यदि \(A=\{1,2,3\}\) और \(B=\{a,b\}\) हैं, तो (A) से (B) तक कुल कितने संबंध संभव हैं?

If \(A=\{1,2,3\}\) and \(B=\{a,b\}\), how many relations are possible from (A) to (B)?

Explanation opens after your attempt
Correct Answer

B. (64)

Step 1

Concept

Since \(A\times B\) has \(3\times2=6\) elements, the number of relations is \(2^6=64\). In exams, count the elements of \(A\times B\) first.

Step 2

Why this answer is correct

The correct answer is B. (64). Since \(A\times B\) has \(3\times2=6\) elements, the number of relations is \(2^6=64\). In exams, count the elements of \(A\times B\) first.

Step 3

Exam Tip

क्योंकि \(A\times B\) में \(3\times2=6\) अवयव हैं, इसलिए संबंधों की संख्या \(2^6=64\) है। परीक्षा में पहले \(A\times B\) के अवयव गिनें।

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Mathematics Answer, Explanation and Revision Hints

यदि \(A=\{1,2,3\}\) और \(B=\{a,b\}\) हैं, तो (A) से (B) तक कुल कितने संबंध संभव हैं? / If \(A=\{1,2,3\}\) and \(B=\{a,b\}\), how many relations are possible from (A) to (B)?

Correct Answer: B. (64). Explanation: क्योंकि \(A\times B\) में \(3\times2=6\) अवयव हैं, इसलिए संबंधों की संख्या \(2^6=64\) है। परीक्षा में पहले \(A\times B\) के अवयव गिनें। / Since \(A\times B\) has \(3\times2=6\) elements, the number of relations is \(2^6=64\). In exams, count the elements of \(A\times B\) first.

Which concept should I revise for this Mathematics MCQ?

Since \(A\times B\) has \(3\times2=6\) elements, the number of relations is \(2^6=64\). In exams, count the elements of \(A\times B\) first.

What exam hint can help solve this Mathematics question?

क्योंकि \(A\times B\) में \(3\times2=6\) अवयव हैं, इसलिए संबंधों की संख्या \(2^6=64\) है। परीक्षा में पहले \(A\times B\) के अवयव गिनें।