Show that the relation R in the set R of real numbers, defined as A = (a, ;b):a , is neither reflexive nor symmetric nor transitive.

We have R = (a, ;b); ;a , where a, ;b R (i) Reflexivity We observe that, 3 3 ) 2 is not true. Therefore, ( 3 , ; 3 ) R. So, R is not reflexive. (ii) Symmetry We observe that, 1 ; ;but ; ;2 1 2 i.e., (1, ;2) R but (2, ;1) R So, R is not symmetric. (iii) Transitivity We observe that, 10 ; ;and ; ;4 but 10 (3) 2 i.e., (10, ;4) R ; ;and ; ;(4, ;3) R ; ;but ; ;(10, ;3) R So, R is not transitive.

Relations and Functions — Class 12 Maths Solution

ncert exercise SA NCERT Ex. 1.1,Q.2 Page 5

Question

Show that the relation R in the set R of real numbers, defined as $A = \{ (a,\;b):a \le {b^2}\} ,$ is neither reflexive nor symmetric nor transitive.

Step-by-step Solution

We have $R = \{ (a,\;b);\;a \le {b^2}\} ,$ where $a,\;b \in R$

(i) Reflexivity

We observe that, $\cfrac{1}{3} \le {\left( {\cfrac{1}{3}} \right)^2}$ is not true.

Therefore, $\left( {\cfrac{1}{3},\;\cfrac{1}{3}} \right) \notin R.$ So, R is not reflexive.

(ii) Symmetry

We observe that, $1 \le {(2)^2}\;\;but\;\;2$ ${1^2}$

i.e., $(1,\;2) \in R$ but $(2,\;1) \notin R$

So, R is not symmetric.

(iii) Transitivity

We observe that, $10 \le {4^2}\;\;and\;\;4 \le {3^2}$ but $10$ ${(3)^2}$

i.e., $(10,\;4) \in R\;\;and\;\;(4,\;3) \in R\;\;but\;\;(10,\;3) \notin R$

So, R is not transitive.

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