Suppose we do a row operation followed by a (possibly different) column operation on a matrix....

Recall the methods for finding bases of the row and column space of a matrix A...

Recall the methods for finding bases of the row and column space of a matrix A which were shown in lectures. To find a basis for the row space we row reduce and then take the non zero rows in reduced row echelon form, and to find a basis for the column space we row reduce to find the pivot columns and then take the corresponding columns from the original matrix. In this question we consider what happens if we...

Let A be a 2x2 matrix and suppose that det(A)=3. For each of the following row...

Let A be a 2x2 matrix and suppose that det(A)=3. For each of the following row operations, determine the value of det(B), where B is the matrix obtained by applying that row operation to A. a) Multiply row 1 by -4 b) Add 4 times row 2 to row 1 c) Interchange rows 2 and 1 Resulting values for det(B): a) det(B) = b) det(B) = c) det(B) =

Suppose we apply the Mix Columns operation to a *column* vector [0x63,0x62,0x61,0x60]T (given with bytes in...

Suppose we apply the Mix Columns operation to a *column* vector [0x63,0x62,0x61,0x60]T (given with bytes in hex). What are the entries of the resulting column (in decimal)?

Solve the system -2x1+4x2+5x3=-22 -4x1+4x2-3x3=-28 4x1-4x2+3x3=30 a)the initial matrix is: b)First, perform the Row Operation 1/-2R1->R1....

Solve the system -2x1+4x2+5x3=-22 -4x1+4x2-3x3=-28 4x1-4x2+3x3=30 a)the initial matrix is: b)First, perform the Row Operation 1/-2R1->R1. The resulting matrix is: c)Next perform operations +4R1+R2->R2 -4R1+R3->R3 The resulting matrix is: d) Finish simplyfying the augmented mantrix down to reduced row echelon form. The reduced matrix is: e) How many solutions does the system have? f) What are the solutions to the system? x1 = x2 = x3 =

  column player      low price  high price Row   low price  0, 0  50, -10 Player   high price  -10, 50  10, 10 The numbers in...

  column player      low price  high price Row   low price  0, 0  50, -10 Player   high price  -10, 50  10, 10 The numbers in the matrix represent profit.  The row player has a dominant strategy of a low price (0 is better than -10 and 50 is better than 10)  and the column player has a dominant strategy of a low price as well (similar numbers). And, low low is a Nash equilibrium. A dilemma that arises here is that both could be better off if they both went with...

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...

MATLAB: Do the following with the provided .m file (a) In the .m file, we have...

MATLAB: Do the following with the provided .m file (a) In the .m file, we have provided three questions. Make sure to answer them. (b) Now on the MATLAB prompt, let us create any two 3 × 3 matrices and you can do the following: X=magic(3); Y=magic(3); X*Y matrixMultiplication3by3(X,Y) (c) Now write a new function in MATLAB called matrixMultiplication that can multiply any two n × n matrix. You can safely assume that we will not test your program with...

MATLAB: Do the following with the provided .m file (a) In the .m file, we have...

MATLAB: Do the following with the provided .m file (a) In the .m file, we have provided three questions. Make sure to answer them. (b) Now on the MATLAB prompt, let us create any two 3 × 3 matrices and you can do the following: X=magic(3); Y=magic(3); X*Y matrixMultiplication3by3(X,Y) (c) Now write a new function in MATLAB called matrixMultiplication that can multiply any two n × n matrix. You can safely assume that we will not test your program with...

Suppose we look at sampling distributions of corresponding to increasing values of the sample size (we...

Suppose we look at sampling distributions of corresponding to increasing values of the sample size (we let n go to infinity, and we look at what happens to the sampling distribution of as we do so). Which of the following is the best statement of consistency? In order for an estimator to be consistent: LETTER. A. Var() must go to zero. B. Bias() must go to zero. C. Bias() must go to zero or Var() must go to zero or...

Suppose you run a simulation model several times with different order quantities. What can we infer...

Suppose you run a simulation model several times with different order quantities. What can we infer about the quantity that maximizes the output, the company’s profit? A. This quantity is the optimal order quantity. B. This quantity might be the optimal order quantity, but we also need to consider the company’s attitude toward risk. C. This is not necessarily the optimal order quantity, because it may have produced the largest profit by luck. D. We can’t infer anything.