Range of Relation from \( A \) to \( B \) Defined by \( x>y \)
📺 Video Explanation
📝 Question
Let:
\[ A=\{1,2,3\}, \quad B=\{1,4,5,9\} \]
A relation \( R \) from \( A \) to \( B \) is defined by:
\[ xRy \iff x>y \]
Find the range of \( R \).
- (a) \(\{1,4,6,9\}\)
- (b) \(\{4,6,9\}\)
- (c) \(\{1\}\)
- (d) none of these
✅ Solution
Relation from \( A \) to \( B \) means:
\[ R=\{(x,y)\in A\times B : x>y\} \]
🔹 Check each element of A
For: \[ x=1 \] No element in \( B \) is less than 1.
So no pair.
For: \[ x=2 \] Only: \[ 2>1 \] So: \[ (2,1) \]
For: \[ x=3 \] Only: \[ 3>1 \] So: \[ (3,1) \]
🔹 Relation Set
\[ R=\{(2,1),(3,1)\} \]
🔹 Range
Range = set of second components:
\[ \{1\} \]
🎯 Final Answer
\[ \boxed{\{1\}} \]
✔ Correct option: (c)
🚀 Exam Shortcut
- Range means second elements of ordered pairs
- Check condition carefully from A to B
- List valid pairs first, then extract range