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JEE Mathematics 2023 Question with Solution

Let A,B,CA, B, C be 3×33 \times 3 matrices such that AA is symmetric and BB and CC are skew-symmetric. Consider the statements:

  • A

    Only S2 is true

  • B

    Only S1 is true

  • C

    Both S1 and S2 are false

  • D

    Both S1 and S2 are true

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: AT=AA^T = A, BT=BB^T = -B and CT=CC^T = -C.

Find: Which of the two statements S1S1 and S2S2 is true.

Let

M=A13B26B26A13M = A^{13}B^{26} - B^{26}A^{13}

Then

MT=(A13B26B26A13)TM^T = (A^{13}B^{26} - B^{26}A^{13})^T =(A13B26)T(B26A13)T= (A^{13}B^{26})^T - (B^{26}A^{13})^T =(BT)26(AT)13(AT)13(BT)26= (B^T)^{26}(A^T)^{13} - (A^T)^{13}(B^T)^{26}

Using AT=AA^T=A and BT=BB^T=-B,

MT=(B)26A13A13(B)26M^T = (-B)^{26}A^{13} - A^{13}(-B)^{26}

Since 2626 is even,

MT=B26A13A13B26=MM^T = B^{26}A^{13} - A^{13}B^{26} = -M

Hence, MM is skew-symmetric. Therefore, statement S1S1 is false.

Now let

N=A26C13C13A26N = A^{26}C^{13} - C^{13}A^{26}

Then

NT=(A26C13C13A26)TN^T = (A^{26}C^{13} - C^{13}A^{26})^T =(CT)13(AT)26(AT)26(CT)13= (C^T)^{13}(A^T)^{26} - (A^T)^{26}(C^T)^{13}

Using AT=AA^T=A and CT=CC^T=-C,

NT=(C)13A26A26(C)13N^T = (-C)^{13}A^{26} - A^{26}(-C)^{13}

Since 1313 is odd,

NT=C13A26+A26C13N^T = -C^{13}A^{26} + A^{26}C^{13} =A26C13C13A26=N= A^{26}C^{13} - C^{13}A^{26} = N

Hence, NN is symmetric. Therefore, statement S2S2 is true.

So, only S2S2 is true. The correct option is A.

The solution states "The Correct Option is D", but the working clearly concludes "Only S2 is true," which matches option A in the given options.

Transpose Test on Each Statement

For matrix expressions of the form XYX-Y, test symmetry by taking transpose.

  • A matrix is symmetric if MT=MM^T=M.
  • A matrix is skew-symmetric if MT=MM^T=-M.

For S1S1, because AA is symmetric, every power of AA remains symmetric. Since BB is skew-symmetric, B26B^{26} behaves like an even power, so transpose does not introduce a minus sign overall. Thus the commutator

A13B26B26A13A^{13}B^{26} - B^{26}A^{13}

changes to its negative under transpose, so it is skew-symmetric, not symmetric. Hence S1S1 is false.

For S2S2, A26A^{26} is symmetric and C13C^{13} carries a negative sign under transpose because the exponent is odd. Therefore,

A26C13C13A26A^{26}C^{13} - C^{13}A^{26}

comes back unchanged after transpose, so it is symmetric. Hence S2S2 is true.

Therefore, only S2S2 is true, so the correct option is A.

Common mistakes

  • Assuming the option label shown on the solution is automatically correct. Here the working concludes "Only S2 is true," which matches option A in the provided options, not D. Always match the conclusion with the given option list.

  • Forgetting that (B)26=B26(-B)^{26} = B^{26} because 2626 is even. Missing this parity check leads to the wrong symmetry type for S1S1.

  • Forgetting that (C)13=C13(-C)^{13} = -C^{13} because 1313 is odd. This sign is essential to show that the expression in S2S2 is symmetric.

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