Consider the following 5 sentences about matrices. 2 of the statements are false in general. Figure out which 2 statements are false. 1) If A is nx n, then 4 and A have the same eigenvalues. (i) If A...


Consider the following 5 sentences about matrices. 2 of the statements<br>are false in general. Figure out which 2 statements are false.<br>1) If A is nx n, then 4 and A have the same eigenvalues.<br>(i) If A is nx n, then A and A! have the same eigenvectors.<br>(ii) If A is nxn then det(4*) = [det(4)]*<br>(iv) If I is the nx n identity matrix, and J is an n xn matrix consisting entirely of ones,<br>then the matrix I-! is invertible and (I-)1 = 1+J.<br>(v) If I is the nxn identity matrix, and J is an nx n matrix consisting entirely of ones,<br>then the matrix A=I- is idempotent (i.e., A A).<br>

Extracted text: Consider the following 5 sentences about matrices. 2 of the statements are false in general. Figure out which 2 statements are false. 1) If A is nx n, then 4 and A have the same eigenvalues. (i) If A is nx n, then A and A! have the same eigenvectors. (ii) If A is nxn then det(4*) = [det(4)]* (iv) If I is the nx n identity matrix, and J is an n xn matrix consisting entirely of ones, then the matrix I-! is invertible and (I-)1 = 1+J. (v) If I is the nxn identity matrix, and J is an nx n matrix consisting entirely of ones, then the matrix A=I- is idempotent (i.e., A A).

Jun 04, 2022
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