Question
Show that the relation R in the set $\{1, 2, 3\}$ given by R $= \{(1, 2), (2, 1)\}$ is symmetric but neither reflexive nor transitive.
Relations and Functions — Class 12 Maths Solution
Step-by-step Solution
Given the set $\{1, 2, 3\}$ where R $= \{(1, 2), (2, 1)\}$
(i) Reflexive
$1,\;2,\;3 \in \{ 1,\;2,\;3\} ,\;(1,\;1)\not \in R,\;(2,\;2)\not \in R,\;(3,\;3)\not \in R$
Therefore, R is not reflexive.
(ii) Symmetric
$1,\;2 \in \{ 1,\;2,\;3\} ,\;(1,\;2) \in R \Rightarrow (2,\;1) \in R$
Therefore, R is symmetric.
(iii) Transitive
$1,\;2,\;3 \in \{ 1,\;2,\;3\} ,$
Consider, $(1,\;2) \in R,\;(2,\;3)\not \in R,\;(1,\;3)\not \in R$
R is not transitive.
Hence, R is symmetric but neither reflexive nor transitive.
NCERT & Exemplar solution for CBSE Class 12 Mathematics, Relations and Functions. Curated by Sachin Sharma. Free for all students.