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Suppose at a critical point of a function, the Hessian matrix is given by. Then what does the second derivative test tell us about this critical point?

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MCQs on Linear Algebra.


Suppose at a critical point of a function<br><img src='https://www.fatskills.com/images2/GradExams/375DEE22-0402-48C1-AFAC-76BE5C95CDAE.png' height='18' width='10'/>, the Hessian matrix is given by<br><img src='https://www.fatskills.com/images2/GradExams/1E065C07-245D-429A-BE8C-F529841E5CB3.png' height='72' width='87'/>. Then what does the second derivative test tell us about this critical point?





 
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