Question

Which of the following is true? Choose all the correct answers a. λ(M)=(λ(M2))−−−−−−−√=svd(M) for any real matrix M λ(M)=(λ(M2))−−−−−−−√=svd(M) for any real, symmetric matrix M (λ(M2))−−−−−−−√ is always real for any real matrix M (λ(M2))−−−−−−−√ is always real for any real, symmetric matrix M

Answer 1

Answer:

For each value of \lambda, the function could be written as  h(x,y) = x^2 + y^2 - \lambda (2x + 8y - 20) has a minimum value m(\lambda). So, it is function according to the lambda value for finding resultant function.  For each value of λ λ the function h(x,y)=x2+y2−λ(2x+8y−20) h ( x , y ) = x 2 + y 2 − λ ( 2 x + 8 y − 20 ) has a constant value.