Which Relation is a Function?

📝 Question

Let:

\[ A=\{1,2,3\} \]

Given relations:

\[ f=\{(1,3),(2,3),(3,2)\} \]

\[ g=\{(1,2),(1,3),(3,1)\} \]

Determine which of these is a function.

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✅ Solution

🔹 Step 1: Definition of function

A relation is a function if every element of domain has exactly one image.

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🔹 Step 2: Check relation \(f\)

\[ 1 \to 3,\quad 2 \to 3,\quad 3 \to 2 \]

Each element of \(A\) has exactly one image.

Hence, \(f\) is a function.

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🔹 Step 3: Check relation \(g\)

\[ 1 \to 2,\quad 1 \to 3 \]

Element 1 has two images.

Hence, \(g\) is not a function.

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🎯 Final Answer

\[ \boxed{f \text{ is a function, but } g \text{ is not a function}} \]

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🚀 Exam Shortcut

• Each input must have only one output
• Check first elements (domain)
• If any repeats with different outputs ⇒ not a function