MCQEasyJEE 2026Basics: Distance, Section Formula, Locus

JEE Mathematics 2026 Question with Solution

The number of elements in the relation R={(x,y):4x2+y2<52,  x,yZ}R=\{(x,y): 4x^2+y^2<52,\; x,y\in\mathbb{Z}\} is

  • A

    6767

  • B

    8989

  • C

    8686

  • D

    7777

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: We are required to count the number of integer ordered pairs (x,y)(x,y) satisfying

4x2+y2<524x^2 + y^2 < 52

Find: The number of elements in the relation RR.

First restrict the possible integer values of xx.

4x2<524x^2 < 52 x2<13x^2 < 13

So,

x=3,2,1,0,1,2,3x = -3,-2,-1,0,1,2,3

Now count the possible integer values of yy for each value of xx.

For x=0x=0,

y2<52y^2 < 52

Hence y7|y| \le 7, so there are 1515 values of yy.

For x=±1x=\pm 1,

y2<48y^2 < 48

Hence y6|y| \le 6, so there are 1313 values of yy for each of these two cases.

For x=±2x=\pm 2,

y2<36y^2 < 36

Hence y5|y| \le 5, so there are 1111 values of yy for each of these two cases.

For x=±3x=\pm 3,

y2<16y^2 < 16

Hence y3|y| \le 3, so there are 77 values of yy for each of these two cases.

Adding all valid ordered pairs,

15+2(13)+2(11)+2(7)15 + 2(13) + 2(11) + 2(7) =15+26+22+14= 15 + 26 + 22 + 14 =77= 77

Therefore, the number of elements in the relation is 7777. The correct option is D.

Common mistakes

  • A common mistake is to treat y2<52y^2<52 as giving y<52|y|<\sqrt{52} and then count only positive values. This is wrong because integer values of yy include negative values and zero as well. Count symmetrically from 7-7 to 77, which gives 1515 values.

  • Another mistake is to use the boundary values as if the inequality were non-strict. For example, for x=±2x=\pm 2, writing y236y^2\le 36 and allowing y=±6y=\pm 6 is wrong because the condition is 4x2+y2<524x^2+y^2<52, not 52\le 52. So here y2<36y^2<36 and hence y5|y|\le 5 only.

  • Students may count the values for x=1,2,3x=1,2,3 and then forget to double for the corresponding negative values of xx. This is wrong because ordered pairs with xx and x-x are distinct. After counting for x=1,2,3x=1,2,3, include both signs separately.

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