Let S be the set of all real numbers and let R be a relation on S, defined by a R b $\Leftrightarrow$ |a-b| $\leq$ 1. Then, R is

reflexive and symmetric but not transitive

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reflexive and transitive but not symmetric

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symmetric and transitive but not reflexive

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an equivalence relation.

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Solution

The correct option is A reflexive and symmetric but not transitive
(i) $| a - a | = 0 \leq 1$ is always true
(ii) $a R b \Rightarrow | a - b | \leq 1 \Rightarrow | - (a - b) | \leq 1 \Rightarrow | b - a | \leq 1 \Rightarrow b R a$ . So, R is symmetric
(iii) 2R 1 and $1 R \frac{1}{2}$
But, 2 is not related to $\frac{1}{2}$ . So, R is not transitive.

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