Let \( A \) and \( B \) be \( n \times n \) matrices with real entries. Consider the following statements:
- P: If \( A \) is symmetric, then rank(\( A \)) = Number of nonzero eigenvalues (counting multiplicity) of \( A \)
- Q: If \( AB = 0 \), then rank(\( A \)) + rank(\( B \)) \( \leq n \)
Then:
Let \( A \) and \( B \) be \( n \times n \) matrices with real entries. Consider the following statements:
- P: If \( A \) is symmetric, then rank(\( A \)) = Number of nonzero eigenvalues (counting multiplicity) of \( A \)
- Q: If \( AB = 0 \), then rank(\( A \)) + rank(\( B \)) \( \leq n \)
Then:
- both P and Q are TRUE
- P is TRUE and Q is FALSE
- P is FALSE and Q is TRUE
- both P and Q are FALSE
The Correct Option is A
Solution and Explanation
Let’s analyze the two statements:
Statement P: If \( A \) is symmetric, then the rank of \( A \) is equal to the number of nonzero eigenvalues (counting multiplicities) of \( A \). This is a well-known property of symmetric matrices. The rank of a matrix is equal to the number of its nonzero eigenvalues, and for symmetric matrices, this holds true by definition. Hence, Statement P is TRUE.
Statement Q: If \( AB = 0 \), then the rank of \( A \) plus the rank of \( B \) is less than or equal to \( n \). This is a standard result from matrix theory. The rank of a product of two matrices is always less than or equal to the sum of their ranks. Therefore, Statement Q is TRUE.
Thus, both P and Q are TRUE, and the correct answer is (A) both P and Q are TRUE.
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