यदि \(f=\{(1,2),(2,4),(3,6)\}\) हो, तो (f^{-1}={(2,1),(4,2),(6,3)}) को ({2,4,6}) से ({1,2,3}) में क्या माना जाएगा?

If \(f=\{(1,2),(2,4),(3,6)\}\), what will (f^{-1}={(2,1),(4,2),(6,3)}) be considered from ({2,4,6}) to ({1,2,3})?

Explanation opens after your attempt
Correct Answer

A. फलनFunction

Step 1

Concept

In the reversed relation, each first component (2,4,6) has exactly one image. In exams, test the inverse relation separately by the function condition.

Step 2

Why this answer is correct

The correct answer is A. फलन / Function. In the reversed relation, each first component (2,4,6) has exactly one image. In exams, test the inverse relation separately by the function condition.

Step 3

Exam Tip

उल्टे संबंध में हर पहले घटक (2,4,6) की ठीक एक छवि है। परीक्षा में उल्टा संबंध भी अलग से फलन शर्त से जांचें।

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यदि \(f=\{(1,2),(2,4),(3,6)\}\) हो, तो (f^{-1}={(2,1),(4,2),(6,3)}) को ({2,4,6}) से ({1,2,3}) में क्या माना जाएगा? / If \(f=\{(1,2),(2,4),(3,6)\}\), what will (f^{-1}={(2,1),(4,2),(6,3)}) be considered from ({2,4,6}) to ({1,2,3})?

Correct Answer: A. फलन / Function. Explanation: उल्टे संबंध में हर पहले घटक (2,4,6) की ठीक एक छवि है। परीक्षा में उल्टा संबंध भी अलग से फलन शर्त से जांचें। / In the reversed relation, each first component (2,4,6) has exactly one image. In exams, test the inverse relation separately by the function condition.

Which concept should I revise for this Mathematics MCQ?

In the reversed relation, each first component (2,4,6) has exactly one image. In exams, test the inverse relation separately by the function condition.

What exam hint can help solve this Mathematics question?

उल्टे संबंध में हर पहले घटक (2,4,6) की ठीक एक छवि है। परीक्षा में उल्टा संबंध भी अलग से फलन शर्त से जांचें।