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प्रश्न
Which one of the following relations on the set of real numbers R is an equivalence relation?
विकल्प
aR1b ⇔ |a| = |b|
aR2b ⇔ a ≥ b
aR3b⇒a divides b
aR4b ⇔ a < b
MCQ
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उत्तर
aR1b ⇔ |a| = |b|
Explanation:
The relation R1 is an equivalence relation
∀a ∈ R, |a| = |a|, i.e. aR1a ∀a ∈ R
∴ R₁ is reflexive.
Again ∀ a, b ∈ R, |a| = |b| ⇒ |b| = |a|
∴ aR1b ⇒ bR1a. Therefore, R is symmetric.
Also, ∀ a, b, c ∈ R, |a| = |b| and |b| = |c|
⇒ |a| = |c| ∴ aR1b and bR1c ⇒ aR1c
⇒ R1 is transitive
R2 and R3 are not symmetric.
R4 is neither reflexive nor symmetric.
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