Let us define a relation \( \mathrm{R} \) in \( \mathbf{R} \) as \(...

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Let us define a relation \( \mathrm{R} \) in \( \mathbf{R} \) as \( a \mathrm{R} b \) if \( a \geq b \). Then \( \mathrm{R} \) is
(A) an equivalence relation
(B) reflexive, transitive but not
\( \mathrm{P} \) symmetric

W
(C) symmetric, transitive but
(D) neither transitive nor reflexive not reflexive but symmetric.
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