(a\mid b\), \(b\mid c\), तो \(a\mid c\)। पर \(2\mid4\) है लेकिन \(4\nmid2\), इसलिए सममित नहीं।

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समुच्चय \(A=\{1,2,3,4\}\) पर संबंध \(R={(a,b)\in A\times A:a+b\) सम है(}) दिया है। (R) के equivalence classes कौन से हैं?

On the set \(A=\{1,2,3,4\}\), relation \(R={(a,b)\in A\times A:a+b\) is even(}) is given. What are the equivalence classes of (R)?

Explanation opens after your attempt
Correct Answer

A. ({1,3}) और ({2,4})({1,3}) and ({2,4})

Step 1

Concept

(a+b) is even exactly when (a) and (b) have the same parity. Hence the equivalence classes are the odd class ({1,3}) and the even class ({2,4}).

Step 2

Why this answer is correct

The correct answer is A. ({1,3}) और ({2,4}) / ({1,3}) and ({2,4}). (a+b) is even exactly when (a) and (b) have the same parity. Hence the equivalence classes are the odd class ({1,3}) and the even class ({2,4}).

Step 3

Exam Tip

(a+b) सम तभी होता है जब (a) और (b) दोनों समान parity के हों। इसलिए equivalence classes विषम ({1,3}) और सम ({2,4}) हैं।

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समुच्चय \(A=\{1,2,3,4,5\}\) पर (aRb) तभी जब (a+b) सम हो। संबंध (R) की प्रकृति क्या है?

On \(A=\{1,2,3,4,5\}\), (aRb) if and only if (a+b) is even. What is the nature of (R)?

Explanation opens after your attempt
Correct Answer

A. तुल्यता संबंधEquivalence relation

Step 1

Concept

(a+a) is even, (a+b) even implies (b+a) even, and same parity gives transitivity. In exams, identify the even and odd equivalence classes.

Step 2

Why this answer is correct

The correct answer is A. तुल्यता संबंध / Equivalence relation. (a+a) is even, (a+b) even implies (b+a) even, and same parity gives transitivity. In exams, identify the even and odd equivalence classes.

Step 3

Exam Tip

(a+a) सम है, (a+b) सम होने पर (b+a) सम है, और समान parity से संक्रामकता मिलती है। परीक्षा में इसे विषम और सम वर्गों से पहचानें।

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किसी (n) अवयव वाले समुच्चय (A) पर कुल कितने संबंध संभव हैं?

How many relations are possible on a set (A) having (n) elements?

Explanation opens after your attempt
Correct Answer

A. \(2^{n^2}\)

Step 1

Concept

\(A\times A\) has \(n^2\) ordered pairs, and a relation can be any subset of it. Hence the number of relations is \(2^{n^2}\).

Step 2

Why this answer is correct

The correct answer is A. \(2^{n^2}\). \(A\times A\) has \(n^2\) ordered pairs, and a relation can be any subset of it. Hence the number of relations is \(2^{n^2}\).

Step 3

Exam Tip

\(A\times A\) में \(n^2\) ordered pairs होते हैं और relation उसका कोई भी उपसमुच्चय हो सकता है। इसलिए कुल \(2^{n^2}\) संबंध बनते हैं।

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यदि (A) में (m) अवयव और (B) में (n) अवयव हैं, तो (A) से (B) तक कुल कितने संबंध संभव हैं?

If (A) has (m) elements and (B) has (n) elements, how many relations are possible from (A) to (B)?

Explanation opens after your attempt
Correct Answer

A. \(2^{mn}\)

Step 1

Concept

\(A\times B\) has (mn) ordered pairs. Each pair may be included or excluded, so there are \(2^{mn}\) possible relations.

Step 2

Why this answer is correct

The correct answer is A. \(2^{mn}\). \(A\times B\) has (mn) ordered pairs. Each pair may be included or excluded, so there are \(2^{mn}\) possible relations.

Step 3

Exam Tip

\(A\times B\) में (mn) ordered pairs होते हैं। प्रत्येक pair relation में हो या न हो, इसलिए कुल \(2^{mn}\) विकल्प हैं।

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समुच्चय \(A=\{1,2,3\}\) पर कितने प्रतिवर्ती संबंध संभव हैं?

How many reflexive relations are possible on \(A=\{1,2,3\}\)?

Explanation opens after your attempt
Correct Answer

A. \(2^6\)

Step 1

Concept

A reflexive relation must contain ((1,1),(2,2),(3,3)). The remaining (9-3=6) pairs are optional, so the answer is \(2^6\).

Step 2

Why this answer is correct

The correct answer is A. \(2^6\). A reflexive relation must contain ((1,1),(2,2),(3,3)). The remaining (9-3=6) pairs are optional, so the answer is \(2^6\).

Step 3

Exam Tip

प्रतिवर्ती संबंध में ((1,1),(2,2),(3,3)) अनिवार्य हैं। बाकी (9-3=6) pairs वैकल्पिक हैं, इसलिए उत्तर \(2^6\) है।

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समुच्चय \(A=\{1,2,3,4\}\) पर प्रतिवर्ती संबंधों की संख्या कितनी है?

How many reflexive relations are there on \(A=\{1,2,3,4\}\)?

Explanation opens after your attempt
Correct Answer

A. \(2^{12}\)

Step 1

Concept

There are \(4^2=16\) ordered pairs, and (4) diagonal pairs are compulsory. Thus (12) pairs are optional, giving \(2^{12}\).

Step 2

Why this answer is correct

The correct answer is A. \(2^{12}\). There are \(4^2=16\) ordered pairs, and (4) diagonal pairs are compulsory. Thus (12) pairs are optional, giving \(2^{12}\).

Step 3

Exam Tip

कुल ordered pairs \(4^2=16\) हैं और (4) diagonal pairs अनिवार्य हैं। अतः वैकल्पिक pairs (12) हैं, इसलिए \(2^{12}\)।

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समुच्चय \(A=\{1,2,3\}\) पर सममित संबंधों की संख्या कितनी है?

How many symmetric relations are possible on \(A=\{1,2,3\}\)?

Explanation opens after your attempt
Correct Answer

A. \(2^6\)

Step 1

Concept

For a symmetric relation, (3) diagonal pairs and (3) unordered off-diagonal pair blocks are independently chosen. Thus there are (6) choices, giving \(2^6\).

Step 2

Why this answer is correct

The correct answer is A. \(2^6\). For a symmetric relation, (3) diagonal pairs and (3) unordered off-diagonal pair blocks are independently chosen. Thus there are (6) choices, giving \(2^6\).

Step 3

Exam Tip

सममित संबंध में (3) diagonal pairs स्वतंत्र हैं और (3) unordered off-diagonal pair blocks स्वतंत्र हैं। कुल स्वतंत्र चुनाव (6) हैं, इसलिए \(2^6\)।

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समुच्चय \(A=\{1,2,3,4\}\) पर सममित संबंधों की संख्या किसके बराबर है?

The number of symmetric relations on \(A=\{1,2,3,4\}\) is equal to which expression?

Explanation opens after your attempt
Correct Answer

A. \(2^{10}\)

Step 1

Concept

For a symmetric relation, the number of independent choices is (\frac{4(4+1)}{2}=10). Hence the number of relations is \(2^{10}\).

Step 2

Why this answer is correct

The correct answer is A. \(2^{10}\). For a symmetric relation, the number of independent choices is (\frac{4(4+1)}{2}=10). Hence the number of relations is \(2^{10}\).

Step 3

Exam Tip

सममित संबंध में स्वतंत्र चुनावों की संख्या (\frac{4(4+1)}{2}=10) होती है। इसलिए कुल संबंध \(2^{10}\) हैं।

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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?

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 \(A=\{1,2,3\}\) पर relation \(R=\{(1,1),(2,2),(3,3),(1,2),(2,1),(2,3)\}\) है। (R) को सममित बनाने के लिए न्यूनतम कौन सा ordered pair जोड़ना होगा?

On \(A=\{1,2,3\}\), relation \(R=\{(1,1),(2,2),(3,3),(1,2),(2,1),(2,3)\}\) is given. Which minimum ordered pair must be added to make (R) symmetric?

Explanation opens after your attempt
Correct Answer

A. \((3,2)\)

Step 1

Concept

For symmetry, ((3,2)) must accompany ((2,3)). The other required reverse pairs are already present.

Step 2

Why this answer is correct

The correct answer is A. \((3,2)\). For symmetry, ((3,2)) must accompany ((2,3)). The other required reverse pairs are already present.

Step 3

Exam Tip

सममित होने के लिए ((2,3)) के साथ ((3,2)) होना जरूरी है। बाकी आवश्यक उल्टे pairs पहले से मौजूद हैं।

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समुच्चय \(A=\{1,2,3\}\) पर \(R=\{(1,2),(2,3),(1,3)\}\) है। कौन सा कथन सही है?

On \(A=\{1,2,3\}\), \(R=\{(1,2),(2,3),(1,3)\}\). Which statement is correct?

Explanation opens after your attempt
Correct Answer

A. (R) संक्रामी है पर प्रतिवर्ती नहीं(R) is transitive but not reflexive

Step 1

Concept

From ((1,2)) and ((2,3)), ((1,3)) is present, so the needed transitive condition holds. But ((1,1),(2,2),(3,3)) are absent, so it is not reflexive.

Step 2

Why this answer is correct

The correct answer is A. (R) संक्रामी है पर प्रतिवर्ती नहीं / (R) is transitive but not reflexive. From ((1,2)) and ((2,3)), ((1,3)) is present, so the needed transitive condition holds. But ((1,1),(2,2),(3,3)) are absent, so it is not reflexive.

Step 3

Exam Tip

((1,2)) और ((2,3)) से ((1,3)) मौजूद है, इसलिए जरूरी संक्रामक शर्त पूरी है। पर ((1,1),(2,2),(3,3)) नहीं हैं, इसलिए प्रतिवर्ती नहीं।

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समुच्चय \(A=\{1,2,3\}\) पर \(R=\{(1,2),(2,1),(2,3),(3,2)\}\) है। (R) के बारे में सही निष्कर्ष क्या है?

For \(A=\{1,2,3\}\), \(R=\{(1,2),(2,1),(2,3),(3,2)\}\). What is the correct conclusion about (R)?

Explanation opens after your attempt
Correct Answer

A. सममित लेकिन संक्रामी नहींSymmetric but not transitive

Step 1

Concept

Every present pair has its reverse, so the relation is symmetric. But ((1,2)) and ((2,3)) are present while ((1,3)) is not, so it is not transitive.

Step 2

Why this answer is correct

The correct answer is A. सममित लेकिन संक्रामी नहीं / Symmetric but not transitive. Every present pair has its reverse, so the relation is symmetric. But ((1,2)) and ((2,3)) are present while ((1,3)) is not, so it is not transitive.

Step 3

Exam Tip

हर मौजूद pair का reverse मौजूद है, इसलिए सममित है। पर ((1,2)) और ((2,3)) हैं लेकिन ((1,3)) नहीं है, इसलिए संक्रामी नहीं।

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वास्तविक संख्याओं के समुच्चय \(\mathbb{R}\) पर (aRb) तभी जब \(a-b\in\mathbb{Z}\)। (R) की प्रकृति क्या है?

On the set of real numbers \(\mathbb{R}\), (aRb) if and only if \(a-b\in\mathbb{Z}\). What is the nature of (R)?

Explanation opens after your attempt
Correct Answer

A. तुल्यता संबंधEquivalence relation

Step 1

Concept

Since \(a-a=0\in\mathbb{Z}\), \(a-b\in\mathbb{Z}\) implies \(b-a\in\mathbb{Z}\), and the sum of integers is an integer. Hence it is an equivalence relation.

Step 2

Why this answer is correct

The correct answer is A. तुल्यता संबंध / Equivalence relation. Since \(a-a=0\in\mathbb{Z}\), \(a-b\in\mathbb{Z}\) implies \(b-a\in\mathbb{Z}\), and the sum of integers is an integer. Hence it is an equivalence relation.

Step 3

Exam Tip

\(a-a=0\in\mathbb{Z}\), \(a-b\in\mathbb{Z}\) से \(b-a\in\mathbb{Z}\), और पूर्णांकों का योग पूर्णांक है। इसलिए यह तुल्यता संबंध है।

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\(\mathbb{Z}\) पर (aRb) तभी जब \(a\equiv b \pmod{5}\)। (7) का equivalence class कौन सा है?

On \(\mathbb{Z}\), (aRb) if and only if \(a\equiv b \pmod{5}\). Which is the equivalence class of (7)?

Explanation opens after your attempt
Correct Answer

A. \({x\in\mathbb{Z}:x\equiv 2 \pmod{5}}\)

Step 1

Concept

Because \(7\equiv 2 \pmod{5}\), all integers with the same remainder are in its class. Always form an equivalence class from the relation condition.

Step 2

Why this answer is correct

The correct answer is A. \({x\in\mathbb{Z}:x\equiv 2 \pmod{5}}\). Because \(7\equiv 2 \pmod{5}\), all integers with the same remainder are in its class. Always form an equivalence class from the relation condition.

Step 3

Exam Tip

क्योंकि \(7\equiv 2 \pmod{5}\), इसलिए उसी शेषफल वाले सभी पूर्णांक class में होंगे। Equivalence class हमेशा relation की condition से बनाइए।

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समुच्चय \(\mathbb{Z}\) पर (aRb) तभी जब (a-b) संख्या (4) से विभाज्य हो। इस relation द्वारा कितने equivalence classes बनते हैं?

On \(\mathbb{Z}\), (aRb) if and only if (a-b) is divisible by (4). How many equivalence classes are formed by this relation?

Explanation opens after your attempt
Correct Answer

A. (4)

Step 1

Concept

The remainders (0,1,2,3) form (4) different classes. For a modulo relation, the number of classes equals the modulus.

Step 2

Why this answer is correct

The correct answer is A. (4). The remainders (0,1,2,3) form (4) different classes. For a modulo relation, the number of classes equals the modulus.

Step 3

Exam Tip

शेषफल (0,1,2,3) के अनुसार (4) अलग classes बनती हैं। Modulo relation में classes की संख्या modulus के बराबर होती है।

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किसी समुच्चय \(A=\{1,2,3,4\}\) पर relation (R={(a,b):\(a\equiv b \pmod{2}\)}) है। (R) से बनने वाला partition कौन सा है?

For \(A=\{1,2,3,4\}\), relation (R={(a,b):\(a\equiv b \pmod{2}\)}). Which partition is formed by (R)?

Explanation opens after your attempt
Correct Answer

A. ({{1,3},{2,4}})

Step 1

Concept

By same parity, the odd class is ({1,3}) and the even class is ({2,4}). A partition is the collection of equivalence classes.

Step 2

Why this answer is correct

The correct answer is A. ({{1,3},{2,4}}). By same parity, the odd class is ({1,3}) and the even class is ({2,4}). A partition is the collection of equivalence classes.

Step 3

Exam Tip

Same parity के अनुसार विषम ({1,3}) और सम ({2,4}) classes मिलती हैं। Partition हमेशा equivalence classes का समूह होता है।

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समुच्चय \(\mathbb{R}\) पर (aRb) तभी जब \(a^2=b^2\)। (R) के बारे में सही कथन कौन सा है?

On \(\mathbb{R}\), (aRb) if and only if \(a^2=b^2\). Which statement about (R) is correct?

Explanation opens after your attempt
Correct Answer

A. यह तुल्यता संबंध हैIt is an equivalence relation

Step 1

Concept

Since \(a^2=a^2\), equality is symmetric, and \(a^2=b^2\), \(b^2=c^2\) imply \(a^2=c^2\). Hence (R) is an equivalence relation.

Step 2

Why this answer is correct

The correct answer is A. यह तुल्यता संबंध है / It is an equivalence relation. Since \(a^2=a^2\), equality is symmetric, and \(a^2=b^2\), \(b^2=c^2\) imply \(a^2=c^2\). Hence (R) is an equivalence relation.

Step 3

Exam Tip

\(a^2=a^2\), equality symmetric होती है, और \(a^2=b^2\), \(b^2=c^2\) से \(a^2=c^2\)। इसलिए (R) तुल्यता संबंध है।

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\(\mathbb{R}\) पर (aRb) तभी जब (|a|=|b|)। (-3) का equivalence class कौन सा है?

On \(\mathbb{R}\), (aRb) if and only if (|a|=|b|). Which is the equivalence class of (-3)?

Explanation opens after your attempt
Correct Answer

A. ({-3,3})

Step 1

Concept

From (|x|=|-3|=3), (x=-3) or (x=3). In an absolute value relation, opposite signs may lie in the same class.

Step 2

Why this answer is correct

The correct answer is A. ({-3,3}). From (|x|=|-3|=3), (x=-3) or (x=3). In an absolute value relation, opposite signs may lie in the same class.

Step 3

Exam Tip

(|x|=|-3|=3) से (x=-3) या (x=3)। Absolute value relation में opposite signs एक ही class में आ सकते हैं।

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समुच्चय \(A=\{1,2,3,4,5,6\}\) पर (aRb) तभी जब (\gcd(a,b)=1)। (R) के बारे में सही विकल्प चुनिए।

On \(A=\{1,2,3,4,5,6\}\), (aRb) if and only if (\gcd(a,b)=1). Choose the correct option about (R).

Explanation opens after your attempt
Correct Answer

A. सममित लेकिन प्रतिवर्ती नहींSymmetric but not reflexive

Step 1

Concept

Since (\gcd(a,b)=\gcd(b,a)), the relation is symmetric. But (\gcd(2,2)=2\neq1), so it is not reflexive.

Step 2

Why this answer is correct

The correct answer is A. सममित लेकिन प्रतिवर्ती नहीं / Symmetric but not reflexive. Since (\gcd(a,b)=\gcd(b,a)), the relation is symmetric. But (\gcd(2,2)=2\neq1), so it is not reflexive.

Step 3

Exam Tip

(\gcd(a,b)=\gcd(b,a)), इसलिए relation सममित है। पर (\gcd(2,2)=2\neq1), इसलिए प्रतिवर्ती नहीं।

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समुच्चय \(A=\{2,3,4,5,6\}\) पर (aRb) तभी जब (a+b) अभाज्य हो। (R) की कौन सी property निश्चित है?

On \(A=\{2,3,4,5,6\}\), (aRb) if and only if (a+b) is prime. Which property is surely true for (R)?

Explanation opens after your attempt
Correct Answer

A. सममितSymmetric

Step 1

Concept

Because (a+b=b+a), reversing the pair keeps the same sum. But not every (a+a) is prime, so reflexivity is not guaranteed.

Step 2

Why this answer is correct

The correct answer is A. सममित / Symmetric. Because (a+b=b+a), reversing the pair keeps the same sum. But not every (a+a) is prime, so reflexivity is not guaranteed.

Step 3

Exam Tip

क्योंकि (a+b=b+a), pair उलटने पर भी योग वही रहता है। पर हर (a+a) prime नहीं होता, इसलिए reflexive निश्चित नहीं है।

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समुच्चय \(A=\{1,2,3,4\}\) पर \(R=\{(a,b):a+b=5\}\) है। (R) के बारे में सही कथन क्या है?

For \(A=\{1,2,3,4\}\), \(R=\{(a,b):a+b=5\}\). What is the correct statement about (R)?

Explanation opens after your attempt
Correct Answer

A. सममित लेकिन प्रतिवर्ती नहींSymmetric but not reflexive

Step 1

Concept

If (a+b=5), then (b+a=5), so it is symmetric. But ((1,1)) is not in the relation because \(1+1\neq5\).

Step 2

Why this answer is correct

The correct answer is A. सममित लेकिन प्रतिवर्ती नहीं / Symmetric but not reflexive. If (a+b=5), then (b+a=5), so it is symmetric. But ((1,1)) is not in the relation because \(1+1\neq5\).

Step 3

Exam Tip

यदि (a+b=5), तो (b+a=5), इसलिए सममित है। पर ((1,1)) relation में नहीं क्योंकि \(1+1\neq5\)।

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\(\mathbb{R}\) पर (aRb) तभी जब \(a\leq b\)। कौन सा कथन सही है?

On \(\mathbb{R}\), (aRb) if and only if \(a\leq b\). Which statement is correct?

Explanation opens after your attempt
Correct Answer

A. प्रतिवर्ती और संक्रामी लेकिन सममित नहींReflexive and transitive but not symmetric

Step 1

Concept

Every \(a\leq a\) is true, and \(a\leq b\leq c\) implies \(a\leq c\). But \(2\leq3\) does not imply \(3\leq2\).

Step 2

Why this answer is correct

The correct answer is A. प्रतिवर्ती और संक्रामी लेकिन सममित नहीं / Reflexive and transitive but not symmetric. Every \(a\leq a\) is true, and \(a\leq b\leq c\) implies \(a\leq c\). But \(2\leq3\) does not imply \(3\leq2\).

Step 3

Exam Tip

हर \(a\leq a\) सत्य है और \(a\leq b\leq c\) से \(a\leq c\)। लेकिन \(2\leq3\) के बाद \(3\leq2\) सत्य नहीं।

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(\mathcal{P}(S)) पर relation (A,R,B) तभी जब \(A\subseteq B\)। यह relation किस प्रकार का है?

On (\mathcal{P}(S)), relation (A,R,B) if and only if \(A\subseteq B\). What type of relation is this?

Explanation opens after your attempt
Correct Answer

A. आंशिक क्रम संबंधPartial order relation

Step 1

Concept

Every \(A\subseteq A\), and the subset relation is antisymmetric and transitive. Do not treat it like equality because it is generally not symmetric.

Step 2

Why this answer is correct

The correct answer is A. आंशिक क्रम संबंध / Partial order relation. Every \(A\subseteq A\), and the subset relation is antisymmetric and transitive. Do not treat it like equality because it is generally not symmetric.

Step 3

Exam Tip

हर \(A\subseteq A\), और subset relation antisymmetric तथा transitive होता है। इसे equality जैसा नहीं मानें क्योंकि यह generally symmetric नहीं होता।

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\(A=\{1,2,3\}\) पर \(R=\{(1,1),(2,2),(3,3),(1,2)\}\) है। कौन सा property गलत है?

On \(A=\{1,2,3\}\), \(R=\{(1,1),(2,2),(3,3),(1,2)\}\). Which property is false?

Explanation opens after your attempt
Correct Answer

A. सममितSymmetric

Step 1

Concept

\((1,2)\in R\) but \((2,1)\notin R\), so it is not symmetric. Since all diagonal pairs are present, it is reflexive.

Step 2

Why this answer is correct

The correct answer is A. सममित / Symmetric. \((1,2)\in R\) but \((2,1)\notin R\), so it is not symmetric. Since all diagonal pairs are present, it is reflexive.

Step 3

Exam Tip

\((1,2)\in R\) है पर \((2,1)\notin R\), इसलिए सममित नहीं है। Diagonal pairs होने से reflexive है।

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यदि relation (R) सममित और antisymmetric दोनों है, तो (R) में कौन से off-diagonal pairs हो सकते हैं?

If a relation (R) is both symmetric and antisymmetric, which off-diagonal pairs can occur in (R)?

Explanation opens after your attempt
Correct Answer

A. कोई भी नहींNone

Step 1

Concept

If ((a,b)) with \(a\neq b\) occurs, symmetry forces ((b,a)), contradicting antisymmetry. Hence only diagonal pairs can occur.

Step 2

Why this answer is correct

The correct answer is A. कोई भी नहीं / None. If ((a,b)) with \(a\neq b\) occurs, symmetry forces ((b,a)), contradicting antisymmetry. Hence only diagonal pairs can occur.

Step 3

Exam Tip

यदि ((a,b)) और \(a\neq b\) हो, तो symmetry से ((b,a)) भी होगा, जो antisymmetry का विरोध करेगा। इसलिए केवल diagonal pairs संभव हैं।

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समुच्चय \(A=\{1,2,3,4\}\) पर (aRb) तभी जब (a) संख्या (b) से छोटा या बराबर है। (R) में अधिकतम element कौन सा है?

On \(A=\{1,2,3,4\}\), (aRb) if and only if (a) is less than or equal to (b). Which is the greatest element in (R)?

Explanation opens after your attempt
Correct Answer

A. (4)

Step 1

Concept

In the order \( \leq \), the greatest element is one that every element is less than or equal to. Here \(a\leq4\) for every \(a\in A\), so (4) is greatest.

Step 2

Why this answer is correct

The correct answer is A. (4). In the order \( \leq \), the greatest element is one that every element is less than or equal to. Here \(a\leq4\) for every \(a\in A\), so (4) is greatest.

Step 3

Exam Tip

Order \( \leq \) में greatest element वह है जिससे सभी elements छोटे या बराबर हों। यहाँ हर \(a\in A\) के लिए \(a\leq4\), इसलिए (4) greatest है।

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समुच्चय \(A=\{2,3,6,12\}\) पर (aRb) तभी जब \(a\mid b\)। इस poset में least element कौन सा है?

On \(A=\{2,3,6,12\}\), (aRb) if and only if \(a\mid b\). Which is the least element of this poset?

Explanation opens after your attempt
Correct Answer

A. कोई नहींNone

Step 1

Concept

A least element must divide every element. Here neither \(2\mid3\) nor \(3\mid2\), so no least element exists.

Step 2

Why this answer is correct

The correct answer is A. कोई नहीं / None. A least element must divide every element. Here neither \(2\mid3\) nor \(3\mid2\), so no least element exists.

Step 3

Exam Tip

Least element को सभी elements को divide करना चाहिए। यहाँ न \(2\mid3\) और न \(3\mid2\), इसलिए कोई least element नहीं है।

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समुच्चय \(A=\{1,2,4,8\}\) पर (aRb) तभी जब \(a\mid b\)। कौन सा कथन सही है?

On \(A=\{1,2,4,8\}\), (aRb) if and only if \(a\mid b\). Which statement is correct?

Explanation opens after your attempt
Correct Answer

A. (1) least और (8) greatest है(1) is least and (8) is greatest

Step 1

Concept

(1) divides every element, and every element divides (8). In divisibility order, identify least and greatest by the direction of divisibility.

Step 2

Why this answer is correct

The correct answer is A. (1) least और (8) greatest है / (1) is least and (8) is greatest. (1) divides every element, and every element divides (8). In divisibility order, identify least and greatest by the direction of divisibility.

Step 3

Exam Tip

(1) सभी को divide करता है और सभी (8) को divide करते हैं। Divisibility order में least और greatest को direction से पहचानें।

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Relation (R) को \(A=\{1,2,3\}\) पर \(R=A\times A\) से परिभाषित किया गया है। (R) के बारे में सही कथन कौन सा है?

Relation (R) is defined on \(A=\{1,2,3\}\) by \(R=A\times A\). Which statement about (R) is correct?

Explanation opens after your attempt
Correct Answer

A. यह प्रतिवर्ती, सममित और संक्रामी हैIt is reflexive, symmetric, and transitive

Step 1

Concept

In the universal relation, every possible ordered pair is present. Hence reflexive, symmetric, and transitive properties all hold automatically.

Step 2

Why this answer is correct

The correct answer is A. यह प्रतिवर्ती, सममित और संक्रामी है / It is reflexive, symmetric, and transitive. In the universal relation, every possible ordered pair is present. Hence reflexive, symmetric, and transitive properties all hold automatically.

Step 3

Exam Tip

Universal relation में हर possible ordered pair मौजूद होता है। इसलिए reflexive, symmetric और transitive तीनों properties स्वतः पूरी होती हैं।

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समुच्चय \(A=\{1,2,3\}\) पर empty relation \(R=\varnothing\) के बारे में कौन सा कथन सही है?

For \(A=\{1,2,3\}\), which statement is correct about the empty relation \(R=\varnothing\)?

Explanation opens after your attempt
Correct Answer

A. यह सममित और संक्रामी है पर प्रतिवर्ती नहींIt is symmetric and transitive but not reflexive

Step 1

Concept

The empty relation has no counterexample, so symmetry and transitivity are vacuously true. But \((1,1)\notin R\), so it is not reflexive.

Step 2

Why this answer is correct

The correct answer is A. यह सममित और संक्रामी है पर प्रतिवर्ती नहीं / It is symmetric and transitive but not reflexive. The empty relation has no counterexample, so symmetry and transitivity are vacuously true. But \((1,1)\notin R\), so it is not reflexive.

Step 3

Exam Tip

Empty relation में कोई counterexample नहीं, इसलिए symmetry और transitivity vacuously true हैं। पर \((1,1)\notin R\), इसलिए reflexive नहीं।

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समुच्चय \(A=\{1,2,3\}\) पर identity relation (I_A={(1,1),(2,2),(3,3)}) है। \(I_A\) की सही प्रकृति क्या है?

On \(A=\{1,2,3\}\), the identity relation is (I_A={(1,1),(2,2),(3,3)}). What is the correct nature of \(I_A\)?

Explanation opens after your attempt
Correct Answer

A. तुल्यता संबंध और आंशिक क्रम दोनोंBoth equivalence relation and partial order

Step 1

Concept

The identity relation is reflexive, symmetric, and transitive, so it is an equivalence relation. It is also reflexive, antisymmetric, and transitive, so it is a partial order.

Step 2

Why this answer is correct

The correct answer is A. तुल्यता संबंध और आंशिक क्रम दोनों / Both equivalence relation and partial order. The identity relation is reflexive, symmetric, and transitive, so it is an equivalence relation. It is also reflexive, antisymmetric, and transitive, so it is a partial order.

Step 3

Exam Tip

Identity relation reflexive, symmetric और transitive है, इसलिए equivalence relation है। यह reflexive, antisymmetric और transitive भी है, इसलिए partial order भी है।

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यदि (R) relation (A) पर reflexive है, तो \(R^{-1}\) के बारे में कौन सा कथन सही है?

If (R) is a reflexive relation on (A), which statement about \(R^{-1}\) is correct?

Explanation opens after your attempt
Correct Answer

A. \(R^{-1}\) भी reflexive है\(R^{-1}\) is also reflexive

Step 1

Concept

A reflexive (R) contains every ((a,a)), and the inverse of ((a,a)) is again ((a,a)). Therefore \(R^{-1}\) remains reflexive.

Step 2

Why this answer is correct

The correct answer is A. \(R^{-1}\) भी reflexive है / \(R^{-1}\) is also reflexive. A reflexive (R) contains every ((a,a)), and the inverse of ((a,a)) is again ((a,a)). Therefore \(R^{-1}\) remains reflexive.

Step 3

Exam Tip

Reflexive (R) में हर ((a,a)) होता है, और उसका inverse भी ((a,a)) ही है। इसलिए \(R^{-1}\) reflexive रहता है।

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यदि (R) symmetric है, तो \(R^{-1}\) के साथ उसका संबंध क्या है?

If (R) is symmetric, what is its relation with \(R^{-1}\)?

Explanation opens after your attempt
Correct Answer

A. \(R=R^{-1}\)

Step 1

Concept

In a symmetric relation, \((a,b)\in R\) implies \((b,a)\in R\), so the inverse has the same pairs. Hence \(R=R^{-1}\).

Step 2

Why this answer is correct

The correct answer is A. \(R=R^{-1}\). In a symmetric relation, \((a,b)\in R\) implies \((b,a)\in R\), so the inverse has the same pairs. Hence \(R=R^{-1}\).

Step 3

Exam Tip

Symmetric relation में \((a,b)\in R\) से \((b,a)\in R\), इसलिए inverse में वही pairs मिलते हैं। अतः \(R=R^{-1}\)।

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समुच्चय \(A=\{1,2,3,4\}\) पर \(R={(a,b):a-b\) (3) से विभाज्य है(}) है। (R) में कितने ordered pairs हैं?

On \(A=\{1,2,3,4\}\), \(R={(a,b):a-b\) is divisible by (3)(}). How many ordered pairs are in (R)?

Explanation opens after your attempt
Correct Answer

A. (6)

Step 1

Concept

The classes are ({1,4},{2},{3}), so the number of pairs is \(2^2+1^2+1^2=6\). Add the squares of the sizes of the equivalence classes.

Step 2

Why this answer is correct

The correct answer is A. (6). The classes are ({1,4},{2},{3}), so the number of pairs is \(2^2+1^2+1^2=6\). Add the squares of the sizes of the equivalence classes.

Step 3

Exam Tip

Classes ({1,4},{2},{3}) हैं, इसलिए pairs की संख्या \(2^2+1^2+1^2=6\) है। Equivalence classes के sizes के squares जोड़ें।

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समुच्चय \(A=\{1,2,3,4,5\}\) पर \(R=\{(a,b):|a-b|\leq1\}\) है। (R) के बारे में कौन सा कथन सही है?

On \(A=\{1,2,3,4,5\}\), \(R=\{(a,b):|a-b|\leq1\}\). Which statement about (R) is correct?

Explanation opens after your attempt
Correct Answer

A. प्रतिवर्ती और सममित लेकिन संक्रामी नहींReflexive and symmetric but not transitive

Step 1

Concept

Since \(|a-a|=0\leq1\) and (|a-b|=|b-a|), it is reflexive and symmetric. But (1R2) and (2R3) hold while (1R3) does not.

Step 2

Why this answer is correct

The correct answer is A. प्रतिवर्ती और सममित लेकिन संक्रामी नहीं / Reflexive and symmetric but not transitive. Since \(|a-a|=0\leq1\) and (|a-b|=|b-a|), it is reflexive and symmetric. But (1R2) and (2R3) hold while (1R3) does not.

Step 3

Exam Tip

\(|a-a|=0\leq1\) और (|a-b|=|b-a|), इसलिए reflexive और symmetric है। लेकिन (1R2) और (2R3) हैं पर (1R3) नहीं।

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\(\mathbb{R}\) पर (aRb) तभी जब (a-b>0)। (R) की कौन सी property सही है?

On \(\mathbb{R}\), (aRb) if and only if (a-b>0). Which property of (R) is correct?

Explanation opens after your attempt
Correct Answer

A. अप्रतिवर्ती और संक्रामीIrreflexive and transitive

Step 1

Concept

Since (a-a=0), (aRa) is never true, so it is irreflexive. If (a>b) and (b>c), then (a>c), so it is transitive.

Step 2

Why this answer is correct

The correct answer is A. अप्रतिवर्ती और संक्रामी / Irreflexive and transitive. Since (a-a=0), (aRa) is never true, so it is irreflexive. If (a>b) and (b>c), then (a>c), so it is transitive.

Step 3

Exam Tip

(a-a=0) होने से (aRa) कभी सत्य नहीं, इसलिए irreflexive है। यदि (a>b) और (b>c), तो (a>c), इसलिए transitive है।

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\(\mathbb{R}\) पर (aRb) तभी जब \(a^3\leq b^3\)। यह relation किस relation के समान है?

On \(\mathbb{R}\), (aRb) if and only if \(a^3\leq b^3\). This relation is equivalent to which relation?

Explanation opens after your attempt
Correct Answer

A. \(a\leq b\)

Step 1

Concept

The function \(x^3\) is strictly increasing, so \(a^3\leq b^3\) is exactly equivalent to \(a\leq b\). Use monotonicity to identify relation properties quickly.

Step 2

Why this answer is correct

The correct answer is A. \(a\leq b\). The function \(x^3\) is strictly increasing, so \(a^3\leq b^3\) is exactly equivalent to \(a\leq b\). Use monotonicity to identify relation properties quickly.

Step 3

Exam Tip

Function \(x^3\) strictly increasing है, इसलिए \(a^3\leq b^3\) exactly \(a\leq b\) के बराबर है। Monotonicity से relation की property जल्दी पहचानें।

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\(\mathbb{N}\) पर (aRb) तभी जब (a+b) विषम हो। (R) के बारे में सही कथन क्या है?

On \(\mathbb{N}\), (aRb) if and only if (a+b) is odd. What is the correct statement about (R)?

Explanation opens after your attempt
Correct Answer

A. सममित लेकिन प्रतिवर्ती नहींSymmetric but not reflexive

Step 1

Concept

Addition is commutative, so the relation is symmetric. But (a+a=2a) is always even, so (aRa) never holds.

Step 2

Why this answer is correct

The correct answer is A. सममित लेकिन प्रतिवर्ती नहीं / Symmetric but not reflexive. Addition is commutative, so the relation is symmetric. But (a+a=2a) is always even, so (aRa) never holds.

Step 3

Exam Tip

योग commutative है, इसलिए relation symmetric है। पर (a+a=2a) हमेशा सम है, इसलिए (aRa) कभी नहीं होता।

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समुच्चय \(A=\{1,2,3,4\}\) पर (aRb) तभी जब \(a\neq b\)। (R) के बारे में कौन सा कथन सही है?

On \(A=\{1,2,3,4\}\), (aRb) if and only if \(a\neq b\). Which statement about (R) is correct?

Explanation opens after your attempt
Correct Answer

A. सममित लेकिन संक्रामी नहींSymmetric but not transitive

Step 1

Concept

If \(a\neq b\), then \(b\neq a\), so it is symmetric. But (1R2) and (2R1) hold while (1R1) does not, so it is not transitive.

Step 2

Why this answer is correct

The correct answer is A. सममित लेकिन संक्रामी नहीं / Symmetric but not transitive. If \(a\neq b\), then \(b\neq a\), so it is symmetric. But (1R2) and (2R1) hold while (1R1) does not, so it is not transitive.

Step 3

Exam Tip

यदि \(a\neq b\), तो \(b\neq a\), इसलिए symmetric है। लेकिन (1R2) और (2R1) हैं, फिर भी (1R1) नहीं, इसलिए transitive नहीं।

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\(A=\{1,2,3\}\) पर relation \(R=\{(1,1),(1,2),(2,2),(2,3),(1,3),(3,3)\}\) है। यह relation किस familiar order जैसा है?

On \(A=\{1,2,3\}\), relation \(R=\{(1,1),(1,2),(2,2),(2,3),(1,3),(3,3)\}\) is given. Which familiar order does this relation resemble?

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Correct Answer

A. \(a\leq b\)

Step 1

Concept

The given pairs are exactly those where the first element is less than or equal to the second. Thus it is the usual order \(\leq\) on (A).

Step 2

Why this answer is correct

The correct answer is A. \(a\leq b\). The given pairs are exactly those where the first element is less than or equal to the second. Thus it is the usual order \(\leq\) on (A).

Step 3

Exam Tip

दिए गए pairs वही हैं जिनमें पहला अवयव दूसरे से छोटा या बराबर है। इसलिए यह (A) पर usual order \(\leq\) है।

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किसी relation (R) को transitive closure बनाने के लिए कौन सा pair अनिवार्य है, यदि (R) में ((1,2)) और ((2,4)) हैं?

Which pair is compulsory in the transitive closure of a relation (R), if (R) contains ((1,2)) and ((2,4))?

Explanation opens after your attempt
Correct Answer

A. ((1,4))

Step 1

Concept

By transitivity, ((1,2)) and ((2,4)) force ((1,4)). A closure adds the minimum necessary pairs.

Step 2

Why this answer is correct

The correct answer is A. ((1,4)). By transitivity, ((1,2)) and ((2,4)) force ((1,4)). A closure adds the minimum necessary pairs.

Step 3

Exam Tip

Transitivity के अनुसार ((1,2)) और ((2,4)) से ((1,4)) होना जरूरी है। Closure में minimum necessary pairs जोड़े जाते हैं।

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समुच्चय \(A=\{1,2,3,4\}\) पर \(R=\{(1,2),(2,3),(3,4)\}\) है। (R) की transitive closure में न्यूनतम कितने नए pairs जोड़ने होंगे?

On \(A=\{1,2,3,4\}\), \(R=\{(1,2),(2,3),(3,4)\}\). What is the minimum number of new pairs needed in the transitive closure of (R)?

Explanation opens after your attempt
Correct Answer

A. (3)

Step 1

Concept

The pairs to add are ((1,3),(2,4),(1,4)). Note that newly added ((1,3)) with ((3,4)) also requires ((1,4)).

Step 2

Why this answer is correct

The correct answer is A. (3). The pairs to add are ((1,3),(2,4),(1,4)). Note that newly added ((1,3)) with ((3,4)) also requires ((1,4)).

Step 3

Exam Tip

जोड़ने वाले pairs ((1,3),(2,4),(1,4)) हैं। ध्यान रखें कि newly added ((1,3)) और ((3,4)) से ((1,4)) भी चाहिए।

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समुच्चय \(A=\{1,2,3\}\) पर \(R=\{(1,2),(2,1)\}\) है। reflexive closure में कौन से pairs जोड़े जाएंगे?

On \(A=\{1,2,3\}\), \(R=\{(1,2),(2,1)\}\). Which pairs will be added in the reflexive closure?

Explanation opens after your attempt
Correct Answer

A. ((1,1),(2,2),(3,3))

Step 1

Concept

In a reflexive closure, ((a,a)) must be present for every \(a\in A\). Therefore all three diagonal pairs are added.

Step 2

Why this answer is correct

The correct answer is A. ((1,1),(2,2),(3,3)). In a reflexive closure, ((a,a)) must be present for every \(a\in A\). Therefore all three diagonal pairs are added.

Step 3

Exam Tip

Reflexive closure में हर \(a\in A\) के लिए ((a,a)) होना जरूरी है। इसलिए तीनों diagonal pairs जोड़े जाएंगे।

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समुच्चय \(A=\{1,2,3\}\) पर \(R=\{(1,2),(2,3)\}\) है। symmetric closure में कौन से pairs जोड़े जाएंगे?

On \(A=\{1,2,3\}\), \(R=\{(1,2),(2,3)\}\). Which pairs will be added in the symmetric closure?

Explanation opens after your attempt
Correct Answer

A. ((2,1),(3,2))

Step 1

Concept

In a symmetric closure, ((b,a)) is added for every ((a,b)). Thus ((2,1)) is needed for ((1,2)), and ((3,2)) for ((2,3)).

Step 2

Why this answer is correct

The correct answer is A. ((2,1),(3,2)). In a symmetric closure, ((b,a)) is added for every ((a,b)). Thus ((2,1)) is needed for ((1,2)), and ((3,2)) for ((2,3)).

Step 3

Exam Tip

Symmetric closure में हर ((a,b)) के साथ ((b,a)) जोड़ा जाता है। इसलिए ((1,2)) के लिए ((2,1)) और ((2,3)) के लिए ((3,2)) चाहिए।

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समुच्चय \(A=\{1,2,3\}\) पर \(R=\{(1,1),(2,2),(3,3),(1,2),(2,3),(1,3)\}\) है। क्या (R) antisymmetric है?

On \(A=\{1,2,3\}\), \(R=\{(1,1),(2,2),(3,3),(1,2),(2,3),(1,3)\}\). Is (R) antisymmetric?

Explanation opens after your attempt
Correct Answer

A. हाँ, क्योंकि कोई distinct reverse pair साथ में नहीं हैYes, because no distinct reverse pair appears together

Step 1

Concept

Antisymmetry is not affected by diagonal pairs. It fails only when ((a,b)) and ((b,a)) both occur for \(a\neq b\).

Step 2

Why this answer is correct

The correct answer is A. हाँ, क्योंकि कोई distinct reverse pair साथ में नहीं है / Yes, because no distinct reverse pair appears together. Antisymmetry is not affected by diagonal pairs. It fails only when ((a,b)) and ((b,a)) both occur for \(a\neq b\).

Step 3

Exam Tip

Antisymmetry को diagonal pairs से समस्या नहीं होती। समस्या तभी होती है जब \(a\neq b\) पर ((a,b)) और ((b,a)) दोनों हों।

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समुच्चय \(A=\{1,2,3,4,5,6\}\) पर (aRb) तभी जब (a) और (b) का समान greatest prime factor हो। यह relation कैसी है?

On \(A=\{1,2,3,4,5,6\}\), (aRb) if and only if (a) and (b) have the same greatest prime factor. What kind of relation is it?

Explanation opens after your attempt
Correct Answer

A. तुल्यता संबंधEquivalence relation

Step 1

Concept

Having the same greatest prime factor behaves like equality, so it is reflexive, symmetric, and transitive. Such same invariant conditions often give equivalence relations.

Step 2

Why this answer is correct

The correct answer is A. तुल्यता संबंध / Equivalence relation. Having the same greatest prime factor behaves like equality, so it is reflexive, symmetric, and transitive. Such same invariant conditions often give equivalence relations.

Step 3

Exam Tip

एक ही greatest prime factor होना equality जैसी condition है, इसलिए reflexive, symmetric और transitive है। ऐसी same invariant वाली conditions अक्सर equivalence relation देती हैं।

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\(\mathbb{R}\) 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।

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समुच्चय \(A=\{1,2,3,4,5\}\) पर \(R=\{(a,b):a+b\leq6\}\) है। (R) के बारे में सही विकल्प चुनिए।

On \(A=\{1,2,3,4,5\}\), \(R=\{(a,b):a+b\leq6\}\). Choose the correct option about (R).

Explanation opens after your attempt
Correct Answer

A. सममित लेकिन प्रतिवर्ती नहींSymmetric but not reflexive

Step 1

Concept

Since (a+b=b+a), the relation is symmetric. But \((4,4)\notin R\) because \(4+4\leq6\) is false, so it is not reflexive.

Step 2

Why this answer is correct

The correct answer is A. सममित लेकिन प्रतिवर्ती नहीं / Symmetric but not reflexive. Since (a+b=b+a), the relation is symmetric. But \((4,4)\notin R\) because \(4+4\leq6\) is false, so it is not reflexive.

Step 3

Exam Tip

(a+b=b+a), इसलिए relation symmetric है। पर \((4,4)\notin R\) क्योंकि \(4+4\leq6\) गलत है, इसलिए reflexive नहीं।

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यदि (R) और (S) दोनों (A) पर equivalence relations हैं, तो \(R\cap S\) के बारे में कौन सा कथन हमेशा सही है?

If (R) and (S) are both equivalence relations on (A), which statement about \(R\cap S\) is always true?

Explanation opens after your attempt
Correct Answer

A. \(R\cap S\) भी equivalence relation है\(R\cap S\) is also an equivalence relation

Step 1

Concept

The intersection retains common diagonal pairs, and symmetry and transitivity are also preserved. Hence the intersection of equivalence relations is again an equivalence relation.

Step 2

Why this answer is correct

The correct answer is A. \(R\cap S\) भी equivalence relation है / \(R\cap S\) is also an equivalence relation. The intersection retains common diagonal pairs, and symmetry and transitivity are also preserved. Hence the intersection of equivalence relations is again an equivalence relation.

Step 3

Exam Tip

Intersection में common diagonal pairs रहते हैं और symmetry तथा transitivity भी preserve होती हैं। इसलिए equivalence relations का intersection फिर equivalence relation होता है।

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