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GATE CSE 2015 Set 2 | Question: 16

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Let $R$ be the relation on the set of positive integers such that $aRb$ and only if $a$ and $b$ are distinct and let have a common divisor other than $1.$ Which one of the following statements about $R$ is true?

  1. $R$ is symmetric and reflexive but not transitive
  2. $R$ is reflexive but not symmetric not transitive
  3. $R$ is transitive but not reflexive and not symmetric
  4. $R$ is symmetric but not reflexive and not transitive
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Answer: $D$

Take $(3, 6)$ and $(6, 2)$ elements of $R$. For transitivity $(3, 2)$ must be element of $R$, but $3$ and $2$ don't have a common divisor and hence not in $R$.

For any positive integer $n$, $(n, n)$ is not element of $R$ as only distinct $m$ and $n$ are allowed for $(m, n)$ in $R$. So, not reflexive also.
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The correct ans is (D) R is symmetric but not reflexive and not transitive

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