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GUJCET · Maths · Relations and Functions
\(R =\left\{(\pi, \pi),\left(\pi^2, \pi^2\right),\left(\pi^3, \pi^3\right),\left(\pi,\pi^2\right),\left(\pi^2, \pi^3\right)\right\}\) is defined on set \(\left\{\pi, \pi^2, \pi^3\right\}\) then \(R\) is ____________ .
- A only symmetric & transitive
- B reflexive but not symmetric nor transitive
- C transitive but not reflexive nor symmetric
- D symmetric but not reflexive nor transitive
Answer & Solution
Correct Answer
(B) reflexive but not symmetric nor transitive
Step-by-step Solution
Detailed explanation
\(R\) is reflexive: \((\pi, \pi) \in R\), \((\pi^2, \pi^2) \in R\), \((\pi^3, \pi^3) \in R\). \(R\) is not symmetric: \((\pi, \pi^2) \in R\) but \((\pi^2, \pi) \notin R\).
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