Question:
If \(\begin{bmatrix}\alpha & \beta
\gamma & -\alpha\end{bmatrix}\) is a square root of identity matrix of order 2, then
If \(\begin{bmatrix}\alpha & \beta
\gamma & -\alpha\end{bmatrix}\) is a square root of identity matrix of order 2, then
\gamma & -\alpha\end{bmatrix}\) is a square root of identity matrix of order 2, then
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Matrix square roots satisfy \(A^2=I\).
Updated On: Mar 24, 2026
- \(1+\alpha^2+\beta\gamma=0\)
- \(1+\alpha^2-\beta\gamma=0\)
- \(1-\alpha^2+\beta\gamma=0\)
- \(\alpha^2+\beta\gamma=1\)
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The Correct Option is B
Solution and Explanation
Step 1: Square the matrix and equate to identity matrix.
Step 2: Comparing elements gives: \[ 1+\alpha^2-\beta\gamma=0 \]
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