I am having a general question for linear equation. Suppose we have matrix A, B,x where...

4. Suppose that we have a linear system given in matrix form as Ax = b,...

4. Suppose that we have a linear system given in matrix form as Ax = b, where A is an m×n matrix, b is an m×1 column vector, and x is an n×1 column vector. Suppose also that the n × 1 vector u is a solution to this linear system. Answer parts a. and b. below. a. Suppose that the n × 1 vector h is a solution to the homogeneous linear system Ax=0. Showthenthatthevectory=u+hisasolutiontoAx=b. b. Now, suppose that...

n x n matrix A, where n >= 3. Select 3 statements from the invertible matrix...

n x n matrix A, where n >= 3. Select 3 statements from the invertible matrix theorem below and show that all 3 statements are true or false. Make sure to clearly explain and justify your work. A= -1 , 7, 9 7 , 7, 10 -3, -6, -4 The equation A has only the trivial solution. 5. The columns of A form a linearly independent set. 6. The linear transformation x → Ax is one-to-one. 7. The equation Ax...

I'm attempting to diagonalize my 3x3 matrix, but with only 2 eigenvectors I am having trouble...

I'm attempting to diagonalize my 3x3 matrix, but with only 2 eigenvectors I am having trouble organizing my A=PDP^-1. Original matrix [0 0 1] . Calculated eigenvalues: (2,-2) . Calculated eigenvectors: [1/2] [0] [-1/2] [0 2 0] [0] [1] . [0] [4 0 0] [1] [0] [1] If I only have 2 eigenvalues, what do i put for my 3x3 D matrix? What order should I place my Eigenvectors in for my 3x3 P matrix?

How can I think about matrix entries in a general sense? I a looking for a...

How can I think about matrix entries in a general sense? I a looking for a much deeper analysis than “systems of equations.” For instance, I know that when it is a rotation matrix, I know that the column vectors in the matrix, R, will be where the basis vectors land, and hence it will rotate any given vector accordingly. (is this correct in a general sense, as far as rotation matrices go?) However, for a general linear transformation, I...

Suppose Ax = b 0 is a linear system and A is a square, singular matrix....

Suppose Ax = b 0 is a linear system and A is a square, singular matrix. How many solutions is it possible for the system to have?

Prove that for a square n ×n matrix A, Ax = b (1) has one and...

Prove that for a square n ×n matrix A, Ax = b (1) has one and only one solution if and only if A is invertible; i.e., that there exists a matrix n ×n matrix B such that AB = I = B A. NOTE 01: The statement or theorem is of the form P iff Q, where P is the statement “Equation (1) has a unique solution” and Q is the statement “The matrix A is invertible”. This means...

*******I am studying for an upcoming test and I am having trouble with QUESTION B) where...

*******I am studying for an upcoming test and I am having trouble with QUESTION B) where I need to find the sample variances for the two cooperatives (BT) and (PA) I would like to see how you end up with 135.14 and 749.70? I am confused about the capital E symbol and why it is used when finding cooperative? 8.80 Lobster trap placement. Given trap spacings among two lobster fishing crews: BT cooperative has spacings = {93, 99, 105, 94,...

I have a linear regression project for class and am having trouble doing the T-test. I...

I have a linear regression project for class and am having trouble doing the T-test. I gathered data and now I'm just wondering how I would determine my hypothesis. Is it based on a p-value, do I have to find the t-statistic? I'm confused as in given problems the hypothesis is given? I know the level of significance is .10, so would that be my hypothesis (ho: beta =.10)?

I am having trouble with knowing where to start logically with this type of problem and...

I am having trouble with knowing where to start logically with this type of problem and wondering if someone could explain in some detail on how to apprach this. Question Suppose it is known that 1% of the population have a certain kind of cancer. It is also known that a test for this kind of cancer is positive in 99% of the people who have it but is also positive in 2% of the people who do not have...

In class, we have studied the linear time algorithm for selection. In that algorithm, we have...

In class, we have studied the linear time algorithm for selection. In that algorithm, we have used groups of size 5. Suppose we are using groups of size 13. • derive the corresponding recurrence formula. • What is the corresponding time complexity of the algorithm? I found the reccurance relation to be T(n)=O(n)+T(n/13)+T(19n/26), but I am having trouble finding the time complexity. Also I really want to learn this, so a detailed response would be nice. I believe it is...