NVAMediumJEE 2023Relations

JEE Mathematics 2023 Question with Solution

Let A={0,3,4,6,7,8,9,10}A = \{0, 3, 4, 6, 7, 8, 9, 10\} and RR be the relation defined on AA such that R={(x,y)A×A:xy is an odd positive integer or xy=2}R = \{(x, y) \in A \times A : x - y \text{ is an odd positive integer or } x - y = 2\}. The minimum number of elements that must be added to RR so that it is a symmetric relation is:

Answer

Correct answer:19

Step-by-step solution

Making the Relation Symmetric

Given: A={0,3,4,6,7,8,9,10}A = \{0, 3, 4, 6, 7, 8, 9, 10\} and R={(x,y):xy is odd positive integer or xy=2}R = \{(x, y) : x - y \text{ is odd positive integer or } x - y = 2\}.

Find: The minimum number of ordered pairs that must be added so that RR becomes symmetric.

A relation is symmetric if whenever (x,y)R(x, y) \in R, then (y,x)R(y, x) \in R must also be in RR.

From the extracted solution:

  1. Define the relation on the given set AA.
  2. Check each pair in RR for the presence of its reverse pair.
  3. Count the missing reverse pairs.

The solution states that:

  • 1515 pairs are missing corresponding to pairs with odd positive difference.
  • 44 pairs are missing corresponding to pairs with xy=2x - y = 2.

Hence, the minimum number of pairs to be added is

15+4=1915 + 4 = 19

Therefore, the minimum number of elements that must be added is 1919.

Using the Symmetry Condition

Given: RR contains those ordered pairs for which xyx - y is an odd positive integer or xy=2x - y = 2.

Find: How many reverse ordered pairs are absent.

To make RR symmetric, each ordered pair (x,y)(x, y) already in RR must be accompanied by (y,x)(y, x).

So the task is to count how many such reverse pairs are not already present in RR. According to the provided solution, these missing pairs are counted category-wise:

Missing pairs=15+4=19\text{Missing pairs} = 15 + 4 = 19

Thus, the relation can be made symmetric by adding 1919 ordered pairs. The correct numerical answer is 1919.

Common mistakes

  • A common mistake is to count the pairs already present in RR instead of the reverse pairs that are missing. This is wrong because symmetry depends on the existence of (y,x)(y, x) for every (x,y)(x, y). Instead, check each ordered pair and look for its mirror pair.

  • Another mistake is to assume that if xyx - y satisfies the condition, then yxy - x also satisfies it automatically. This is wrong because the condition involves an odd positive integer or exactly 22, which is directional. Instead, explicitly test whether the reverse pair belongs to RR.

  • Students may double count missing pairs while examining both (x,y)(x, y) and (y,x)(y, x). This gives an incorrect total. Instead, count each absent reverse pair exactly once.

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