X is the unique square root for which every eigenvalue has nonnegative real part. If a has any eigenvalues with negative real parts why
Answers
Answered by
0
hchoiguxyfchljbppkmllp
Ritiksuglan:
hii
Answered by
0
hey mates your answer is here
X is the unique square root for which every eigenvalue has nonnegative real part. If A has any eigenvalues with negative real parts then a complex result is produced. If A is singular then A may not have a square root. A warning is printed if exact singularity is detected
may be it's helpful for you
please mark me as brainliest ✌️✌️
Similar questions