Let R be a relation on the set of intege...

Let R be a relation on the set of integers given by `aRb hArr a=2^(k)*b` for some integer k. Then R is :
a)An equivalence relation b)reflexive but not symmetric
c)reflexive and transitive but not symmetric d)reflexive and symmetric but not transitive

an equivalence relation

reflexive but not symmetric

reflexive and transitive but not symmetric

reflexive and symmetric but not transitive

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Let R be a relation on the set of integers given by `aRb hArr a=2^(k)*b` for some integer k. Then R is : a)An equivalence relation b)reflexive but not symmetric c)reflexive and transitive but not symmetric d)reflexive and symmetric but not transitive

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Let R be a relation on the set of integers given by `aRb hArr a=2^(k)*b` for some integer k. Then R is :
a)An equivalence relation b)reflexive but not symmetric
c)reflexive and transitive but not symmetric d)reflexive and symmetric but not transitive