MCQMediumJEE 2023Properties of Determinants

JEE Mathematics 2023 Question with Solution

Let AA be a 3×33 \times 3 matrix such that adj(adj(A))=124|adj(adj(A))| = 12^4. Then A1adj(A)|A^{-1}adj(A)| is equal to:

  • A

    232\sqrt{3}

  • B

    6\sqrt{6}

  • C

    1212

  • D

    11

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: AA is a 3×33 \times 3 matrix and adj(adj(A))=124|adj(adj(A))| = 12^4.

Find: A1adj(A)|A^{-1}adj(A)|.

Using the determinant property for an n×nn \times n matrix,

adj(A)=An1|adj(A)| = |A|^{n-1}

Hence,

adj(adj(A))=adj(A)n1=(An1)n1=A(n1)2|adj(adj(A))| = |adj(A)|^{n-1} = \left(|A|^{n-1}\right)^{n-1} = |A|^{(n-1)^2}

For n=3n = 3,

adj(adj(A))=A4|adj(adj(A))| = |A|^4

So,

A4=124|A|^4 = 12^4

Therefore,

A=12|A| = 12

Now,

A1adj(A)=A1adj(A)|A^{-1}adj(A)| = |A^{-1}|\,|adj(A)|

Also,

A1=1A,adj(A)=A31=A2|A^{-1}| = \frac{1}{|A|}, \qquad |adj(A)| = |A|^{3-1} = |A|^2

Thus,

A1adj(A)=1AA2=A=12|A^{-1}adj(A)| = \frac{1}{|A|}\cdot |A|^2 = |A| = 12

Therefore, the correct option from the extracted solution working is C. The solution contains an internal inconsistency because it also states 232\sqrt{3}, but the determinant relation shown implies 1212.

Check the inconsistency in the scraped solution

The solution text uses the step

A(n1)3=124|A|^{(n-1)^3} = 12^4

and with n=3n=3 concludes

A8=124|A|^8 = 12^4

which gives

A2=12A=23|A|^2 = 12 \Rightarrow |A| = 2\sqrt{3}

This is the route used there to obtain A1adj(A)=23|A^{-1}adj(A)| = 2\sqrt{3}.

However, for a 3×33 \times 3 matrix,

adj(A)=A2|adj(A)| = |A|^{2}

and therefore

adj(adj(A))=adj(A)2=A4|adj(adj(A))| = |adj(A)|^2 = |A|^4

not A8|A|^8.

So the worked algebra displayed on the page is inconsistent with the standard determinant identity. Using the identity written correctly gives

A1adj(A)=12|A^{-1}adj(A)| = 12

which matches option C.

Common mistakes

  • Using adj(adj(A))=A(n1)3|adj(adj(A))| = |A|^{(n-1)^3} without verification. For a matrix of order nn, first use adj(A)=An1|adj(A)| = |A|^{n-1} and then apply the same rule carefully to adj(A)adj(A). For n=3n=3, this gives adj(adj(A))=A4|adj(adj(A))| = |A|^4, not A8|A|^8.

  • Forgetting that determinants multiply under matrix multiplication. The correct step is A1adj(A)=A1adj(A)|A^{-1}adj(A)| = |A^{-1}|\,|adj(A)|, not determinant of a product as a sum or some entrywise operation.

  • Using adj(A)=A|adj(A)| = |A| for a 3×33 \times 3 matrix. The correct identity is adj(A)=An1|adj(A)| = |A|^{n-1}, so here adj(A)=A2|adj(A)| = |A|^2.

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