for the matrix, A= [1 2 -1; 2 3 1; -1 -1 -2; 3 5 0]
a. calculate the transpose of A multiplied by A
b. find the eigenvectors and eigenvalues of the answer to a
c. Find the SVD of matrix A
eigenvalues of the matrix A = [1 3 0, 3 ?2 ?1, 0 ?1 1] are 1, ?4
and 3. express the equation of the surface x^2 ? 2y^2 + z^2 + 6xy ?
2yz = 16. How should i determine the order of the coefficient in
the form X^2/A+Y^2/B+Z^2/C=1?
Reproductive System
1.Name three major forms of asexual reproduction.What are
advantages? Disadvantages?
2.What are the advantages of sexual reproduction?
3.Explain why reproduction is an important mechanism of
evolution. Describe at least two different reproductive strategies
that increase evolutionary fitness in animals.
4.How will reproductive strategies differ in water versus
terrestrial environments?
5.What does leopard slug sex have that mammalian sex lacks
(aside from twirling mucusy elegance)?
1) What is meant by Factoring of Accounts Receivables?
2) List 3 advantages of Factoring
3) List 3 disadvantages of Factoring
4) List 3 Factors in the USA.
5) If you are a company that factors your receivables, would you
prefer "recourse" or "non-recourse" factoring? Explain your
choice.
Let C be the following matrix:
C=( 1 2 3 -2
0 1 1 -2
-1 3 2 -8
-1 -2 -3 2 )
Give a basis for the row space of Cin the format [1,2,3],[3,4,5],
for example.
Problem 3:
Find the equilibrium distribution for each transition
matrix.
a)
1/2 1/9 3/10
1/3 1/2 1/5
1/6 7/18 1/2
b)
2/5 0 3/4
0 2/3 1/4
3/5 1/3 0
Problem 4:
For either transition matrix in problem 3, find the other two
eigenvalues with corresponding eigenvectors.
Problem 3:
Find the equilibrium distribution for each transition
matrix.
a)
1/2 1/9 3/10
1/3 1/2 1/5
1/6 7/18 1/2
b)
2/5 0 3/4
0 2/3 1/4
3/5 1/3 0
Problem 4:
For either transition matrix in problem 3, find the other two
eigenvalues with corresponding eigenvectors.