Show that the relation R in R defined as R = (a, ;b):a b , is reflexive and transitive but not symmetric.

(i) Reflexive Let a R, ;a a which is true. Therefore, (a, ;a) R Thus, R is reflexive. (ii) Symmetric Let a, ;b R ; ; & ; ;(a, ;b) R Consider, a b does not imply b a (a, ;b) R ; ;but ; ;(b, ;a) R Therefore, R is not symmetric. (iii) Transitive Let a, ;b, ;c R If (a, ;b) R a b ; ;and ; ;(b, ;c) R ;b c a c (a, ;c) R Thus, R is transitive. Hence, R is reflexive and transitive but not symmetric.

Relations and Functions — Class 12 Maths Solution

ncert exercise SA NCERT Ex. 1.1, Q.4,Page 5

Question

Show that the relation R in R defined as $R = \{ (a,\;b):a \le b\} ,$ is reflexive and transitive but not symmetric.

Step-by-step Solution

(i) Reflexive

Let $a \in R,\;a \le a$ which is true. Therefore, $(a,\;a) \in R$

Thus, R is reflexive.

(ii) Symmetric

Let $a,\;b \in R\;\;\& \;\;(a,\;b) \in R$
Consider, $a \le b$ does not imply $b \le a$
$\Rightarrow$ $(a,\;b) \in R\;\;but\;\;(b,\;a)\not \in R$

Therefore, R is not symmetric.

(iii) Transitive

Let $a,\;b,\;c \in R$
If $(a,\;b) \in R \Rightarrow a \le b\;\;and\;\;(b,\;c) \in R \Rightarrow \;b \le c \Rightarrow a \le c$

$\Rightarrow$ $(a,\;c) \in R$

Thus, R is transitive.

Hence, R is reflexive and transitive but not symmetric.

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