AP EAMCET · Maths · Matrices
If \(A\) is a square matrix of order 3 , then consider the following statements.
I. If \(|A|=0\), then \(|\operatorname{Adj} A|=0\)
II. If \(|A| \neq 0\), then \(\left|A^{-1}\right|=|A|^{-1}\)
Which of the above statements is/are true?
- A Both I and II
- B Neither I nor II
- C I only
- D II only
Answer & Solution
Correct Answer
(A) Both I and II
Step-by-step Solution
Detailed explanation
For a square matrix \(A\) of order 3 , \[ |\operatorname{Adj} \cdot A|=|A|^{3-1}=|A|^2 \] If \(|A|=0\), then \(|\operatorname{Adj} \cdot A|=0\) and \(A \cdot A^{-1}=I\), if \(|A| \neq 0\)…
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