MCQMediumJEE 2023Relations

JEE Mathematics 2023 Question with Solution

Let RR be a relation defined on N\mathbb{N} as aRba R b if 2a+3b2a + 3b is a multiple of 55. Then RR is:

  • A

    not reflexive

  • B

    transitive but not symmetric

  • C

    symmetric but not transitive

  • D

    an equivalence relation

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: RR is defined on N\mathbb{N} by aRba R b if 2a+3b2a + 3b is a multiple of 55.

Find: Which property combination the relation RR satisfies.

From the solution:

Reflexivity:

aRa    2a+3a=5aa R a \iff 2a + 3a = 5a

Since 5a5a is a multiple of 55, RR is reflexive.

Symmetry:

aRb    2a+3b=5k,a R b \implies 2a + 3b = 5k, bRa    2b+3a=5m.b R a \implies 2b + 3a = 5m.

The solution states that both are satisfied, so RR is symmetric.

Transitivity:

aRb and bRc    2a+3b=5k,a R b \text{ and } b R c \implies 2a + 3b = 5k, 2b+3c=5m.2b + 3c = 5m.

Adding, the solution gives

2a+3c=5(k+mb)2a + 3c = 5(k + m - b)

so aRca R c. Thus, RR is transitive.

Therefore, the working in the solution concludes that the relation is reflexive, symmetric, and transitive, which would make it an equivalence relation. However, the solution explicitly declares the correct option as B. Following the solution's authority for the final marked answer, the correct option is B.

Answer Resolution from Source

The solution contains an internal inconsistency:

  • It explicitly says The Correct Option is B.
  • But the written explanation says the relation is reflexive, symmetric, and transitive.

Because the solution's explicitly labels B as correct, the extracted answer is recorded as B, while preserving the discrepancy in the solution content.

Common mistakes

  • Checking only one property, such as reflexivity, and concluding the answer from that alone is incorrect. A relation must be tested separately for reflexivity, symmetry, and transitivity.

  • Assuming that aRba R b automatically implies bRab R a without comparing 2a+3b2a + 3b and 2b+3a2b + 3a can lead to a wrong conclusion. Symmetry must be verified from the defining condition.

  • In transitivity, students often add the two given equations carelessly and fail to isolate 2a+3c2a + 3c correctly. The target expression must match the original relation definition.

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