MCQMediumJEE 2023Complex Numbers Basics

JEE Mathematics 2023 Question with Solution

Let x=(83+13)13x = \left( 8\sqrt{3}+13 \right)^{13} and y=(72+9)9y = \left( 7\sqrt{2}+9 \right)^9. If [t][t] denotes the greatest integer t\leq t, then

  • A

    [x]+[y][x] + [y] is even

  • B

    [x][x] is odd but [y][y] is even

  • C

    [x][x] is even but [y][y] is odd

  • D

    Both [x][x] and [y][y] are both odd

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: x=(83+13)13x = \left( 8\sqrt{3}+13 \right)^{13} and y=(72+9)9y = \left( 7\sqrt{2}+9 \right)^9.

Find: The correct statement about the parity of [x][x] and [y][y].

Take the conjugate-type expressions

x=(1383)13,y=(972)9x' = \left( 13 - 8\sqrt{3} \right)^{13}, \qquad y' = \left( 9 - 7\sqrt{2} \right)^9

Since 0<1383<10 < 13 - 8\sqrt{3} < 1 and 0<972<10 < 9 - 7\sqrt{2} < 1, we get

0<x<1,0<y<10 < x' < 1, \qquad 0 < y' < 1

Now

x+x=(13+83)13+(1383)13x + x' = \left( 13 + 8\sqrt{3} \right)^{13} + \left( 13 - 8\sqrt{3} \right)^{13}

In the binomial expansion, all irrational terms cancel, so x+xx + x' is an integer. Also, every surviving term contains a factor 1313, hence x+xx + x' is odd.

Because 0<x<10 < x' < 1, we have

x=(x+x)xx = (x + x') - x'

so [x]=x+x1[x] = x + x' - 1. Therefore, [x][x] is even.

Similarly,

y+y=(9+72)9+(972)9y + y' = \left( 9 + 7\sqrt{2} \right)^9 + \left( 9 - 7\sqrt{2} \right)^9

Again, irrational terms cancel, so this is an integer. Every surviving term has a factor 99, hence y+yy + y' is odd.

Since 0<y<10 < y' < 1, we get

[y]=y+y1[y] = y + y' - 1

Thus [y][y] is even.

Therefore, both [x][x] and [y][y] are even, so [x]+[y][x] + [y] is even.

The solution states the working leads to this conclusion, but its option label announcement says B, which conflicts with the actual conclusion. Hence the defensible correct option from the working is A.

Parity via conjugate pair

Given: Expressions of the form (a+bn)m\left(a+b\sqrt{n}\right)^m.

Find: The parity of their greatest integer parts.

Use the fact that if

0<abn<10 < a-b\sqrt{n} < 1

then

(a+bn)m+(abn)m\left(a+b\sqrt{n}\right)^m + \left(a-b\sqrt{n}\right)^m

is an integer, while the second term lies between 00 and 11. So the floor of the first term is exactly one less than that integer.

For both given expressions, this associated integer is odd, so the floor becomes odd minus 11, which is even.

Hence [x][x] and [y][y] are both even, and the correct option is A.

Common mistakes

  • Using (8313)13\left(8\sqrt{3}-13\right)^{13} instead of (1383)13\left(13-8\sqrt{3}\right)^{13} as the small positive conjugate term. The former is negative, so it does not justify the floor step. Use the positive quantity between 00 and 11.

  • Checking only that irrational terms cancel and concluding the floor is the same integer. This is wrong because the conjugate term is not zero; it lies strictly between 00 and 11. Therefore, the floor is the integer sum minus 11.

  • Trusting the printed option label from the solution without comparing it to the actual conclusion of the working. Here the working shows [x][x] and [y][y] are both even, so [x]+[y][x]+[y] is even, which matches option A, not B.

Practice more Complex Numbers Basics questions

Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.

Related questions