MCQMediumJEE 2024Algebra of Matrices

JEE Mathematics 2024 Question with Solution

Let R=diag(sinθ,sin(θ+2π/3),sin(θ+4π/3))R = \operatorname{diag}(\sin\theta, \sin(\theta + 2\pi/3), \sin(\theta + 4\pi/3)) be a diagonal 3×33 \times 3 matrix. For a square matrix MM, let trace(M)\operatorname{trace}(M) denote the sum of all the diagonal entries of MM. Then among the statements: (I) Trace(R)=0\operatorname{Trace}(R) = 0 (II) If trace(adj(adj(R)))=0\operatorname{trace}(\operatorname{adj}(\operatorname{adj}(R))) = 0, then RR has exactly one non-zero entry. Which of the following is true?

  • A

    Both (I) and (II) are true

  • B

    Neither (I) nor (II) is true

  • C

    Only (II) is true

  • D

    Only (I) is true

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: R=diag(x,y,z)R = \operatorname{diag}(x,y,z) where

x=sinθ,y=sin(θ+2π3),z=sin(θ+4π3)x = \sin\theta, \quad y = \sin\left(\theta + \frac{2\pi}{3}\right), \quad z = \sin\left(\theta + \frac{4\pi}{3}\right)

Find: Which of the statements (I) and (II) is true.

For statement (I),

trace(R)=x+y+z=sinθ+sin(θ+2π3)+sin(θ+4π3)\operatorname{trace}(R) = x + y + z = \sin\theta + \sin\left(\theta + \frac{2\pi}{3}\right) + \sin\left(\theta + \frac{4\pi}{3}\right)

Using

sin(A+B)=sinAcosB+cosAsinB\sin(A+B) = \sin A \cos B + \cos A \sin B

we get

sin(θ+2π3)=12sinθ+32cosθ\sin\left(\theta + \frac{2\pi}{3}\right) = -\frac{1}{2}\sin\theta + \frac{\sqrt{3}}{2}\cos\theta

and

sin(θ+4π3)=12sinθ32cosθ\sin\left(\theta + \frac{4\pi}{3}\right) = -\frac{1}{2}\sin\theta - \frac{\sqrt{3}}{2}\cos\theta

Therefore,

trace(R)=sinθ+(12sinθ+32cosθ)+(12sinθ32cosθ)=0\operatorname{trace}(R) = \sin\theta + \left(-\frac{1}{2}\sin\theta + \frac{\sqrt{3}}{2}\cos\theta\right) + \left(-\frac{1}{2}\sin\theta - \frac{\sqrt{3}}{2}\cos\theta\right) = 0

So statement (I) is true.

Now consider statement (II). For a 3×33 \times 3 matrix,

adj(adj(R))=(detR)R\operatorname{adj}(\operatorname{adj}(R)) = (\det R)R

Since RR is diagonal,

detR=xyz\det R = xyz

Hence,

adj(adj(R))=(xyz)(x000y000z)=(x2yz000xy2z000xyz2)\operatorname{adj}(\operatorname{adj}(R)) = (xyz)\begin{pmatrix}x&0&0\\0&y&0\\0&0&z\end{pmatrix} = \begin{pmatrix}x^2yz&0&0\\0&xy^2z&0\\0&0&xyz^2\end{pmatrix}

Thus,

trace(adj(adj(R)))=x2yz+xy2z+xyz2=xyz(x+y+z)\operatorname{trace}(\operatorname{adj}(\operatorname{adj}(R))) = x^2yz + xy^2z + xyz^2 = xyz(x+y+z)

But from statement (I),

x+y+z=0x+y+z=0

So,

trace(adj(adj(R)))=0\operatorname{trace}(\operatorname{adj}(\operatorname{adj}(R))) = 0

for all θ\theta.

To test the conclusion in statement (II), take

θ=π6\theta = \frac{\pi}{6}

Then,

x=sinπ6=12,y=sin5π6=12,z=sin3π2=1x = \sin\frac{\pi}{6} = \frac{1}{2}, \quad y = \sin\frac{5\pi}{6} = \frac{1}{2}, \quad z = \sin\frac{3\pi}{2} = -1

All three diagonal entries are non-zero, so RR does not have exactly one non-zero entry.

Therefore statement (II) is false.

Hence only statement (I) is true. The solution concludes "The Correct Option is A", but this conflicts with the option list, where "Only (I) is true" is option D. Based on the worked solution and the given options, the defensible answer is D.

Shortcut Using the Sum and Product Form

Given: x=sinθ,  y=sin(θ+2π3),  z=sin(θ+4π3)x = \sin\theta, \; y = \sin\left(\theta + \frac{2\pi}{3}\right), \; z = \sin\left(\theta + \frac{4\pi}{3}\right)

Find: Which statement is correct.

A quick identity gives

x+y+z=sinθ+sin(θ+2π3)+sin(θ+4π3)=0x+y+z = \sin\theta + \sin\left(\theta + \frac{2\pi}{3}\right) + \sin\left(\theta + \frac{4\pi}{3}\right) = 0

So statement (I) is immediately true.

Also,

trace(adj(adj(R)))=xyz(x+y+z)\operatorname{trace}(\operatorname{adj}(\operatorname{adj}(R))) = xyz(x+y+z)

Hence this trace is automatically 00 because x+y+z=0x+y+z=0. That does not force exactly one of x,y,zx,y,z to be non-zero.

So statement (II) is false.

Therefore only statement (I) is true, so the correct option is D.

Common mistakes

  • Assuming that because trace(adj(adj(R)))=0\operatorname{trace}(\operatorname{adj}(\operatorname{adj}(R)))=0, one of the factors must alone be zero. This is wrong because the expression is xyz(x+y+z)xyz(x+y+z), and here x+y+z=0x+y+z=0 always. Check the full factorization before drawing conclusions about the entries of RR.

  • Using the raw label from the solution without matching it to the actual option text. This is wrong because the worked solution proves only statement (I) is true, which corresponds to option D in the provided list. Always resolve the answer from the mathematical conclusion and then map it to the displayed options.

  • Applying the identity for adj(adj(R))\operatorname{adj}(\operatorname{adj}(R)) incorrectly. For a 3×33 \times 3 matrix, adj(adj(R))=(detR)R\operatorname{adj}(\operatorname{adj}(R))=(\det R)R. Using a wrong power of detR\det R leads to an incorrect trace expression.

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